Quantum Spin probabilities at positive temperature are H\"older Gibbs probabilities

Abstract

We consider the KMS state associated to the Hamiltonian H= σx σx over the quantum spin lattice C2 C2 C2 .... For a fixed observable of the form L L L ..., where L:C2 C2 is self adjoint, and for positive temperature T one can get a naturally defined stationary probability μT on the Bernoulli space \1,2\N. The Jacobian of μT can be expressed via a certain continued fraction expansion. We will show that this probability is a Gibbs probability for a H\"older potential. Therefore, this probability is mixing for the shift map. For such probability μT we will show the explicit deviation function for a certain class of functions. When decreasing temperature we will be able to exhibit the explicit transition value Tc where the set of values of the Jacobian of the Gibbs probability μT changes from being a Cantor set to being an interval. We also present some properties for quantum spin probabilities at zero temperature (for instance, the explicit value of the entropy).