Interface asymptotics of Partial Bergman kernels around a critical level

Abstract

In a recent series of articles (arXiv:1604.06655, arXiv:1708.09267), the authors have studied the transition behavior of partial Bergman kernels k, [E1, E2](z,w) and the associated DOS (density of states) k, [E1, E2](z) across the interface between the allowed and forbidden regions. Partial Bergman kernels are Toeplitz Hamiltonians quantizing Morse functions H: M on a manifold. The allowed region is H-1([E1, E2]) and the interface is its boundary. In prior articles it was assumed that the endpoints Ej were regular values of H. This article completes the series by giving parallel results when an endpoint is a critical value of H. In place of the Erf scaling asymptotics in a k- tube around for regular interfaces, one obtains δ-asymptotics in k-14-tubes around singular points of a critical interface. In k- tubes, the transition law is given by the osculating metaplectic propagator.