lean2/hott/algebra/e_closure.hlean
2015-09-11 23:35:21 -07:00

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/-
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
The "equivalence closure" of a type-valued relation.
Given a binary type-valued relation (fibration), we add reflexivity, symmetry and transitivity terms
-/
import .relation eq2 arity
open eq
inductive e_closure {A : Type} (R : A → A → Type) : A → A → Type :=
| of_rel : Π{a a'} (r : R a a'), e_closure R a a'
| refl : Πa, e_closure R a a
| symm : Π{a a'} (r : e_closure R a a'), e_closure R a' a
| trans : Π{a a' a''} (r : e_closure R a a') (r' : e_closure R a' a''), e_closure R a a''
namespace e_closure
infix `⬝r`:75 := e_closure.trans
postfix `⁻¹ʳ`:(max+10) := e_closure.symm
notation `[`:max a `]`:0 := e_closure.of_rel a
abbreviation rfl {A : Type} {R : A → A → Type} {a : A} := refl R a
end e_closure
namespace relation
section
parameters {A : Type}
(R : A → A → Type)
local abbreviation T := e_closure R
variables ⦃a a' a'' : A⦄ {s : R a a'} {r : T a a} {B C : Type}
parameter {R}
protected definition e_closure.elim [unfold 8] {f : A → B}
(e : Π⦃a a' : A⦄, R a a' → f a = f a') (t : T a a') : f a = f a' :=
begin
induction t,
exact e r,
reflexivity,
exact v_0⁻¹,
exact v_0 ⬝ v_1
end
definition ap_e_closure_elim_h [unfold 12] {B C : Type} {f : A → B} {g : B → C}
(e : Π⦃a a' : A⦄, R a a' → f a = f a')
{e' : Π⦃a a' : A⦄, R a a' → g (f a) = g (f a')}
(p : Π⦃a a' : A⦄ (s : R a a'), ap g (e s) = e' s) (t : T a a')
: ap g (e_closure.elim e t) = e_closure.elim e' t :=
begin
induction t,
apply p,
reflexivity,
exact ap_inv g (e_closure.elim e r) ⬝ inverse2 v_0,
exact ap_con g (e_closure.elim e r) (e_closure.elim e r') ⬝ (v_0 ◾ v_1)
end
definition ap_e_closure_elim {B C : Type} {f : A → B} (g : B → C)
(e : Π⦃a a' : A⦄, R a a' → f a = f a') (t : T a a')
: ap g (e_closure.elim e t) = e_closure.elim (λa a' r, ap g (e r)) t :=
ap_e_closure_elim_h e (λa a' s, idp) t
definition ap_e_closure_elim_h_eq {B C : Type} {f : A → B} {g : B → C}
(e : Π⦃a a' : A⦄, R a a' → f a = f a')
{e' : Π⦃a a' : A⦄, R a a' → g (f a) = g (f a')}
(p : Π⦃a a' : A⦄ (s : R a a'), ap g (e s) = e' s) (t : T a a')
: ap_e_closure_elim_h e p t =
ap_e_closure_elim g e t ⬝ ap (λx, e_closure.elim x t) (eq_of_homotopy3 p) :=
begin
fapply homotopy3.rec_on p,
intro q, esimp at q, induction q,
esimp, rewrite eq_of_homotopy3_id
end
theorem ap_ap_e_closure_elim_h {B C D : Type} {f : A → B}
{g : B → C} (h : C → D)
(e : Π⦃a a' : A⦄, R a a' → f a = f a')
{e' : Π⦃a a' : A⦄, R a a' → g (f a) = g (f a')}
(p : Π⦃a a' : A⦄ (s : R a a'), ap g (e s) = e' s) (t : T a a')
: square (ap (ap h) (ap_e_closure_elim_h e p t))
