The congruence η on semigroups

Abstract

In this paper we define a congruence η on semigroups. For the finite semigroups S, η is the smallest congruence relation such that S/η is a nilpotent semigroup (in the sense of Malcev). In order to study the congruence relation η on finite semigroups, we define a CS-diagonal finite regular Rees matrix semigroup. We prove that, if S is a CS-diagonal finite regular Rees matrix semigroup then S/η is inverse. Also, if S is a completely regular finite semigroup, then S/η is a Clifford semigroup. We show that, for every non-null principal factor A/B of S, there is a special principal factor C/D such that every element of A B is η-equivalent with some element of C D. We call the principal factor C/D, the η-root of A/B. All η-roots are CS-diagonal. If certain elements of S act in the special way on the R-classes of a CS-diagonal principal factor then it is not an η-root. Some of these results are also expressed in terms of pseudovarieties of semigroups.