On the geometry of semiclassical limits on Dirichlet spaces

Abstract

This paper is a contribution to semiclassical analysis for abstract Schr\"odinger type operators on locally compact spaces: Let X be a metrizable seperable locally compact space, let μ be a Radon measure on X with a full support. Let (t,x,y) p(t,x,y) be a strictly positive pointwise consistent μ-heat kernel, and assume that the generator Hp≥ 0 of the corresponding self-adjoint contraction semigroup in L2(X,μ) induces a regular Dirichlet form. Then, given a function : (0,1) (0,∞) such that the limit t 0+p(t,x,x) (t) exists for all x∈ X, we prove that for every potential w:X R one has t 0+ (t)tr(e -t Hp + w)= ∫ e-w(x) t 0+p(t,x,x) (t) dμ(x)<∞ for the Schr\"odinger type operator Hp + w, provided w satisfies very mild conditions at ∞, that are essentially only made to guarantee that the sum of quadratic forms Hp + w/t is self-adjoint and bounded from below for small t, and to guarantee that ∫ e-w(x) t 0+p(t,x,x) (t) dμ(x)<∞. The proof is probabilistic and relies on a principle of not feeling the boundary for p(t,x,x). In particular, this result implies a new semiclassical limit result for partition functions valid on arbitrary connected geodesically complete Riemannian manifolds, and one also recovers a previously established semiclassical limit result for possibly locally infinite connected weighted graphs.