298 lines
10 KiB
Text
298 lines
10 KiB
Text
/-
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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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Declaration of the circle
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-/
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import .sphere
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import types.bool types.int.hott types.equiv
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import algebra.homotopy_group algebra.hott
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open eq susp bool sphere_index is_equiv equiv equiv.ops is_trunc pi algebra
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definition circle : Type₀ := sphere 1
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namespace circle
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notation `S¹` := circle
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definition base1 : circle := !north
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definition base2 : circle := !south
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definition seg1 : base1 = base2 := merid !north
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definition seg2 : base1 = base2 := merid !south
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definition base : circle := base1
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definition loop : base = base := seg2 ⬝ seg1⁻¹
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definition rec2 {P : circle → Type} (Pb1 : P base1) (Pb2 : P base2)
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(Ps1 : Pb1 =[seg1] Pb2) (Ps2 : Pb1 =[seg2] Pb2) (x : circle) : P x :=
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begin
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induction x with b,
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{ exact Pb1},
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{ exact Pb2},
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{ esimp at *, induction b with y,
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{ exact Ps1},
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{ exact Ps2},
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{ cases y}},
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end
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definition rec2_on [reducible] {P : circle → Type} (x : circle) (Pb1 : P base1) (Pb2 : P base2)
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(Ps1 : Pb1 =[seg1] Pb2) (Ps2 : Pb1 =[seg2] Pb2) : P x :=
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circle.rec2 Pb1 Pb2 Ps1 Ps2 x
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theorem rec2_seg1 {P : circle → Type} (Pb1 : P base1) (Pb2 : P base2)
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(Ps1 : Pb1 =[seg1] Pb2) (Ps2 : Pb1 =[seg2] Pb2)
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: apdo (rec2 Pb1 Pb2 Ps1 Ps2) seg1 = Ps1 :=
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!rec_merid
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theorem rec2_seg2 {P : circle → Type} (Pb1 : P base1) (Pb2 : P base2)
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(Ps1 : Pb1 =[seg1] Pb2) (Ps2 : Pb1 =[seg2] Pb2)
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: apdo (rec2 Pb1 Pb2 Ps1 Ps2) seg2 = Ps2 :=
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!rec_merid
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definition elim2 {P : Type} (Pb1 Pb2 : P) (Ps1 Ps2 : Pb1 = Pb2) (x : circle) : P :=
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rec2 Pb1 Pb2 (pathover_of_eq Ps1) (pathover_of_eq Ps2) x
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definition elim2_on [reducible] {P : Type} (x : circle) (Pb1 Pb2 : P)
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(Ps1 : Pb1 = Pb2) (Ps2 : Pb1 = Pb2) : P :=
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elim2 Pb1 Pb2 Ps1 Ps2 x
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theorem elim2_seg1 {P : Type} (Pb1 Pb2 : P) (Ps1 : Pb1 = Pb2) (Ps2 : Pb1 = Pb2)
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: ap (elim2 Pb1 Pb2 Ps1 Ps2) seg1 = Ps1 :=
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begin
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apply eq_of_fn_eq_fn_inv !(pathover_constant seg1),
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rewrite [▸*,-apdo_eq_pathover_of_eq_ap,↑elim2,rec2_seg1],
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end
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theorem elim2_seg2 {P : Type} (Pb1 Pb2 : P) (Ps1 : Pb1 = Pb2) (Ps2 : Pb1 = Pb2)
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: ap (elim2 Pb1 Pb2 Ps1 Ps2) seg2 = Ps2 :=
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begin
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apply eq_of_fn_eq_fn_inv !(pathover_constant seg2),
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rewrite [▸*,-apdo_eq_pathover_of_eq_ap,↑elim2,rec2_seg2],
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end
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definition elim2_type (Pb1 Pb2 : Type) (Ps1 Ps2 : Pb1 ≃ Pb2) (x : circle) : Type :=
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elim2 Pb1 Pb2 (ua Ps1) (ua Ps2) x
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definition elim2_type_on [reducible] (x : circle) (Pb1 Pb2 : Type) (Ps1 Ps2 : Pb1 ≃ Pb2)
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: Type :=
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elim2_type Pb1 Pb2 Ps1 Ps2 x
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theorem elim2_type_seg1 (Pb1 Pb2 : Type) (Ps1 Ps2 : Pb1 ≃ Pb2)
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: transport (elim2_type Pb1 Pb2 Ps1 Ps2) seg1 = Ps1 :=
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by rewrite [tr_eq_cast_ap_fn,↑elim2_type,elim2_seg1];apply cast_ua_fn
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theorem elim2_type_seg2 (Pb1 Pb2 : Type) (Ps1 Ps2 : Pb1 ≃ Pb2)
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: transport (elim2_type Pb1 Pb2 Ps1 Ps2) seg2 = Ps2 :=
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by rewrite [tr_eq_cast_ap_fn,↑elim2_type,elim2_seg2];apply cast_ua_fn
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protected definition rec {P : circle → Type} (Pbase : P base) (Ploop : Pbase =[loop] Pbase)
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(x : circle) : P x :=
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begin
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fapply (rec2_on x),
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{ exact Pbase},
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{ exact (transport P seg1 Pbase)},
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{ apply pathover_tr},
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{ apply pathover_tr_of_pathover, exact Ploop}
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end
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protected definition rec_on [reducible] {P : circle → Type} (x : circle) (Pbase : P base)
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(Ploop : Pbase =[loop] Pbase) : P x :=
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circle.rec Pbase Ploop x
