phanerozoic/redtt · Datasets at Hugging Face

fact stringlengths 10 2.87k	statement stringlengths 2 731	proof stringlengths 5 2.72k	type stringclasses 2 values	symbolic_name stringlengths 1 31	library stringclasses 6 values	filename stringclasses 65 values	imports listlengths 0 10	deps listlengths 0 15	docstring stringclasses 19 values	line_start int64 1 266	line_end int64 3 272	has_proof bool 1 class	source_url stringclasses 1 value	commit stringclasses 1 value
is-biinv-equiv (A B : type) (f : A → B) : type = section A B f × retraction A B f	is-biinv-equiv (A B : type) (f : A → B) : type	= section A B f × retraction A B f	def	is-biinv-equiv	library/basics	library/basics/biinv-equiv.red	[ "basics.isotoequiv", "basics.retract", "prelude" ]	[ "retraction", "section" ]	null	7	8	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
biinv-equiv (A B : type) : type = (f : A → B) × is-biinv-equiv A B f	biinv-equiv (A B : type) : type	= (f : A → B) × is-biinv-equiv A B f	def	biinv-equiv	library/basics	library/basics/biinv-equiv.red	[ "basics.isotoequiv", "basics.retract", "prelude" ]	[ "is-biinv-equiv" ]	null	10	10	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
biinv-equiv→iso (A B : type) : biinv-equiv A B → iso A B = λ (f,(g,α),h,β) → let β' (a : A) : path _ (g (f a)) a = λ i → comp 0 1 (h (α (f a) i)) [ \| i=0 j → β (g (f a)) j \| i=1 j → β a j ] in (f,g,α,β')	biinv-equiv→iso (A B : type) : biinv-equiv A B → iso A B	= λ (f,(g,α),h,β) → let β' (a : A) : path _ (g (f a)) a = λ i → comp 0 1 (h (α (f a) i)) [ \| i=0 j → β (g (f a)) j \| i=1 j → β a j ] in (f,g,α,β')	def	biinv-equiv→iso	library/basics	library/basics/biinv-equiv.red	[ "basics.isotoequiv", "basics.retract", "prelude" ]	[ "biinv-equiv", "iso", "path" ]	null	12	21	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
lcoh (A B : type) (f : A → B) (g : B → A) (f-g : (b : _) → path _ (f (g b)) b) : type = (g-f : (a : _) → path _ (g (f a)) a) × (a : A) → path (path _ (f (g (f a))) (f a)) (λ i → f (g-f a i)) (f-g (f a))	lcoh (A B : type) (f : A → B) (g : B → A) (f-g : (b : _) → path _ (f (g b)) b) : type	= (g-f : (a : _) → path _ (g (f a)) a) × (a : A) → path (path _ (f (g (f a))) (f a)) (λ i → f (g-f a i)) (f-g (f a))	def	lcoh	library/basics	library/basics/ha-equiv.red	[ "basics.retract", "prelude" ]	[ "path" ]	null	6	8	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
is-ha-equiv (A B : type) (f : A → B) : type = (g : B → A) × (f-g : (b : _) → path _ (f (g b)) b) × lcoh A B f g f-g	is-ha-equiv (A B : type) (f : A → B) : type	= (g : B → A) × (f-g : (b : _) → path _ (f (g b)) b) × lcoh A B f g f-g	def	is-ha-equiv	library/basics	library/basics/ha-equiv.red	[ "basics.retract", "prelude" ]	[ "lcoh", "path" ]	null	10	13	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
ha-equiv (A B : type) : type = (f : A → B) × is-ha-equiv A B f	ha-equiv (A B : type) : type	= (f : A → B) × is-ha-equiv A B f	def	ha-equiv	library/basics	library/basics/ha-equiv.red	[ "basics.retract", "prelude" ]	[ "is-ha-equiv" ]	null	15	15	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
ha-equiv/symm (A B : type) (e : ha-equiv A B) : ha-equiv B A = let (f, g, f-g, g-f, adj) = e in let adj' (b : B) : path (path _ (g (f (g b))) (g b)) (λ i → g (f-g b i)) (g-f (g b)) = λ j i → let cap0 : A = comp 1 0 (g (f-g (f-g b i) j)) [ \| i=0 k → g (adj (g b) k j) \| i=1 \| ∂[j] → refl ...	ha-equiv/symm (A B : type) (e : ha-equiv A B) : ha-equiv B A	= let (f, g, f-g, g-f, adj) = e in let adj' (b : B) : path (path _ (g (f (g b))) (g b)) (λ i → g (f-g b i)) (g-f (g b)) = λ j i → let cap0 : A = comp 1 0 (g (f-g (f-g b i) j)) [ \| i=0 k → g (adj (g b) k j) \| i=1 \| ∂[j] → refl ] in let filler (x k : 𝕀) : A = comp 0 x (g...	def	ha-equiv/symm	library/basics	library/basics/ha-equiv.red	[ "basics.retract", "prelude" ]	[ "ha-equiv", "path", "weak-connection/and", "weak-connection/or" ]	this symmetry function is exactly involutive on all but the highest coherence	18	49	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
equiv→ha-equiv (A B : type) (e : equiv A B) : ha-equiv A B = let (f, c) = e in let g (b : B) = c b .fst .fst in let f-g (b : B) = c b .fst .snd in let p (a : A) = symm (fiber A B f (f a)) (c (f a) .snd (a, refl)) in ( f , g , f-g , λ a i → p a i .fst , λ a j i → comp 1 0 (p a i .snd j) [ \| i=0...	equiv→ha-equiv (A B : type) (e : equiv A B) : ha-equiv A B	= let (f, c) = e in let g (b : B) = c b .fst .fst in let f-g (b : B) = c b .fst .snd in let p (a : A) = symm (fiber A B f (f a)) (c (f a) .snd (a, refl)) in ( f , g , f-g , λ a i → p a i .fst , λ a j i → comp 1 0 (p a i .snd j) [ \| i=0 k → weak-connection/and B (f-g (f a)) j k \| i=1 → refl...	def	equiv→ha-equiv	library/basics	library/basics/ha-equiv.red	[ "basics.retract", "prelude" ]	[ "equiv", "fiber", "ha-equiv", "symm", "weak-connection/and", "weak-connection/or" ]	null	51	67	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
stable (A : type) : type = neg (neg A) → A	stable (A : type) : type	= neg (neg A) → A	def	stable	library/basics	library/basics/hedberg.red	[ "basics.retract", "data.or", "data.void", "prelude" ]	[ "neg" ]	null	6	7	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
dec (A : type) : type = or A (neg A)	dec (A : type) : type	= or A (neg A)	def	dec	library/basics	library/basics/hedberg.red	[ "basics.retract", "data.or", "data.void", "prelude" ]	[ "neg", "or" ]	null	9	10	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
discrete (A : type) : type = (x y : A) → dec (path A x y)	discrete (A : type) : type	= (x y : A) → dec (path A x y)	def	discrete	library/basics	library/basics/hedberg.red	[ "basics.retract", "data.or", "data.void", "prelude" ]	[ "dec", "path" ]	null	12	13	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
dec→stable (A : type) : dec A → stable A = elim [ \| inl a → λ _ → a \| inr f → λ g → elim (g f) [] ]	dec→stable (A : type) : dec A → stable A	= elim [ \| inl a → λ _ → a \| inr f → λ g → elim (g f) [] ]	def	dec→stable	library/basics	library/basics/hedberg.red	[ "basics.retract", "data.or", "data.void", "prelude" ]	[ "dec", "stable" ]	null	15	19	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
neg/is-prop-over (A : 𝕀 → type) : is-prop-over (λ i → neg (A i)) = prop→prop-over (λ i → neg (A i)) (neg/prop (A 1))	neg/is-prop-over (A : 𝕀 → type) : is-prop-over (λ i → neg (A i))	= prop→prop-over (λ i → neg (A i)) (neg/prop (A 1))	def	neg/is-prop-over	library/basics	library/basics/hedberg.red	[ "basics.retract", "data.or", "data.void", "prelude" ]	[ "is-prop-over", "neg", "neg/prop", "prop→prop-over" ]	null	21	23	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
paths-stable→set (A : type) (st : (x y : A) → stable (path A x y)) : is-set A = λ a b p q i j → let square (k m : 𝕀) : A = comp 0 k a [ \| m=0 → p \| m=1 → q ] in let mycap (k m : 𝕀) = st (p k) (q k) (λ c → c (square k)) m in comp 0 1 (mycap j i) [ \| i=0 k → st (p j) (p j) (neg/is...	paths-stable→set (A : type) (st : (x y : A) → stable (path A x y)) : is-set A	= λ a b p q i j → let square (k m : 𝕀) : A = comp 0 k a [ \| m=0 → p \| m=1 → q ] in let mycap (k m : 𝕀) = st (p k) (q k) (λ c → c (square k)) m in comp 0 1 (mycap j i) [ \| i=0 k → st (p j) (p j) (neg/is-prop-over (λ j → neg (path A (p j) (p j))) (λ c → c (square 0)) ...	def	paths-stable→set	library/basics	library/basics/hedberg.red	[ "basics.retract", "data.or", "data.void", "prelude" ]	[ "is-set", "neg", "neg/is-prop-over", "path", "square", "stable", "weak-connection/or" ]	Hedberg's theorem for stable path types	26	45	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
discrete→set (A : type) (d : discrete A) : is-set A = paths-stable→set A (λ x y → dec→stable (path A x y) (d x y))	discrete→set (A : type) (d : discrete A) : is-set A	= paths-stable→set A (λ x y → dec→stable (path A x y) (d x y))	def	discrete→set	library/basics	library/basics/hedberg.red	[ "basics.retract", "data.or", "data.void", "prelude" ]	[ "dec→stable", "discrete", "is-set", "path", "paths-stable→set" ]	Hedberg's theorem for decidable path types	48	49	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
hrel/set-equiv (A : type) (R : A → A → type) (R/prop : (x y : A) → is-prop (R x y)) (R/refl : (x : A) → R x x) (R/id : (x y : A) → R x y → path A x y) : (is-set A) × ((x y : A) → equiv (R x y) (path A x y)) = let eq = path-retract/equiv A R (λ a b → ( R/id a b , λ p → coe 0 1 (R/refl a) in λ...	hrel/set-equiv (A : type) (R : A → A → type) (R/prop : (x y : A) → is-prop (R x y)) (R/refl : (x : A) → R x x) (R/id : (x y : A) → R x y → path A x y) : (is-set A) × ((x y : A) → equiv (R x y) (path A x y))	= let eq = path-retract/equiv A R (λ a b → ( R/id a b , λ p → coe 0 1 (R/refl a) in λ j → R a (p j) , λ rab → R/prop a b (coe 0 1 (R/refl a) in λ j → R a (R/id a b rab j)) rab )) in ( λ x y → coe 0 1 (R/prop x y) in λ j → is-prop (ua _ _ (eq x y) j) , eq )	def	hrel/set-equiv	library/basics	library/basics/hedberg.red	[ "basics.retract", "data.or", "data.void", "prelude" ]	[ "equiv", "is-prop", "is-set", "path", "path-retract/equiv", "ua" ]	null	51	65	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
paths-stable→set/alt (A : type) (st : (x y : A) → stable (path A x y)) : is-set A = (hrel/set-equiv A (λ x y → neg (neg (path A x y))) (λ x y → neg/prop (neg (path A x y))) (λ _ np → np refl) st ).fst	paths-stable→set/alt (A : type) (st : (x y : A) → stable (path A x y)) : is-set A	= (hrel/set-equiv A (λ x y → neg (neg (path A x y))) (λ x y → neg/prop (neg (path A x y))) (λ _ np → np refl) st ).fst	def	paths-stable→set/alt	library/basics	library/basics/hedberg.red	[ "basics.retract", "data.or", "data.void", "prelude" ]	[ "hrel/set-equiv", "is-set", "neg", "neg/prop", "path", "stable" ]	Hedberg's theorem is a corollary of above	68	73	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
iso (A B : type) : type = (f : A → B) × (g : B → A) × ((b : _) → path _ (f (g b)) b) × (a : _) → path _ (g (f a)) a	iso (A B : type) : type	= (f : A → B) × (g : B → A) × ((b : _) → path _ (f (g b)) b) × (a : _) → path _ (g (f a)) a	def	iso	library/basics	library/basics/isotoequiv.red	[ "prelude" ]	[ "path" ]	null	7	11	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
iso/refl (A : type) : iso A A = ( λ f → f , λ g → g , λ _ → refl , λ _ → refl )	iso/refl (A : type) : iso A A	= ( λ f → f , λ g → g , λ _ → refl , λ _ → refl )	def	iso/refl	library/basics	library/basics/isotoequiv.red	[ "prelude" ]	[ "iso" ]	null	13	18	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
iso/symm (A B : type) (I : iso A B) : iso B A = let (f,g,α,β) = I in (g,f,β,α)	iso/symm (A B : type) (I : iso A B) : iso B A	= let (f,g,α,β) = I in (g,f,β,α)	def	iso/symm	library/basics	library/basics/isotoequiv.red	[ "prelude" ]	[ "iso" ]	null	20	21	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
iso/trans (A B C : type) (I1 : iso A B) (I2 : iso B C) : iso A C = let (f1,g1,α1,β1) = I1 in let (f2,g2,α2,β2) = I2 in ( λ a → f2 (f1 a) , λ c → g1 (g2 c) , λ c → trans _ (λ j → f2 (α1 (g2 c) j)) (α2 c) , λ a → trans _ (λ j → g1 (β2 (f1 a) j)) (β1 a) )	iso/trans (A B C : type) (I1 : iso A B) (I2 : iso B C) : iso A C	= let (f1,g1,α1,β1) = I1 in let (f2,g2,α2,β2) = I2 in ( λ a → f2 (f1 a) , λ c → g1 (g2 c) , λ c → trans _ (λ j → f2 (α1 (g2 c) j)) (α2 c) , λ a → trans _ (λ j → g1 (β2 (f1 a) j)) (β1 a) )	def	iso/trans	library/basics	library/basics/isotoequiv.red	[ "prelude" ]	[ "iso", "trans" ]	null	23	30	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
iso/fiber/prop-over (A B : type) (I : iso A B) (b : 𝕀 → B) : is-prop-over (λ i → fiber _ _ (I.fst) (b i)) = let (f, g, α, β) = I in let sq (b : B) (fib : fiber _ _ f b) (j k : 𝕀) : A = comp k j (β (fib.fst) k) [ \| k=1 → refl \| k=0 j → g (fib.snd j) ] in λ fib0 fib1 → let sq2 (i k : �...	iso/fiber/prop-over (A B : type) (I : iso A B) (b : 𝕀 → B) : is-prop-over (λ i → fiber _ _ (I.fst) (b i))	= let (f, g, α, β) = I in let sq (b : B) (fib : fiber _ _ f b) (j k : 𝕀) : A = comp k j (β (fib.fst) k) [ \| k=1 → refl \| k=0 j → g (fib.snd j) ] in λ fib0 fib1 → let sq2 (i k : 𝕀) : A = comp 0 k (g (b i)) [ \| i=0 → sq (b 0) fib0 1 \| i=1 → sq (b 1) fib1 1 ] in λ i → ( re...	def	iso/fiber/prop-over	library/basics	library/basics/isotoequiv.red	[ "prelude" ]	[ "fiber", "is-prop-over", "iso" ]	null	32	67	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
iso→equiv (A B : type) (I : iso A B) : equiv A B = let (f, g, α, β) = I in (f , λ b → ((g b, α b), λ fib → iso/fiber/prop-over _ _ I (λ _ → b) fib (g b, α b)))	iso→equiv (A B : type) (I : iso A B) : equiv A B	= let (f, g, α, β) = I in (f , λ b → ((g b, α b), λ fib → iso/fiber/prop-over _ _ I (λ _ → b) fib (g b, α b)))	def	iso→equiv	library/basics	library/basics/isotoequiv.red	[ "prelude" ]	[ "equiv", "iso", "iso/fiber/prop-over" ]	null	69	71	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
equiv→iso (A B : type) (e : equiv A B) : iso A B = ( e .fst , λ b → e .snd b .fst .fst , λ b → e .snd b .fst .snd , λ a i → symm (fiber A B (e .fst) (e .fst a)) (e .snd (e .fst a) .snd (a, refl)) i .fst )	equiv→iso (A B : type) (e : equiv A B) : iso A B	= ( e .fst , λ b → e .snd b .fst .fst , λ b → e .snd b .fst .snd , λ a i → symm (fiber A B (e .fst) (e .fst a)) (e .snd (e .fst a) .snd (a, refl)) i .fst )	def	equiv→iso	library/basics	library/basics/isotoequiv.red	[ "prelude" ]	[ "equiv", "fiber", "iso", "symm" ]	null	79	84	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
