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Abbreviation: BrSlat
Definition
A Brouwerian semilattice is a structure A = (A, ∧, 1, →) such that
(A, ∧, 1) is a semilattice with identity, and
→ gives the residual of ∧: x∧y ≤ z ⇔ y ≤ x→z.
Morphisms
Let A and B be Brouwerian semilattices. A morphism from A to B is a function h : A→B that is a
homomorphism:
h(x∧y) = h(x)∧h(y) and h(1) = 1 and h(x→y) = h(x)→h(y).
Definition
A Brouwerian semilattice is a hoop A = (A, ·, 1, →) such that
· is idempotent: x·x = x.
Some results
Examples
Properties
Finite members
[Size 1]?: 1
[Size 2]?: 1
[Size 3]?: 1
[Size 4]?: 2
[Size 5]?: 3
[Size 6]?: 5
[Size 7]?: 8
[Size 8]?: 15
[Size 9]?: 26
[Size 10]?: 47
[Size 11]?: 82
[Size 12]?: 151
[Size 13]?: 269
[Size 14]?: 494
[Size 15]?: 891
[Size 16]?: 1639
[Size 17]?: 2978
[Size 18]?: 5483
[Size 19]?: 10006
[Size 20]?: 18428
Values known up to size 49 [Erne, Heitzig, Reinhold (2002)]
Subclasses
Brouwerian algebras
Superclasses
Semilattices with identity
Hoops
![[Home]](/structures.gif)
Brouwerian semilattices