Graded Naimark's Problem for Leavitt Path Algebras

Abstract

In this paper we study the graded version of Naimark's problem for Leavitt path algebras considering them as Z-graded algebras. Several characterizations are obtained of a Leavitt path algebra L of an arbitrary graph E over a field K over which any two graded-simple modules are graded isomorphic. Such a Leavitt path algebra L is shown to be graded isomorphic to the algebra of graded infinite matrices having at most finitely many non-zero entries from the ring R where R=K or R=K[x,x-1]. Equivalently, L is a graded-simple ring which is graded-semisimple, that is, L is a graded direct sum of graded-isomorphic graded-simple left L-modules. Graphically, the graph E is shown to be row-finite, downward directed and the vertex set E0 is the hereditary saturated closure of a single vertex v which is either a line point or lies on a cycle without exits. We also characterize Leavitt path algebras possessing at most countably many isomorphism classes of graded-simple left modules. Examples are constructed illustrating these results.