2015-06-26 02:27:03 +00:00
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/-
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Copyright (c) 2015 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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Authors: Floris van Doorn
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-/
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2015-11-22 06:37:13 +00:00
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import homotopy.circle eq2 algebra.e_closure cubical.squareover cubical.cube cubical.square2
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2015-06-26 02:27:03 +00:00
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2015-11-22 06:37:13 +00:00
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open quotient eq circle sum sigma equiv function relation e_closure
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2015-06-26 02:27:03 +00:00
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2015-09-10 22:32:52 +00:00
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/-
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2016-04-22 19:12:25 +00:00
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This files defines a general class of nonrecursive 2-HITs using just quotients.
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2015-09-10 22:32:52 +00:00
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We can define any HIT X which has
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- a single 0-constructor
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f : A → X (for some type A)
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- a single 1-constructor
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e : Π{a a' : A}, R a a' → a = a' (for some (type-valued) relation R on A)
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and furthermore has 2-constructors which are all of the form
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p = p'
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where p, p' are of the form
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- refl (f a), for some a : A;
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- e r, for some r : R a a';
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- ap f q, where q : a = a' :> A;
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- inverses of such paths;
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- concatenations of such paths.
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so an example 2-constructor could be (as long as it typechecks):
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ap f q' ⬝ ((e r)⁻¹ ⬝ ap f q)⁻¹ ⬝ e r' = idp
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2016-04-22 19:12:25 +00:00
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We first define "simple two quotients" which have as requirement that the right hand side is idp
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Then we define "two quotients" which can have an arbitrary path on the right hand side
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Then we define "truncated two quotients", which is a two quotient followed by n-truncation,
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and show that this satisfies the desired induction principle and computation rule.
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Caveat: for none of these constructions we show that the induction priniciple computes on
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2-paths. However, with truncated two quotients, if the truncation is a 1-truncation, then this
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computation rule follows automatically, since the target is a 1-type.
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2015-09-10 22:32:52 +00:00
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-/
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2015-06-26 02:27:03 +00:00
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namespace simple_two_quotient
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section
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parameters {A : Type}
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(R : A → A → Type)
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local abbreviation T := e_closure R -- the (type-valued) equivalence closure of R
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parameter (Q : Π⦃a⦄, T a a → Type)
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variables ⦃a a' : A⦄ {s : R a a'} {r : T a a}
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local abbreviation B := A ⊎ Σ(a : A) (r : T a a), Q r
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2015-07-29 12:17:16 +00:00
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inductive pre_two_quotient_rel : B → B → Type :=
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| pre_Rmk {} : Π⦃a a'⦄ (r : R a a'), pre_two_quotient_rel (inl a) (inl a')
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2015-06-26 02:27:03 +00:00
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--BUG: if {} not provided, the alias for pre_Rmk is wrong
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2015-07-29 12:17:16 +00:00
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definition pre_two_quotient := quotient pre_two_quotient_rel
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2015-07-29 12:17:16 +00:00
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open pre_two_quotient_rel
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local abbreviation C := quotient pre_two_quotient_rel
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protected definition j [constructor] (a : A) : C := class_of pre_two_quotient_rel (inl a)
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protected definition pre_aux [constructor] (q : Q r) : C :=
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class_of pre_two_quotient_rel (inr ⟨a, r, q⟩)
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protected definition e (s : R a a') : j a = j a' := eq_of_rel _ (pre_Rmk s)
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protected definition et (t : T a a') : j a = j a' := e_closure.elim e t
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protected definition f [unfold 7] (q : Q r) : S¹ → C :=
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circle.elim (j a) (et r)
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2015-07-07 23:37:06 +00:00
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protected definition pre_rec [unfold 8] {P : C → Type}
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(Pj : Πa, P (j a)) (Pa : Π⦃a : A⦄ ⦃r : T a a⦄ (q : Q r), P (pre_aux q))
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(Pe : Π⦃a a' : A⦄ (s : R a a'), Pj a =[e s] Pj a') (x : C) : P x :=
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begin
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induction x with p,
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{ induction p,
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{ apply Pj},
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{ induction a with a1 a2, induction a2, apply Pa}},
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{ induction H, esimp, apply Pe},
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end
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2015-07-07 23:37:06 +00:00
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protected definition pre_elim [unfold 8] {P : Type} (Pj : A → P)
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(Pa : Π⦃a : A⦄ ⦃r : T a a⦄, Q r → P) (Pe : Π⦃a a' : A⦄ (s : R a a'), Pj a = Pj a') (x : C)
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: P :=
