Szego kernel asymptotics and concentration of Husimi Distributions of eigenfunctions

Abstract

We work on the boundary ∂ Mτ of a Grauert tube of a closed, real analytic Riemannian manifold M. The Toeplitz operator τ D τ associated to the Reeb vector field is a positive, self-adjoint, elliptic operator on H2(∂ Mτ). We compute λ ∞ asymptotics under parabolic rescaling in a neighborhood of the geodesic (Reeb) flow Gtτ = t for the spectral projection kernel , λ associated to τ D τ. We also compute scaling asymptotics for tempered sums of Husimi distributions (analytic continuations) on ∂ Mτ of Laplace eigenfunctions on M. Both asymptotic formulae can be expressed in terms of the metaplectic representation of the linearization of the geodesic flow Gtτ on Bargmann--Fock space. As a corollary, we obtain sharp Lp Lq norm estimates for , λ and sharp Lp estimates for Husimi distributions.