lean2/hott/types/fiber.hlean

/-
Copyright (c) 2015 Floris van Doorn. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Author: Floris van Doorn

Ported from Coq HoTT
Theorems about fibers
-/

import .sigma .eq .pi .pointed

structure fiber {A B : Type} (f : A → B) (b : B) :=
  (point : A)
  (point_eq : f point = b)

open equiv sigma sigma.ops eq pi

namespace fiber
  variables {A B : Type} {f : A → B} {b : B}

  protected definition sigma_char [constructor]
    (f : A → B) (b : B) : fiber f b ≃ (Σ(a : A), f a = b) :=
  begin
  fapply equiv.MK,
    {intro x, exact ⟨point x, point_eq x⟩},
    {intro x, exact (fiber.mk x.1 x.2)},
    {intro x, cases x, apply idp},
    {intro x, cases x, apply idp},
  end

  definition fiber_eq_equiv (x y : fiber f b)
    : (x = y) ≃ (Σ(p : point x = point y), point_eq x = ap f p ⬝ point_eq y) :=
  begin
    apply equiv.trans,
      apply eq_equiv_fn_eq_of_equiv, apply fiber.sigma_char,
    apply equiv.trans,
      apply sigma_eq_equiv,
    apply sigma_equiv_sigma_id,
    intro p,
    apply pathover_eq_equiv_Fl,
  end

  definition fiber_eq {x y : fiber f b} (p : point x = point y)
    (q : point_eq x = ap f p ⬝ point_eq y) : x = y :=
  to_inv !fiber_eq_equiv ⟨p, q⟩

  open is_trunc
  definition fiber_pr1 (B : A → Type) (a : A) : fiber (pr1 : (Σa, B a) → A) a ≃ B a :=
  calc
    fiber pr1 a ≃ Σu, u.1 = a            : fiber.sigma_char
            ... ≃ Σa' (b : B a'), a' = a : sigma_assoc_equiv
            ... ≃ Σa' (p : a' = a), B a' : sigma_equiv_sigma_id (λa', !comm_equiv_nondep)
            ... ≃ Σu, B u.1              : sigma_assoc_equiv
            ... ≃ B a                    : !sigma_equiv_of_is_contr_left

  definition sigma_fiber_equiv (f : A → B) : (Σb, fiber f b) ≃ A :=
  calc
    (Σb, fiber f b) ≃ Σb a, f a = b : sigma_equiv_sigma_id (λb, !fiber.sigma_char)
                ... ≃ Σa b, f a = b : sigma_comm_equiv
                ... ≃ A             : sigma_equiv_of_is_contr_right

  definition is_pointed_fiber [instance] [constructor] (f : A → B) (a : A)
    : pointed (fiber f (f a)) :=
  pointed.mk (fiber.mk a idp)

  definition pointed_fiber [constructor] (f : A → B) (a : A) : Type* :=
  Pointed.mk (fiber.mk a (idpath (f a)))

  definition is_trunc_fun [reducible] (n : trunc_index) (f : A → B) :=
  Π(b : B), is_trunc n (fiber f b)
  definition is_contr_fun [reducible] (f : A → B) := is_trunc_fun -2 f

end fiber

open unit is_trunc

namespace fiber

  definition fiber_star_equiv (A : Type) : fiber (λx : A, star) star ≃ A :=
  begin
    fapply equiv.MK,
    { intro f, cases f with a H, exact a },
    { intro a, apply fiber.mk a, reflexivity },
    { intro a, reflexivity },
    { intro f, cases f with a H, change fiber.mk a (refl star) = fiber.mk a H,
      rewrite [is_hset.elim H (refl star)] }
  end

  definition fiber_const_equiv (A : Type) (a₀ : A) (a : A)
    : fiber (λz : unit, a₀) a ≃ a₀ = a :=
  calc
    fiber (λz : unit, a₀) a
      ≃ Σz : unit, a₀ = a : fiber.sigma_char
  ... ≃ a₀ = a : sigma_unit_left

end fiber

open function is_equiv

namespace fiber
  /- Theorem 4.7.6 -/
  variables {A : Type} {P Q : A → Type}
  variable (f : Πa, P a → Q a)

