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Criticality of measures on 2-d Ising configurations: from square to hexagonal graphs

On the space of Ising configurations on the 2-d square lattice, we consider a family of non Gibbsian measures introduced by using a pair Hamiltonian, depending on an additional inertial parameter $q$. These measures are related to the usual Gibbs measure on $\Z^2$ and turn out to be the marginal of the Gibbs measure of a suitable Ising model on the hexagonal lattice. The inertial parameter $q$ tunes the geometry of the system. The critical behaviour and the decay of correlation functions of these measures are studied thanks to relation with the Random Cluster model.

preprint2019arXivOpen access
Valentina ApollonioRoberto D'AutiliaBenedetto ScoppolaElisabetta ScoppolaAlessio Troiani
math-phmath.PRmath.MP
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Valentina ApollonioRoberto D'AutiliaBenedetto ScoppolaElisabetta ScoppolaAlessio Troiani

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