retraction (A B : type) (f : A → B) : type = (g : B → A) × (a : A) → path A (g (f a)) a	retraction (A B : type) (f : A → B) : type	= (g : B → A) × (a : A) → path A (g (f a)) a	def	retraction	library/basics	library/basics/retract.red	[ "basics.isotoequiv", "prelude" ]	[ "path" ]	null	4	5	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
section (A B : type) (f : A → B) : type = (g : B → A) × (b : B) → path B (f (g b)) b	section (A B : type) (f : A → B) : type	= (g : B → A) × (b : B) → path B (f (g b)) b	def	section	library/basics	library/basics/retract.red	[ "basics.isotoequiv", "prelude" ]	[ "path" ]	null	7	8	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
retract (A B : type) : type = (f : A → B) × retraction A B f	retract (A B : type) : type	= (f : A → B) × retraction A B f	def	retract	library/basics	library/basics/retract.red	[ "basics.isotoequiv", "prelude" ]	[ "retraction" ]	null	10	11	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
retract/path-action (A B : type) (f : A → B) (retr : retraction A B f) (a a' : A) : retract (path _ a a') (path B (f a) (f a')) = let (g,α) = retr in ( λ p i → f (p i) , λ q i → comp 0 1 (g (q i)) [i=0 → α a \| i=1 → α a'] , λ p j i → comp j 1 (α (p i) j) [i=0 → α a \| i=1 → α a'] )	retract/path-action (A B : type) (f : A → B) (retr : retraction A B f) (a a' : A) : retract (path _ a a') (path B (f a) (f a'))	= let (g,α) = retr in ( λ p i → f (p i) , λ q i → comp 0 1 (g (q i)) [i=0 → α a \| i=1 → α a'] , λ p j i → comp j 1 (α (p i) j) [i=0 → α a \| i=1 → α a'] )	def	retract/path-action	library/basics	library/basics/retract.red	[ "basics.isotoequiv", "prelude" ]	[ "path", "retract", "retraction" ]	null	13	21	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
retract/hlevel : (l : hlevel) (A B : type) → retract A B → has-hlevel l B → has-hlevel l A = elim [ \| contr → λ A B (f,g,α) B/contr → ( g (B/contr .fst) , λ a i → comp 0 1 (g (B/contr .snd (f a) i)) [ \| i=0 → α a \| i=1 → refl ] ) \| hsuc l → elim l [ \| contr → λ A B ...	retract/hlevel : (l : hlevel) (A B : type) → retract A B → has-hlevel l B → has-hlevel l A	= elim [ \| contr → λ A B (f,g,α) B/contr → ( g (B/contr .fst) , λ a i → comp 0 1 (g (B/contr .snd (f a) i)) [ \| i=0 → α a \| i=1 → refl ] ) \| hsuc l → elim l [ \| contr → λ A B (f,g,α) B/prop a a' i → comp 0 1 (g (B/prop (f a) (f a') i)) [ \| i=0 → α a \| ...	def	retract/hlevel	library/basics	library/basics/retract.red	[ "basics.isotoequiv", "prelude" ]	[ "has-hlevel", "hlevel", "path", "retract", "retract/path-action" ]	null	23	47	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
path-retract/preserves-refl (A : type) (R : A → A → type) (ret : (x y : A) → retract (R x y) (path A x y)) (x : A) : path _ (ret x x .fst (ret x x .snd .fst refl)) refl = let s (x y : A) : R x y → path A x y = ret x y .fst in let r (x y : A) : path A x y → R x y = ret x y .snd .fst in let q = s x x (r x x r...	path-retract/preserves-refl (A : type) (R : A → A → type) (ret : (x y : A) → retract (R x y) (path A x y)) (x : A) : path _ (ret x x .fst (ret x x .snd .fst refl)) refl	= let s (x y : A) : R x y → path A x y = ret x y .fst in let r (x y : A) : path A x y → R x y = ret x y .snd .fst in let q = s x x (r x x refl) in let cap1 : [i j] A [ \| j=0 → x \| j=1 → q i \| i=0 → q j \| i=1 → s x x (r x x q) j ] = λ i j → s x (q i) (r x (q i) (λ k → weak-connect...	def	path-retract/preserves-refl	library/basics	library/basics/retract.red	[ "basics.isotoequiv", "prelude" ]	[ "path", "retract", "weak-connection/and" ]	Adapted from https://github.com/HoTT/book/issues/718 Any family of retracts of the path family preserves refl through the other round-trip	51	91	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
path-retract/equiv (A : type) (R : A → A → type) (ret : (x y : A) → retract (R x y) (path A x y)) (a b : A) : equiv (R a b) (path A a b) = let preserves-refl = path-retract/preserves-refl A R ret a in iso→equiv (R a b) (path A a b) ( ret a b .fst , ret a b .snd .fst , λ p → J A p (λ q → path _ (re...	path-retract/equiv (A : type) (R : A → A → type) (ret : (x y : A) → retract (R x y) (path A x y)) (a b : A) : equiv (R a b) (path A a b)	= let preserves-refl = path-retract/preserves-refl A R ret a in iso→equiv (R a b) (path A a b) ( ret a b .fst , ret a b .snd .fst , λ p → J A p (λ q → path _ (ret a (q 1) .fst (ret a (q 1) .snd .fst q)) q) preserves-refl , ret a b .snd .snd )	def	path-retract/equiv	library/basics	library/basics/retract.red	[ "basics.isotoequiv", "prelude" ]	[ "equiv", "iso→equiv", "path", "path-retract/preserves-refl", "retract" ]	null	95	105	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
equiv-section/prop (A B : type) (f : A → B) (c : is-equiv A B f) : is-prop (section A B f) = λ (g0,p0) (g1,p1) i → let α (b : B) : path (fiber A B f b) (g0 b, p0 b) (g1 b, p1 b) = contr→prop (fiber A B f b) (c b) (g0 b, p0 b) (g1 b, p1 b) in (λ b → α b i .fst, λ b → α b i .snd)	equiv-section/prop (A B : type) (f : A → B) (c : is-equiv A B f) : is-prop (section A B f)	= λ (g0,p0) (g1,p1) i → let α (b : B) : path (fiber A B f b) (g0 b, p0 b) (g1 b, p1 b) = contr→prop (fiber A B f b) (c b) (g0 b, p0 b) (g1 b, p1 b) in (λ b → α b i .fst, λ b → α b i .snd)	def	equiv-section/prop	library/basics	library/basics/retract.red	[ "basics.isotoequiv", "prelude" ]	[ "contr→prop", "fiber", "is-equiv", "is-prop", "path", "section" ]	null	107	113	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
precompose-equiv (A B C : type) (e : equiv A B) : equiv (B → C) (A → C) = let (f,g,α,β) = equiv→iso _ _ e in iso→equiv (B → C) (A → C) ( λ h a → h (f a) , λ k b → k (g b) , λ k i a → k (β a i) , λ h i b → h (α b i) )	precompose-equiv (A B C : type) (e : equiv A B) : equiv (B → C) (A → C)	= let (f,g,α,β) = equiv→iso _ _ e in iso→equiv (B → C) (A → C) ( λ h a → h (f a) , λ k b → k (g b) , λ k i a → k (β a i) , λ h i b → h (α b i) )	def	precompose-equiv	library/basics	library/basics/retract.red	[ "basics.isotoequiv", "prelude" ]	[ "equiv", "equiv→iso", "iso→equiv" ]	TODO this does not really belong in this file	116	123	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
equiv-retraction/prop (A B : type) (f : A → B) (c : is-equiv A B f) : is-prop (retraction A B f) = λ (g0,q0) (g1,q1) i → let p = contr→prop _ (precompose-equiv A B A (f,c) .snd (λ a → a)) (g0, λ j b → q0 b j) (g1, λ j b → q1 b j) in (p i .fst, λ b j → p i .snd j b)	equiv-retraction/prop (A B : type) (f : A → B) (c : is-equiv A B f) : is-prop (retraction A B f)	= λ (g0,q0) (g1,q1) i → let p = contr→prop _ (precompose-equiv A B A (f,c) .snd (λ a → a)) (g0, λ j b → q0 b j) (g1, λ j b → q1 b j) in (p i .fst, λ b j → p i .snd j b)	def	equiv-retraction/prop	library/basics	library/basics/retract.red	[ "basics.isotoequiv", "prelude" ]	[ "contr→prop", "is-equiv", "is-prop", "precompose-equiv", "retraction" ]	null	125	132	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
biinv-int where \| zero \| suc (z : biinv-int) \| predl (z : biinv-int) \| predr (z : biinv-int) \| predl-suc (z : biinv-int) (i : 𝕀) [i=0 → predl (suc z) \| i=1 → z] \| suc-predr (z : biinv-int) (i : 𝕀) [i=0 → suc (predr z) \| i=1 → z]	biinv-int	where \| zero \| suc (z : biinv-int) \| predl (z : biinv-int) \| predr (z : biinv-int) \| predl-suc (z : biinv-int) (i : 𝕀) [i=0 → predl (suc z) \| i=1 → z] \| suc-predr (z : biinv-int) (i : 𝕀) [i=0 → suc (predr z) \| i=1 → z]	data	biinv-int	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[]	null	8	14	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
predl/ha-equiv : ha-equiv biinv-int biinv-int = equiv→ha-equiv _ _ (iso→equiv biinv-int biinv-int ( λ z → predl z , λ z → suc z , λ z i → predl-suc z i , λ z i → comp 0 1 (suc (predl-suc (predr z) i)) [ \| i=0 j → suc (predl (suc-predr z j)) \| i=1 j → suc-predr z j ...	predl/ha-equiv : ha-equiv biinv-int biinv-int	= equiv→ha-equiv _ _ (iso→equiv biinv-int biinv-int ( λ z → predl z , λ z → suc z , λ z i → predl-suc z i , λ z i → comp 0 1 (suc (predl-suc (predr z) i)) [ \| i=0 j → suc (predl (suc-predr z j)) \| i=1 j → suc-predr z j ] ))	def	predl/ha-equiv	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "equiv→ha-equiv", "ha-equiv", "iso→equiv" ]	null	16	27	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
suc-predl = predl/ha-equiv .snd .snd .snd .fst	suc-predl	= predl/ha-equiv .snd .snd .snd .fst	def	suc-predl	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "predl/ha-equiv" ]	null	29	29	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
predl-adj = predl/ha-equiv .snd .snd .snd .snd	predl-adj	= predl/ha-equiv .snd .snd .snd .snd	def	predl-adj	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "predl/ha-equiv" ]	null	30	30	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
suc-adj = ha-equiv/symm _ _ predl/ha-equiv .snd .snd .snd .snd	suc-adj	= ha-equiv/symm _ _ predl/ha-equiv .snd .snd .snd .snd	def	suc-adj	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "ha-equiv/symm", "predl/ha-equiv" ]	null	31	31	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
suc/equiv : equiv biinv-int biinv-int = iso→equiv biinv-int biinv-int ( λ z → suc z , λ z → predl z , suc-predl , λ z i → predl-suc z i )	suc/equiv : equiv biinv-int biinv-int	= iso→equiv biinv-int biinv-int ( λ z → suc z , λ z → predl z , suc-predl , λ z i → predl-suc z i )	def	suc/equiv	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "equiv", "iso→equiv", "suc-predl" ]	null	33	39	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
predl~predr (z : biinv-int) : path biinv-int (predl z) (predr z) = λ j → equiv-section/prop biinv-int biinv-int (λ z → suc z) (suc/equiv .snd) (λ z → predl z, suc-predl) (λ z → predr z, λ z i → suc-predr z i) j .fst z	predl~predr (z : biinv-int) : path biinv-int (predl z) (predr z)	= λ j → equiv-section/prop biinv-int biinv-int (λ z → suc z) (suc/equiv .snd) (λ z → predl z, suc-predl) (λ z → predr z, λ z i → suc-predr z i) j .fst z	def	predl~predr	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "equiv-section/prop", "path", "suc-predl", "suc/equiv" ]	null	41	46	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
suc-predl~suc-predr (z : biinv-int) : [j i] biinv-int [ \| i=0 → suc (predl~predr z j) \| i=1 → z \| j=0 → suc-predl z i \| j=1 → suc-predr z i ] = λ j i → equiv-section/prop biinv-int biinv-int (λ z → suc z) (suc/equiv .snd) (λ z → predl z, suc-predl) (λ z → predr z, λ z i → suc-predr z i) j .s...	suc-predl~suc-predr (z : biinv-int) : [j i] biinv-int [ \| i=0 → suc (predl~predr z j) \| i=1 → z \| j=0 → suc-predl z i \| j=1 → suc-predr z i ]	= λ j i → equiv-section/prop biinv-int biinv-int (λ z → suc z) (suc/equiv .snd) (λ z → predl z, suc-predl) (λ z → predr z, λ z i → suc-predr z i) j .snd z i	def	suc-predl~suc-predr	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "equiv-section/prop", "predl~predr", "suc-predl", "suc/equiv" ]	null	48	59	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
fwd/pos : nat → biinv-int = elim [zero → zero \| suc (_ → ih/n) → suc ih/n]	fwd/pos : nat → biinv-int	= elim [zero → zero \| suc (_ → ih/n) → suc ih/n]	def	fwd/pos	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "nat" ]	null	63	63	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
fwd/negsuc : nat → biinv-int = elim [zero → predl zero \| suc (_ → ih/n) → predl ih/n]	fwd/negsuc : nat → biinv-int	= elim [zero → predl zero \| suc (_ → ih/n) → predl ih/n]	def	fwd/negsuc	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "nat" ]	null	65	65	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
fwd : int → biinv-int = elim [pos n → fwd/pos n \| negsuc n → fwd/negsuc n]	fwd : int → biinv-int	= elim [pos n → fwd/pos n \| negsuc n → fwd/negsuc n]	def	fwd	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "fwd/negsuc", "fwd/pos", "int" ]	null	67	67	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
bwd : biinv-int → int = elim [ \| zero → pos zero \| suc (z → ih/z) → isuc ih/z \| predl (z → ih/z) → pred ih/z \| predr (z → ih/z) → pred ih/z \| predl-suc (z → ih/z) i → pred-isuc ih/z i \| suc-predr (z → ih/z) i → isuc-pred ih/z i ]	bwd : biinv-int → int	= elim [ \| zero → pos zero \| suc (z → ih/z) → isuc ih/z \| predl (z → ih/z) → pred ih/z \| predr (z → ih/z) → pred ih/z \| predl-suc (z → ih/z) i → pred-isuc ih/z i \| suc-predr (z → ih/z) i → isuc-pred ih/z i ]	def	bwd	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "int", "isuc", "isuc-pred", "pred", "pred-isuc" ]	null	69	77	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
bwd-fwd/pos : (n : nat) → path _ (bwd (fwd/pos n)) (pos n) = elim [ \| zero → refl \| suc (_ → n/ih) → λ k → isuc (n/ih k) ]	bwd-fwd/pos : (n : nat) → path _ (bwd (fwd/pos n)) (pos n)	= elim [ \| zero → refl \| suc (_ → n/ih) → λ k → isuc (n/ih k) ]	def	bwd-fwd/pos	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "bwd", "fwd/pos", "isuc", "nat", "path" ]	null	79	83	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
