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On Quantum Markov Chains on Cayley tree II: Phase transitions for the associated chain with XY-model on the Cayley tree of order three

Luigi Accardi, Farrukh Mukhamedov, Mansoor Saburov

Published 2010-11-10Version 1

In the present paper we study forward Quantum Markov Chains (QMC) defined on a Cayley tree. Using the tree structure of graphs, we give a construction of quantum Markov chains on a Cayley tree. By means of such constructions we prove the existence of a phase transition for the XY-model on a Cayley tree of order three in QMC scheme. By the phase transition we mean the existence of two now quasi equivalent QMC for the given family of interaction operators $\{K_{<x,y>}\}$.

Comments: 34 pages, 1 figure

Journal: Ann. Henri Poincar\'e 12 (2011), 1109--1144

DOI: 10.1007/s00023-011-0107-2

Categories: math-ph, math.DS, math.FA, math.MP, math.OA, quant-ph

Subjects: 46L53, 60J99, 46L60, 60G50, 82B10, 81Q10, 94A17

Keywords: cayley tree, phase transition, associated chain, study forward quantum markov chains, quasi equivalent qmc

Tags: journal article

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