The asymptotic behavior of simple eigenvalues of particle-in-well systems

Abstract

The particle in a well in dimension one is a classical problem in quantum mechanics. We study higher-dimensional analogues of the problem, where the well is a smooth domain in Rd. We show that simple eigenvalues and eigenfunctions of the corresponding Schr\"odinger operator depend smoothly on the square root h of the inverse depth of the well and provide an explicit first-order expansion of the eigenvalues at h = 0. Our proof consists of two steps. In the first step, we construct O(h∞) quasimodes (approximate eigenfunctions) on a resolution of [0, 1)h×Rd which allows us to capture fine structure near the boundary of the well. The second step corrects these quasimodes to true eigenfunctions via a fixed point argument.