We study the thermodynamic limit of the algebraic dynamics for an "almost" mean-field Ising model, which is a slight generalization of the Ising model in the mean-field approximation. We prove that there exists a family of "relevant" states on which the algebraic dynamics αt can be defined. This αt defines a group of automorphisms of the algebra obtained by completing the standard spin algebra with respect to the quasiuniform topology defined by our states. © 1991 Plenum Publishing Corporation.
Bagarello, F., Trapani, C. (1991). "Almost" mean-field ising model: An algebraic approach. JOURNAL OF STATISTICAL PHYSICS, 65(3-4), 469-482 [10.1007/BF01053740].
"Almost" mean-field ising model: An algebraic approach
BAGARELLO, Fabio;TRAPANI, Camillo
1991-01-01
Abstract
We study the thermodynamic limit of the algebraic dynamics for an "almost" mean-field Ising model, which is a slight generalization of the Ising model in the mean-field approximation. We prove that there exists a family of "relevant" states on which the algebraic dynamics αt can be defined. This αt defines a group of automorphisms of the algebra obtained by completing the standard spin algebra with respect to the quasiuniform topology defined by our states. © 1991 Plenum Publishing Corporation.
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