Entropy of shifts on higher-rank graph C*-algebras
Abstract
Let OLambda be a higher rank graph C*-algebra of rank r. For every tuple p of non-negative integers there is a canonical completely positive map Phip on OLambda and a subshift Tp on the path space X of the graph. We show that ht(Phip)=h(Tp), where ht is Voiculescu's approximation entropy and h the classical topological entropy. For a higher rank Cuntz-Krieger algebra OM we obtain ht(Phip)= log r(M1p1M2p2 ... Mrpr), r being the spectral radius. This generalises Boca and Goldstein's result for Cuntz-Krieger algebras.
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