  definition fiber_total_equiv {a : A} (q : Q a)
    : fiber (total f) ⟨a , q⟩ ≃ fiber (f a) q :=
  calc
    fiber (total f) ⟨a , q⟩
          ≃ Σ(w : Σx, P x), ⟨w.1 , f w.1 w.2 ⟩ = ⟨a , q⟩
            : fiber.sigma_char
      ... ≃ Σ(x : A), Σ(p : P x), ⟨x , f x p⟩ = ⟨a , q⟩
            : sigma_assoc_equiv
      ... ≃ Σ(x : A), Σ(p : P x), Σ(H : x = a), f x p =[H] q
            :
            begin
              apply sigma_equiv_sigma_id, intro x,
              apply sigma_equiv_sigma_id, intro p,
              apply sigma_eq_equiv
            end
      ... ≃ Σ(x : A), Σ(H : x = a), Σ(p : P x), f x p =[H] q
            :
            begin
              apply sigma_equiv_sigma_id, intro x,
              apply sigma_comm_equiv
            end
      ... ≃ Σ(w : Σx, x = a), Σ(p : P w.1), f w.1 p =[w.2] q
            : sigma_assoc_equiv
      ... ≃ Σ(p : P (center (Σx, x=a)).1), f (center (Σx, x=a)).1 p =[(center (Σx, x=a)).2] q
            : sigma_equiv_of_is_contr_left
      ... ≃ Σ(p : P a), f a p =[idpath a] q
            : equiv_of_eq idp
      ... ≃ Σ(p : P a), f a p = q
            :
            begin
              apply sigma_equiv_sigma_id, intro p,
              apply pathover_idp
            end
      ... ≃ fiber (f a) q
            : fiber.sigma_char

end fiber
feat(hott/types): start with proof that is_equiv is an hprop 2015-03-03 21:35:51 +00:00			`/-`
feat(hott/types): a bit of cleanup 2015-04-19 19:58:13 +00:00			`Copyright (c) 2015 Floris van Doorn. All rights reserved.`
feat(hott/types): start with proof that is_equiv is an hprop 2015-03-03 21:35:51 +00:00			`Released under Apache 2.0 license as described in the file LICENSE.`
			`Author: Floris van Doorn`

			`Ported from Coq HoTT`
			`Theorems about fibers`
			`-/`

feat(hott): port more from chapters 4 and 6 of the book 2015-09-22 16:01:55 +00:00			`import .sigma .eq .pi .pointed`
feat(hott/types): start with proof that is_equiv is an hprop 2015-03-03 21:35:51 +00:00
			`structure fiber {A B : Type} (f : A → B) (b : B) :=`
			`(point : A)`
			`(point_eq : f point = b)`

feat(hott): port more from chapters 4 and 6 of the book 2015-09-22 16:01:55 +00:00			`open equiv sigma sigma.ops eq pi`
feat(hott/types): start with proof that is_equiv is an hprop 2015-03-03 21:35:51 +00:00
			`namespace fiber`
feat(hott/types): prove that 'is_equiv f' is an hprop 2015-03-04 05:10:48 +00:00			`variables {A B : Type} {f : A → B} {b : B}`
feat(hott/types): start with proof that is_equiv is an hprop 2015-03-03 21:35:51 +00:00
feat(hott): port more from chapters 4 and 6 of the book 2015-09-22 16:01:55 +00:00			`protected definition sigma_char [constructor]`
			`(f : A → B) (b : B) : fiber f b ≃ (Σ(a : A), f a = b) :=`
feat(hott/types): start with proof that is_equiv is an hprop 2015-03-03 21:35:51 +00:00			`begin`
			`fapply equiv.MK,`
			`{intro x, exact ⟨point x, point_eq x⟩},`
			`{intro x, exact (fiber.mk x.1 x.2)},`
			`{intro x, cases x, apply idp},`
			`{intro x, cases x, apply idp},`
			`end`

