Using Steinberg algebras to study decomposability of Leavitt path algebras

Abstract

Given an arbitrary graph E we investigate the relationship between E and the groupoid GE. We show that there is a lattice isomorphism between the lattice of pairs (H, S), where H is a hereditary and saturated set of vertices and S is a set of breaking vertices associated to H , onto the lattice of open invariant subsets of GE(0). We use this lattice isomorphism to characterize the decomposability of the Leavitt path algebra LK(E), where K is a field. First we find a graph condition to characterise when an open invariant subset of GE(0) is closed. Then we give both a graph condition and a groupoid condition each of which is equivalent to LK(E) being decomposable in the sense that it can be written as a direct sum of two nonzero ideals.