Feynman path integrals for magnetic Schr\"odinger operators on infinite weighted graphs

Abstract

We prove a Feynman path integral formula for the unitary group (-itLv,θ), t≥ 0, associated with a discrete magnetic Schr\"odinger operator Lv,θ on a large class of weighted infinite graphs. As a consequence, we get a new Kato-Simon estimate |(-itLv,θ)(x,y)|≤ (-tL-deg,0)(x,y), which controls the unitary group uniformly in the potentials in terms of a Schr\"odinger semigroup, where the potential deg is the weighted degree function of the graph.