Semigroups for One-Dimensional Schr\"odinger Operators with Multiplicative Gaussian Noise

Abstract

Let H:=-12+V be a one-dimensional continuum Schr\"odinger operator. Consider H:= H+, where is a translation invariant Gaussian noise. Under some assumptions on , we prove that if V is locally integrable, bounded below, and grows faster than at infinity, then the semigroup e-t H is trace class and admits a probabilistic representation via a Feynman-Kac formula. Our result applies to operators acting on the whole line R, the half line (0,∞), or a bounded interval (0,b), with a variety of boundary conditions. Our method of proof consists of a comprehensive generalization of techniques recently developed in the random matrix theory literature to tackle this problem in the special case where H is the stochastic Airy operator.