Spectral/algebra/direct_sum.hlean

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

Constructions with groups
-/

import .quotient_group .free_commutative_group

open eq algebra is_trunc set_quotient relation sigma prod sum list trunc function equiv sigma.ops

namespace group

  variables {G G' : Group} (H : subgroup_rel G) (N : normal_subgroup_rel G) {g g' h h' k : G}
            {A B : AbGroup}

  variables (X : Set) {l l' : list (X ⊎ X)}

  section

    parameters {I : Set} (Y : I → AbGroup)
    variables {A' : AbGroup}

    definition dirsum_carrier : AbGroup := free_ab_group (trunctype.mk (Σi, Y i) _)
    local abbreviation ι [constructor] := @free_ab_group_inclusion
    inductive dirsum_rel : dirsum_carrier → Type :=
    | rmk : Πi y₁ y₂, dirsum_rel (ι ⟨i, y₁⟩ * ι ⟨i, y₂⟩ * (ι ⟨i, y₁ * y₂⟩)⁻¹)

    definition dirsum : AbGroup := quotient_ab_group_gen dirsum_carrier (λg, ∥dirsum_rel g∥)

    -- definition dirsum_carrier_incl [constructor] (i : I) : Y i →g dirsum_carrier :=

    definition dirsum_incl [constructor] (i : I) : Y i →g dirsum :=
    homomorphism.mk (λy, class_of (ι ⟨i, y⟩))
      begin intro g h, symmetry, apply gqg_eq_of_rel, apply tr, apply dirsum_rel.rmk end

    definition dirsum_elim_resp_quotient (f : Πi, Y i →g A') (g : dirsum_carrier)
      (r : ∥dirsum_rel g∥) : free_ab_group_elim (λv, f v.1 v.2) g = 1 :=
    begin
      induction r with r, induction r,
      rewrite [to_respect_mul, to_respect_inv], apply mul_inv_eq_of_eq_mul,
      rewrite [one_mul, to_respect_mul, ▸*, ↑foldl, +one_mul, to_respect_mul]
    end

    definition dirsum_elim [constructor] (f : Πi, Y i →g A') : dirsum →g A' :=
    gqg_elim _ (free_ab_group_elim (λv, f v.1 v.2)) (dirsum_elim_resp_quotient f)

    definition dirsum_elim_compute (f : Πi, Y i →g A') (i : I) :
      dirsum_elim f ∘g dirsum_incl i ~ f i :=
    begin
      intro g, apply one_mul
    end

    definition dirsum_elim_unique (f : Πi, Y i →g A') (k : dirsum →g A')
      (H : Πi, k ∘g dirsum_incl i ~ f i) : k ~ dirsum_elim f :=
    begin
      apply gqg_elim_unique,
      apply free_ab_group_elim_unique,
      intro x, induction x with i y, exact H i y
    end


  end

end group
-												split group_constructions into several files

											
										
										
											2016-10-13 19:04:57 +00:00
+								/-
 								Copyright (c) 2015 Floris van Doorn. All rights reserved.
 								Released under Apache 2.0 license as described in the file LICENSE.
 								Authors: Floris van Doorn, Egbert Rijke
 								Constructions with groups
 								-/
-												clean-up in imports/opens of the files in the algebra folder

											
										
										
											2016-10-13 20:01:17 +00:00
+								import .quotient_group .free_commutative_group
-												some additions to the smash product and direct sums

											
										
										
											2016-11-14 19:44:29 +00:00
+								open eq algebra is_trunc set_quotient relation sigma prod sum list trunc function equiv sigma.ops
-												split group_constructions into several files

											
										
										
											2016-10-13 19:04:57 +00:00
 								namespace group
 								  variables {G G' : Group} (H : subgroup_rel G) (N : normal_subgroup_rel G) {g g' h h' k : G}
-												move things to the Lean library, and update after changes in the Lean library

											
										
										
											2016-11-24 04:54:57 +00:00
+								            {A B : AbGroup}
-												split group_constructions into several files

											
										
										
											2016-10-13 19:04:57 +00:00
 								  variables (X : Set) {l l' : list (X ⊎ X)}
 								  section
-												move things to the Lean library, and update after changes in the Lean library

											
										
										
											2016-11-24 04:54:57 +00:00
+								    parameters {I : Set} (Y : I → AbGroup)
 								    variables {A' : AbGroup}
-												split group_constructions into several files

											
										
										
											2016-10-13 19:04:57 +00:00
-												move things to the Lean library, and update after changes in the Lean library

