theorem
AddSubgroup.op.proof_2
{G : Type u_1}
[AddGroup G]
(H : AddSubgroup G)
:
∀ {x : Gᵃᵒᵖ}, AddOpposite.unop x ∈ H → -AddOpposite.unop x ∈ H
theorem
AddSubgroup.op.proof_1
{G : Type u_1}
[AddGroup G]
(H : AddSubgroup G)
:
∀ {a b : Gᵃᵒᵖ}, a ∈ AddOpposite.unop ⁻¹' ↑H → b ∈ AddOpposite.unop ⁻¹' ↑H → AddOpposite.unop b + AddOpposite.unop a ∈ H
Pull an additive subgroup back to an opposite additive subgroup along AddOpposite.unop
Equations
- One or more equations did not get rendered due to their size.
Instances For
@[simp]
theorem
AddSubgroup.op_coe
{G : Type u_1}
[AddGroup G]
(H : AddSubgroup G)
:
↑(AddSubgroup.op H) = AddOpposite.unop ⁻¹' ↑H
@[simp]
theorem
Subgroup.op_coe
{G : Type u_1}
[Group G]
(H : Subgroup G)
:
↑(Subgroup.op H) = MulOpposite.unop ⁻¹' ↑H
Pull a subgroup back to an opposite subgroup along MulOpposite.unop
Equations
- One or more equations did not get rendered due to their size.
Instances For
theorem
AddSubgroup.unop.proof_3
{G : Type u_1}
[AddGroup G]
(H : AddSubgroup Gᵃᵒᵖ)
:
∀ {x : G}, AddOpposite.op x ∈ H → -AddOpposite.op x ∈ H
Pull an opposite additive subgroup back to an additive subgroup along AddOpposite.op
Equations
- One or more equations did not get rendered due to their size.
Instances For
@[simp]
theorem
AddSubgroup.unop_coe
{G : Type u_1}
[AddGroup G]
(H : AddSubgroup Gᵃᵒᵖ)
:
↑(AddSubgroup.unop H) = AddOpposite.op ⁻¹' ↑H
@[simp]
theorem
Subgroup.unop_coe
{G : Type u_1}
[Group G]
(H : Subgroup Gᵐᵒᵖ)
:
↑(Subgroup.unop H) = MulOpposite.op ⁻¹' ↑H
Pull an opposite subgroup back to a subgroup along MulOpposite.op
Equations
- One or more equations did not get rendered due to their size.
Instances For
@[simp]
theorem
AddSubgroup.op_toAddSubmonoid
{G : Type u_1}
[AddGroup G]
(H : AddSubgroup G)
:
(AddSubgroup.op H).toAddSubmonoid = AddSubmonoid.op H.toAddSubmonoid
@[simp]
theorem
Subgroup.op_toSubmonoid
{G : Type u_1}
[Group G]
(H : Subgroup G)
:
(Subgroup.op H).toSubmonoid = Submonoid.op H.toSubmonoid
@[simp]
theorem
AddSubgroup.unop_toAddSubmonoid
{G : Type u_1}
[AddGroup G]
(H : AddSubgroup Gᵃᵒᵖ)
:
(AddSubgroup.unop H).toAddSubmonoid = AddSubmonoid.unop H.toAddSubmonoid
@[simp]
theorem
Subgroup.unop_toSubmonoid
{G : Type u_1}
[Group G]
(H : Subgroup Gᵐᵒᵖ)
:
(Subgroup.unop H).toSubmonoid = Submonoid.unop H.toSubmonoid
theorem
AddSubgroup.opEquiv.proof_2
{G : Type u_1}
[AddGroup G]
:
∀ (x : AddSubgroup Gᵃᵒᵖ), AddSubgroup.op (AddSubgroup.unop x) = x
An additive subgroup H of G determines an additive subgroup
H.op of the opposite additive group Gᵃᵒᵖ.
Equations
- One or more equations did not get rendered due to their size.