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pre_rec Pj Pa (λa a' s, pathover_of_eq (Pe s)) x
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protected theorem rec_e {P : C → Type}
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(Pj : Πa, P (j a)) (Pa : Π⦃a : A⦄ ⦃r : T a a⦄ (q : Q r), P (pre_aux q))
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(Pe : Π⦃a a' : A⦄ (s : R a a'), Pj a =[e s] Pj a') ⦃a a' : A⦄ (s : R a a')
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2016-03-19 15:25:08 +00:00
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: apd (pre_rec Pj Pa Pe) (e s) = Pe s :=
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!rec_eq_of_rel
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protected theorem elim_e {P : Type} (Pj : A → P) (Pa : Π⦃a : A⦄ ⦃r : T a a⦄, Q r → P)
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(Pe : Π⦃a a' : A⦄ (s : R a a'), Pj a = Pj a') ⦃a a' : A⦄ (s : R a a')
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: ap (pre_elim Pj Pa Pe) (e s) = Pe s :=
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begin
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apply eq_of_fn_eq_fn_inv !(pathover_constant (e s)),
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rewrite [▸*,-apd_eq_pathover_of_eq_ap,↑pre_elim,rec_e],
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end
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protected definition elim_et {P : Type} (Pj : A → P) (Pa : Π⦃a : A⦄ ⦃r : T a a⦄, Q r → P)
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(Pe : Π⦃a a' : A⦄ (s : R a a'), Pj a = Pj a') ⦃a a' : A⦄ (t : T a a')
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: ap (pre_elim Pj Pa Pe) (et t) = e_closure.elim Pe t :=
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ap_e_closure_elim_h e (elim_e Pj Pa Pe) t
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2015-11-22 06:37:13 +00:00
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protected definition rec_et {P : C → Type}
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(Pj : Πa, P (j a)) (Pa : Π⦃a : A⦄ ⦃r : T a a⦄ (q : Q r), P (pre_aux q))
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(Pe : Π⦃a a' : A⦄ (s : R a a'), Pj a =[e s] Pj a') ⦃a a' : A⦄ (t : T a a')
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2016-03-19 15:25:08 +00:00
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: apd (pre_rec Pj Pa Pe) (et t) = e_closure.elimo e Pe t :=
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ap_e_closure_elimo_h e Pe (rec_e Pj Pa Pe) t
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2015-06-26 02:27:03 +00:00
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inductive simple_two_quotient_rel : C → C → Type :=
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2015-09-10 22:32:52 +00:00
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| Rmk {} : Π{a : A} {r : T a a} (q : Q r) (x : circle),
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simple_two_quotient_rel (f q x) (pre_aux q)
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2015-06-26 02:27:03 +00:00
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open simple_two_quotient_rel
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definition simple_two_quotient := quotient simple_two_quotient_rel
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local abbreviation D := simple_two_quotient
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local abbreviation i := class_of simple_two_quotient_rel
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definition incl0 (a : A) : D := i (j a)
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protected definition aux (q : Q r) : D := i (pre_aux q)
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definition incl1 (s : R a a') : incl0 a = incl0 a' := ap i (e s)
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definition inclt (t : T a a') : incl0 a = incl0 a' := e_closure.elim incl1 t
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2015-06-26 02:27:03 +00:00
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-- "wrong" version inclt, which is ap i (p ⬝ q) instead of ap i p ⬝ ap i q
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2015-09-10 22:32:52 +00:00
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-- it is used in the proof, because incltw is easier to work with
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protected definition incltw (t : T a a') : incl0 a = incl0 a' := ap i (et t)
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protected definition inclt_eq_incltw (t : T a a') : inclt t = incltw t :=
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(ap_e_closure_elim i e t)⁻¹
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definition incl2' (q : Q r) (x : S¹) : i (f q x) = aux q :=
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eq_of_rel simple_two_quotient_rel (Rmk q x)
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protected definition incl2w (q : Q r) : incltw r = idp :=
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(ap02 i (elim_loop (j a) (et r))⁻¹) ⬝
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(ap_compose i (f q) loop)⁻¹ ⬝
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2015-09-10 22:32:52 +00:00
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ap_is_constant (incl2' q) loop ⬝
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2015-06-26 02:27:03 +00:00
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!con.right_inv
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definition incl2 (q : Q r) : inclt r = idp :=
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inclt_eq_incltw r ⬝ incl2w q
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2015-07-29 12:17:16 +00:00
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local attribute simple_two_quotient f i D incl0 aux incl1 incl2' inclt [reducible]
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local attribute i aux incl0 [constructor]
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2015-11-22 08:08:31 +00:00
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parameters {R Q}
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2015-11-22 06:37:13 +00:00
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protected definition rec {P : D → Type} (P0 : Π(a : A), P (incl0 a))
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(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a =[incl1 s] P0 a')
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(P2 : Π⦃a : A⦄ ⦃r : T a a⦄ (q : Q r),
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change_path (incl2 q) (e_closure.elimo incl1 P1 r) = idpo) (x : D) : P x :=
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begin
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induction x,
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{ refine (pre_rec _ _ _ a),
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{ exact P0},
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{ intro a r q, exact incl2' q base ▸ P0 a},
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{ intro a a' s, exact pathover_of_pathover_ap P i (P1 s)}},
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{ exact abstract [irreducible] begin induction H, induction x,
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{ esimp, exact pathover_tr (incl2' q base) (P0 a)},
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{ apply pathover_pathover,
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esimp, fold [i, incl2' q],
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refine eq_hconcato _ _, apply _,
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{ transitivity _,
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{ apply ap (pathover_ap _ _),
