Isomorphism and Morita equivalence of graph algebras

Abstract

For any countable graph E, we investigate the relationship between the Leavitt path algebra L(E) and the graph C*-algebra C*(E). For graphs E and F, we examine ring homomorphisms, ring *-homomorphisms, algebra homomorphisms, and algebra *-homomorphisms between L(E) and L(F). We prove that in certain situations isomorphisms between L(E) and L(F) yield *-isomorphisms between the corresponding C*-algebras C*(E) and C*(F). Conversely, we show that *-isomorphisms between C*(E) and C*(F) produce isomorphisms between L(E) and L(F) in specific cases. The relationship between Leavitt path algebras and graph C*-algebras is also explored in the context of Morita equivalence.