											
										
										
											2016-11-24 04:54:57 +00:00
+								    definition dirsum_carrier : AbGroup := free_ab_group (trunctype.mk (Σi, Y i) _)
 								    local abbreviation ι [constructor] := @free_ab_group_inclusion
-												split group_constructions into several files

											
										
										
											2016-10-13 19:04:57 +00:00
+								    inductive dirsum_rel : dirsum_carrier → Type :=
 								    | rmk : Πi y₁ y₂, dirsum_rel (ι ⟨i, y₁⟩ * ι ⟨i, y₂⟩ * (ι ⟨i, y₁ * y₂⟩)⁻¹)
-												move things to the Lean library, and update after changes in the Lean library

											
										
										
											2016-11-24 04:54:57 +00:00
+								    definition dirsum : AbGroup := quotient_ab_group_gen dirsum_carrier (λg, ∥dirsum_rel g∥)
-												some additions to the smash product and direct sums

											
										
										
											2016-11-14 19:44:29 +00:00
 								    -- definition dirsum_carrier_incl [constructor] (i : I) : Y i →g dirsum_carrier :=
 								    definition dirsum_incl [constructor] (i : I) : Y i →g dirsum :=
 								    homomorphism.mk (λy, class_of (ι ⟨i, y⟩))
 								      begin intro g h, symmetry, apply gqg_eq_of_rel, apply tr, apply dirsum_rel.rmk end
-												Finish the universal property of the direct sum

											
										
										
											2016-11-18 20:20:22 +00:00
+								    definition dirsum_elim_resp_quotient (f : Πi, Y i →g A') (g : dirsum_carrier)
-												move things to the Lean library, and update after changes in the Lean library

											
										
										
											2016-11-24 04:54:57 +00:00
+								      (r : ∥dirsum_rel g∥) : free_ab_group_elim (λv, f v.1 v.2) g = 1 :=
-												some additions to the smash product and direct sums

											
										
										
											2016-11-14 19:44:29 +00:00
+								    begin
-												Finish the universal property of the direct sum

											
										
										
											2016-11-18 20:20:22 +00:00
+								      induction r with r, induction r,
 								      rewrite [to_respect_mul, to_respect_inv], apply mul_inv_eq_of_eq_mul,
 								      rewrite [one_mul, to_respect_mul, ▸*, ↑foldl, +one_mul, to_respect_mul]
-												some additions to the smash product and direct sums

											
										
										
											2016-11-14 19:44:29 +00:00
+								    end
-												Finish the universal property of the direct sum

											
										
										
											2016-11-18 20:20:22 +00:00
+								    definition dirsum_elim [constructor] (f : Πi, Y i →g A') : dirsum →g A' :=
-												move things to the Lean library, and update after changes in the Lean library

											
										
										
											2016-11-24 04:54:57 +00:00
+								    gqg_elim _ (free_ab_group_elim (λv, f v.1 v.2)) (dirsum_elim_resp_quotient f)
-												Finish the universal property of the direct sum

											
										
										
											2016-11-18 20:20:22 +00:00
-												some additions to the smash product and direct sums

											
										
										
											2016-11-14 19:44:29 +00:00
+								    definition dirsum_elim_compute (f : Πi, Y i →g A') (i : I) :
 								      dirsum_elim f ∘g dirsum_incl i ~ f i :=
 								    begin
-												Finish the universal property of the direct sum

											
										
										
											2016-11-18 20:20:22 +00:00
+								      intro g, apply one_mul
-												some additions to the smash product and direct sums

											
										
										
											2016-11-14 19:44:29 +00:00
+								    end
 								    definition dirsum_elim_unique (f : Πi, Y i →g A') (k : dirsum →g A')
 								      (H : Πi, k ∘g dirsum_incl i ~ f i) : k ~ dirsum_elim f :=
-												Finish the universal property of the direct sum

											
										
										
											2016-11-18 20:20:22 +00:00
+								    begin
 								      apply gqg_elim_unique,
-												move things to the Lean library, and update after changes in the Lean library

											
										
										
											2016-11-24 04:54:57 +00:00
+								      apply free_ab_group_elim_unique,
-												Finish the universal property of the direct sum

											
										
										
											2016-11-18 20:20:22 +00:00
+								      intro x, induction x with i y, exact H i y
 								    end
-												some additions to the smash product and direct sums

											
										
										
											2016-11-14 19:44:29 +00:00
-												split group_constructions into several files

											
										
										
											2016-10-13 19:04:57 +00:00
 								  end
 								end group