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2016-03-19 15:25:08 +00:00
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transitivity _, apply apd_compose2 (pre_rec P0 _ _) (f q) loop,
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2015-11-22 06:37:13 +00:00
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apply ap (pathover_of_pathover_ap _ _),
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transitivity _, apply apd_change_path, exact !elim_loop⁻¹,
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2015-11-22 06:37:13 +00:00
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transitivity _,
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apply ap (change_path _),
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transitivity _, apply rec_et,
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transitivity (pathover_of_pathover_ap P i (change_path (inclt_eq_incltw r)
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(e_closure.elimo incl1 (λ (a a' : A) (s : R a a'), P1 s) r))),
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apply e_closure_elimo_ap,
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exact idp,
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apply change_path_pathover_of_pathover_ap},
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esimp, transitivity _, apply pathover_ap_pathover_of_pathover_ap P i (f q),
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transitivity _, apply ap (change_path _), apply to_right_inv !pathover_compose,
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do 2 (transitivity _; exact !change_path_con⁻¹),
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transitivity _, apply ap (change_path _),
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exact (to_left_inv (change_path_equiv _ _ (incl2 q)) _)⁻¹, esimp,
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rewrite P2, transitivity _; exact !change_path_con⁻¹, apply ap (λx, change_path x _),
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rewrite [↑incl2, con_inv], transitivity _, exact !con.assoc⁻¹,
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rewrite [inv_con_cancel_right, ↑incl2w, ↑ap02, +con_inv, +ap_inv, +inv_inv, -+con.assoc,
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+con_inv_cancel_right], reflexivity},
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2016-03-19 15:25:08 +00:00
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rewrite [change_path_con, apd_constant],
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2015-11-22 06:37:13 +00:00
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apply squareover_change_path_left, apply squareover_change_path_right',
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apply squareover_change_path_left,
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refine change_square _ vrflo,
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symmetry, apply inv_ph_eq_of_eq_ph, rewrite [ap_is_constant_natural_square],
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apply whisker_bl_whisker_tl_eq} end end},
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end
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protected definition rec_on [reducible] {P : D → Type} (x : D) (P0 : Π(a : A), P (incl0 a))
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(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a =[incl1 s] P0 a')
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(P2 : Π⦃a : A⦄ ⦃r : T a a⦄ (q : Q r),
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change_path (incl2 q) (e_closure.elimo incl1 P1 r) = idpo) : P x :=
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rec P0 P1 P2 x
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theorem rec_incl1 {P : D → Type} (P0 : Π(a : A), P (incl0 a))
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(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a =[incl1 s] P0 a')
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(P2 : Π⦃a : A⦄ ⦃r : T a a⦄ (q : Q r),
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change_path (incl2 q) (e_closure.elimo incl1 P1 r) = idpo) ⦃a a' : A⦄ (s : R a a')
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2016-03-19 15:25:08 +00:00
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: apd (rec P0 P1 P2) (incl1 s) = P1 s :=
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2015-11-22 06:37:13 +00:00
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begin
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2016-03-19 15:25:08 +00:00
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unfold [rec, incl1], refine !apd_ap ⬝ _, esimp, rewrite rec_e,
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2015-11-22 06:37:13 +00:00
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apply to_right_inv !pathover_compose
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end
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theorem rec_inclt {P : D → Type} (P0 : Π(a : A), P (incl0 a))
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(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a =[incl1 s] P0 a')
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(P2 : Π⦃a : A⦄ ⦃r : T a a⦄ (q : Q r),
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change_path (incl2 q) (e_closure.elimo incl1 P1 r) = idpo) ⦃a a' : A⦄ (t : T a a')
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2016-03-19 15:25:08 +00:00
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: apd (rec P0 P1 P2) (inclt t) = e_closure.elimo incl1 P1 t :=
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2015-11-22 06:37:13 +00:00
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ap_e_closure_elimo_h incl1 P1 (rec_incl1 P0 P1 P2) t
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2015-06-26 02:27:03 +00:00
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protected definition elim {P : Type} (P0 : A → P)
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(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a')
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(P2 : Π⦃a : A⦄ ⦃r : T a a⦄ (q : Q r), e_closure.elim P1 r = idp)
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(x : D) : P :=
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begin
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induction x,
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{ refine (pre_elim _ _ _ a),
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{ exact P0},
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{ intro a r q, exact P0 a},
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{ exact P1}},
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{ exact abstract begin induction H, induction x,
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{ exact idpath (P0 a)},
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2015-07-29 12:17:16 +00:00
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{ unfold f, apply eq_pathover, apply hdeg_square,
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2015-06-26 02:27:03 +00:00
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exact abstract ap_compose (pre_elim P0 _ P1) (f q) loop ⬝
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ap _ !elim_loop ⬝
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!elim_et ⬝
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P2 q ⬝
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!ap_constant⁻¹ end} end end},
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end
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2015-07-07 23:37:06 +00:00
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local attribute elim [unfold 8]
