122 lines
4.8 KiB
Text
122 lines
4.8 KiB
Text
/-
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Copyright (c) 2014 Floris van Doorn. All rights reserved.
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Released under Apache 2.0 license as described in the file LICENSE.
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Author: Floris van Doorn
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Ported from Coq HoTT
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Theorems about pi-types (dependent function spaces)
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-/
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import types.sigma
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open eq equiv is_equiv funext
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namespace pi
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universe variables l k
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variables {A A' : Type.{l}} {B : A → Type.{k}} {B' : A' → Type.{k}} {C : Πa, B a → Type}
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{D : Πa b, C a b → Type}
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{a a' a'' : A} {b b₁ b₂ : B a} {b' : B a'} {b'' : B a''} {f g : Πa, B a}
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/- Paths -/
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/- Paths [p : f ≈ g] in a function type [Πx:X, P x] are equivalent to functions taking values in path types, [H : Πx:X, f x ≈ g x], or concisely, [H : f ∼ g].
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This equivalence, however, is just the combination of [apD10] and function extensionality [funext], and as such, [path_forall], et seq. are given in axioms.funext and path: -/
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/- Now we show how these things compute. -/
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definition apd10_path_pi (H : funext) (h : f ~ g) : apd10 (eq_of_homotopy h) ~ h :=
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apd10 (right_inv apd10 h)
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definition path_pi_eta (H : funext) (p : f = g) : eq_of_homotopy (apd10 p) = p :=
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left_inv apd10 p
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print classes
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definition path_pi_idp (H : funext) : eq_of_homotopy (λx : A, refl (f x)) = refl f :=
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path_pi_eta H _
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/- The identification of the path space of a dependent function space, up to equivalence, is of course just funext. -/
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definition path_equiv_homotopy (H : funext) (f g : Πx, B x) : (f = g) ≃ (f ~ g) :=
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equiv.mk _ !is_equiv_apd
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definition is_equiv_path_pi [instance] (H : funext) (f g : Πx, B x)
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: is_equiv (@eq_of_homotopy _ _ f g) :=
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is_equiv_inv apd10
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definition homotopy_equiv_path (H : funext) (f g : Πx, B x) : (f ~ g) ≃ (f = g) :=
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equiv.mk _ (is_equiv_path_pi H f g)
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/- Transport -/
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protected definition transport (p : a = a') (f : Π(b : B a), C a b)
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: (transport (λa, Π(b : B a), C a b) p f)
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~ (λb, transport (C a') !tr_inv_tr (transportD _ p _ (f (p⁻¹ ▸ b)))) :=
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eq.rec_on p (λx, idp)
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/- A special case of [transport_pi] where the type [B] does not depend on [A],
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and so it is just a fixed type [B]. -/
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definition transport_constant {C : A → A' → Type} (p : a = a') (f : Π(b : A'), C a b)
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: (eq.transport (λa, Π(b : A'), C a b) p f) ~ (λb, eq.transport (λa, C a b) p (f b)) :=
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eq.rec_on p (λx, idp)
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/- Maps on paths -/
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/- The action of maps given by lambda. -/
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definition ap_lambdaD (H : funext) {C : A' → Type} (p : a = a') (f : Πa b, C b) :
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ap (λa b, f a b) p = eq_of_homotopy (λb, ap (λa, f a b) p) :=
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begin
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apply (eq.rec_on p),
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apply inverse,
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apply (path_pi_idp H)
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end
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/- Dependent paths -/
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/- with more implicit arguments the conclusion of the following theorem is
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(Π(b : B a), transportD B C p b (f b) = g (eq.transport B p b)) ≃
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(eq.transport (λa, Π(b : B a), C a b) p f = g) -/
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definition dpath_pi (H : funext) (p : a = a') (f : Π(b : B a), C a b) (g : Π(b' : B a'), C a' b')
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: (Π(b : B a), p ▸D (f b) = g (p ▸ b)) ≃ (p ▸ f = g) :=
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eq.rec_on p (λg, homotopy_equiv_path H f g) g
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section open sigma sigma.ops
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/- more implicit arguments:
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(Π(b : B a), eq.transport C (sigma.path p idp) (f b) = g (p ▸ b)) ≃
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(Π(b : B a), transportD B (λ(a : A) (b : B a), C ⟨a, b⟩) p b (f b) = g (eq.transport B p b)) -/
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definition dpath_pi_sigma {C : (Σa, B a) → Type} (p : a = a')
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(f : Π(b : B a), C ⟨a, b⟩) (g : Π(b' : B a'), C ⟨a', b'⟩) :
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(Π(b : B a), (sigma.sigma_eq p !pathover_tr) ▸ (f b) = g (p ▸ b)) ≃ (Π(b : B a), p ▸D (f b) = g (p ▸ b)) :=
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eq.rec_on p (λg, !equiv.refl) g
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end
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variables (f0 : A' → A) (f1 : Π(a':A'), B (f0 a') → B' a')
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definition transport_V [reducible] (P : A → Type) {x y : A} (p : x = y) (u : P y) : P x :=
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p⁻¹ ▸ u
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definition functor_pi : (Π(a:A), B a) → (Π(a':A'), B' a') := (λg a', f1 a' (g (f0 a')))
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/- Equivalences -/
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definition isequiv_functor_pi [instance] (f0 : A' → A) (f1 : Π(a':A'), B (f0 a') → B' a')
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[H0 : is_equiv f0] [H1 : Πa', @is_equiv (B (f0 a')) (B' a') (f1 a')]
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: is_equiv (functor_pi f0 f1) :=
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begin
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apply (adjointify (functor_pi f0 f1) (functor_pi (f0⁻¹)
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(λ(a : A) (b' : B' (f0⁻¹ a)), transport B (right_inv f0 a) ((f1 (f0⁻¹ a))⁻¹ b')))),
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intro h, apply eq_of_homotopy,
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esimp [functor_pi, function.compose], -- simplify (and unfold function_pi and function.compose)
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--first subgoal
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intro a', esimp,
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rewrite adj,
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rewrite -transport_compose,
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rewrite {f1 a' _}(fn_tr_eq_tr_fn _ f1 _),
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rewrite (right_inv (f1 _) _),
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apply apd,
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intro h, beta,
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apply eq_of_homotopy, intro a, esimp,
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apply (transport_V (λx, right_inv f0 a ▸ x = h a) (left_inv (f1 _) _)),
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esimp [function.id],
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apply apd
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end
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end pi
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