Eigenvalue estimates for a three-dimensional magnetic Schr\"odinger operator

Abstract

We consider a magnetic Schr\"odinger operator Hh=(-ih∇-A)2 with the Dirichlet boundary conditions in an open set ⊂ R3, where h>0 is a small parameter. We suppose that the minimal value b0 of the module |B| of the vector magnetic field B is strictly positive, and there exists a unique minimum point of |B|, which is non-degenerate. The main result of the paper is upper estimates for the low-lying eigenvalues of the operator Hh in the semiclassical limit. We also prove the existence of an arbitrary large number of spectral gaps in the semiclassical limit in the corresponding periodic setting.