A magnetic eigenvalue bound in the disk

Abstract

We consider the magnetic Schrödinger operator in the unit disk with constant magnetic field of strength b>0 and magnetic Neumann boundary condition. If λ1(b) denotes its lowest eigenvalue, then we prove that λ1(b) < Θ0 b for all b>0, where Θ0 is the de Gennes constant. The proof has two parts, both based on Rayleigh's principle. For large b, we use a trial state built from the de Gennes ground state. For the remaining bounded range of b, we divide the interval into finitely many overlapping subintervals and, on each of them, choose a trial state from a finite-dimensional space. This reduces the proof to finitely many inequalities between rational numbers.