equality and isomorphisms of quotient groups
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Egbert Rijke
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c67fd11633
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1 changed files with 26 additions and 5 deletions
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@ -314,14 +314,14 @@ namespace group
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reflexivity
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end
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definition subgroup_rel_eq {K L : subgroup_rel A} (forth : Π (a : A), K a → L a) (opforth : Π (a : A), L a → K a) : K = L :=
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definition subgroup_rel_eq {K L : subgroup_rel A} (K_in_L : Π (a : A), K a → L a) (L_in_K : Π (a : A), L a → K a) : K = L :=
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begin
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have htpy : Π (a : A), K a ≃ L a,
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begin
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intro a,
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fapply equiv_of_is_prop,
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fapply forth a,
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fapply opforth a,
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fapply K_in_L a,
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fapply L_in_K a,
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end,
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exact subgroup_rel_eq' htpy,
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end
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@ -331,8 +331,29 @@ namespace group
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induction p, reflexivity
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end
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definition eq_of_ab_qg_group {K L : subgroup_rel A} (forth : Π (a : A), K a → L a) (opforth : Π (a : A), L a → K a) : quotient_ab_group K = quotient_ab_group L :=
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eq_of_ab_qg_group' (subgroup_rel_eq forth opforth)
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definition iso_of_eq {B : AbGroup} (p : A = B) : A ≃g B :=
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begin
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induction p, fapply isomorphism.mk, exact gid A, fapply adjointify, exact id, intro a, reflexivity, intro a, reflexivity
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end
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definition iso_of_ab_qg_group' {K L : subgroup_rel A} (p : K = L) : quotient_ab_group K ≃g quotient_ab_group L :=
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iso_of_eq (eq_of_ab_qg_group' p)
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definition htpy_of_ab_qg_map' {K L : subgroup_rel A} (p : K = L) : (iso_of_ab_qg_group' p) ∘g ab_qg_map K ~ ab_qg_map L :=
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begin
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induction p, reflexivity
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end
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definition eq_of_ab_qg_group {K L : subgroup_rel A} (K_in_L : Π (a : A), K a → L a) (L_in_K : Π (a : A), L a → K a) : quotient_ab_group K = quotient_ab_group L :=
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eq_of_ab_qg_group' (subgroup_rel_eq K_in_L L_in_K)
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definition iso_of_ab_qg_group {K L : subgroup_rel A} (K_in_L : Π (a : A), K a → L a) (L_in_K : Π (a : A), L a → K a) : quotient_ab_group K ≃g quotient_ab_group L :=
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iso_of_eq (eq_of_ab_qg_group K_in_L L_in_K)
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definition eq_of_ab_qg_group_triangle {K L : subgroup_rel A} (K_in_L : Π (a : A), K a → L a) (L_in_K : Π (a : A), L a → K a) : iso_of_ab_qg_group K_in_L L_in_K ∘g ab_qg_map K ~ ab_qg_map L :=
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begin
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end
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end quotient_group_iso_ua
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