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theorem rec_loop_helper {A : Type} (P : A → Type)
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{x y z : A} {p : x = y} {p' : z = y} {u : P x} {v : P z} (q : u =[p ⬝ p'⁻¹] v) :
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pathover_tr_of_pathover q ⬝o !pathover_tr⁻¹ᵒ = q :=
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by cases p'; cases q; exact idp
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definition con_refl {A : Type} {x y : A} (p : x = y) : p ⬝ refl _ = p :=
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eq.rec_on p idp
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theorem rec_loop {P : circle → Type} (Pbase : P base) (Ploop : Pbase =[loop] Pbase) :
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apdo (circle.rec Pbase Ploop) loop = Ploop :=
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begin
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rewrite [↑loop,apdo_con,↑circle.rec,↑circle.rec2_on,↑base,rec2_seg2,apdo_inv,rec2_seg1],
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apply rec_loop_helper
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end
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protected definition elim {P : Type} (Pbase : P) (Ploop : Pbase = Pbase)
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(x : circle) : P :=
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circle.rec Pbase (pathover_of_eq Ploop) x
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protected definition elim_on [reducible] {P : Type} (x : circle) (Pbase : P)
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(Ploop : Pbase = Pbase) : P :=
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circle.elim Pbase Ploop x
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theorem elim_loop {P : Type} (Pbase : P) (Ploop : Pbase = Pbase) :
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ap (circle.elim Pbase Ploop) loop = Ploop :=
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begin
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apply eq_of_fn_eq_fn_inv !(pathover_constant loop),
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rewrite [▸*,-apdo_eq_pathover_of_eq_ap,↑circle.elim,rec_loop],
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end
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protected definition elim_type (Pbase : Type) (Ploop : Pbase ≃ Pbase)
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(x : circle) : Type :=
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circle.elim Pbase (ua Ploop) x
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protected definition elim_type_on [reducible] (x : circle) (Pbase : Type)
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(Ploop : Pbase ≃ Pbase) : Type :=
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circle.elim_type Pbase Ploop x
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theorem elim_type_loop (Pbase : Type) (Ploop : Pbase ≃ Pbase) :
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transport (circle.elim_type Pbase Ploop) loop = Ploop :=
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by rewrite [tr_eq_cast_ap_fn,↑circle.elim_type,circle.elim_loop];apply cast_ua_fn
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theorem elim_type_loop_inv (Pbase : Type) (Ploop : Pbase ≃ Pbase) :
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transport (circle.elim_type Pbase Ploop) loop⁻¹ = to_inv Ploop :=
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by rewrite [tr_inv_fn]; apply inv_eq_inv; apply elim_type_loop
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end circle
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attribute circle.base1 circle.base2 circle.base [constructor]
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attribute circle.rec2 circle.elim2 [unfold 6] [recursor 6]
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attribute circle.elim2_type [unfold 5]
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attribute circle.rec2_on circle.elim2_on [unfold 2]
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attribute circle.elim2_type [unfold 1]
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attribute circle.rec circle.elim [unfold 4] [recursor 4]
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attribute circle.elim_type [unfold 3]
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attribute circle.rec_on circle.elim_on [unfold 2]
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attribute circle.elim_type_on [unfold 1]
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namespace circle
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definition pointed_circle [instance] [constructor] : pointed circle :=
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pointed.mk base
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definition Circle [constructor] : Type* := pointed.mk' circle
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notation `S¹.` := Circle
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definition loop_neq_idp : loop ≠ idp :=
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assume H : loop = idp,
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have H2 : Π{A : Type₁} {a : A} {p : a = a}, p = idp,
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from λA a p, calc
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p = ap (circle.elim a p) loop : elim_loop
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... = ap (circle.elim a p) (refl base) : by rewrite H,
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eq_bnot_ne_idp H2
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definition nonidp (x : circle) : x = x :=
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begin
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induction x,
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{ exact loop},
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{ apply concato_eq, apply pathover_eq_lr, rewrite [con.left_inv,idp_con]}
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end
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definition nonidp_neq_idp : nonidp ≠ (λx, idp) :=
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assume H : nonidp = λx, idp,
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have H2 : loop = idp, from apd10 H base,
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absurd H2 loop_neq_idp
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open int
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protected definition code [unfold 1] (x : circle) : Type₀ :=
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circle.elim_type_on x ℤ equiv_succ
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definition transport_code_loop (a : ℤ) : transport circle.code loop a = succ a :=
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ap10 !elim_type_loop a
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definition transport_code_loop_inv (a : ℤ) : transport circle.code loop⁻¹ a = pred a :=
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ap10 !elim_type_loop_inv a
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protected definition encode [unfold 2] {x : circle} (p : base = x) : circle.code x :=
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transport circle.code p (of_num 0)
