Set-theoretical solutions of the pentagon equation on Clifford semigroups

Abstract

Given a set-theoretical solution of the pentagon equation s:S× S S× S on a set S and writing s(a, b)=(a· b,\, θa(b)), with · a binary operation on S and θa a map from S into itself, for every a∈ S, one naturally obtains that (S,\,·) is a semigroup. In this paper, we focus on solutions on Clifford semigroups (S,\,·) satisfying special properties on the set of the idempotents E(S). Into the specific, we provide a complete description of idempotent-invariant solutions, namely, those solutions for which θa remains invariant in E(S), for every a∈ S. Moreover, considering (S,\,·) as a disjoint union of groups, we construct a family of idempotent-fixed solutions, i.e., those solutions for which θa fixes every element in E(S), for every a∈ S, starting from a solution on each group.