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This article is cited in 6 scientific papers (total in 6 papers)
Uniqueness of Quantum Markov Chains Associated with an $XY$-Model on a Cayley Tree of Order $2$
L. Accardia, F. M. Mukhamedovb, M. Kh. Saburovb a Università degli Studi di Roma — Tor Vergata
b International Islamic University Malaysia
Abstract:
We propose the construction of a quantum Markov chain that corresponds to a “forward” quantum Markov chain. In the given construction, the quantum Markov chain is defined as the limit of finite-dimensional states depending on the boundary conditions. A similar construction is widely used in the definition of Gibbs states in classical statistical mechanics. Using this construction, we study the quantum Markov chain associated with an $XY$-model on a Cayley tree. For this model, within the framework of the given construction, we prove the uniqueness of the quantum Markov chain, i.e., we show that the state is independent of the boundary conditions.
Keywords:
quantum Markov chain, Cayley tree, $XY$-model, Gibbs state, phase transition, quasiconditional expectation, graph, dynamical system, quasilocal algebra.
Received: 01.09.2010 Revised: 17.02.2011
Citation:
L. Accardi, F. M. Mukhamedov, M. Kh. Saburov, “Uniqueness of Quantum Markov Chains Associated with an $XY$-Model on a Cayley Tree of Order $2$”, Mat. Zametki, 90:2 (2011), 168–182; Math. Notes, 90:2 (2011), 162–174
Linking options:
https://www.mathnet.ru/eng/mzm8862https://doi.org/10.4213/mzm8862 https://www.mathnet.ru/eng/mzm/v90/i2/p168
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