class AbsField (R : Type) where zero : R one : R add : R → R → R mul : R → R → R opp : R → R abs : R → R le : R → R → Prop lt : R → R → Prop NatAlt : Type NatAltle : NatAlt → NatAlt → Prop NatAltMax : NatAlt → NatAlt → NatAlt le_max_left : ∀ x y, NatAltle x (NatAltMax x y) le_max_right : ∀ x y, NatAltle y (NatAltMax x y) add_comm : ∀ x y, add x y = add y x add_assoc : ∀ x y z, add (add x y) z = add x (add y z) add_zero : ∀ x, add x zero = x add_opp : ∀ x, add x (opp x) = zero opp_add : ∀ x y, opp (add x y) = add (opp x) (opp y) mul_comm : ∀ x y, mul x y = mul y x mul_assoc : ∀ x y z, mul (mul x y) z = mul x (mul y z) mul_one : ∀ x, mul x one = x le_refl : ∀ x, le x x le_trans : ∀ x y z, le x y → le y z → le x z add_le_add : ∀ a b c d, le a b → le c d → le (add a c) (add b d) abs_nonneg : ∀ x, le zero (abs x) abs_triangle : ∀ x y, le (abs (add x y)) (add (abs x) (abs y)) abs_opp : ∀ x, abs (opp x) = abs x abs_sub_symm : ∀ x y, abs (add x (opp y)) = abs (add y (opp x)) sub_decomp : ∀ x y z, add x (opp z) = add (add x (opp y)) (add y (opp z)) sub_eq_zero : ∀ x y, add x (opp y) = zero → x = y eq_of_forall_eps2 : ∀ x, (∀ eps, lt zero eps → le (abs x) (add eps eps)) → x = zero namespace Limits variable {R : Type} [AR : AbsField R] def sub (x y : R) : R := AbsField.add x (AbsField.opp y) def limit (u : (AbsField.NatAlt (R := R)) → R) (l : R) : Prop := ∀ eps : R, AbsField.lt AbsField.zero eps → ∃ N : AbsField.NatAlt (R := R), ∀ n : AbsField.NatAlt (R := R), AbsField.NatAltle (R := R) N n → AbsField.le (AbsField.abs (sub (u n) l)) eps theorem sub_self_zero (x : R) : sub x x = AbsField.zero := by sorry theorem sub_decomp (x y z : R) : sub x z = AR.add (sub x y) (sub y z) := by sorry theorem abs_sub_triangle (x y z : R) : AbsField.le (AbsField.abs (sub x z)) (AbsField.add (AbsField.abs (sub x y)) (AbsField.abs (sub y z))) := by sorry theorem abs_sub_nonneg (x y : R) : AR.le AR.zero (AR.abs (sub x y)) := by sorry theorem limit_unique (u : (AbsField.NatAlt (R := R)) → R) (l m : R) : limit u l → limit u m → l = m := by sorry end Limits