Instances For
theorem
AddSubgroup.opEquiv.proof_1
{G : Type u_1}
[AddGroup G]
:
∀ (x : AddSubgroup G), AddSubgroup.unop (AddSubgroup.op x) = x
@[simp]
theorem
AddSubgroup.opEquiv_symm_apply
{G : Type u_1}
[AddGroup G]
(H : AddSubgroup Gᵃᵒᵖ)
:
↑AddSubgroup.opEquiv.symm H = AddSubgroup.unop H
@[simp]
theorem
Subgroup.opEquiv_symm_apply
{G : Type u_1}
[Group G]
(H : Subgroup Gᵐᵒᵖ)
:
↑Subgroup.opEquiv.symm H = Subgroup.unop H
@[simp]
theorem
AddSubgroup.opEquiv_apply
{G : Type u_1}
[AddGroup G]
(H : AddSubgroup G)
:
↑AddSubgroup.opEquiv H = AddSubgroup.op H
@[simp]
theorem
Subgroup.opEquiv_apply
{G : Type u_1}
[Group G]
(H : Subgroup G)
:
↑Subgroup.opEquiv H = Subgroup.op H
def
AddSubgroup.equivOp
{G : Type u_1}
[AddGroup G]
(H : AddSubgroup G)
:
{ x // x ∈ H } ≃ { x // x ∈ AddSubgroup.op H }
Bijection between an additive subgroup H and its opposite.
Equations
- AddSubgroup.equivOp H = Equiv.subtypeEquiv AddOpposite.opEquiv (_ : ∀ (x : G), x ∈ H ↔ x ∈ H)
Instances For
@[simp]
theorem
AddSubgroup.equivOp_apply_coe
{G : Type u_1}
[AddGroup G]
(H : AddSubgroup G)
(a : { a // (fun x => x ∈ H) a })
:
↑(↑(AddSubgroup.equivOp H) a) = AddOpposite.op ↑a
@[simp]
theorem
Subgroup.equivOp_symm_apply_coe
{G : Type u_1}
[Group G]
(H : Subgroup G)
(b : { b // (fun x => x ∈ Subgroup.op H) b })
:
↑(↑(Subgroup.equivOp H).symm b) = MulOpposite.unop ↑b
@[simp]
theorem
AddSubgroup.equivOp_symm_apply_coe
{G : Type u_1}
[AddGroup G]
(H : AddSubgroup G)
(b : { b // (fun x => x ∈ AddSubgroup.op H) b })
:
↑(↑(AddSubgroup.equivOp H).symm b) = AddOpposite.unop ↑b
@[simp]
theorem
Subgroup.equivOp_apply_coe
{G : Type u_1}
[Group G]
(H : Subgroup G)
(a : { a // (fun x => x ∈ H) a })
:
↑(↑(Subgroup.equivOp H) a) = MulOpposite.op ↑a
def
Subgroup.equivOp
{G : Type u_1}
[Group G]
(H : Subgroup G)
:
{ x // x ∈ H } ≃ { x // x ∈ Subgroup.op H }
Bijection between a subgroup H and its opposite.
Equations
- Subgroup.equivOp H = Equiv.subtypeEquiv MulOpposite.opEquiv (_ : ∀ (x : G), x ∈ H ↔ x ∈ H)
Instances For
instance
AddSubgroup.instEncodableSubtypeAddOppositeMemAddSubgroupAddGroupInstMembershipInstSetLikeAddSubgroupOp
{G : Type u_1}
[AddGroup G]
(H : AddSubgroup G)
[Encodable { x // x ∈ H }]
:
Encodable { x // x ∈ AddSubgroup.op H }
Equations
instance
Subgroup.instEncodableSubtypeMulOppositeMemSubgroupGroupInstMembershipInstSetLikeSubgroupOp
{G : Type u_1}
[Group G]
(H : Subgroup G)
[Encodable { x // x ∈ H }]
:
Encodable { x // x ∈ Subgroup.op H }
Equations
instance
AddSubgroup.instCountableSubtypeAddOppositeMemAddSubgroupAddGroupInstMembershipInstSetLikeAddSubgroupOp
{G : Type u_1}
[AddGroup G]
(H : AddSubgroup G)
[Countable { x // x ∈ H }]
:
Countable { x // x ∈ AddSubgroup.op H }
Equations
- One or more equations did not get rendered due to their size.
theorem
AddSubgroup.instCountableSubtypeAddOppositeMemAddSubgroupAddGroupInstMembershipInstSetLikeAddSubgroupOp.proof_1
{G : Type u_1}
[AddGroup G]
(H : AddSubgroup G)
[Countable { x // x ∈ H }]
:
Countable { x // x ∈ AddSubgroup.op H }
instance
Subgroup.instCountableSubtypeMulOppositeMemSubgroupGroupInstMembershipInstSetLikeSubgroupOp
{G : Type u_1}
[Group G]
(H : Subgroup G)
[Countable { x // x ∈ H }]
:
Countable { x // x ∈ Subgroup.op H }
theorem
AddSubgroup.vadd_opposite_add
{G : Type u_1}
[AddGroup G]
{H : AddSubgroup G}
(x : G)
(g : G)
(h : { x // x ∈ AddSubgroup.op H })
: