Lengths of words in transformation semigroups generated by digraphs

Abstract

Given a simple digraph D on n vertices (with n2), there is a natural construction of a semigroup D associated with D. For any edge (a,b) of D, let a b be the idempotent of defect 1 mapping a to b and fixing all vertices other than a; then define D to be the semigroup a b:(a,b)∈ E(D). For α ∈ D , let (D,α) be the minimal length of a word in E(D) expressing α. When D=Kn is the complete undirected graph, Howie and Iwahori, independently, obtained a formula to calculate (Kn,α), for any α ∈ Kn = Singn; however, no analogous nontrivial results are known when D ≠ Kn. In this paper, we characterise all simple digraphs D such that either (D,α) is equal to Howie-Iwahori's formula for all α ∈ D , or (D,α) = n - fix(α) for all α ∈ D , or (D,α) = n - rk(α) for all α ∈ D . When D is an acyclic digraph and α ∈ D , we find a tight upper bound for (D,α). Finally, we study the case when D is a strong tournament (which corresponds to a smallest generating set of idempotents of defect 1 of Singn), and we propose some conjectures.