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protected definition elim_on {P : Type} (x : D) (P0 : A → P)
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(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a')
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(P2 : Π⦃a : A⦄ ⦃r : T a a⦄ (q : Q r), e_closure.elim P1 r = idp)
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: P :=
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elim P0 P1 P2 x
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definition elim_incl1 {P : Type} {P0 : A → P}
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{P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a'}
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(P2 : Π⦃a : A⦄ ⦃r : T a a⦄ (q : Q r), e_closure.elim P1 r = idp)
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⦃a a' : A⦄ (s : R a a') : ap (elim P0 P1 P2) (incl1 s) = P1 s :=
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(ap_compose (elim P0 P1 P2) i (e s))⁻¹ ⬝ !elim_e
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definition elim_inclt {P : Type} {P0 : A → P}
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{P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a'}
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(P2 : Π⦃a : A⦄ ⦃r : T a a⦄ (q : Q r), e_closure.elim P1 r = idp)
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⦃a a' : A⦄ (t : T a a') : ap (elim P0 P1 P2) (inclt t) = e_closure.elim P1 t :=
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ap_e_closure_elim_h incl1 (elim_incl1 P2) t
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protected definition elim_incltw {P : Type} {P0 : A → P}
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{P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a'}
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(P2 : Π⦃a : A⦄ ⦃r : T a a⦄ (q : Q r), e_closure.elim P1 r = idp)
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⦃a a' : A⦄ (t : T a a') : ap (elim P0 P1 P2) (incltw t) = e_closure.elim P1 t :=
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(ap_compose (elim P0 P1 P2) i (et t))⁻¹ ⬝ !elim_et
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protected theorem elim_inclt_eq_elim_incltw {P : Type} {P0 : A → P}
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{P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a'}
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(P2 : Π⦃a : A⦄ ⦃r : T a a⦄ (q : Q r), e_closure.elim P1 r = idp)
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⦃a a' : A⦄ (t : T a a')
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: elim_inclt P2 t = ap (ap (elim P0 P1 P2)) (inclt_eq_incltw t) ⬝ elim_incltw P2 t :=
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begin
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unfold [elim_inclt,elim_incltw,inclt_eq_incltw,et],
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refine !ap_e_closure_elim_h_eq ⬝ _,
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rewrite [ap_inv,-con.assoc],
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xrewrite [eq_of_square (ap_ap_e_closure_elim i (elim P0 P1 P2) e t)⁻¹ʰ],
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rewrite [↓incl1,con.assoc], apply whisker_left,
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rewrite [↑[elim_et,elim_incl1],+ap_e_closure_elim_h_eq,con_inv,↑[i,function.compose]],
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rewrite [-con.assoc (_ ⬝ _),con.assoc _⁻¹,con.left_inv,▸*,-ap_inv,-ap_con],
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apply ap (ap _),
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krewrite [-eq_of_homotopy3_inv,-eq_of_homotopy3_con]
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end
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|
2015-07-29 12:17:16 +00:00
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definition elim_incl2' {P : Type} {P0 : A → P}
|
2015-06-26 02:27:03 +00:00
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{P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a'}
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(P2 : Π⦃a : A⦄ ⦃r : T a a⦄ (q : Q r), e_closure.elim P1 r = idp)
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⦃a : A⦄ ⦃r : T a a⦄ (q : Q r) : ap (elim P0 P1 P2) (incl2' q base) = idpath (P0 a) :=
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!elim_eq_of_rel
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protected theorem elim_incl2w {P : Type} (P0 : A → P)
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(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a')
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(P2 : Π⦃a : A⦄ ⦃r : T a a⦄ (q : Q r), e_closure.elim P1 r = idp)
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⦃a : A⦄ ⦃r : T a a⦄ (q : Q r)
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: square (ap02 (elim P0 P1 P2) (incl2w q)) (P2 q) (elim_incltw P2 r) idp :=
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begin
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esimp [incl2w,ap02],
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rewrite [+ap_con (ap _),▸*],
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xrewrite [-ap_compose (ap _) (ap i)],
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rewrite [+ap_inv],
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xrewrite [eq_top_of_square
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((ap_compose_natural (elim P0 P1 P2) i (elim_loop (j a) (et r)))⁻¹ʰ⁻¹ᵛ ⬝h
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(ap_ap_compose (elim P0 P1 P2) i (f q) loop)⁻¹ʰ⁻¹ᵛ ⬝h
|
2015-09-10 22:32:52 +00:00
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ap_ap_is_constant (elim P0 P1 P2) (incl2' q) loop ⬝h
|
2015-06-26 02:27:03 +00:00
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ap_con_right_inv_sq (elim P0 P1 P2) (incl2' q base)),
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↑[elim_incltw]],
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apply whisker_tl,
|
2015-09-10 22:32:52 +00:00
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|
rewrite [ap_is_constant_eq],
|
2016-03-19 15:25:08 +00:00
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|
xrewrite [naturality_apd_eq (λx, !elim_eq_of_rel) loop],
|
2015-06-26 02:27:03 +00:00
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|
rewrite [↑elim_2,rec_loop,square_of_pathover_concato_eq,square_of_pathover_eq_concato,
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eq_of_square_vconcat_eq,eq_of_square_eq_vconcat],
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apply eq_vconcat,
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{ apply ap (λx, _ ⬝ eq_con_inv_of_con_eq ((_ ⬝ x ⬝ _)⁻¹ ⬝ _) ⬝ _),
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transitivity _, apply ap eq_of_square,
|
2015-07-29 12:17:16 +00:00
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|
apply to_right_inv !eq_pathover_equiv_square (hdeg_square (elim_1 P A R Q P0 P1 a r q P2)),
|
2015-06-26 02:27:03 +00:00
|
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|
transitivity _, apply eq_of_square_hdeg_square,
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unfold elim_1, reflexivity},
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|
rewrite [+con_inv,whisker_left_inv,+inv_inv,-whisker_right_inv,
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con.assoc (whisker_left _ _),con.assoc _ (whisker_right _ _),▸*,
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whisker_right_con_whisker_left _ !ap_constant],
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|
xrewrite [-con.assoc _ _ (whisker_right _ _)],
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rewrite [con.assoc _ _ (whisker_left _ _),idp_con_whisker_left,▸*,