bwd-fwd/negsuc : (n : nat) → path _ (bwd (fwd/negsuc n)) (negsuc n) = elim [ \| zero → refl \| suc (_ → n/ih) → λ k → pred (n/ih k) ]	bwd-fwd/negsuc : (n : nat) → path _ (bwd (fwd/negsuc n)) (negsuc n)	= elim [ \| zero → refl \| suc (_ → n/ih) → λ k → pred (n/ih k) ]	def	bwd-fwd/negsuc	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "bwd", "fwd/negsuc", "nat", "path", "pred" ]	null	85	89	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
bwd-fwd : (n : int) → path _ (bwd (fwd n)) n = elim [pos n → bwd-fwd/pos n \| negsuc n → bwd-fwd/negsuc n]	bwd-fwd : (n : int) → path _ (bwd (fwd n)) n	= elim [pos n → bwd-fwd/pos n \| negsuc n → bwd-fwd/negsuc n]	def	bwd-fwd	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "bwd", "bwd-fwd/negsuc", "bwd-fwd/pos", "fwd", "int", "path" ]	null	91	92	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
fwd/isuc/negsuc : (n : nat) → path _ (fwd (isuc (negsuc n))) (suc (fwd (negsuc n))) = elim [ \| zero → λ k → symm' biinv-int (λ j → suc-predl zero j) k \| suc n → λ k → symm' biinv-int (λ j → suc-predl (fwd/negsuc n) j) k ]	fwd/isuc/negsuc : (n : nat) → path _ (fwd (isuc (negsuc n))) (suc (fwd (negsuc n)))	= elim [ \| zero → λ k → symm' biinv-int (λ j → suc-predl zero j) k \| suc n → λ k → symm' biinv-int (λ j → suc-predl (fwd/negsuc n) j) k ]	def	fwd/isuc/negsuc	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "fwd", "fwd/negsuc", "isuc", "nat", "path", "suc-predl", "symm'" ]	null	94	100	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
fwd/isuc : (n : int) → path _ (fwd (isuc n)) (suc (fwd n)) = elim [pos n → refl \| negsuc n → fwd/isuc/negsuc n]	fwd/isuc : (n : int) → path _ (fwd (isuc n)) (suc (fwd n))	= elim [pos n → refl \| negsuc n → fwd/isuc/negsuc n]	def	fwd/isuc	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "fwd", "fwd/isuc/negsuc", "int", "isuc", "path" ]	null	102	103	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
fwd/pred/pos : (n : nat) → path _ (fwd (pred (pos n))) (predl (fwd/pos n)) = elim [ \| zero → refl \| suc n → λ k → symm' biinv-int (λ i → predl-suc (fwd/pos n) i) k ]	fwd/pred/pos : (n : nat) → path _ (fwd (pred (pos n))) (predl (fwd/pos n))	= elim [ \| zero → refl \| suc n → λ k → symm' biinv-int (λ i → predl-suc (fwd/pos n) i) k ]	def	fwd/pred/pos	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "fwd", "fwd/pos", "nat", "path", "pred", "symm'" ]	null	105	111	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
fwd/pred : (n : int) → path _ (fwd (pred n)) (predl (fwd n)) = elim [pos n → fwd/pred/pos n \| negsuc n → refl]	fwd/pred : (n : int) → path _ (fwd (pred n)) (predl (fwd n))	= elim [pos n → fwd/pred/pos n \| negsuc n → refl]	def	fwd/pred	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "fwd", "fwd/pred/pos", "int", "path", "pred" ]	null	113	114	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
fwd/pred-isuc/negsuc : (n : nat) → [i k] biinv-int [ \| i=0 → trans biinv-int (fwd/pred (isuc (negsuc n))) (λ k → predl (fwd/isuc/negsuc n k)) k \| i=1 → fwd/negsuc n \| k=0 → fwd (pred-isuc (negsuc n) i) \| k=1 → predl-suc (fwd/negsuc n) i ] = elim [ \| zero → λ i k → comp 0 1 (predl (symm'/filler biinv...	fwd/pred-isuc/negsuc : (n : nat) → [i k] biinv-int [ \| i=0 → trans biinv-int (fwd/pred (isuc (negsuc n))) (λ k → predl (fwd/isuc/negsuc n k)) k \| i=1 → fwd/negsuc n \| k=0 → fwd (pred-isuc (negsuc n) i) \| k=1 → predl-suc (fwd/negsuc n) i ]	= elim [ \| zero → λ i k → comp 0 1 (predl (symm'/filler biinv-int (λ i → suc-predl zero i) i k)) [ \| i=0 m → trans/unit/l biinv-int (λ k → predl (fwd/isuc/negsuc zero k)) m k \| i=1 \| k=0 → refl \| k=1 m → predl-adj zero m i ] \| suc n → λ i k → comp 0 1 (predl (symm'/filler biinv-int (λ i → ...	def	fwd/pred-isuc/negsuc	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "fwd", "fwd/isuc/negsuc", "fwd/negsuc", "fwd/pred", "isuc", "nat", "pred-isuc", "predl-adj", "suc-predl", "symm'/filler", "trans", "trans/unit/l" ]	null	117	137	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
fwd/pred-isuc : (n : int) → [i k] biinv-int [ \| i=0 → trans biinv-int (fwd/pred (isuc n)) (λ k → predl (fwd/isuc n k)) k \| i=1 \| k=0 → fwd (pred-isuc n i) \| k=1 → predl-suc (fwd n) i ] = elim [ \| pos n → λ i k → comp 0 1 (symm'/filler biinv-int (λ i → predl-suc (fwd/pos n) i) i k) [ \| i=0 m → tran...	fwd/pred-isuc : (n : int) → [i k] biinv-int [ \| i=0 → trans biinv-int (fwd/pred (isuc n)) (λ k → predl (fwd/isuc n k)) k \| i=1 \| k=0 → fwd (pred-isuc n i) \| k=1 → predl-suc (fwd n) i ]	= elim [ \| pos n → λ i k → comp 0 1 (symm'/filler biinv-int (λ i → predl-suc (fwd/pos n) i) i k) [ \| i=0 m → trans/unit/r biinv-int (fwd/pred/pos (suc n)) m k \| i=1 \| ∂[k] → refl ] \| negsuc n → fwd/pred-isuc/negsuc n ]	def	fwd/pred-isuc	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "fwd", "fwd/isuc", "fwd/pos", "fwd/pred", "fwd/pred-isuc/negsuc", "fwd/pred/pos", "int", "isuc", "pred-isuc", "symm'/filler", "trans", "trans/unit/r" ]	null	139	152	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
fwd/isuc-pred/pos : (n : nat) → [i k] biinv-int [ \| i=0 → trans biinv-int (fwd/isuc (pred (pos n))) (λ k → suc (fwd/pred/pos n k)) k \| i=1 → fwd/pos n \| k=0 → fwd (isuc-pred (pos n) i) \| k=1 → suc-predl (fwd/pos n) i ] = elim [ \| zero → λ i k → comp 0 1 (symm'/filler biinv-int (λ i → suc-predl zero ...	fwd/isuc-pred/pos : (n : nat) → [i k] biinv-int [ \| i=0 → trans biinv-int (fwd/isuc (pred (pos n))) (λ k → suc (fwd/pred/pos n k)) k \| i=1 → fwd/pos n \| k=0 → fwd (isuc-pred (pos n) i) \| k=1 → suc-predl (fwd/pos n) i ]	= elim [ \| zero → λ i k → comp 0 1 (symm'/filler biinv-int (λ i → suc-predl zero i) i k) [ \| i=0 m → trans/unit/r biinv-int (fwd/isuc/negsuc zero) m k \| i=1 \| ∂[k] → refl ] \| suc n → λ i k → comp 0 1 (suc (symm'/filler biinv-int (λ i → predl-suc (fwd/pos n) i) i k)) [ \| i=0 m → trans/unit/...	def	fwd/isuc-pred/pos	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "fwd", "fwd/isuc", "fwd/isuc/negsuc", "fwd/pos", "fwd/pred/pos", "isuc-pred", "nat", "pred", "suc-adj", "suc-predl", "symm'/filler", "trans", "trans/unit/l", "trans/unit/r" ]	null	154	173	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
fwd/isuc-pred : (n : int) → [i k] biinv-int [ \| i=0 → trans biinv-int (fwd/isuc (pred n)) (λ k → suc (fwd/pred n k)) k \| i=1 → fwd n \| k=0 → fwd (isuc-pred n i) \| k=1 → suc-predl (fwd n) i ] = elim [ \| pos n → fwd/isuc-pred/pos n \| negsuc n → λ i k → comp 0 1 (symm'/filler biinv-int (λ i → suc-pre...	fwd/isuc-pred : (n : int) → [i k] biinv-int [ \| i=0 → trans biinv-int (fwd/isuc (pred n)) (λ k → suc (fwd/pred n k)) k \| i=1 → fwd n \| k=0 → fwd (isuc-pred n i) \| k=1 → suc-predl (fwd n) i ]	= elim [ \| pos n → fwd/isuc-pred/pos n \| negsuc n → λ i k → comp 0 1 (symm'/filler biinv-int (λ i → suc-predl (fwd/negsuc n) i) i k) [ \| i=0 m → trans/unit/r biinv-int (fwd/isuc/negsuc (suc n)) m k \| i=1 \| ∂[k] → refl ] ]	def	fwd/isuc-pred	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "fwd", "fwd/isuc", "fwd/isuc-pred/pos", "fwd/isuc/negsuc", "fwd/negsuc", "fwd/pred", "int", "isuc-pred", "pred", "suc-predl", "symm'/filler", "trans", "trans/unit/r" ]	null	176	190	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
fwd-bwd : (z : biinv-int) → path _ (fwd (bwd z)) z = elim [ \| zero → refl \| suc (z → z/ih) → trans biinv-int (fwd/isuc (bwd z)) (λ k → suc (z/ih k)) \| predl (z → z/ih) → trans biinv-int (fwd/pred (bwd z)) (λ k → predl (z/ih k)) \| predr (z → z/ih) → trans biinv-int (fwd/pred (bwd z)) (λ k → predl~predr (z/ih k...	fwd-bwd : (z : biinv-int) → path _ (fwd (bwd z)) z	= elim [ \| zero → refl \| suc (z → z/ih) → trans biinv-int (fwd/isuc (bwd z)) (λ k → suc (z/ih k)) \| predl (z → z/ih) → trans biinv-int (fwd/pred (bwd z)) (λ k → predl (z/ih k)) \| predr (z → z/ih) → trans biinv-int (fwd/pred (bwd z)) (λ k → predl~predr (z/ih k) k) \| predl-suc (z → z/ih) i → λ k → comp 0 ...	def	fwd-bwd	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "bwd", "fwd", "fwd/isuc", "fwd/isuc-pred", "fwd/pred", "fwd/pred-isuc", "isuc", "path", "pred", "predl~predr", "suc-predl~suc-predr", "trans", "trans/filler", "weak-connection/and" ]	null	192	216	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
int-equiv-biinv-int : equiv int biinv-int = iso→equiv _ _ (fwd,bwd,fwd-bwd,bwd-fwd)	int-equiv-biinv-int : equiv int biinv-int	= iso→equiv _ _ (fwd,bwd,fwd-bwd,bwd-fwd)	def	int-equiv-biinv-int	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "bwd", "bwd-fwd", "equiv", "fwd", "fwd-bwd", "int", "iso→equiv" ]	null	218	219	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
suc'/pair : (z : biinv-int) → (y : biinv-int) × path biinv-int (suc z) y = elim [ \| zero → (suc zero, refl) \| suc z → (suc (suc z), refl) \| predl z → (z, suc-predl z) \| predr z → (z, λ j → suc-predr z j) \| predl-suc (z → z/ih) i → let filler (i j : 𝕀) : biinv-int = comp 0 j (suc (predl-suc z i)) ...	suc'/pair : (z : biinv-int) → (y : biinv-int) × path biinv-int (suc z) y	= elim [ \| zero → (suc zero, refl) \| suc z → (suc (suc z), refl) \| predl z → (z, suc-predl z) \| predr z → (z, λ j → suc-predr z j) \| predl-suc (z → z/ih) i → let filler (i j : 𝕀) : biinv-int = comp 0 j (suc (predl-suc z i)) [i=0 → suc-predl (suc z) \| i=1 → z/ih .snd] in (filler i 1, fille...	def	suc'/pair	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "path", "suc-predl" ]	null	223	239	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
suc' (z : biinv-int) : biinv-int = suc'/pair z .fst	suc' (z : biinv-int) : biinv-int	= suc'/pair z .fst	def	suc'	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "suc'/pair" ]	null	241	241	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
suc'-predl (z : biinv-int) : path _ (suc' (predl z)) z = refl	suc'-predl (z : biinv-int) : path _ (suc' (predl z)) z	= refl	def	suc'-predl	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "path", "suc'" ]	null	243	243	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
suc'-predr (z : biinv-int) : path _ (suc' (predr z)) z = refl	suc'-predr (z : biinv-int) : path _ (suc' (predr z)) z	= refl	def	suc'-predr	library/cool	library/cool/biinv-int.red	[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]	[ "biinv-int", "path", "suc'" ]	null	244	244	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
le : nat → nat → type = elim [ \| zero → λ _ → unit \| suc (m → f) → elim [ \| zero → void \| suc n → f n ] ]	le : nat → nat → type	= elim [ \| zero → λ _ → unit \| suc (m → f) → elim [ \| zero → void \| suc n → f n ] ]	def	le	library/cool	library/cool/complete-induction.red	[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]	[ "nat", "unit", "void" ]	null	7	15	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
le/suc/right : (n m : nat) → le n m → le n (suc m) = elim [ \| zero → λ _ _ → ★ \| suc (n' → f) → elim [ \| zero → elim [] \| suc m' → λ l → f m' l ] ]	le/suc/right : (n m : nat) → le n m → le n (suc m)	= elim [ \| zero → λ _ _ → ★ \| suc (n' → f) → elim [ \| zero → elim [] \| suc m' → λ l → f m' l ] ]	def	le/suc/right	library/cool	library/cool/complete-induction.red	[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]	[ "le", "nat" ]	null	17	25	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
le/suc : (n m : nat) → le n m → le (suc n) (suc m) = elim [ \| zero → λ _ _ → ★ \| suc _ → λ _ l → l ]	le/suc : (n m : nat) → le n m → le (suc n) (suc m)	= elim [ \| zero → λ _ _ → ★ \| suc _ → λ _ l → l ]	def	le/suc	library/cool	library/cool/complete-induction.red	[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]	[ "le", "nat" ]	null	27	31	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
le/refl : (n : nat) → le n n = elim [ \| zero → ★ \| suc (_ → f) → f ]	le/refl : (n : nat) → le n n	= elim [ \| zero → ★ \| suc (_ → f) → f ]	def	le/refl	library/cool	library/cool/complete-induction.red	[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]	[ "le", "nat" ]	null	33	37	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
le/zero/implies/zero : (n : nat) → (le n zero) → path nat zero n = elim [ \| zero → λ _ → refl \| suc n' → elim [] ]	le/zero/implies/zero : (n : nat) → (le n zero) → path nat zero n	= elim [ \| zero → λ _ → refl \| suc n' → elim [] ]	def	le/zero/implies/zero	library/cool	library/cool/complete-induction.red	[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]	[ "le", "nat", "path" ]	null	39	43	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
le/case : (m n : nat) → (le n (suc m)) → or (path nat n (suc m)) (le n m) = elim [ \| zero → elim [ \| zero → λ _ → inr ★ \| suc n' → elim n' [ \| zero → λ _ → inl refl \| suc _ → λ p → inr p ] ] \| suc (m' → c) → elim [ \| zero → λ _ → inr ★ \| suc n' → λ p → eli...	le/case : (m n : nat) → (le n (suc m)) → or (path nat n (suc m)) (le n m)	= elim [ \| zero → elim [ \| zero → λ _ → inr ★ \| suc n' → elim n' [ \| zero → λ _ → inl refl \| suc _ → λ p → inr p ] ] \| suc (m' → c) → elim [ \| zero → λ _ → inr ★ \| suc n' → λ p → elim (c n' p) [ \| inl p → inl (λ i → suc (p i)) \| inr l → inr (le...	def	le/case	library/cool	library/cool/complete-induction.red	[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]	[ "le", "le/suc", "nat", "or", "path" ]	null	45	65	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