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protected definition decode [unfold 1] {x : circle} : circle.code x → base = x :=
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begin
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induction x,
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{ exact power loop},
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{ apply arrow_pathover_left, intro b, apply concato_eq, apply pathover_eq_r,
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rewrite [power_con,transport_code_loop]}
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end
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definition circle_eq_equiv [constructor] (x : circle) : (base = x) ≃ circle.code x :=
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begin
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fapply equiv.MK,
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{ exact circle.encode},
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{ exact circle.decode},
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{ exact abstract [irreducible] begin
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induction x,
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{ intro a, esimp, apply rec_nat_on a,
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{ exact idp},
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{ intros n p, rewrite [↑circle.encode, -power_con, con_tr, transport_code_loop],
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exact ap succ p},
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{ intros n p, rewrite [↑circle.encode, nat_succ_eq_int_succ, neg_succ, -power_con_inv,
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@con_tr _ circle.code, transport_code_loop_inv, ↑[circle.encode] at p, p, -neg_succ] }},
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{ apply pathover_of_tr_eq, apply eq_of_homotopy, intro a, apply @is_set.elim,
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esimp, exact _} end end},
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{ intro p, cases p, exact idp},
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end
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definition base_eq_base_equiv [constructor] : base = base ≃ ℤ :=
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circle_eq_equiv base
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definition decode_add (a b : ℤ) : circle.decode a ⬝ circle.decode b = circle.decode (a +[ℤ] b) :=
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!power_con_power
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definition encode_con (p q : base = base)
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: circle.encode (p ⬝ q) = circle.encode p +[ℤ] circle.encode q :=
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preserve_binary_of_inv_preserve base_eq_base_equiv concat (@add ℤ _) decode_add p q
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--the carrier of π₁(S¹) is the set-truncation of base = base.
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open algebra trunc equiv.ops
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definition fg_carrier_equiv_int : π[1](S¹.) ≃ ℤ :=
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trunc_equiv_trunc 0 base_eq_base_equiv ⬝e @(trunc_equiv ℤ _) proof _ qed
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definition con_comm_base (p q : base = base) : p ⬝ q = q ⬝ p :=
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eq_of_fn_eq_fn base_eq_base_equiv (by esimp;rewrite [+encode_con,add.comm])
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definition fundamental_group_of_circle : π₁(S¹.) = group_integers :=
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begin
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apply (Group_eq fg_carrier_equiv_int),
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intros g h,
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induction g with g', induction h with h',
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apply encode_con,
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end
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open nat
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definition homotopy_group_of_circle (n : ℕ) : πG[n+1 +1] S¹. = G0 :=
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begin
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refine @trivial_homotopy_of_is_set_loop_space S¹. 1 n _,
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apply is_trunc_equiv_closed_rev, apply base_eq_base_equiv
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end
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definition eq_equiv_Z (x : S¹) : x = x ≃ ℤ :=
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begin
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induction x,
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{ apply base_eq_base_equiv},
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{ apply equiv_pathover, intro p p' q, apply pathover_of_eq,
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note H := eq_of_square (square_of_pathover q),
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rewrite con_comm_base at H,
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note H' := cancel_left _ H,
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induction H', reflexivity}
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end
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definition circle_mul [reducible] (x y : S¹) : S¹ :=
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begin
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induction x,
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{ induction y,
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{ exact base },
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{ exact loop } },
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{ induction y,
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{ exact loop },
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{ apply eq_pathover, rewrite elim_loop,
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apply square_of_eq, reflexivity } }
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end
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definition circle_mul_base (x : S¹) : circle_mul x base = x :=
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begin
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induction x,
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{ reflexivity },
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{ apply eq_pathover, krewrite [elim_loop,ap_id], apply hrefl }
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end
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definition circle_base_mul (x : S¹) : circle_mul base x = x :=
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begin
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induction x,
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{ reflexivity },
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{ apply eq_pathover, krewrite [elim_loop,ap_id], apply hrefl }
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end
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end circle
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