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con.assoc _ !ap_constant⁻¹,con.left_inv],
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xrewrite [eq_con_inv_of_con_eq_whisker_left,▸*],
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|
rewrite [+con.assoc _ _ !con.right_inv,
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right_inv_eq_idp (
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(λ(x : ap (elim P0 P1 P2) (incl2' q base) = idpath
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(elim P0 P1 P2 (class_of simple_two_quotient_rel (f q base)))), x)
|
2015-07-29 12:17:16 +00:00
|
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|
(elim_incl2' P2 q)),
|
2015-06-26 02:27:03 +00:00
|
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|
↑[whisker_left]],
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|
xrewrite [con2_con_con2],
|
2015-07-29 12:17:16 +00:00
|
|
|
rewrite [idp_con,↑elim_incl2',con.left_inv,whisker_right_inv,↑whisker_right],
|
2015-06-26 02:27:03 +00:00
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|
xrewrite [con.assoc _ _ (_ ◾ _)],
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|
rewrite [con.left_inv,▸*,-+con.assoc,con.assoc _⁻¹,↑[elim,function.compose],con.left_inv,
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|
▸*,↑j,con.left_inv,idp_con],
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|
|
apply square_of_eq, reflexivity
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|
|
|
end
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|
theorem elim_incl2 {P : Type} (P0 : A → P)
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(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a')
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|
(P2 : Π⦃a : A⦄ ⦃r : T a a⦄ (q : Q r), e_closure.elim P1 r = idp)
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|
⦃a : A⦄ ⦃r : T a a⦄ (q : Q r)
|
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|
|
: square (ap02 (elim P0 P1 P2) (incl2 q)) (P2 q) (elim_inclt P2 r) idp :=
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|
|
begin
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|
rewrite [↑incl2,↑ap02,ap_con,elim_inclt_eq_elim_incltw],
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|
|
apply whisker_tl,
|
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|
|
apply elim_incl2w
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|
end
|
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|
end
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|
end simple_two_quotient
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|
|
2016-04-11 17:11:59 +00:00
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export [unfold] simple_two_quotient
|
2016-03-08 05:16:45 +00:00
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attribute simple_two_quotient.j simple_two_quotient.incl0 [constructor]
|
2015-11-22 06:37:13 +00:00
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attribute simple_two_quotient.rec simple_two_quotient.elim [unfold 8] [recursor 8]
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--attribute simple_two_quotient.elim_type [unfold 9] -- TODO
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attribute simple_two_quotient.rec_on simple_two_quotient.elim_on [unfold 5]
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|
|
--attribute simple_two_quotient.elim_type_on [unfold 6] -- TODO
|
2015-06-26 02:27:03 +00:00
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|
|
namespace two_quotient
|
2015-11-22 06:37:13 +00:00
|
|
|
open simple_two_quotient
|
2015-06-26 02:27:03 +00:00
|
|
|
section
|
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|
|
parameters {A : Type}
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|
(R : A → A → Type)
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|
|
local abbreviation T := e_closure R -- the (type-valued) equivalence closure of R
|
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|
parameter (Q : Π⦃a a'⦄, T a a' → T a a' → Type)
|
2015-11-22 22:46:54 +00:00
|
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|
variables ⦃a a' a'' : A⦄ {s : R a a'} {t t' : T a a'}
|
2015-06-26 02:27:03 +00:00
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inductive two_quotient_Q : Π⦃a : A⦄, e_closure R a a → Type :=
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| Qmk : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄, Q t t' → two_quotient_Q (t ⬝r t'⁻¹ʳ)
|
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|
|
open two_quotient_Q
|
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|
|
local abbreviation Q2 := two_quotient_Q
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|
|
definition two_quotient := simple_two_quotient R Q2
|
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|
|
definition incl0 (a : A) : two_quotient := incl0 _ _ a
|
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|
definition incl1 (s : R a a') : incl0 a = incl0 a' := incl1 _ _ s
|
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|
definition inclt (t : T a a') : incl0 a = incl0 a' := e_closure.elim incl1 t
|
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|
definition incl2 (q : Q t t') : inclt t = inclt t' :=
|
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|
eq_of_con_inv_eq_idp (incl2 _ _ (Qmk R q))
|
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|
|
|
2015-11-22 08:08:31 +00:00
|
|
|
parameters {R Q}
|
2015-11-22 06:37:13 +00:00
|
|
|
protected definition rec {P : two_quotient → Type} (P0 : Π(a : A), P (incl0 a))
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(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a =[incl1 s] P0 a')
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|
(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'),
|
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|
change_path (incl2 q) (e_closure.elimo incl1 P1 t) = e_closure.elimo incl1 P1 t')
|
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|
|
(x : two_quotient) : P x :=
|
|
|
|
begin
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|
|
induction x,
|
|
|
|
{ exact P0 a},
|
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|
{ exact P1 s},
|
2015-11-22 22:46:54 +00:00
|
|
|
{ exact abstract [irreducible] begin induction q with a a' t t' q,
|
2016-04-11 17:11:59 +00:00
|
|
|
rewrite [elimo_trans (simple_two_quotient.incl1 R Q2) P1,
|
|
|
|
elimo_symm (simple_two_quotient.incl1 R Q2) P1,
|
2015-11-22 06:37:13 +00:00
|
|
|
-whisker_right_eq_of_con_inv_eq_idp (simple_two_quotient.incl2 R Q2 (Qmk R q)),
|
|
|
|
change_path_con],
|
|
|
|
xrewrite [change_path_cono],
|
|
|
|
refine ap (λx, change_path _ (_ ⬝o x)) !change_path_invo ⬝ _, esimp,
|
2015-11-22 22:46:54 +00:00
|
|
|
apply cono_invo_eq_idpo, apply P2 end end}
|
2015-11-22 06:37:13 +00:00
|
|
|
end
|
|
|
|
|
|
|
|
protected definition rec_on [reducible] {P : two_quotient → Type} (x : two_quotient)
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|
|
(P0 : Π(a : A), P (incl0 a))
|
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|
(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a =[incl1 s] P0 a')
|
|
|
|
(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'),
|
|
|
|
change_path (incl2 q) (e_closure.elimo incl1 P1 t) = e_closure.elimo incl1 P1 t') : P x :=
|
|
|
|
rec P0 P1 P2 x
|
|
|
|
|
|
|
|
theorem rec_incl1 {P : two_quotient → Type} (P0 : Π(a : A), P (incl0 a))
|
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|
|
(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a =[incl1 s] P0 a')
|
|
|
|
(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'),
|
|
|
|
change_path (incl2 q) (e_closure.elimo incl1 P1 t) = e_closure.elimo incl1 P1 t')
|
2016-03-19 15:25:08 +00:00
|
