On the absence of zero-temperature limit of equilibrium states for finite-range interactions on the lattice Z2

Abstract

We construct finite-range interactions on SZ2, where S is a finite set, for which the associated equilibrium states (i.e., the shift-invariant Gibbs states) fail to converge as temperature goes to zero. More precisely, if we pick any one-parameter family (μβ)β>0 in which μβ is an equilibrium state at inverse temperature β for this interaction, then β∞μβ does not exist. This settles a question posed by the first author and Hochman who obtained such a non-convergence behavior when d≥ 3, d being the dimension of the lattice.