G-invariant Szeg\"o kernel asymptotics and CR reduction

Abstract

Let (X, T1,0X) be a compact connected orientable CR manifold of dimension 2n+1 with non-degenerate Levi curvature. Assume that X admits a connected compact Lie group action G. Under certain natural assumptions about the group action G, we show that the G-invariant Szeg\"o kernel for (0,q) forms is a complex Fourier integral operator, smoothing away μ-1(0) and there is a precise description of the singularity near μ-1(0), where μ denotes the CR moment map. We apply our result to the case when X admits a transversal CR S1 action and deduce an asymptotic expansion for the m-th Fourier component of the G-invariant Szeg\"o kernel for (0,q) forms as m +∞. As an application, we show that if m large enough, quantization commutes with reduction.