weak/induction (P : nat → type) : type = P zero → ((n : nat) → P n → P (suc n)) → (n : nat) → P n	weak/induction (P : nat → type) : type	= P zero → ((n : nat) → P n → P (suc n)) → (n : nat) → P n	def	weak/induction	library/cool	library/cool/complete-induction.red	[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]	[ "nat" ]	null	67	71	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
realize/weak/induction (P : nat → type) : weak/induction P = λ p0 ps → elim [ \| zero → p0 \| suc (n' → pn') → ps n' pn' ]	realize/weak/induction (P : nat → type) : weak/induction P	= λ p0 ps → elim [ \| zero → p0 \| suc (n' → pn') → ps n' pn' ]	def	realize/weak/induction	library/cool	library/cool/complete-induction.red	[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]	[ "nat", "weak/induction" ]	null	73	78	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
complete/induction (P : nat → type) : type = P zero → ((n : nat) → ((k : nat) → (le k n) → P k) → P (suc n)) → (n : nat) → P n	complete/induction (P : nat → type) : type	= P zero → ((n : nat) → ((k : nat) → (le k n) → P k) → P (suc n)) → (n : nat) → P n	def	complete/induction	library/cool	library/cool/complete-induction.red	[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]	[ "le", "nat" ]	null	80	84	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
complete/implies/weak (P : nat → type) (complete : complete/induction P) : weak/induction P = λ p0 ps → complete p0 (λ n f → ps n (f n (le/refl n)))	complete/implies/weak (P : nat → type) (complete : complete/induction P) : weak/induction P	= λ p0 ps → complete p0 (λ n f → ps n (f n (le/refl n)))	def	complete/implies/weak	library/cool	library/cool/complete-induction.red	[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]	[ "complete/induction", "le/refl", "nat", "weak/induction" ]	null	86	92	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
weak/implies/complete (P : nat → type) (weak : (P' : nat → type) → weak/induction P') : complete/induction P = λ p0 ps → let P' (n : nat) : type = (k : nat) → (le k n) → P k in let P'0 : P' zero = λ k k/le/0 → coe 0 1 p0 in λ i → P (le/zero/implies/zero k k/le/0 i) in let f (n : nat) (p'n ...	weak/implies/complete (P : nat → type) (weak : (P' : nat → type) → weak/induction P') : complete/induction P	= λ p0 ps → let P' (n : nat) : type = (k : nat) → (le k n) → P k in let P'0 : P' zero = λ k k/le/0 → coe 0 1 p0 in λ i → P (le/zero/implies/zero k k/le/0 i) in let f (n : nat) (p'n : P' n) : (P' (suc n)) = λ k k/le/sn → elim (le/case n k k/le/sn) [ \| inl p → coe 1 0 (ps n p'n) in λ i →...	def	weak/implies/complete	library/cool	library/cool/complete-induction.red	[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]	[ "complete/induction", "le", "le/case", "le/refl", "le/zero/implies/zero", "nat", "weak/induction" ]	null	94	114	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
(A : type) ⊢ F where \| η (a : A) \| ☆ (s t : F) \| ε \| idn/r (s : F) (i : 𝕀) [ \| i=0 → ☆ s ε \| i=1 → s ] \| idn/l (s : F) (i : 𝕀) [ \| i=0 → ☆ ε s \| i=1 → s ] \| ass (s t u : F) (i : 𝕀) [ \| i=0 → ☆ s (☆ t u) \| i=1 → ☆ (☆ s t) u ]	(A : type) ⊢ F	where \| η (a : A) \| ☆ (s t : F) \| ε \| idn/r (s : F) (i : 𝕀) [ \| i=0 → ☆ s ε \| i=1 → s ] \| idn/l (s : F) (i : 𝕀) [ \| i=0 → ☆ ε s \| i=1 → s ] \| ass (s t u : F) (i : 𝕀) [ \| i=0 → ☆ s (☆ t u) \| i=1 → ☆ (☆ s t) u ]	data	F	library/cool	library/cool/free-monoid.red	[ "data.list" ]	[]	Probably need to truncate this to get the right type	7	22	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
quote (A : type) : list A → F A = elim [ \| nil → ε \| cons x (xs → ih) → ☆ (η x) ih ]	quote (A : type) : list A → F A	= elim [ \| nil → ε \| cons x (xs → ih) → ☆ (η x) ih ]	def	quote	library/cool	library/cool/free-monoid.red	[ "data.list" ]	[ "list" ]	null	24	29	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
eval (A : type) : F A → list A = elim [ \| η a → cons a nil \| ☆ (s → ih/s) (t → ih/t) → append A ih/s ih/t \| ε → nil \| idn/l s i → refl \| idn/r (s → ih/s) i → append/idn/r A ih/s i \| ass (s → ih/s) (t → ih/t) (u → ih/u) i → append/ass A ih/s ih/t ih/u i ]	eval (A : type) : F A → list A	= elim [ \| η a → cons a nil \| ☆ (s → ih/s) (t → ih/t) → append A ih/s ih/t \| ε → nil \| idn/l s i → refl \| idn/r (s → ih/s) i → append/idn/r A ih/s i \| ass (s → ih/s) (t → ih/t) (u → ih/u) i → append/ass A ih/s ih/t ih/u i ]	def	eval	library/cool	library/cool/free-monoid.red	[ "data.list" ]	[ "append", "append/ass", "append/idn/r", "list" ]	null	31	45	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
nbe (A : type) (s : F A) : F A = quote A (eval A s)	nbe (A : type) (s : F A) : F A	= quote A (eval A s)	def	nbe	library/cool	library/cool/free-monoid.red	[ "data.list" ]	[ "eval", "quote" ]	null	47	48	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
double : nat → nat = elim [ \| zero → zero \| suc (n' → f) → suc (suc f) ]	double : nat → nat	= elim [ \| zero → zero \| suc (n' → f) → suc (suc f) ]	def	double	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "nat" ]	null	6	10	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
sub : nat → nat → nat = elim [ \| zero → λ _ → zero \| suc (m' → sub/m') → elim [ \| zero → suc m' \| suc n' → sub/m' n' ] ]	sub : nat → nat → nat	= elim [ \| zero → λ _ → zero \| suc (m' → sub/m') → elim [ \| zero → suc m' \| suc n' → sub/m' n' ] ]	def	sub	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "nat" ]	null	12	20	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
sub/le : (n m : nat) → le (sub n m) n = elim [ \| zero → λ _ → ★ \| suc (n' → f) → λ m → elim m [ \| zero → le/refl n' \| suc m' → le/suc/right (sub n' m') n' (f m') ] ]	sub/le : (n m : nat) → le (sub n m) n	= elim [ \| zero → λ _ → ★ \| suc (n' → f) → λ m → elim m [ \| zero → le/refl n' \| suc m' → le/suc/right (sub n' m') n' (f m') ] ]	def	sub/le	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "le", "le/refl", "le/suc/right", "nat", "sub" ]	null	22	29	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
mod/prop : nat → type = λ _ → nat → nat	mod/prop : nat → type	= λ _ → nat → nat	def	mod/prop	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "nat" ]	null	31	31	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
mod : (n : nat) → mod/prop n = let complete = weak/implies/complete mod/prop (λ P → realize/weak/induction P) in complete (λ _ → zero) (λ n f → λ m → elim m [ \| zero → zero \| suc m' → elim (sub (suc n) m) [ \| zero → elim (sub m (suc n)) [ \| zero → zero ...	mod : (n : nat) → mod/prop n	= let complete = weak/implies/complete mod/prop (λ P → realize/weak/induction P) in complete (λ _ → zero) (λ n f → λ m → elim m [ \| zero → zero \| suc m' → elim (sub (suc n) m) [ \| zero → elim (sub m (suc n)) [ \| zero → zero \| suc _ → suc n ...	def	mod	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "mod/prop", "nat", "realize/weak/induction", "sub", "sub/le", "weak/implies/complete" ]	null	33	50	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
id/nat : nat → nat = elim [ \| zero → zero \| suc (_ → f) → suc f ]	id/nat : nat → nat	= elim [ \| zero → zero \| suc (_ → f) → suc f ]	def	id/nat	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "nat" ]	null	52	56	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
eta : (n : nat) → path nat (id/nat n) n = elim [ \| zero → refl \| suc (_ → p) → λ i → suc (p i) ]	eta : (n : nat) → path nat (id/nat n) n	= elim [ \| zero → refl \| suc (_ → p) → λ i → suc (p i) ]	def	eta	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "id/nat", "nat", "path" ]	null	58	62	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
sub/plus/path : (m n : nat) → le n m → path nat (plus n (sub m n)) m = elim [ \| zero → λ n p → let path/n/0 = symm nat (le/zero/implies/zero n p) in trans nat (eta n) path/n/0 \| suc (m' → f) → elim [ \| zero → refl \| suc n' → λ p i → suc ((f n' p) i) ] ]	sub/plus/path : (m n : nat) → le n m → path nat (plus n (sub m n)) m	= elim [ \| zero → λ n p → let path/n/0 = symm nat (le/zero/implies/zero n p) in trans nat (eta n) path/n/0 \| suc (m' → f) → elim [ \| zero → refl \| suc n' → λ p i → suc ((f n' p) i) ] ]	def	sub/plus/path	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "eta", "le", "le/zero/implies/zero", "nat", "path", "plus", "sub", "symm", "trans" ]	null	64	73	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
plus/le : (m n : nat) → le m (plus m n) = elim [ \| zero → λ _ → ★ \| suc (m' → f) → f ]	plus/le : (m n : nat) → le m (plus m n)	= elim [ \| zero → λ _ → ★ \| suc (m' → f) → f ]	def	plus/le	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "le", "nat", "plus" ]	null	75	79	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
le/trans : (m n l : nat) → le m n → le n l → le m l = elim [ \| zero → λ _ _ _ _ → ★ \| suc (m' → f) → elim [ \| zero → λ _ → elim [] \| suc n' → elim [ \| zero → λ _ → elim [] \| suc l' → f n' l' ] ] ]	le/trans : (m n l : nat) → le m n → le n l → le m l	= elim [ \| zero → λ _ _ _ _ → ★ \| suc (m' → f) → elim [ \| zero → λ _ → elim [] \| suc n' → elim [ \| zero → λ _ → elim [] \| suc l' → f n' l' ] ] ]	def	le/trans	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "le", "nat" ]	null	81	93	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
sub/le/implies/le : (m n k : nat) → path nat (suc k) (sub m n) → le n m = elim [ \| zero → elim [ \| zero → λ _ _ → ★ \| suc n' → λ _ p → coe 1 0 ★ in λ i → le (p i) zero ] \| suc (m' → f) → elim [ \| zero → λ _ _ → ★ \| suc n' → f n' ] ]	sub/le/implies/le : (m n k : nat) → path nat (suc k) (sub m n) → le n m	= elim [ \| zero → elim [ \| zero → λ _ _ → ★ \| suc n' → λ _ p → coe 1 0 ★ in λ i → le (p i) zero ] \| suc (m' → f) → elim [ \| zero → λ _ _ → ★ \| suc n' → f n' ] ]	def	sub/le/implies/le	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "le", "nat", "path", "sub" ]	null	95	107	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
suc/right/path : (m n : nat) → path nat (plus (suc m) n) (plus m (suc n)) = elim [ \| zero → refl \| suc (_ → f) → λ n i → suc (f n i) ]	suc/right/path : (m n : nat) → path nat (plus (suc m) n) (plus m (suc n))	= elim [ \| zero → refl \| suc (_ → f) → λ n i → suc (f n i) ]	def	suc/right/path	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "nat", "path", "plus" ]	null	109	113	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
path/implies/le (p : dim → nat) : le (p 0) (p 1) = coe 0 1 (le/refl (p 0)) in (λ i → le (p 0) (p i))	path/implies/le (p : dim → nat) : le (p 0) (p 1)	= coe 0 1 (le/refl (p 0)) in (λ i → le (p 0) (p i))	def	path/implies/le	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "le", "le/refl", "nat" ]	null	115	116	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
gcd/prop (m : nat) : type = (x y : nat) → le (plus x y) m → nat	gcd/prop (m : nat) : type	= (x y : nat) → le (plus x y) m → nat	def	gcd/prop	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "le", "nat", "plus" ]	null	118	119	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
gcd' : (m : nat) → gcd/prop m = let complete = weak/implies/complete gcd/prop realize/weak/induction in complete (λ _ _ _ → zero) (λ m f → λ x y → elim x [ \| zero → λ _ → y \| suc x' → elim y [ \| zero → λ _ → x \| suc y' → elim (sub y x) [ \| zero →...	gcd' : (m : nat) → gcd/prop m	= let complete = weak/implies/complete gcd/prop realize/weak/induction in complete (λ _ _ _ → zero) (λ m f → λ x y → elim x [ \| zero → λ _ → y \| suc x' → elim y [ \| zero → λ _ → x \| suc y' → elim (sub y x) [ \| zero → λ x+y'/le/m → let...	def	gcd'	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "gcd/prop", "le", "le/trans", "nat", "path", "path/implies/le", "plus", "plus/comm", "plus/le", "realize/weak/induction", "sub", "sub/le/implies/le", "sub/plus/path", "suc/right/path", "weak/implies/complete" ]	null	121	169	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
gcd (m n : nat) : nat = gcd' (plus m n) m n (le/refl (plus m n))	gcd (m n : nat) : nat	= gcd' (plus m n) m n (le/refl (plus m n))	def	gcd	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "gcd'", "le/refl", "nat", "plus" ]	null	171	171	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
n1 : nat = suc zero	n1 : nat	= suc zero	def	n1	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "nat" ]	null	173	173	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
n2 : nat = double n1	n2 : nat	= double n1	def	n2	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "double", "n1", "nat" ]	null	174	174	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
n3 : nat = suc n2	n3 : nat	= suc n2	def	n3	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "n2", "nat" ]	null	175	175	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
n4 : nat = double n2	n4 : nat	= double n2	def	n4	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "double", "n2", "nat" ]	null	176	176	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
n5 : nat = suc n4	n5 : nat	= suc n4	def	n5	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "n4", "nat" ]	null	177	177	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c
n6 : nat = plus n2 n4	n6 : nat	= plus n2 n4	def	n6	library/cool	library/cool/gcd.red	[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]	[ "n2", "n4", "nat", "plus" ]	null	178	178	true	https://github.com/RedPRL/redtt	ae76658873a647eb43d8cf84365a9d68e9a3273c

