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Gibbs measures for a Hard-Core model with a countable set of states

U. A. RozikovKarshi State University, 180100, Karshi, UzbekistanR. M. KhakimovNamangan State University, 160107, Namangan, UzbekistanM. T. MakhammadalievNamangan State University, 160107, Namangan, Uzbekistan
ABI

Аннотация

In this paper, we focus on studying the non-probability Gibbs measures for a Hard-Core (HC) model on a Cayley tree of order [Formula: see text], where the set of integers [Formula: see text] is the set of spin values. It is well known that each Gibbs measure, whether it be a gradient or non-probability measure, of this model corresponds to a boundary law. A boundary law can be thought of as an infinite-dimensional vector function (with strictly positive coordinates) defined at the vertices of the Cayley tree, which satisfies a nonlinear functional equation. Furthermore, every normalizable boundary law corresponds to a Gibbs measure. However, a non-normalizable boundary law can define the gradient or non-probability Gibbs measures. In this paper, we investigate the conditions for uniqueness and non-uniqueness of translation-invariant and periodic non-probability Gibbs measures for the HC model on a Cayley tree of any order [Formula: see text].

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