An alternative look at the structure of graph inverse semigroups

Abstract

For any graph inverse semigroup G(E) we describe subsemigroups D0=D\0\ and J0=J\0\ of G(E) where D and J are arbitrary D-class and J-class of G(E), respectively. In particular, we prove that for each D-class D of a graph inverse semigroup over an acyclic graph the semigroup D0 is isomorphic to a semigroup of matrix units. Also we show that for any elements a,b of a graph inverse semigroup G(E), Ja· Jb Jb· Ja⊂ Jb0 if there exists a path w such that s(w)∈ Ja and r(w)∈ Jb.