is-biinv-equiv (A B : type) (f : A → B) : type = section A B f × retraction A B f

is-biinv-equiv (A B : type) (f : A → B) : type

= section A B f × retraction A B f

def

is-biinv-equiv

library/basics

library/basics/biinv-equiv.red

[ "basics.isotoequiv", "basics.retract", "prelude" ]

[ "retraction", "section" ]

null

7

8

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

biinv-equiv (A B : type) : type = (f : A → B) × is-biinv-equiv A B f

biinv-equiv (A B : type) : type

= (f : A → B) × is-biinv-equiv A B f

def

biinv-equiv

library/basics

library/basics/biinv-equiv.red

[ "basics.isotoequiv", "basics.retract", "prelude" ]

[ "is-biinv-equiv" ]

null

10

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

biinv-equiv→iso (A B : type) : biinv-equiv A B → iso A B = λ (f,(g,α),h,β) → let β' (a : A) : path _ (g (f a)) a = λ i → comp 0 1 (h (α (f a) i)) [ | i=0 j → β (g (f a)) j | i=1 j → β a j ] in (f,g,α,β')

biinv-equiv→iso (A B : type) : biinv-equiv A B → iso A B

= λ (f,(g,α),h,β) → let β' (a : A) : path _ (g (f a)) a = λ i → comp 0 1 (h (α (f a) i)) [ | i=0 j → β (g (f a)) j | i=1 j → β a j ] in (f,g,α,β')

def

biinv-equiv→iso

library/basics

library/basics/biinv-equiv.red

[ "basics.isotoequiv", "basics.retract", "prelude" ]

[ "biinv-equiv", "iso", "path" ]

null

12

21

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

lcoh (A B : type) (f : A → B) (g : B → A) (f-g : (b : _) → path _ (f (g b)) b) : type = (g-f : (a : _) → path _ (g (f a)) a) × (a : A) → path (path _ (f (g (f a))) (f a)) (λ i → f (g-f a i)) (f-g (f a))

lcoh (A B : type) (f : A → B) (g : B → A) (f-g : (b : _) → path _ (f (g b)) b) : type

= (g-f : (a : _) → path _ (g (f a)) a) × (a : A) → path (path _ (f (g (f a))) (f a)) (λ i → f (g-f a i)) (f-g (f a))

def

lcoh

library/basics

library/basics/ha-equiv.red

[ "basics.retract", "prelude" ]

[ "path" ]

null

6

8

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

is-ha-equiv (A B : type) (f : A → B) : type = (g : B → A) × (f-g : (b : _) → path _ (f (g b)) b) × lcoh A B f g f-g

is-ha-equiv (A B : type) (f : A → B) : type

= (g : B → A) × (f-g : (b : _) → path _ (f (g b)) b) × lcoh A B f g f-g

def

is-ha-equiv

library/basics

library/basics/ha-equiv.red

[ "basics.retract", "prelude" ]

[ "lcoh", "path" ]

null

10

13

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

ha-equiv (A B : type) : type = (f : A → B) × is-ha-equiv A B f

ha-equiv (A B : type) : type

= (f : A → B) × is-ha-equiv A B f

def

ha-equiv

library/basics

library/basics/ha-equiv.red

[ "basics.retract", "prelude" ]

[ "is-ha-equiv" ]

null

15

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

ha-equiv/symm (A B : type) (e : ha-equiv A B) : ha-equiv B A = let (f, g, f-g, g-f, adj) = e in let adj' (b : B) : path (path _ (g (f (g b))) (g b)) (λ i → g (f-g b i)) (g-f (g b)) = λ j i → let cap0 : A = comp 1 0 (g (f-g (f-g b i) j)) [ | i=0 k → g (adj (g b) k j) | i=1 | ∂[j] → refl ...

ha-equiv/symm (A B : type) (e : ha-equiv A B) : ha-equiv B A

= let (f, g, f-g, g-f, adj) = e in let adj' (b : B) : path (path _ (g (f (g b))) (g b)) (λ i → g (f-g b i)) (g-f (g b)) = λ j i → let cap0 : A = comp 1 0 (g (f-g (f-g b i) j)) [ | i=0 k → g (adj (g b) k j) | i=1 | ∂[j] → refl ] in let filler (x k : 𝕀) : A = comp 0 x (g...

def

ha-equiv/symm

library/basics

library/basics/ha-equiv.red

[ "basics.retract", "prelude" ]

[ "ha-equiv", "path", "weak-connection/and", "weak-connection/or" ]

this symmetry function is exactly involutive on all but the highest coherence

18

49

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

equiv→ha-equiv (A B : type) (e : equiv A B) : ha-equiv A B = let (f, c) = e in let g (b : B) = c b .fst .fst in let f-g (b : B) = c b .fst .snd in let p (a : A) = symm (fiber A B f (f a)) (c (f a) .snd (a, refl)) in ( f , g , f-g , λ a i → p a i .fst , λ a j i → comp 1 0 (p a i .snd j) [ | i=0...

equiv→ha-equiv (A B : type) (e : equiv A B) : ha-equiv A B

= let (f, c) = e in let g (b : B) = c b .fst .fst in let f-g (b : B) = c b .fst .snd in let p (a : A) = symm (fiber A B f (f a)) (c (f a) .snd (a, refl)) in ( f , g , f-g , λ a i → p a i .fst , λ a j i → comp 1 0 (p a i .snd j) [ | i=0 k → weak-connection/and B (f-g (f a)) j k | i=1 → refl...

def

equiv→ha-equiv

library/basics

library/basics/ha-equiv.red

[ "basics.retract", "prelude" ]

[ "equiv", "fiber", "ha-equiv", "symm", "weak-connection/and", "weak-connection/or" ]

null

51

67

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

stable (A : type) : type = neg (neg A) → A

stable (A : type) : type

= neg (neg A) → A

def

stable

library/basics

library/basics/hedberg.red

[ "basics.retract", "data.or", "data.void", "prelude" ]

[ "neg" ]

null

6

7

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

dec (A : type) : type = or A (neg A)

dec (A : type) : type

= or A (neg A)

def

dec

library/basics

library/basics/hedberg.red

[ "basics.retract", "data.or", "data.void", "prelude" ]

[ "neg", "or" ]

null

9

10

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

discrete (A : type) : type = (x y : A) → dec (path A x y)

discrete (A : type) : type

= (x y : A) → dec (path A x y)

def

discrete

library/basics

library/basics/hedberg.red

[ "basics.retract", "data.or", "data.void", "prelude" ]

[ "dec", "path" ]

null

12

13

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

dec→stable (A : type) : dec A → stable A = elim [ | inl a → λ _ → a | inr f → λ g → elim (g f) [] ]

dec→stable (A : type) : dec A → stable A

= elim [ | inl a → λ _ → a | inr f → λ g → elim (g f) [] ]

def

dec→stable

library/basics

library/basics/hedberg.red

[ "basics.retract", "data.or", "data.void", "prelude" ]

[ "dec", "stable" ]

null

15

19

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

neg/is-prop-over (A : 𝕀 → type) : is-prop-over (λ i → neg (A i)) = prop→prop-over (λ i → neg (A i)) (neg/prop (A 1))

neg/is-prop-over (A : 𝕀 → type) : is-prop-over (λ i → neg (A i))

= prop→prop-over (λ i → neg (A i)) (neg/prop (A 1))

def

neg/is-prop-over

library/basics

library/basics/hedberg.red

[ "basics.retract", "data.or", "data.void", "prelude" ]

[ "is-prop-over", "neg", "neg/prop", "prop→prop-over" ]

null

21

23

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

paths-stable→set (A : type) (st : (x y : A) → stable (path A x y)) : is-set A = λ a b p q i j → let square (k m : 𝕀) : A = comp 0 k a [ | m=0 → p | m=1 → q ] in let mycap (k m : 𝕀) = st (p k) (q k) (λ c → c (square k)) m in comp 0 1 (mycap j i) [ | i=0 k → st (p j) (p j) (neg/is...

paths-stable→set (A : type) (st : (x y : A) → stable (path A x y)) : is-set A

= λ a b p q i j → let square (k m : 𝕀) : A = comp 0 k a [ | m=0 → p | m=1 → q ] in let mycap (k m : 𝕀) = st (p k) (q k) (λ c → c (square k)) m in comp 0 1 (mycap j i) [ | i=0 k → st (p j) (p j) (neg/is-prop-over (λ j → neg (path A (p j) (p j))) (λ c → c (square 0)) ...

def

paths-stable→set

library/basics

library/basics/hedberg.red

[ "basics.retract", "data.or", "data.void", "prelude" ]

[ "is-set", "neg", "neg/is-prop-over", "path", "square", "stable", "weak-connection/or" ]

Hedberg's theorem for stable path types

26

45

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

discrete→set (A : type) (d : discrete A) : is-set A = paths-stable→set A (λ x y → dec→stable (path A x y) (d x y))

discrete→set (A : type) (d : discrete A) : is-set A

= paths-stable→set A (λ x y → dec→stable (path A x y) (d x y))

def

discrete→set

library/basics

library/basics/hedberg.red

[ "basics.retract", "data.or", "data.void", "prelude" ]

[ "dec→stable", "discrete", "is-set", "path", "paths-stable→set" ]

Hedberg's theorem for decidable path types

48

49

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

hrel/set-equiv (A : type) (R : A → A → type) (R/prop : (x y : A) → is-prop (R x y)) (R/refl : (x : A) → R x x) (R/id : (x y : A) → R x y → path A x y) : (is-set A) × ((x y : A) → equiv (R x y) (path A x y)) = let eq = path-retract/equiv A R (λ a b → ( R/id a b , λ p → coe 0 1 (R/refl a) in λ...

hrel/set-equiv (A : type) (R : A → A → type) (R/prop : (x y : A) → is-prop (R x y)) (R/refl : (x : A) → R x x) (R/id : (x y : A) → R x y → path A x y) : (is-set A) × ((x y : A) → equiv (R x y) (path A x y))