|
|
⦃a a' : A⦄ (s : R a a') : apd (rec P0 P1 P2) (incl1 s) = P1 s :=
|
2015-11-22 08:08:31 +00:00
|
|
|
rec_incl1 _ _ _ s
|
2015-11-22 06:37:13 +00:00
|
|
|
|
|
|
|
theorem rec_inclt {P : two_quotient → Type} (P0 : Π(a : A), P (incl0 a))
|
|
|
|
(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a =[incl1 s] P0 a')
|
|
|
|
(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'),
|
|
|
|
change_path (incl2 q) (e_closure.elimo incl1 P1 t) = e_closure.elimo incl1 P1 t')
|
2016-03-19 15:25:08 +00:00
|
|
|
⦃a a' : A⦄ (t : T a a') : apd (rec P0 P1 P2) (inclt t) = e_closure.elimo incl1 P1 t :=
|
2015-11-22 08:08:31 +00:00
|
|
|
rec_inclt _ _ _ t
|
2015-11-22 06:37:13 +00:00
|
|
|
|
2015-06-26 02:27:03 +00:00
|
|
|
protected definition elim {P : Type} (P0 : A → P)
|
|
|
|
(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a')
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|
|
(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'), e_closure.elim P1 t = e_closure.elim P1 t')
|
|
|
|
(x : two_quotient) : P :=
|
|
|
|
begin
|
|
|
|
induction x,
|
|
|
|
{ exact P0 a},
|
|
|
|
{ exact P1 s},
|
2015-07-07 23:37:06 +00:00
|
|
|
{ exact abstract [unfold 10] begin induction q with a a' t t' q,
|
2015-11-22 06:37:13 +00:00
|
|
|
esimp [e_closure.elim],
|
2015-06-26 02:27:03 +00:00
|
|
|
apply con_inv_eq_idp, exact P2 q end end},
|
|
|
|
end
|
2015-07-07 23:37:06 +00:00
|
|
|
local attribute elim [unfold 8]
|
2015-06-26 02:27:03 +00:00
|
|
|
|
|
|
|
protected definition elim_on {P : Type} (x : two_quotient) (P0 : A → P)
|
|
|
|
(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a')
|
|
|
|
(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'), e_closure.elim P1 t = e_closure.elim P1 t')
|
|
|
|
: P :=
|
|
|
|
elim P0 P1 P2 x
|
|
|
|
|
|
|
|
definition elim_incl1 {P : Type} {P0 : A → P}
|
|
|
|
{P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a'}
|
|
|
|
(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'), e_closure.elim P1 t = e_closure.elim P1 t')
|
|
|
|
⦃a a' : A⦄ (s : R a a') : ap (elim P0 P1 P2) (incl1 s) = P1 s :=
|
|
|
|
!elim_incl1
|
|
|
|
|
|
|
|
definition elim_inclt {P : Type} {P0 : A → P}
|
|
|
|
{P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a'}
|
|
|
|
(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'), e_closure.elim P1 t = e_closure.elim P1 t')
|
|
|
|
⦃a a' : A⦄ (t : T a a') : ap (elim P0 P1 P2) (inclt t) = e_closure.elim P1 t :=
|
2016-04-11 17:11:59 +00:00
|
|
|
ap_e_closure_elim_h incl1 (elim_incl1 P2) t
|
2015-06-26 02:27:03 +00:00
|
|
|
|
|
|
|
theorem elim_incl2 {P : Type} (P0 : A → P)
|
|
|
|
(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a')
|
|
|
|
(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'), e_closure.elim P1 t = e_closure.elim P1 t')
|
|
|
|
⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t')
|
|
|
|
: square (ap02 (elim P0 P1 P2) (incl2 q)) (P2 q) (elim_inclt P2 t) (elim_inclt P2 t') :=
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begin
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rewrite [↑[incl2,elim],ap_eq_of_con_inv_eq_idp],
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2015-11-22 08:08:31 +00:00
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xrewrite [eq_top_of_square (elim_incl2 P0 P1 (elim_1 A R Q P P0 P1 P2) (Qmk R q))],
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xrewrite [{simple_two_quotient.elim_inclt (elim_1 A R Q P P0 P1 P2)
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2015-08-04 17:00:12 +00:00
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(t ⬝r t'⁻¹ʳ)}
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2015-11-22 08:08:31 +00:00
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idpath (ap_con (simple_two_quotient.elim P0 P1 (elim_1 A R Q P P0 P1 P2))
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2015-08-04 17:00:12 +00:00
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(inclt t) (inclt t')⁻¹ ⬝
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2015-11-22 08:08:31 +00:00
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(simple_two_quotient.elim_inclt (elim_1 A R Q P P0 P1 P2) t ◾
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(ap_inv (simple_two_quotient.elim P0 P1 (elim_1 A R Q P P0 P1 P2))
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2015-08-04 17:00:12 +00:00
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(inclt t') ⬝
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2015-11-22 08:08:31 +00:00
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inverse2 (simple_two_quotient.elim_inclt (elim_1 A R Q P P0 P1 P2) t')))),▸*],
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2015-08-04 17:00:12 +00:00
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rewrite [-con.assoc _ _ (con_inv_eq_idp _),-con.assoc _ _ (_ ◾ _),con.assoc _ _ (ap_con _ _ _),
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con.left_inv,↑whisker_left,con2_con_con2,-con.assoc (ap_inv _ _)⁻¹,
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con.left_inv,+idp_con,eq_of_con_inv_eq_idp_con2],
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xrewrite [to_left_inv !eq_equiv_con_inv_eq_idp (P2 q)],
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apply top_deg_square
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2015-06-26 02:27:03 +00:00
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end
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2015-11-22 22:46:54 +00:00
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definition elim_inclt_rel [unfold_full] {P : Type} {P0 : A → P}
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{P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a'}
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(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'), e_closure.elim P1 t = e_closure.elim P1 t')
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⦃a a' : A⦄ (r : R a a') : elim_inclt P2 [r] = elim_incl1 P2 r :=
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idp
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definition elim_inclt_inv [unfold_full] {P : Type} {P0 : A → P}
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{P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a'}
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(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'), e_closure.elim P1 t = e_closure.elim P1 t')
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⦃a a' : A⦄ (t : T a a')
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: elim_inclt P2 t⁻¹ʳ = ap_inv (elim P0 P1 P2) (inclt t) ⬝ (elim_inclt P2 t)⁻² :=
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idp
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definition elim_inclt_con [unfold_full] {P : Type} {P0 : A → P}
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{P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a'}
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(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'), e_closure.elim P1 t = e_closure.elim P1 t')
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⦃a a' a'' : A⦄ (t : T a a') (t': T a' a'')
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: elim_inclt P2 (t ⬝r t') =
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ap_con (elim P0 P1 P2) (inclt t) (inclt t') ⬝ (elim_inclt P2 t ◾ elim_inclt P2 t') :=
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idp
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definition inclt_rel [unfold_full] (r : R a a') : inclt [r] = incl1 r := idp
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definition inclt_inv [unfold_full] (t : T a a') : inclt t⁻¹ʳ = (inclt t)⁻¹ := idp
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definition inclt_con [unfold_full] (t : T a a') (t' : T a' a'')
