Fixed points of an infinite-dimensional operator related to Gibbs measures
U. R. OlimovRomanovskiy Institute of Mathematics, Academy of Sciences of Uzbekistan, Tashkent, UzbekistanU. A. RozikovAKFA University, Tashkent, Uzbekistan
ABI
Аннотация
We describe fixed points of an infinite-dimensional nonlinear operator related to a hard-core (HC) model with a countable set $$\mathbb N$$ of spin values on a Cayley tree. This operator is defined by a countable set of parameters $$\lambda_i>0$$ , $$a_{ij}\in\{0,1\}$$ , $$i,j\in\mathbb N$$ . We find a sufficient condition on these parameters under which the operator has a unique fixed point. When this condition is not satisfied, we show that the operator may have up to five fixed points. We also prove that every fixed point generates a normalizable boundary law and therefore defines a Gibbs measure for the given HC model.
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