The Dixmier-Moeglin equivalence for Leavitt path algebras

Abstract

Let K be a field, let E be a finite directed graph, and let LK(E) be the Leavitt path algebra of E over K. We show that for a prime ideal P in LK(E), the following are equivalent: enumerate P is primitive; P is rational; P is locally closed in Spec(LK(E)). enumerate We show that the prime spectrum Spec(LK(E)) decomposes into a finite disjoint union of subsets, each of which is homeomorphic to Spec(K) or to Spec(K[x,x-1]). In the case that K is infinite, we show that LK(E) has a rational K×-action, and that the indicated decomposition of Spec(LK(E)) is induced by this action.