Semiclassical analysis and the Agmon-Finsler metric for discrete Schr\"odinger operators

Abstract

The Agmon estimate for multi-dimensional discrete Schr\"odinger operators is studied with emphasis on the microlocal analysis on the torus. We first consider the semiclassical setting where semiclassical continuous Schr\"odinger operators are discretized with the mesh width proportional to the semiclassical parameter. Under this setting, the Agmon estimate for eigenfunctions is described by an Agmon metric, which is a Finsler metric rather than a Riemannian metric. Klein-Rosenberger (2008) proved this by a different argument in the case of a potential minimum. We also prove the Agmon estimate and the optimal anisotropic exponential decay of eigenfunctions for discrete Schr\"odinger operators in the non-semiclassical standard setting.