Centralizers in semigroups, as subsemigroups. #
Main definitions #
Subsemigroup.centralizer
: the centralizer of a subset of a semigroupAddSubsemigroup.centralizer
: the centralizer of a subset of an additive semigroup
We provide Monoid.centralizer
, AddMonoid.centralizer
, Subgroup.centralizer
, and
AddSubgroup.centralizer
in other files.
The centralizer of a subset of an additive semigroup.
Equations
- AddSubsemigroup.centralizer S = { carrier := Set.addCentralizer S, add_mem' := ⋯ }
Instances For
The centralizer of a subset of a semigroup M
.
Equations
- Subsemigroup.centralizer S = { carrier := Set.centralizer S, mul_mem' := ⋯ }
Instances For
@[simp]
@[simp]
instance
AddSubsemigroup.decidableMemCentralizer
{M : Type u_1}
{S : Set M}
[AddSemigroup M]
(a : M)
[Decidable (∀ b ∈ S, b + a = a + b)]
:
Equations
- AddSubsemigroup.decidableMemCentralizer a = decidable_of_iff' (∀ g ∈ S, g + a = a + g) ⋯
instance
Subsemigroup.decidableMemCentralizer
{M : Type u_1}
{S : Set M}
[Semigroup M]
(a : M)
[Decidable (∀ b ∈ S, b * a = a * b)]
:
Equations
- Subsemigroup.decidableMemCentralizer a = decidable_of_iff' (∀ g ∈ S, g * a = a * g) ⋯
theorem
AddSubsemigroup.centralizer_le
{M : Type u_1}
{S : Set M}
{T : Set M}
[AddSemigroup M]
(h : S ⊆ T)
:
@[simp]
theorem
AddSubsemigroup.centralizer_eq_top_iff_subset
{M : Type u_1}
[AddSemigroup M]
{s : Set M}
:
AddSubsemigroup.centralizer s = ⊤ ↔ s ⊆ ↑(AddSubsemigroup.center M)
@[simp]
theorem
Subsemigroup.centralizer_eq_top_iff_subset
{M : Type u_1}
[Semigroup M]
{s : Set M}
:
Subsemigroup.centralizer s = ⊤ ↔ s ⊆ ↑(Subsemigroup.center M)
@[simp]
theorem
AddSubsemigroup.centralizer_univ
(M : Type u_1)
[AddSemigroup M]
:
AddSubsemigroup.centralizer Set.univ = AddSubsemigroup.center M
@[simp]
theorem
Subsemigroup.centralizer_univ
(M : Type u_1)
[Semigroup M]
:
Subsemigroup.centralizer Set.univ = Subsemigroup.center M