On the general one-dimensional XY Model: positive and zero temperature, selection and non-selection

Abstract

We consider (M,d) a connected and compact manifold and we denote by Bi the Bernoulli space M of sequences represented by x=(... x-3,x-2,x-1,x0,x1,x2,x3,...), where xi belongs to the space (alphabet) M. The case where M=S1, the unit circle, is of particular interest here. The analogous problem in the one-dimensional lattice N is also considered. %In this case we consider the potential A: B=MN R. Let A: Bi be an observable or potential defined in the Bernoulli space Bi. The potential A describes an interaction between sites in the one-dimensional lattice MZ. Given a temperature T, we analyze the main properties of the Gibbs state μ1T A which is a certain probability measure over Bi. We denote this setting "the general XY model". In order to do our analysis we consider the Ruelle operator associated to 1T A, and, we get in this procedure the main eigenfunction 1T A. Later, we analyze selection problems when temperature goes to zero: a) existence, or not, of the limit (on the uniform convergence) V:=T 0 T\, (1T A),\,\,\,\,a question about selection of subaction, and, b) existence, or not, of the limit (on the weak* sense) μ:=T 0 μ1T\, A,\,\,\,\,a question about selection of measure. The existence of subactions and other properties of Ergodic Optimization are also considered.