= let eq = path-retract/equiv A R (λ a b → ( R/id a b , λ p → coe 0 1 (R/refl a) in λ j → R a (p j) , λ rab → R/prop a b (coe 0 1 (R/refl a) in λ j → R a (R/id a b rab j)) rab )) in ( λ x y → coe 0 1 (R/prop x y) in λ j → is-prop (ua _ _ (eq x y) j) , eq )

def

hrel/set-equiv

library/basics

library/basics/hedberg.red

[ "basics.retract", "data.or", "data.void", "prelude" ]

[ "equiv", "is-prop", "is-set", "path", "path-retract/equiv", "ua" ]

null

51

65

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

paths-stable→set/alt (A : type) (st : (x y : A) → stable (path A x y)) : is-set A = (hrel/set-equiv A (λ x y → neg (neg (path A x y))) (λ x y → neg/prop (neg (path A x y))) (λ _ np → np refl) st ).fst

paths-stable→set/alt (A : type) (st : (x y : A) → stable (path A x y)) : is-set A

= (hrel/set-equiv A (λ x y → neg (neg (path A x y))) (λ x y → neg/prop (neg (path A x y))) (λ _ np → np refl) st ).fst

def

paths-stable→set/alt

library/basics

library/basics/hedberg.red

[ "basics.retract", "data.or", "data.void", "prelude" ]

[ "hrel/set-equiv", "is-set", "neg", "neg/prop", "path", "stable" ]

Hedberg's theorem is a corollary of above

68

73

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

iso (A B : type) : type = (f : A → B) × (g : B → A) × ((b : _) → path _ (f (g b)) b) × (a : _) → path _ (g (f a)) a

iso (A B : type) : type

= (f : A → B) × (g : B → A) × ((b : _) → path _ (f (g b)) b) × (a : _) → path _ (g (f a)) a

def

iso

library/basics

library/basics/isotoequiv.red

[ "prelude" ]

[ "path" ]

null

7

11

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

iso/refl (A : type) : iso A A = ( λ f → f , λ g → g , λ _ → refl , λ _ → refl )

iso/refl (A : type) : iso A A

= ( λ f → f , λ g → g , λ _ → refl , λ _ → refl )

def

iso/refl

library/basics

library/basics/isotoequiv.red

[ "prelude" ]

[ "iso" ]

null

13

18

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

iso/symm (A B : type) (I : iso A B) : iso B A = let (f,g,α,β) = I in (g,f,β,α)

iso/symm (A B : type) (I : iso A B) : iso B A

= let (f,g,α,β) = I in (g,f,β,α)

def

iso/symm

library/basics

library/basics/isotoequiv.red

[ "prelude" ]

[ "iso" ]

null

20

21

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

iso/trans (A B C : type) (I1 : iso A B) (I2 : iso B C) : iso A C = let (f1,g1,α1,β1) = I1 in let (f2,g2,α2,β2) = I2 in ( λ a → f2 (f1 a) , λ c → g1 (g2 c) , λ c → trans _ (λ j → f2 (α1 (g2 c) j)) (α2 c) , λ a → trans _ (λ j → g1 (β2 (f1 a) j)) (β1 a) )

iso/trans (A B C : type) (I1 : iso A B) (I2 : iso B C) : iso A C

= let (f1,g1,α1,β1) = I1 in let (f2,g2,α2,β2) = I2 in ( λ a → f2 (f1 a) , λ c → g1 (g2 c) , λ c → trans _ (λ j → f2 (α1 (g2 c) j)) (α2 c) , λ a → trans _ (λ j → g1 (β2 (f1 a) j)) (β1 a) )

def

iso/trans

library/basics

library/basics/isotoequiv.red

[ "prelude" ]

[ "iso", "trans" ]

null

23

30

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

iso/fiber/prop-over (A B : type) (I : iso A B) (b : 𝕀 → B) : is-prop-over (λ i → fiber _ _ (I.fst) (b i)) = let (f, g, α, β) = I in let sq (b : B) (fib : fiber _ _ f b) (j k : 𝕀) : A = comp k j (β (fib.fst) k) [ | k=1 → refl | k=0 j → g (fib.snd j) ] in λ fib0 fib1 → let sq2 (i k : �...

iso/fiber/prop-over (A B : type) (I : iso A B) (b : 𝕀 → B) : is-prop-over (λ i → fiber _ _ (I.fst) (b i))

= let (f, g, α, β) = I in let sq (b : B) (fib : fiber _ _ f b) (j k : 𝕀) : A = comp k j (β (fib.fst) k) [ | k=1 → refl | k=0 j → g (fib.snd j) ] in λ fib0 fib1 → let sq2 (i k : 𝕀) : A = comp 0 k (g (b i)) [ | i=0 → sq (b 0) fib0 1 | i=1 → sq (b 1) fib1 1 ] in λ i → ( re...

def

iso/fiber/prop-over

library/basics

library/basics/isotoequiv.red

[ "prelude" ]

[ "fiber", "is-prop-over", "iso" ]

null

32

67

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

iso→equiv (A B : type) (I : iso A B) : equiv A B = let (f, g, α, β) = I in (f , λ b → ((g b, α b), λ fib → iso/fiber/prop-over _ _ I (λ _ → b) fib (g b, α b)))

iso→equiv (A B : type) (I : iso A B) : equiv A B

= let (f, g, α, β) = I in (f , λ b → ((g b, α b), λ fib → iso/fiber/prop-over _ _ I (λ _ → b) fib (g b, α b)))

def

iso→equiv

library/basics

library/basics/isotoequiv.red

[ "prelude" ]

[ "equiv", "iso", "iso/fiber/prop-over" ]

null

69

71

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

equiv→iso (A B : type) (e : equiv A B) : iso A B = ( e .fst , λ b → e .snd b .fst .fst , λ b → e .snd b .fst .snd , λ a i → symm (fiber A B (e .fst) (e .fst a)) (e .snd (e .fst a) .snd (a, refl)) i .fst )

equiv→iso (A B : type) (e : equiv A B) : iso A B

= ( e .fst , λ b → e .snd b .fst .fst , λ b → e .snd b .fst .snd , λ a i → symm (fiber A B (e .fst) (e .fst a)) (e .snd (e .fst a) .snd (a, refl)) i .fst )

def

equiv→iso

library/basics

library/basics/isotoequiv.red

[ "prelude" ]

[ "equiv", "fiber", "iso", "symm" ]

null

79

84

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

retraction (A B : type) (f : A → B) : type = (g : B → A) × (a : A) → path A (g (f a)) a

retraction (A B : type) (f : A → B) : type

= (g : B → A) × (a : A) → path A (g (f a)) a

def

retraction

library/basics

library/basics/retract.red

[ "basics.isotoequiv", "prelude" ]

[ "path" ]

null

4

5

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

section (A B : type) (f : A → B) : type = (g : B → A) × (b : B) → path B (f (g b)) b

section (A B : type) (f : A → B) : type

= (g : B → A) × (b : B) → path B (f (g b)) b

def

section

library/basics

library/basics/retract.red

[ "basics.isotoequiv", "prelude" ]

[ "path" ]

null

7

8

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

retract (A B : type) : type = (f : A → B) × retraction A B f

retract (A B : type) : type

= (f : A → B) × retraction A B f

def

retract

library/basics

library/basics/retract.red

[ "basics.isotoequiv", "prelude" ]

[ "retraction" ]

null

10

11

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

retract/path-action (A B : type) (f : A → B) (retr : retraction A B f) (a a' : A) : retract (path _ a a') (path B (f a) (f a')) = let (g,α) = retr in ( λ p i → f (p i) , λ q i → comp 0 1 (g (q i)) [i=0 → α a | i=1 → α a'] , λ p j i → comp j 1 (α (p i) j) [i=0 → α a | i=1 → α a'] )

retract/path-action (A B : type) (f : A → B) (retr : retraction A B f) (a a' : A) : retract (path _ a a') (path B (f a) (f a'))

= let (g,α) = retr in ( λ p i → f (p i) , λ q i → comp 0 1 (g (q i)) [i=0 → α a | i=1 → α a'] , λ p j i → comp j 1 (α (p i) j) [i=0 → α a | i=1 → α a'] )

def

retract/path-action

library/basics

library/basics/retract.red

[ "basics.isotoequiv", "prelude" ]

[ "path", "retract", "retraction" ]

null

13

21

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

retract/hlevel : (l : hlevel) (A B : type) → retract A B → has-hlevel l B → has-hlevel l A = elim [ | contr → λ A B (f,g,α) B/contr → ( g (B/contr .fst) , λ a i → comp 0 1 (g (B/contr .snd (f a) i)) [ | i=0 → α a | i=1 → refl ] ) | hsuc l → elim l [ | contr → λ A B ...

retract/hlevel : (l : hlevel) (A B : type) → retract A B → has-hlevel l B → has-hlevel l A

def

retract/hlevel

library/basics

library/basics/retract.red

[ "basics.isotoequiv", "prelude" ]

[ "has-hlevel", "hlevel", "path", "retract", "retract/path-action" ]

null

23

47

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

path-retract/preserves-refl (A : type) (R : A → A → type) (ret : (x y : A) → retract (R x y) (path A x y)) (x : A) : path _ (ret x x .fst (ret x x .snd .fst refl)) refl = let s (x y : A) : R x y → path A x y = ret x y .fst in let r (x y : A) : path A x y → R x y = ret x y .snd .fst in let q = s x x (r x x r...

path-retract/preserves-refl (A : type) (R : A → A → type) (ret : (x y : A) → retract (R x y) (path A x y)) (x : A) : path _ (ret x x .fst (ret x x .snd .fst refl)) refl

= let s (x y : A) : R x y → path A x y = ret x y .fst in let r (x y : A) : path A x y → R x y = ret x y .snd .fst in let q = s x x (r x x refl) in let cap1 : [i j] A [ | j=0 → x | j=1 → q i | i=0 → q j | i=1 → s x x (r x x q) j ] = λ i j → s x (q i) (r x (q i) (λ k → weak-connect...

def

path-retract/preserves-refl

library/basics

library/basics/retract.red

[ "basics.isotoequiv", "prelude" ]

[ "path", "retract", "weak-connection/and" ]

Adapted from https://github.com/HoTT/book/issues/718 Any family of retracts of the path family preserves refl through the other round-trip

51

91

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

path-retract/equiv (A : type) (R : A → A → type) (ret : (x y : A) → retract (R x y) (path A x y)) (a b : A) : equiv (R a b) (path A a b) = let preserves-refl = path-retract/preserves-refl A R ret a in iso→equiv (R a b) (path A a b) ( ret a b .fst , ret a b .snd .fst , λ p → J A p (λ q → path _ (re...

path-retract/equiv (A : type) (R : A → A → type) (ret : (x y : A) → retract (R x y) (path A x y)) (a b : A) : equiv (R a b) (path A a b)

= let preserves-refl = path-retract/preserves-refl A R ret a in iso→equiv (R a b) (path A a b) ( ret a b .fst , ret a b .snd .fst , λ p → J A p (λ q → path _ (ret a (q 1) .fst (ret a (q 1) .snd .fst q)) q) preserves-refl , ret a b .snd .snd )

def

path-retract/equiv

library/basics

library/basics/retract.red

[ "basics.isotoequiv", "prelude" ]

[ "equiv", "iso→equiv", "path", "path-retract/preserves-refl", "retract" ]

null

95

105

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

equiv-section/prop (A B : type) (f : A → B) (c : is-equiv A B f) : is-prop (section A B f) = λ (g0,p0) (g1,p1) i → let α (b : B) : path (fiber A B f b) (g0 b, p0 b) (g1 b, p1 b) = contr→prop (fiber A B f b) (c b) (g0 b, p0 b) (g1 b, p1 b) in (λ b → α b i .fst, λ b → α b i .snd)

equiv-section/prop (A B : type) (f : A → B) (c : is-equiv A B f) : is-prop (section A B f)

= λ (g0,p0) (g1,p1) i → let α (b : B) : path (fiber A B f b) (g0 b, p0 b) (g1 b, p1 b) = contr→prop (fiber A B f b) (c b) (g0 b, p0 b) (g1 b, p1 b) in (λ b → α b i .fst, λ b → α b i .snd)

def

equiv-section/prop

library/basics

library/basics/retract.red

[ "basics.isotoequiv", "prelude" ]

[ "contr→prop", "fiber", "is-equiv", "is-prop", "path", "section" ]

null

107

113

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

precompose-equiv (A B C : type) (e : equiv A B) : equiv (B → C) (A → C) = let (f,g,α,β) = equiv→iso _ _ e in iso→equiv (B → C) (A → C) ( λ h a → h (f a) , λ k b → k (g b) , λ k i a → k (β a i) , λ h i b → h (α b i) )

precompose-equiv (A B C : type) (e : equiv A B) : equiv (B → C) (A → C)

= let (f,g,α,β) = equiv→iso _ _ e in iso→equiv (B → C) (A → C) ( λ h a → h (f a) , λ k b → k (g b) , λ k i a → k (β a i) , λ h i b → h (α b i) )

def

precompose-equiv

library/basics

library/basics/retract.red

[ "basics.isotoequiv", "prelude" ]

[ "equiv", "equiv→iso", "iso→equiv" ]

TODO this does not really belong in this file

116

123

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

equiv-retraction/prop (A B : type) (f : A → B) (c : is-equiv A B f) : is-prop (retraction A B f) = λ (g0,q0) (g1,q1) i → let p = contr→prop _ (precompose-equiv A B A (f,c) .snd (λ a → a)) (g0, λ j b → q0 b j) (g1, λ j b → q1 b j) in (p i .fst, λ b j → p i .snd j b)

equiv-retraction/prop (A B : type) (f : A → B) (c : is-equiv A B f) : is-prop (retraction A B f)

= λ (g0,q0) (g1,q1) i → let p = contr→prop _ (precompose-equiv A B A (f,c) .snd (λ a → a)) (g0, λ j b → q0 b j) (g1, λ j b → q1 b j) in (p i .fst, λ b j → p i .snd j b)

def

equiv-retraction/prop

library/basics

library/basics/retract.red

[ "basics.isotoequiv", "prelude" ]

[ "contr→prop", "is-equiv", "is-prop", "precompose-equiv", "retraction" ]

null

125

132

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

biinv-int

data

biinv-int

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[]

null

8

14

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

predl/ha-equiv : ha-equiv biinv-int biinv-int = equiv→ha-equiv _ _ (iso→equiv biinv-int biinv-int ( λ z → predl z , λ z → suc z , λ z i → predl-suc z i , λ z i → comp 0 1 (suc (predl-suc (predr z) i)) [ | i=0 j → suc (predl (suc-predr z j)) | i=1 j → suc-predr z j ...

