On the semi-classical analysis of Schr\"odinger operators with purely imaginary electric potentials in a bounded domain

Abstract

In this paper, we describe the leftmost eigenvalue of the non-selfadjoint operator Ah = -h2+iV(x) with Dirichlet boundary conditions on a smooth bounded domain ⊂Rn\,, as h→0\,. V is assumed to be a Morse function without critical point at the boundary of \,. More precisely, we compare ∈fσ(Ah) with the minimum of the spectrum's real part for some model operator. In the case where V has no critical point, the spectrum is determined by the boundary points where ∇ V is orthogonal, and the model operator involves a 1-dimensional complex Airy operator in R+\,. If V is a Morse function with critical points in \,, the behavior of the operator near the critical points prevails, and the model operator is a complex harmonic oscillator. This question is related to the decay of associated semigroups. In particular, it allows to recover, in a simplified setting, some stability results by Almog in superconductivity theory.