A Regularity Theory for Static Schr\"odinger Equations on Rd in Spectral Barron Spaces

Abstract

Spectral Barron spaces have received considerable interest recently as it is the natural function space for approximation theory of two-layer neural networks with a dimension-free convergence rate. In this paper we study the regularity of solutions to the whole-space static Schr\"odinger equation in spectral Barron spaces. We prove that if the source of the equation lies in the spectral Barron space Bs(Rd) and the potential function admitting a non-negative lower bound decomposes as a positive constant plus a function in Bs(Rd), then the solution lies in the spectral Barron space Bs+2(Rd).