Large Deviations for Quantum Spin probabilities at temperature zero

Abstract

We consider certain self-adjoint observables for 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 , and for the zero temperature limit one can get a naturally defined stationary probability μ on the Bernoulli space \1,2\N. This probability is ergodic but it is not mixing for the shift map. It is not a Gibbs state for a continuous normalized potential but its Jacobian assume only two values almost everywhere. Anyway, for such probability μ we can show that a Large Deviation Principle is true for a certain class of functions. The result is derived by showing the explicit form of the free energy which is differentiable.