Algebraic Cuntz-Krieger algebras

Abstract

We show that E is a finite graph with no sinks if and only if the Leavitt path algebra LR(E) is isomorphic to an algebraic Cuntz-Krieger algebra if and only if the C*-algebra C*(E) is unital and rank(K0(C*(E)))=rank(K1(C*(E))). When k is a field and rank(k×)< ∞, we show that the Leavitt path algebra Lk(E) is isomorphic to an algebraic Cuntz-Krieger algebra if and only if Lk(E) is unital and rank(K1(Lk(E)))=(rank(k×)+1)rank(K0(Lk(E))). We also show that any unital k-algebra which is Morita equivalent or stably isomorphic to an algebraic Cuntz-Krieger algebra, is isomorphic to an algebraic Cuntz-Krieger algebra. As a consequence, corners of algebraic Cuntz-Krieger algebras are algebraic Cuntz-Krieger algebras.