feat(hott): standardize the naming of definitions proving equality of elements of a structure examples: foo_eq : Pi {A B : foo}, _ -> A = B foo_mk_eq : Pi _, foo.mk _ = foo.mk _ (if constructor is called "bar", then this becomes "bar_eq") foo_eq_equiv : Pi {A B : foo}, (A = B) ≃ _ also changed priority of some instances of is_trunc 2015-04-27 21:29:56 +00:00			`definition fiber_eq_equiv (x y : fiber f b)`
feat(hott/types): start with proof that is_equiv is an hprop 2015-03-03 21:35:51 +00:00			`: (x = y) ≃ (Σ(p : point x = point y), point_eq x = ap f p ⬝ point_eq y) :=`
			`begin`
			`apply equiv.trans,`
feat(hott): port more from chapters 4 and 6 of the book 2015-09-22 16:01:55 +00:00			`apply eq_equiv_fn_eq_of_equiv, apply fiber.sigma_char,`
feat(hott/types): start with proof that is_equiv is an hprop 2015-03-03 21:35:51 +00:00			`apply equiv.trans,`
feat(hott): add types.sum, greatly expand types.prod, minor changes in types.sigma and types.pi 2015-08-06 20:37:52 +00:00			`apply sigma_eq_equiv,`
feat(hott/types): start with proof that is_equiv is an hprop 2015-03-03 21:35:51 +00:00			`apply sigma_equiv_sigma_id,`
			`intro p,`
feat(types): incorporate pathovers in the files of the types folder Conflicts: hott/cubical/pathover.hlean 2015-05-22 08:35:44 +00:00			`apply pathover_eq_equiv_Fl,`
feat(hott/types): start with proof that is_equiv is an hprop 2015-03-03 21:35:51 +00:00			`end`

feat(hott/types): a bit of cleanup 2015-04-19 19:58:13 +00:00			`definition fiber_eq {x y : fiber f b} (p : point x = point y)`
			`(q : point_eq x = ap f p ⬝ point_eq y) : x = y :=`
feat(hott): standardize the naming of definitions proving equality of elements of a structure examples: foo_eq : Pi {A B : foo}, _ -> A = B foo_mk_eq : Pi _, foo.mk _ = foo.mk _ (if constructor is called "bar", then this becomes "bar_eq") foo_eq_equiv : Pi {A B : foo}, (A = B) ≃ _ also changed priority of some instances of is_trunc 2015-04-27 21:29:56 +00:00			`to_inv !fiber_eq_equiv ⟨p, q⟩`
feat(hott/types): start with proof that is_equiv is an hprop 2015-03-03 21:35:51 +00:00
feat(hott): port more from chapters 4 and 6 of the book 2015-09-22 16:01:55 +00:00			`open is_trunc`
			`definition fiber_pr1 (B : A → Type) (a : A) : fiber (pr1 : (Σa, B a) → A) a ≃ B a :=`
			`calc`
			`fiber pr1 a ≃ Σu, u.1 = a : fiber.sigma_char`
			`... ≃ Σa' (b : B a'), a' = a : sigma_assoc_equiv`
			`... ≃ Σa' (p : a' = a), B a' : sigma_equiv_sigma_id (λa', !comm_equiv_nondep)`
			`... ≃ Σu, B u.1 : sigma_assoc_equiv`
			`... ≃ B a : !sigma_equiv_of_is_contr_left`

			`definition sigma_fiber_equiv (f : A → B) : (Σb, fiber f b) ≃ A :=`
			`calc`
			`(Σb, fiber f b) ≃ Σb a, f a = b : sigma_equiv_sigma_id (λb, !fiber.sigma_char)`
			`... ≃ Σa b, f a = b : sigma_comm_equiv`
			`... ≃ A : sigma_equiv_of_is_contr_right`

			`definition is_pointed_fiber [instance] [constructor] (f : A → B) (a : A)`
			`: pointed (fiber f (f a)) :=`
			`pointed.mk (fiber.mk a idp)`

			`definition pointed_fiber [constructor] (f : A → B) (a : A) : Type* :=`
			`Pointed.mk (fiber.mk a (idpath (f a)))`

feat(hott/function): show that a function is embedding iff it has propositional fibers 2015-11-05 17:51:59 +00:00			`definition is_trunc_fun [reducible] (n : trunc_index) (f : A → B) :=`
			`Π(b : B), is_trunc n (fiber f b)`
			`definition is_contr_fun [reducible] (f : A → B) := is_trunc_fun -2 f`

feat(hott/types): prove that 'is_equiv f' is an hprop 2015-03-04 05:10:48 +00:00			`end fiber`
feat(hott): prove HoTT book Theorem 4.7.6 2015-09-26 22:01:33 +00:00
fix(hott/*): update book.md and clean up homotopy.connectedness 2015-09-26 23:35:58 +00:00			`open unit is_trunc`

