Equivariant scaling asymptotics for Poisson and Szego kernels on Grauert tube boundaries

Abstract

Let (M,) be a closed and connected real-analytic Riemannian manifold, acted upon by a compact Lie group of isometries G. We consider the following two kinds of equivariant asymptotics along a fixed Grauer tube boundary Xτ of (M,). 1): Given the induced unitary representation of G on the eigenspaces of the Laplacian of (M,), these split over the irreducible representations of G. On the other hand, the eigenfunctions of the Laplacian of (M,) admit a simultaneous complexification to some Grauert tube. We study the asymptotic concentration along Xτ of the complexified eigenfunctions pertaining to a fixed isotypical component. 2): There are furthermore an induced action of G as a group of CR and contact automorphisms on Xτ, and a corresponding unitary representation on the Hardy space H(Xτ). The action of G on Xτ commutes with the homogeneous geogesic flow\, and the representation on the Hardy space commutes with the elliptic self-adjoint Toeplitz operator induced by the generator of the goedesic flow. Hence each eigenspace of the latter also splits over the irreducible representations of G. We study the asymptotic concentration of the eigenfunctions in a given isotypical component. We also give some applications of these asymptotics.