Elaborating the word problem for free idempotent-generated semigroups over the full transformation monoid

Abstract

With each semigroup one can associate a partial algebra, called the biordered set, which captures important algebraic and geometric features of the structure of idempotents of that semigroup. For a biordered set E, one can construct the free idempotent-generated semigroup over E, IG(E), which is the free-est semigroup (in a definite categorical sense) whose biorder of idempotents is isomorphic to E. Studies of these intriguing objects have been recently focusing on their particular aspects, such as maximal subgroups, the word problem, etc. In 2012, Gray and Ruskuc pointed out that a more detailed investigation into the structure of the free idempotent-generated semigroup over the biorder of Tn, the full transformation monoid over an n-element set, might be worth pursuing. In 2019, together with Gould and Yang, the present author showed that the word problem for IG(ETn) is algorithmically soluble. In a recent work by the author, it was showed that, for a wide class of biorders E, the algorithmic solution of the word problem revolves around the so-called vertex groups, which arise as certain subgroups of direct products of pairs of maximal subgroups of IG(E). In this paper we determine these vertex groups for the case when E is the biorder of idempotents of Tn.