Morita theory of finite representations of Leavitt path algebras

Abstract

The Graded Classification Conjecture states that for finite directed graphs E and F, the associated Leavitt path algebras L(E) and L(F) are graded Morita equivalent, i.e., L(E) ≈ L(F), if and only if, their graded Grothendieck groups are isomorphic K0(L(E)) K0(L(F)) as order-preserving Z[x,x-1]-modules. Furthermore, if under this isomorphism, the class [L(E)] is sent to [L(F)] then the algebras are graded isomorphic, i.e., L(E) L(F). In this note we show that, for finite graphs E and F with so sinks and sources, an order-preserving Z[x,x-1]-module isomorphism K0(L(E)) K0(L(F)) gives that the categories of locally finite dimensional graded modules of L(E) and L(F) are equivalent, i.e., [Z] L(E)≈ [Z]L(F). We further obtain that the category of finite dimensional (graded) modules are equivalent, i.e., L(E) ≈ L(F) and L(E) ≈ L(F).