Lp-operator algebras associated with oriented graphs

Abstract

For each 1 p<∞ and each countable oriented graph Q we introduce an Lp-operator algebra Op(Q) which contains the Leavitt path C-algebra LQ as a dense subalgebra and is universal for those Lp-representations of LQ which are spatial in the sense of N.C. Phillips. For Rn the graph with one vertex and n loops (2 n ∞), Op(Rn)=Opn, the Lp-Cuntz algebra introduced by Phillips. If p\1,2\ and S(Q) is the inverse semigroup generated by Q, Op(Q)=Ftightp(S(Q)) is the tight semigroup Lp-operator algebra introduced by Gardella and Lupini. We prove that Op(Q) is simple as an Lp-operator algebra if and only if LQ is simple, and that in this case it is isometrically isomorphic to the closure (LQ) of the image of any nonzero spatial Lp-representation :LQL(Lp(X)). We also show that if LQ is purely infinite simple and p p', then there is no nonzero continuous homomorphism Op(Q)p'(Q). Our results generalize those obtained by Phillips for Lp-Cuntz algebras.