Absence of Dobrushin states for 2d long-range Ising models
Abstract
We consider the two-dimensional Ising model with long-range pair interactions of the form Jxy|x-y|-α with α>2, mostly when Jxy ≥ 0. We show that Dobrushin states (i.e. extremal non-translation-invariant Gibbs states selected by mixed -boundary conditions) do not exist. We discuss possible extensions of this result in the direction of the Aizenman-Higuchi theorem, or concerning fluctuations of interfaces. We also mention the existence of rigid interfaces in two long-range anisotropic contexts.
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