Spectral/algebra/group_constructions.hlean

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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.
Authors: Floris van Doorn, Egbert Rijke
Constructions with groups
-/
import .free_commutative_group
open eq algebra is_trunc sigma sigma.ops prod trunc function equiv
namespace group
variables {G G' : Group} {g g' h h' k : G} {A B : CommGroup}
/- Tensor group (WIP) -/
/- namespace tensor_group
variables {A B}
local abbreviation ι := @free_comm_group_inclusion
inductive tensor_rel_type : free_comm_group (Set_of_Group A ×t Set_of_Group B) → Type :=
| mul_left : Π(a₁ a₂ : A) (b : B), tensor_rel_type (ι (a₁, b) * ι (a₂, b) * (ι (a₁ * a₂, b))⁻¹)
| mul_right : Π(a : A) (b₁ b₂ : B), tensor_rel_type (ι (a, b₁) * ι (a, b₂) * (ι (a, b₁ * b₂))⁻¹)
open tensor_rel_type
definition tensor_rel' (x : free_comm_group (Set_of_Group A ×t Set_of_Group B)) : Prop :=
∥ tensor_rel_type x ∥
definition tensor_group_rel (A B : CommGroup)
: normal_subgroup_rel (free_comm_group (Set_of_Group A ×t Set_of_Group B)) :=
sorry /- relation generated by tensor_rel'-/
definition tensor_group [constructor] : CommGroup :=
quotient_comm_group (tensor_group_rel A B)
end tensor_group-/
end group