predl/ha-equiv : ha-equiv biinv-int biinv-int

= equiv→ha-equiv _ _ (iso→equiv biinv-int biinv-int ( λ z → predl z , λ z → suc z , λ z i → predl-suc z i , λ z i → comp 0 1 (suc (predl-suc (predr z) i)) [ | i=0 j → suc (predl (suc-predr z j)) | i=1 j → suc-predr z j ] ))

def

predl/ha-equiv

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "equiv→ha-equiv", "ha-equiv", "iso→equiv" ]

null

16

27

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

suc-predl = predl/ha-equiv .snd .snd .snd .fst

suc-predl

= predl/ha-equiv .snd .snd .snd .fst

def

suc-predl

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "predl/ha-equiv" ]

null

29

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

predl-adj = predl/ha-equiv .snd .snd .snd .snd

predl-adj

= predl/ha-equiv .snd .snd .snd .snd

def

predl-adj

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "predl/ha-equiv" ]

null

30

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

suc-adj = ha-equiv/symm _ _ predl/ha-equiv .snd .snd .snd .snd

suc-adj

= ha-equiv/symm _ _ predl/ha-equiv .snd .snd .snd .snd

def

suc-adj

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "ha-equiv/symm", "predl/ha-equiv" ]

null

31

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

suc/equiv : equiv biinv-int biinv-int = iso→equiv biinv-int biinv-int ( λ z → suc z , λ z → predl z , suc-predl , λ z i → predl-suc z i )

suc/equiv : equiv biinv-int biinv-int

= iso→equiv biinv-int biinv-int ( λ z → suc z , λ z → predl z , suc-predl , λ z i → predl-suc z i )

def

suc/equiv

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "equiv", "iso→equiv", "suc-predl" ]

null

33

39

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

predl~predr (z : biinv-int) : path biinv-int (predl z) (predr z) = λ j → equiv-section/prop biinv-int biinv-int (λ z → suc z) (suc/equiv .snd) (λ z → predl z, suc-predl) (λ z → predr z, λ z i → suc-predr z i) j .fst z

predl~predr (z : biinv-int) : path biinv-int (predl z) (predr z)

= λ j → equiv-section/prop biinv-int biinv-int (λ z → suc z) (suc/equiv .snd) (λ z → predl z, suc-predl) (λ z → predr z, λ z i → suc-predr z i) j .fst z

def

predl~predr

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "equiv-section/prop", "path", "suc-predl", "suc/equiv" ]

null

41

46

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

suc-predl~suc-predr (z : biinv-int) : [j i] biinv-int [ | i=0 → suc (predl~predr z j) | i=1 → z | j=0 → suc-predl z i | j=1 → suc-predr z i ] = λ j i → equiv-section/prop biinv-int biinv-int (λ z → suc z) (suc/equiv .snd) (λ z → predl z, suc-predl) (λ z → predr z, λ z i → suc-predr z i) j .s...

suc-predl~suc-predr (z : biinv-int) : [j i] biinv-int [ | i=0 → suc (predl~predr z j) | i=1 → z | j=0 → suc-predl z i | j=1 → suc-predr z i ]

= λ j i → equiv-section/prop biinv-int biinv-int (λ z → suc z) (suc/equiv .snd) (λ z → predl z, suc-predl) (λ z → predr z, λ z i → suc-predr z i) j .snd z i

def

suc-predl~suc-predr

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "equiv-section/prop", "predl~predr", "suc-predl", "suc/equiv" ]

null

48

59

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

fwd/pos : nat → biinv-int = elim [zero → zero | suc (_ → ih/n) → suc ih/n]

fwd/pos : nat → biinv-int

= elim [zero → zero | suc (_ → ih/n) → suc ih/n]

def

fwd/pos

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "nat" ]

null

63

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

fwd/negsuc : nat → biinv-int = elim [zero → predl zero | suc (_ → ih/n) → predl ih/n]

fwd/negsuc : nat → biinv-int

= elim [zero → predl zero | suc (_ → ih/n) → predl ih/n]

def

fwd/negsuc

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "nat" ]

null

65

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

fwd : int → biinv-int = elim [pos n → fwd/pos n | negsuc n → fwd/negsuc n]

fwd : int → biinv-int

= elim [pos n → fwd/pos n | negsuc n → fwd/negsuc n]

def

fwd

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "fwd/negsuc", "fwd/pos", "int" ]

null

67

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

bwd : biinv-int → int

def

bwd

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "int", "isuc", "isuc-pred", "pred", "pred-isuc" ]

null

69

77

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

bwd-fwd/pos : (n : nat) → path _ (bwd (fwd/pos n)) (pos n) = elim [ | zero → refl | suc (_ → n/ih) → λ k → isuc (n/ih k) ]

bwd-fwd/pos : (n : nat) → path _ (bwd (fwd/pos n)) (pos n)

= elim [ | zero → refl | suc (_ → n/ih) → λ k → isuc (n/ih k) ]

def

bwd-fwd/pos

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "bwd", "fwd/pos", "isuc", "nat", "path" ]

null

79

83

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

bwd-fwd/negsuc : (n : nat) → path _ (bwd (fwd/negsuc n)) (negsuc n) = elim [ | zero → refl | suc (_ → n/ih) → λ k → pred (n/ih k) ]

bwd-fwd/negsuc : (n : nat) → path _ (bwd (fwd/negsuc n)) (negsuc n)

= elim [ | zero → refl | suc (_ → n/ih) → λ k → pred (n/ih k) ]

def

bwd-fwd/negsuc

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "bwd", "fwd/negsuc", "nat", "path", "pred" ]

null

85

89

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

bwd-fwd : (n : int) → path _ (bwd (fwd n)) n = elim [pos n → bwd-fwd/pos n | negsuc n → bwd-fwd/negsuc n]

bwd-fwd : (n : int) → path _ (bwd (fwd n)) n

= elim [pos n → bwd-fwd/pos n | negsuc n → bwd-fwd/negsuc n]

def

bwd-fwd

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "bwd", "bwd-fwd/negsuc", "bwd-fwd/pos", "fwd", "int", "path" ]

null

91

92

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

fwd/isuc/negsuc : (n : nat) → path _ (fwd (isuc (negsuc n))) (suc (fwd (negsuc n))) = elim [ | zero → λ k → symm' biinv-int (λ j → suc-predl zero j) k | suc n → λ k → symm' biinv-int (λ j → suc-predl (fwd/negsuc n) j) k ]

fwd/isuc/negsuc : (n : nat) → path _ (fwd (isuc (negsuc n))) (suc (fwd (negsuc n)))

= elim [ | zero → λ k → symm' biinv-int (λ j → suc-predl zero j) k | suc n → λ k → symm' biinv-int (λ j → suc-predl (fwd/negsuc n) j) k ]

def

fwd/isuc/negsuc

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "fwd", "fwd/negsuc", "isuc", "nat", "path", "suc-predl", "symm'" ]

null

94

100

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

fwd/isuc : (n : int) → path _ (fwd (isuc n)) (suc (fwd n)) = elim [pos n → refl | negsuc n → fwd/isuc/negsuc n]

fwd/isuc : (n : int) → path _ (fwd (isuc n)) (suc (fwd n))

= elim [pos n → refl | negsuc n → fwd/isuc/negsuc n]

def

fwd/isuc

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "fwd", "fwd/isuc/negsuc", "int", "isuc", "path" ]

null

102

103

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

fwd/pred/pos : (n : nat) → path _ (fwd (pred (pos n))) (predl (fwd/pos n)) = elim [ | zero → refl | suc n → λ k → symm' biinv-int (λ i → predl-suc (fwd/pos n) i) k ]

fwd/pred/pos : (n : nat) → path _ (fwd (pred (pos n))) (predl (fwd/pos n))

= elim [ | zero → refl | suc n → λ k → symm' biinv-int (λ i → predl-suc (fwd/pos n) i) k ]

def

fwd/pred/pos

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "fwd", "fwd/pos", "nat", "path", "pred", "symm'" ]

null

105

111

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

fwd/pred : (n : int) → path _ (fwd (pred n)) (predl (fwd n)) = elim [pos n → fwd/pred/pos n | negsuc n → refl]

fwd/pred : (n : int) → path _ (fwd (pred n)) (predl (fwd n))

= elim [pos n → fwd/pred/pos n | negsuc n → refl]

def

fwd/pred

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "fwd", "fwd/pred/pos", "int", "path", "pred" ]

null

113

114

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

fwd/pred-isuc/negsuc : (n : nat) → [i k] biinv-int [ | i=0 → trans biinv-int (fwd/pred (isuc (negsuc n))) (λ k → predl (fwd/isuc/negsuc n k)) k | i=1 → fwd/negsuc n | k=0 → fwd (pred-isuc (negsuc n) i) | k=1 → predl-suc (fwd/negsuc n) i ] = elim [ | zero → λ i k → comp 0 1 (predl (symm'/filler biinv...

fwd/pred-isuc/negsuc : (n : nat) → [i k] biinv-int [ | i=0 → trans biinv-int (fwd/pred (isuc (negsuc n))) (λ k → predl (fwd/isuc/negsuc n k)) k | i=1 → fwd/negsuc n | k=0 → fwd (pred-isuc (negsuc n) i) | k=1 → predl-suc (fwd/negsuc n) i ]

def

fwd/pred-isuc/negsuc

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "fwd", "fwd/isuc/negsuc", "fwd/negsuc", "fwd/pred", "isuc", "nat", "pred-isuc", "predl-adj", "suc-predl", "symm'/filler", "trans", "trans/unit/l" ]

null

117

137

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

fwd/pred-isuc : (n : int) → [i k] biinv-int [ | i=0 → trans biinv-int (fwd/pred (isuc n)) (λ k → predl (fwd/isuc n k)) k | i=1 | k=0 → fwd (pred-isuc n i) | k=1 → predl-suc (fwd n) i ]

def

fwd/pred-isuc

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "fwd", "fwd/isuc", "fwd/pos", "fwd/pred", "fwd/pred-isuc/negsuc", "fwd/pred/pos", "int", "isuc", "pred-isuc", "symm'/filler", "trans", "trans/unit/r" ]

null

139

152

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

fwd/isuc-pred/pos : (n : nat) → [i k] biinv-int [ | i=0 → trans biinv-int (fwd/isuc (pred (pos n))) (λ k → suc (fwd/pred/pos n k)) k | i=1 → fwd/pos n | k=0 → fwd (isuc-pred (pos n) i) | k=1 → suc-predl (fwd/pos n) i ] = elim [ | zero → λ i k → comp 0 1 (symm'/filler biinv-int (λ i → suc-predl zero ...

fwd/isuc-pred/pos : (n : nat) → [i k] biinv-int [ | i=0 → trans biinv-int (fwd/isuc (pred (pos n))) (λ k → suc (fwd/pred/pos n k)) k | i=1 → fwd/pos n | k=0 → fwd (isuc-pred (pos n) i) | k=1 → suc-predl (fwd/pos n) i ]

def

fwd/isuc-pred/pos

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "fwd", "fwd/isuc", "fwd/isuc/negsuc", "fwd/pos", "fwd/pred/pos", "isuc-pred", "nat", "pred", "suc-adj", "suc-predl", "symm'/filler", "trans", "trans/unit/l", "trans/unit/r" ]

null

154

173

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

fwd/isuc-pred : (n : int) → [i k] biinv-int [ | i=0 → trans biinv-int (fwd/isuc (pred n)) (λ k → suc (fwd/pred n k)) k | i=1 → fwd n | k=0 → fwd (isuc-pred n i) | k=1 → suc-predl (fwd n) i ]

def

fwd/isuc-pred

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "fwd", "fwd/isuc", "fwd/isuc-pred/pos", "fwd/isuc/negsuc", "fwd/negsuc", "fwd/pred", "int", "isuc-pred", "pred", "suc-predl", "symm'/filler", "trans", "trans/unit/r" ]

null

176

190

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

fwd-bwd : (z : biinv-int) → path _ (fwd (bwd z)) z = elim [ | zero → refl | suc (z → z/ih) → trans biinv-int (fwd/isuc (bwd z)) (λ k → suc (z/ih k)) | predl (z → z/ih) → trans biinv-int (fwd/pred (bwd z)) (λ k → predl (z/ih k)) | predr (z → z/ih) → trans biinv-int (fwd/pred (bwd z)) (λ k → predl~predr (z/ih k...

fwd-bwd : (z : biinv-int) → path _ (fwd (bwd z)) z

= elim [ | zero → refl | suc (z → z/ih) → trans biinv-int (fwd/isuc (bwd z)) (λ k → suc (z/ih k)) | predl (z → z/ih) → trans biinv-int (fwd/pred (bwd z)) (λ k → predl (z/ih k)) | predr (z → z/ih) → trans biinv-int (fwd/pred (bwd z)) (λ k → predl~predr (z/ih k) k) | predl-suc (z → z/ih) i → λ k → comp 0 ...

def

fwd-bwd

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "bwd", "fwd", "fwd/isuc", "fwd/isuc-pred", "fwd/pred", "fwd/pred-isuc", "isuc", "path", "pred", "predl~predr", "suc-predl~suc-predr", "trans", "trans/filler", "weak-connection/and" ]

null

192

216

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

int-equiv-biinv-int : equiv int biinv-int = iso→equiv _ _ (fwd,bwd,fwd-bwd,bwd-fwd)

int-equiv-biinv-int : equiv int biinv-int

= iso→equiv _ _ (fwd,bwd,fwd-bwd,bwd-fwd)

def

int-equiv-biinv-int

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "bwd", "bwd-fwd", "equiv", "fwd", "fwd-bwd", "int", "iso→equiv" ]

null

218

219

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

suc'/pair : (z : biinv-int) → (y : biinv-int) × path biinv-int (suc z) y = elim [ | zero → (suc zero, refl) | suc z → (suc (suc z), refl) | predl z → (z, suc-predl z) | predr z → (z, λ j → suc-predr z j) | predl-suc (z → z/ih) i → let filler (i j : 𝕀) : biinv-int = comp 0 j (suc (predl-suc z i)) ...

suc'/pair : (z : biinv-int) → (y : biinv-int) × path biinv-int (suc z) y

def

suc'/pair

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "path", "suc-predl" ]

null

223

239

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

suc' (z : biinv-int) : biinv-int = suc'/pair z .fst

suc' (z : biinv-int) : biinv-int

= suc'/pair z .fst

def

suc'