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: inclt (t ⬝r t') = inclt t ⬝ inclt t' := idp
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2015-06-26 02:27:03 +00:00
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end
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end two_quotient
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2015-11-22 06:37:13 +00:00
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attribute two_quotient.incl0 [constructor]
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attribute two_quotient.rec two_quotient.elim [unfold 8] [recursor 8]
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2015-07-07 23:37:06 +00:00
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--attribute two_quotient.elim_type [unfold 9]
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2015-11-22 06:37:13 +00:00
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attribute two_quotient.rec_on two_quotient.elim_on [unfold 5]
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2015-07-07 23:37:06 +00:00
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--attribute two_quotient.elim_type_on [unfold 6]
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2016-04-22 19:12:25 +00:00
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open two_quotient is_trunc trunc
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namespace trunc_two_quotient
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section
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parameters (n : ℕ₋₂) {A : Type}
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(R : A → A → Type)
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local abbreviation T := e_closure R -- the (type-valued) equivalence closure of R
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parameter (Q : Π⦃a a'⦄, T a a' → T a a' → Type)
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variables ⦃a a' a'' : A⦄ {s : R a a'} {t t' : T a a'}
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definition trunc_two_quotient := trunc n (two_quotient R Q)
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parameters {n R Q}
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definition incl0 (a : A) : trunc_two_quotient := tr (!incl0 a)
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definition incl1 (s : R a a') : incl0 a = incl0 a' := ap tr (!incl1 s)
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definition incltw (t : T a a') : incl0 a = incl0 a' := ap tr (!inclt t)
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definition inclt (t : T a a') : incl0 a = incl0 a' := e_closure.elim incl1 t
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definition incl2w (q : Q t t') : incltw t = incltw t' :=
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ap02 tr (!incl2 q)
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definition incl2 (q : Q t t') : inclt t = inclt t' :=
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!ap_e_closure_elim⁻¹ ⬝ ap02 tr (!incl2 q) ⬝ !ap_e_closure_elim
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local attribute trunc_two_quotient incl0 [reducible]
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definition is_trunc_trunc_two_quotient [instance] : is_trunc n trunc_two_quotient := _
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protected definition rec {P : trunc_two_quotient → Type} [H : Πx, is_trunc n (P x)]
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(P0 : Π(a : A), P (incl0 a))
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(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a =[incl1 s] P0 a')
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(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'),
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change_path (incl2 q) (e_closure.elimo incl1 P1 t) = e_closure.elimo incl1 P1 t')
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(x : trunc_two_quotient) : P x :=
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begin
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induction x,
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induction a,
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{ exact P0 a},
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{ exact !pathover_of_pathover_ap (P1 s)},
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{ exact abstract [irreducible]
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by rewrite [+ e_closure_elimo_ap, ↓incl1, -P2 q, change_path_pathover_of_pathover_ap,
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- + change_path_con, ↑incl2, con_inv_cancel_right] end}
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end
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protected definition rec_on [reducible] {P : trunc_two_quotient → Type} [H : Πx, is_trunc n (P x)]
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(x : trunc_two_quotient)
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(P0 : Π(a : A), P (incl0 a))
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(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a =[incl1 s] P0 a')
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(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'),
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change_path (incl2 q) (e_closure.elimo incl1 P1 t) = e_closure.elimo incl1 P1 t') : P x :=
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rec P0 P1 P2 x
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theorem rec_incl1 {P : trunc_two_quotient → Type} [H : Πx, is_trunc n (P x)]
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(P0 : Π(a : A), P (incl0 a))
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(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a =[incl1 s] P0 a')
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(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'),
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change_path (incl2 q) (e_closure.elimo incl1 P1 t) = e_closure.elimo incl1 P1 t')
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⦃a a' : A⦄ (s : R a a') : apd (rec P0 P1 P2) (incl1 s) = P1 s :=
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!apd_ap ⬝ ap !pathover_ap !rec_incl1 ⬝ to_right_inv !pathover_compose (P1 s)
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theorem rec_inclt {P : trunc_two_quotient → Type} [H : Πx, is_trunc n (P x)]
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(P0 : Π(a : A), P (incl0 a))
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(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a =[incl1 s] P0 a')
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(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'),
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change_path (incl2 q) (e_closure.elimo incl1 P1 t) = e_closure.elimo incl1 P1 t')
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⦃a a' : A⦄ (t : T a a') : apd (rec P0 P1 P2) (inclt t) = e_closure.elimo incl1 P1 t :=
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ap_e_closure_elimo_h incl1 P1 (rec_incl1 P0 P1 P2) t
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protected definition elim {P : Type} (P0 : A → P) [H : is_trunc n P]
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(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a')
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(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'), e_closure.elim P1 t = e_closure.elim P1 t')
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(x : trunc_two_quotient) : P :=
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begin
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induction x,
