Semiclassical limits of quantum partition functions on infinite graphs

Abstract

We prove that if H denotes the operator corresponding to the canonical Dirichlet form on a possibly locally infinite weighted graph (X,b,m), and if v:X R is such that H+v/ is well-defined as a form sum for all >0, then the quantum partition function tr(e-β ( H + v/)) satisfies tr(e-β ( H + v/))[] 0+Σx∈ X e-β v(x) for all β>0, regardless of the fact whether e-β v is apriori summable or not. We also prove natural generalizations of this semiclassical limit to a large class of covariant Schr\"odinger operators that act on sections in Hermitian vector bundle over (X,m,b), a result that particularly applies to magnetic Schr\"odinger operators that are defined on (X,m,b).