(ap_e_closure_elim_h e (λa a' s, ap_compose h g (e s)) t)
(ap_compose h g (e_closure.elim e t))⁻¹
(ap_e_closure_elim_h e' (λa a' s, (ap (ap h) (p s))⁻¹) t) :=
begin
induction t,
{ esimp,
apply square_of_eq, exact !con.right_inv ⬝ !con.left_inv⁻¹},
{ apply ids},
{ rewrite [▸*,ap_con (ap h)],
refine (transpose !ap_compose_inv)⁻¹ᵛ ⬝h _,
rewrite [con_inv,inv_inv,-inv2_inv],
exact !ap_inv2 ⬝v square_inv2 v_0},
{ rewrite [▸*,ap_con (ap h)],
refine (transpose !ap_compose_con)⁻¹ᵛ ⬝h _,
rewrite [con_inv,inv_inv,con2_inv],
refine !ap_con2 ⬝v square_con2 v_0 v_1},
end
theorem ap_ap_e_closure_elim {B C D : Type} {f : A → B}
(g : B → C) (h : C → D)
(e : Π⦃a a' : A⦄, R a a' → f a = f a') (t : T a a')
: square (ap (ap h) (ap_e_closure_elim g e t))
(ap_e_closure_elim_h e (λa a' s, ap_compose h g (e s)) t)
(ap_compose h g (e_closure.elim e t))⁻¹
(ap_e_closure_elim h (λa a' r, ap g (e r)) t) :=
!ap_ap_e_closure_elim_h
open e_closure
definition is_equivalence_e_closure : is_equivalence T :=
begin
constructor,
intro a, exact rfl,
intro a a' t, exact t⁻¹ʳ,
intro a a' a'' t t', exact t ⬝r t',
end
definition e_closure.transport_left {f : A → B} (e : Π⦃a a' : A⦄, R a a' → f a = f a')
(t : e_closure R a a') (p : a = a'')
: e_closure.elim e (p ▸ t) = (ap f p)⁻¹ ⬝ e_closure.elim e t :=
by induction p; exact !idp_con⁻¹
definition e_closure.transport_right {f : A → B} (e : Π⦃a a' : A⦄, R a a' → f a = f a')
(t : e_closure R a a') (p : a' = a'')
: e_closure.elim e (p ▸ t) = e_closure.elim e t ⬝ (ap f p) :=
by induction p; reflexivity
definition e_closure.transport_lr {f : A → B} (e : Π⦃a a' : A⦄, R a a' → f a = f a')
(t : e_closure R a a) (p : a = a')
: e_closure.elim e (p ▸ t) = (ap f p)⁻¹ ⬝ e_closure.elim e t ⬝ (ap f p) :=
by induction p; esimp; exact !idp_con⁻¹
--dependent elimination:
variables {P : B → Type} {Q : C → Type} {f : A → B} {g : B → C} {f' : Π(a : A), P (f a)}
protected definition e_closure.elimo [unfold 6]
(p : Π⦃a a' : A⦄, R a a' → f a = f a')
(po : Π⦃a a' : A⦄ (s : R a a'), f' a =[p s] f' a')
(t : T a a') : f' a =[e_closure.elim p t] f' a' :=
begin
induction t,
exact po r,
constructor,
exact v_0⁻¹ᵒ,
exact v_0 ⬝o v_1
end
definition ap_e_closure_elimo_h [unfold 12] {g' : Πb, Q (g b)}
(p : Π⦃a a' : A⦄, R a a' → f a = f a')
--(po : Π⦃a a' : A⦄ (s : R a a'), f' a =[p s] f' a')
(po : Π⦃a a' : A⦄ (s : R a a'), g' (f a) =[p s] g' (f a'))
(q : Π⦃a a' : A⦄ (s : R a a'), apdo g' (p s) = po s)
(t : T a a') : apdo g' (e_closure.elim p t) = e_closure.elimo p po t :=
begin
induction t,
apply q,
reflexivity,
esimp [e_closure.elim],
exact apdo_inv g' (e_closure.elim p r) ⬝ v_0⁻²ᵒ,
exact apdo_con g' (e_closure.elim p r) (e_closure.elim p r') ⬝ (v_0 ◾o v_1)
end
end
end relation