Variants of finite full transformation semigroups

Abstract

The variant of a semigroup S with respect to an element a in S, denoted Sa, is the semigroup with underlying set S and operation * defined by x*y=xay for x,y in S. In this article, we study variants TXa of the full transformation semigroup TX on a finite set X. We explore the structure of TXa as well as its subsemigroups Reg(TXa) (consisting of all regular elements) and EXa (consisting of all products of idempotents), and the ideals of Reg(TXa). Among other results, we calculate the rank and idempotent rank (if applicable) of each semigroup, and (where possible) the number of (idempotent) generating sets of the minimal possible size.