			`namespace fiber`

			`definition fiber_star_equiv (A : Type) : fiber (λx : A, star) star ≃ A :=`
			`begin`
			`fapply equiv.MK,`
			`{ intro f, cases f with a H, exact a },`
			`{ intro a, apply fiber.mk a, reflexivity },`
			`{ intro a, reflexivity },`
			`{ intro f, cases f with a H, change fiber.mk a (refl star) = fiber.mk a H,`
			`rewrite [is_hset.elim H (refl star)] }`
			`end`

feat(hott/homotopy): connectedness, including HoTT Thm 8.2.1 2015-11-05 19:37:46 +00:00			`definition fiber_const_equiv (A : Type) (a₀ : A) (a : A)`
			`: fiber (λz : unit, a₀) a ≃ a₀ = a :=`
			`calc`
			`fiber (λz : unit, a₀) a`
			`≃ Σz : unit, a₀ = a : fiber.sigma_char`
			`... ≃ a₀ = a : sigma_unit_left`

fix(hott/*): update book.md and clean up homotopy.connectedness 2015-09-26 23:35:58 +00:00			`end fiber`

			`open function is_equiv`
feat(hott): prove HoTT book Theorem 4.7.6 2015-09-26 22:01:33 +00:00
			`namespace fiber`
			`/- Theorem 4.7.6 -/`
			`variables {A : Type} {P Q : A → Type}`
feat(hott): prove HoTT book Theorem 4.7.7 2015-09-27 00:23:39 +00:00			`variable (f : Πa, P a → Q a)`
feat(hott): prove HoTT book Theorem 4.7.6 2015-09-26 22:01:33 +00:00
feat(hott): prove HoTT book Theorem 4.7.7 2015-09-27 00:23:39 +00:00			`definition fiber_total_equiv {a : A} (q : Q a)`
feat(hott/function): show that a function is embedding iff it has propositional fibers 2015-11-05 17:51:59 +00:00			`: fiber (total f) ⟨a , q⟩ ≃ fiber (f a) q :=`
feat(hott): prove HoTT book Theorem 4.7.6 2015-09-26 22:01:33 +00:00			`calc`
feat(hott/function): show that a function is embedding iff it has propositional fibers 2015-11-05 17:51:59 +00:00			`fiber (total f) ⟨a , q⟩`
feat(hott): prove HoTT book Theorem 4.7.6 2015-09-26 22:01:33 +00:00			`≃ Σ(w : Σx, P x), ⟨w.1 , f w.1 w.2 ⟩ = ⟨a , q⟩`
fix(hott): minor changes to merge ulrik and my commits 2015-09-27 21:08:58 +00:00			`: fiber.sigma_char`
feat(hott): prove HoTT book Theorem 4.7.6 2015-09-26 22:01:33 +00:00			`... ≃ Σ(x : A), Σ(p : P x), ⟨x , f x p⟩ = ⟨a , q⟩`
			`: sigma_assoc_equiv`
			`... ≃ Σ(x : A), Σ(p : P x), Σ(H : x = a), f x p =[H] q`
			`:`
			`begin`
			`apply sigma_equiv_sigma_id, intro x,`
			`apply sigma_equiv_sigma_id, intro p,`
			`apply sigma_eq_equiv`
			`end`
			`... ≃ Σ(x : A), Σ(H : x = a), Σ(p : P x), f x p =[H] q`
			`:`
			`begin`
			`apply sigma_equiv_sigma_id, intro x,`
			`apply sigma_comm_equiv`
			`end`
			`... ≃ Σ(w : Σx, x = a), Σ(p : P w.1), f w.1 p =[w.2] q`
			`: sigma_assoc_equiv`
			`... ≃ Σ(p : P (center (Σx, x=a)).1), f (center (Σx, x=a)).1 p =[(center (Σx, x=a)).2] q`
			`: sigma_equiv_of_is_contr_left`
			`... ≃ Σ(p : P a), f a p =[idpath a] q`
			`: equiv_of_eq idp`
			`... ≃ Σ(p : P a), f a p = q`
			`:`
			`begin`
			`apply sigma_equiv_sigma_id, intro p,`
			`apply pathover_idp`
			`end`
			`... ≃ fiber (f a) q`
fix(hott): minor changes to merge ulrik and my commits 2015-09-27 21:08:58 +00:00			`: fiber.sigma_char`
feat(hott): prove HoTT book Theorem 4.7.6 2015-09-26 22:01:33 +00:00
			`end fiber`