Analytic Microlocal Bohr-Sommerfeld Expansions

Abstract

This article is devoted to analytic (in the sense of Boutet de Monvel-Sjöstrand) estimates in , of the Bohr-Sommerfeld expansion of the eigenvalues of self-adjoint pseudodifferential operators acting on L2(R) in the regular case. We consider an interval of energies in which the spectrum of P is discrete and such that the energy sets are regular connected curves. Under some assumptions on the holomorphy of the symbol p, we will use the isometry between L2(R) and the Bargmann space to obtain an exponentially sharp description of the spectrum in the energy window . More precisely it is possible to build exponentially sharp WKB quasimodes in the Bargmann space. A precise examination of the principal symbols will provide an interpretation to the Maslov correction π in the Bargmann space.