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induction a,
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{ exact P0 a},
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{ exact P1 s},
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{ exact P2 q},
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end
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local attribute elim [unfold 10]
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protected definition elim_on {P : Type} [H : is_trunc n P] (x : trunc_two_quotient) (P0 : A → P)
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(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a')
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(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'), e_closure.elim P1 t = e_closure.elim P1 t')
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: P :=
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elim P0 P1 P2 x
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definition elim_incl1 {P : Type} [H : is_trunc n P] {P0 : A → P}
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{P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a'}
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(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'), e_closure.elim P1 t = e_closure.elim P1 t')
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⦃a a' : A⦄ (s : R a a') : ap (elim P0 P1 P2) (incl1 s) = P1 s :=
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!ap_compose⁻¹ ⬝ !elim_incl1
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definition elim_inclt {P : Type} [H : is_trunc n P] {P0 : A → P}
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{P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a'}
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(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'), e_closure.elim P1 t = e_closure.elim P1 t')
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⦃a a' : A⦄ (t : T a a') : ap (elim P0 P1 P2) (inclt t) = e_closure.elim P1 t :=
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ap_e_closure_elim_h incl1 (elim_incl1 P2) t
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open function
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theorem elim_incl2 {P : Type} [H : is_trunc n P] (P0 : A → P)
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(P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a')
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(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'), e_closure.elim P1 t = e_closure.elim P1 t')
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⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t')
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: square (ap02 (elim P0 P1 P2) (incl2 q)) (P2 q) (elim_inclt P2 t) (elim_inclt P2 t') :=
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begin
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note Ht' := ap_ap_e_closure_elim tr (elim P0 P1 P2) (two_quotient.incl1 R Q) t',
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note Ht := ap_ap_e_closure_elim tr (elim P0 P1 P2) (two_quotient.incl1 R Q) t,
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note Hn := natural_square (ap_compose (elim P0 P1 P2) tr) (two_quotient.incl2 R Q q),
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note H7 := eq_top_of_square (Ht⁻¹ʰ ⬝h Hn⁻¹ᵛ ⬝h Ht'), clear [Hn, Ht, Ht'],
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unfold [ap02,incl2], rewrite [+ap_con,ap_inv,-ap_compose (ap _)],
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xrewrite [H7, ↑function.compose, eq_top_of_square (elim_incl2 P0 P1 P2 q)], clear [H7],
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have H : Π(t : T a a'),
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ap_e_closure_elim (elim P0 P1 P2) (λa a' (r : R a a'), ap tr (two_quotient.incl1 R Q r)) t ⬝
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(ap_e_closure_elim_h (two_quotient.incl1 R Q)
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(λa a' (s : R a a'), ap_compose (elim P0 P1 P2) tr (two_quotient.incl1 R Q s)) t)⁻¹ ⬝
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two_quotient.elim_inclt P2 t = elim_inclt P2 t, from
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ap_e_closure_elim_h_zigzag (elim P0 P1 P2)
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(two_quotient.incl1 R Q)
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(two_quotient.elim_incl1 P2),
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rewrite [con.assoc5, con.assoc5, H t, -inv_con_inv_right, -con_inv], xrewrite [H t'],
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apply top_deg_square
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end
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definition elim_inclt_rel [unfold_full] {P : Type} [is_trunc n P] {P0 : A → P}
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{P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a'}
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(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'), e_closure.elim P1 t = e_closure.elim P1 t')
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⦃a a' : A⦄ (r : R a a') : elim_inclt P2 [r] = elim_incl1 P2 r :=
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idp
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definition elim_inclt_inv [unfold_full] {P : Type} [is_trunc n P] {P0 : A → P}
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{P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a'}
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(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'), e_closure.elim P1 t = e_closure.elim P1 t')
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⦃a a' : A⦄ (t : T a a')
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: elim_inclt P2 t⁻¹ʳ = ap_inv (elim P0 P1 P2) (inclt t) ⬝ (elim_inclt P2 t)⁻² :=
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idp
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definition elim_inclt_con [unfold_full] {P : Type} [is_trunc n P] {P0 : A → P}
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{P1 : Π⦃a a' : A⦄ (s : R a a'), P0 a = P0 a'}
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(P2 : Π⦃a a' : A⦄ ⦃t t' : T a a'⦄ (q : Q t t'), e_closure.elim P1 t = e_closure.elim P1 t')
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⦃a a' a'' : A⦄ (t : T a a') (t': T a' a'')
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: elim_inclt P2 (t ⬝r t') =
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ap_con (elim P0 P1 P2) (inclt t) (inclt t') ⬝ (elim_inclt P2 t ◾ elim_inclt P2 t') :=
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idp
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definition inclt_rel [unfold_full] (r : R a a') : inclt [r] = incl1 r := idp
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definition inclt_inv [unfold_full] (t : T a a') : inclt t⁻¹ʳ = (inclt t)⁻¹ := idp
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definition inclt_con [unfold_full] (t : T a a') (t' : T a' a'')
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: inclt (t ⬝r t') = inclt t ⬝ inclt t' := idp
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end
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end trunc_two_quotient
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attribute trunc_two_quotient.incl0 [constructor]
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attribute trunc_two_quotient.rec trunc_two_quotient.elim [unfold 10] [recursor 10]
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attribute trunc_two_quotient.rec_on trunc_two_quotient.elim_on [unfold 7]
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