Victor Vega

W*-Corresponcences, Finite Directed Graphs and Markov Chains

W*-Algebras, Graph Algebras and Markov Chains

• Broschiertes Buch

Produktbeschreibung

Let A be the W -algebra, L1(E(0),µ), where E(0) is a fnite set and µ is a probability measure with full support. Let P:A-A be a completely positive unital map. In the present context, P is given by a stochastic matrix. We study the properties of P that are refected in the dilation theory developed by Muhly and Solel in Int. J. Math. 13, 2002. Let H be the Hilbert space L2(E(0),µ) and let pi : A - B(H) the representation of A given by multiplication. Form the Stinespring space H1. Then X is a W -correspondence over P is expressed through a completely contractive representation T of X on H. This representation can be dilated to an isometric representation V of X on a Hilbert space that contains H. We show that X is naturally isomorphic to the correspondence associated to the directed graph E whose vertex space is E(0) and whose edge space is the support of the matrix representing P - a subset of E(0)×E(0). Further, V is shown to be essentially a Cuntz-Krieger representation of E. We also study the simplicity and the ideal structure of the graph C -algebra associated to the stochastic matrix P.

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Produktdetails

• Verlag: VDM Verlag Dr. Müller
• Seitenzahl: 120
• Erscheinungstermin: 11. Februar 2014
• Englisch
• Abmessung: 220mm x 150mm x 8mm
• Gewicht: 169g
• ISBN-13: 9783639155242
• ISBN-10: 3639155246
• Artikelnr.: 26443606

Autorenporträt

Victor Vega, Ph. D. completed his studies at The University of Iowa. His research interests include Operator Algebras, Operator Theory, Graph Algebras, W*-Correspondences and Markov Chains. He is currently Professor and Chairman of Mathematics at St. Ambrose University in Davenport, Iowa.