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "suc'/pair" ]

null

241

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

suc'-predl (z : biinv-int) : path _ (suc' (predl z)) z = refl

suc'-predl (z : biinv-int) : path _ (suc' (predl z)) z

= refl

def

suc'-predl

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "path", "suc'" ]

null

243

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

suc'-predr (z : biinv-int) : path _ (suc' (predr z)) z = refl

suc'-predr (z : biinv-int) : path _ (suc' (predr z)) z

= refl

def

suc'-predr

library/cool

library/cool/biinv-int.red

[ "basics.ha-equiv", "basics.isotoequiv", "basics.retract", "data.int", "data.nat", "prelude" ]

[ "biinv-int", "path", "suc'" ]

null

244

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

le : nat → nat → type = elim [ | zero → λ _ → unit | suc (m → f) → elim [ | zero → void | suc n → f n ] ]

le : nat → nat → type

= elim [ | zero → λ _ → unit | suc (m → f) → elim [ | zero → void | suc n → f n ] ]

def

le

library/cool

library/cool/complete-induction.red

[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]

[ "nat", "unit", "void" ]

null

7

15

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

le/suc/right : (n m : nat) → le n m → le n (suc m) = elim [ | zero → λ _ _ → ★ | suc (n' → f) → elim [ | zero → elim [] | suc m' → λ l → f m' l ] ]

le/suc/right : (n m : nat) → le n m → le n (suc m)

= elim [ | zero → λ _ _ → ★ | suc (n' → f) → elim [ | zero → elim [] | suc m' → λ l → f m' l ] ]

def

le/suc/right

library/cool

library/cool/complete-induction.red

[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]

[ "le", "nat" ]

null

17

25

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

le/suc : (n m : nat) → le n m → le (suc n) (suc m) = elim [ | zero → λ _ _ → ★ | suc _ → λ _ l → l ]

le/suc : (n m : nat) → le n m → le (suc n) (suc m)

= elim [ | zero → λ _ _ → ★ | suc _ → λ _ l → l ]

def

le/suc

library/cool

library/cool/complete-induction.red

[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]

[ "le", "nat" ]

null

27

31

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

le/refl : (n : nat) → le n n = elim [ | zero → ★ | suc (_ → f) → f ]

le/refl : (n : nat) → le n n

= elim [ | zero → ★ | suc (_ → f) → f ]

def

le/refl

library/cool

library/cool/complete-induction.red

[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]

[ "le", "nat" ]

null

33

37

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

le/zero/implies/zero : (n : nat) → (le n zero) → path nat zero n = elim [ | zero → λ _ → refl | suc n' → elim [] ]

le/zero/implies/zero : (n : nat) → (le n zero) → path nat zero n

= elim [ | zero → λ _ → refl | suc n' → elim [] ]

def

le/zero/implies/zero

library/cool

library/cool/complete-induction.red

[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]

[ "le", "nat", "path" ]

null

39

43

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

le/case : (m n : nat) → (le n (suc m)) → or (path nat n (suc m)) (le n m)

def

le/case

library/cool

library/cool/complete-induction.red

[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]

[ "le", "le/suc", "nat", "or", "path" ]

null

45

65

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

weak/induction (P : nat → type) : type = P zero → ((n : nat) → P n → P (suc n)) → (n : nat) → P n

weak/induction (P : nat → type) : type

= P zero → ((n : nat) → P n → P (suc n)) → (n : nat) → P n

def

weak/induction

library/cool

library/cool/complete-induction.red

[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]

[ "nat" ]

null

67

71

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

realize/weak/induction (P : nat → type) : weak/induction P = λ p0 ps → elim [ | zero → p0 | suc (n' → pn') → ps n' pn' ]

realize/weak/induction (P : nat → type) : weak/induction P

= λ p0 ps → elim [ | zero → p0 | suc (n' → pn') → ps n' pn' ]

def

realize/weak/induction

library/cool

library/cool/complete-induction.red

[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]

[ "nat", "weak/induction" ]

null

73

78

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

complete/induction (P : nat → type) : type = P zero → ((n : nat) → ((k : nat) → (le k n) → P k) → P (suc n)) → (n : nat) → P n

complete/induction (P : nat → type) : type

= P zero → ((n : nat) → ((k : nat) → (le k n) → P k) → P (suc n)) → (n : nat) → P n

def

complete/induction

library/cool

library/cool/complete-induction.red

[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]

[ "le", "nat" ]

null

80

84

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

complete/implies/weak (P : nat → type) (complete : complete/induction P) : weak/induction P = λ p0 ps → complete p0 (λ n f → ps n (f n (le/refl n)))

complete/implies/weak (P : nat → type) (complete : complete/induction P) : weak/induction P

= λ p0 ps → complete p0 (λ n f → ps n (f n (le/refl n)))

def

complete/implies/weak

library/cool

library/cool/complete-induction.red

[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]

[ "complete/induction", "le/refl", "nat", "weak/induction" ]

null

86

92

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

weak/implies/complete (P : nat → type) (weak : (P' : nat → type) → weak/induction P') : complete/induction P = λ p0 ps → let P' (n : nat) : type = (k : nat) → (le k n) → P k in let P'0 : P' zero = λ k k/le/0 → coe 0 1 p0 in λ i → P (le/zero/implies/zero k k/le/0 i) in let f (n : nat) (p'n ...

weak/implies/complete (P : nat → type) (weak : (P' : nat → type) → weak/induction P') : complete/induction P

= λ p0 ps → let P' (n : nat) : type = (k : nat) → (le k n) → P k in let P'0 : P' zero = λ k k/le/0 → coe 0 1 p0 in λ i → P (le/zero/implies/zero k k/le/0 i) in let f (n : nat) (p'n : P' n) : (P' (suc n)) = λ k k/le/sn → elim (le/case n k k/le/sn) [ | inl p → coe 1 0 (ps n p'n) in λ i →...

def

weak/implies/complete

library/cool

library/cool/complete-induction.red

[ "data.nat", "data.or", "data.unit", "data.void", "prelude" ]

[ "complete/induction", "le", "le/case", "le/refl", "le/zero/implies/zero", "nat", "weak/induction" ]

null

94

114

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

(A : type) ⊢ F where | η (a : A) | ☆ (s t : F) | ε | idn/r (s : F) (i : 𝕀) [ | i=0 → ☆ s ε | i=1 → s ] | idn/l (s : F) (i : 𝕀) [ | i=0 → ☆ ε s | i=1 → s ] | ass (s t u : F) (i : 𝕀) [ | i=0 → ☆ s (☆ t u) | i=1 → ☆ (☆ s t) u ]

(A : type) ⊢ F

where | η (a : A) | ☆ (s t : F) | ε | idn/r (s : F) (i : 𝕀) [ | i=0 → ☆ s ε | i=1 → s ] | idn/l (s : F) (i : 𝕀) [ | i=0 → ☆ ε s | i=1 → s ] | ass (s t u : F) (i : 𝕀) [ | i=0 → ☆ s (☆ t u) | i=1 → ☆ (☆ s t) u ]

data

F

library/cool

library/cool/free-monoid.red

[ "data.list" ]

[]

Probably need to truncate this to get the right type

7

22

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

quote (A : type) : list A → F A = elim [ | nil → ε | cons x (xs → ih) → ☆ (η x) ih ]

quote (A : type) : list A → F A

= elim [ | nil → ε | cons x (xs → ih) → ☆ (η x) ih ]

def

quote

library/cool

library/cool/free-monoid.red

[ "data.list" ]

[ "list" ]

null

24

29

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

eval (A : type) : F A → list A

def

eval

library/cool

library/cool/free-monoid.red

[ "data.list" ]

[ "append", "append/ass", "append/idn/r", "list" ]

null

31

45

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

nbe (A : type) (s : F A) : F A = quote A (eval A s)

nbe (A : type) (s : F A) : F A

= quote A (eval A s)

def

nbe

library/cool

library/cool/free-monoid.red

[ "data.list" ]

[ "eval", "quote" ]

null

47

48

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

double : nat → nat = elim [ | zero → zero | suc (n' → f) → suc (suc f) ]

double : nat → nat

= elim [ | zero → zero | suc (n' → f) → suc (suc f) ]

def

double

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "nat" ]

null

6

10

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

sub : nat → nat → nat = elim [ | zero → λ _ → zero | suc (m' → sub/m') → elim [ | zero → suc m' | suc n' → sub/m' n' ] ]

sub : nat → nat → nat

= elim [ | zero → λ _ → zero | suc (m' → sub/m') → elim [ | zero → suc m' | suc n' → sub/m' n' ] ]

def

sub

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "nat" ]

null

12

20

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

sub/le : (n m : nat) → le (sub n m) n = elim [ | zero → λ _ → ★ | suc (n' → f) → λ m → elim m [ | zero → le/refl n' | suc m' → le/suc/right (sub n' m') n' (f m') ] ]

sub/le : (n m : nat) → le (sub n m) n

= elim [ | zero → λ _ → ★ | suc (n' → f) → λ m → elim m [ | zero → le/refl n' | suc m' → le/suc/right (sub n' m') n' (f m') ] ]

def

sub/le

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "le", "le/refl", "le/suc/right", "nat", "sub" ]

null

22

29

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

mod/prop : nat → type = λ _ → nat → nat

mod/prop : nat → type

= λ _ → nat → nat

def

mod/prop

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "nat" ]

null

31

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

mod : (n : nat) → mod/prop n = let complete = weak/implies/complete mod/prop (λ P → realize/weak/induction P) in complete (λ _ → zero) (λ n f → λ m → elim m [ | zero → zero | suc m' → elim (sub (suc n) m) [ | zero → elim (sub m (suc n)) [ | zero → zero ...

mod : (n : nat) → mod/prop n

def

mod

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "mod/prop", "nat", "realize/weak/induction", "sub", "sub/le", "weak/implies/complete" ]

null

33

50

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

id/nat : nat → nat = elim [ | zero → zero | suc (_ → f) → suc f ]

id/nat : nat → nat

= elim [ | zero → zero | suc (_ → f) → suc f ]

def

id/nat

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "nat" ]

null

52

56

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

eta : (n : nat) → path nat (id/nat n) n = elim [ | zero → refl | suc (_ → p) → λ i → suc (p i) ]

eta : (n : nat) → path nat (id/nat n) n

= elim [ | zero → refl | suc (_ → p) → λ i → suc (p i) ]

def

eta

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "id/nat", "nat", "path" ]

null

58

62

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

sub/plus/path : (m n : nat) → le n m → path nat (plus n (sub m n)) m = elim [ | zero → λ n p → let path/n/0 = symm nat (le/zero/implies/zero n p) in trans nat (eta n) path/n/0 | suc (m' → f) → elim [ | zero → refl | suc n' → λ p i → suc ((f n' p) i) ] ]

sub/plus/path : (m n : nat) → le n m → path nat (plus n (sub m n)) m

= elim [ | zero → λ n p → let path/n/0 = symm nat (le/zero/implies/zero n p) in trans nat (eta n) path/n/0 | suc (m' → f) → elim [ | zero → refl | suc n' → λ p i → suc ((f n' p) i) ] ]

def

sub/plus/path

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "eta", "le", "le/zero/implies/zero", "nat", "path", "plus", "sub", "symm", "trans" ]

null

64

73

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

plus/le : (m n : nat) → le m (plus m n) = elim [ | zero → λ _ → ★ | suc (m' → f) → f ]

plus/le : (m n : nat) → le m (plus m n)

= elim [ | zero → λ _ → ★ | suc (m' → f) → f ]

def

plus/le

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "le", "nat", "plus" ]

null

75

79

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

le/trans : (m n l : nat) → le m n → le n l → le m l

def

le/trans

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "le", "nat" ]

null

81

93

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

sub/le/implies/le : (m n k : nat) → path nat (suc k) (sub m n) → le n m

def

sub/le/implies/le

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "le", "nat", "path", "sub" ]

null

95

107

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

suc/right/path : (m n : nat) → path nat (plus (suc m) n) (plus m (suc n)) = elim [ | zero → refl | suc (_ → f) → λ n i → suc (f n i) ]

suc/right/path : (m n : nat) → path nat (plus (suc m) n) (plus m (suc n))

= elim [ | zero → refl | suc (_ → f) → λ n i → suc (f n i) ]

def

suc/right/path

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "nat", "path", "plus" ]

null

109

113

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

path/implies/le (p : dim → nat) : le (p 0) (p 1) = coe 0 1 (le/refl (p 0)) in (λ i → le (p 0) (p i))

path/implies/le (p : dim → nat) : le (p 0) (p 1)

= coe 0 1 (le/refl (p 0)) in (λ i → le (p 0) (p i))

def

path/implies/le

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "le", "le/refl", "nat" ]

null

115

116

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

gcd/prop (m : nat) : type = (x y : nat) → le (plus x y) m → nat

gcd/prop (m : nat) : type

= (x y : nat) → le (plus x y) m → nat

def

gcd/prop

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "le", "nat", "plus" ]

null

118

119

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

gcd' : (m : nat) → gcd/prop m

def

gcd'

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "gcd/prop", "le", "le/trans", "nat", "path", "path/implies/le", "plus", "plus/comm", "plus/le", "realize/weak/induction", "sub", "sub/le/implies/le", "sub/plus/path", "suc/right/path", "weak/implies/complete" ]

null

121

169

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

gcd (m n : nat) : nat = gcd' (plus m n) m n (le/refl (plus m n))

gcd (m n : nat) : nat

= gcd' (plus m n) m n (le/refl (plus m n))

def

gcd

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "gcd'", "le/refl", "nat", "plus" ]

null

171

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

n1 : nat = suc zero

n1 : nat

= suc zero

def

n1

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "nat" ]

null

173

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

n2 : nat = double n1

n2 : nat

= double n1

def

n2

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "double", "n1", "nat" ]

null

174

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

n3 : nat = suc n2

n3 : nat

= suc n2

def

n3

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "n2", "nat" ]

null

175

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

n4 : nat = double n2

n4 : nat

= double n2

def

n4

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "double", "n2", "nat" ]

null

176

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

n5 : nat = suc n4

n5 : nat

= suc n4

def

n5

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "n4", "nat" ]

null

177

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c

n6 : nat = plus n2 n4

n6 : nat

= plus n2 n4

def

n6

library/cool

library/cool/gcd.red

[ "cool.complete-induction", "data.nat", "data.void", "prelude" ]

[ "n2", "n4", "nat", "plus" ]

null

178

true

https://github.com/RedPRL/redtt

ae76658873a647eb43d8cf84365a9d68e9a3273c