Heat kernel asymptotics and analytic torsion on non-degenerate CR manifolds

Abstract

The existence of small-time asymptotics for the heat kernel of the Kohn Laplacian on a general CR manifold has remained an open problem. In this paper, we resolve the problem in the non-degenerate case. More precisely, let X be a compact oriented CR manifold of dimension 2n+1, n 1, with a nondegenerate Levi form of constant signature (n-, n+). Suppose that condition Y(q) holds at each point of X, we establish the small-time asymptotics of the heat kernel of Kohn Laplacian. Suppose that condition Y(q) fails, we establish the small-time asymptotics of the kernel of the difference of the heat operator and Szegő projector. As an application we define the analytic torsion on compact oriented nondegenerate CR manifolds and study its dependence on changes of the metrics. Let Lk be the k-th power of a CR complex line bundle L over X. We establish the asymptotics, as k ∞, of the analytic torsion with values in Lk, under a variant of spectral gap condition. Furthermore, when X admits a transversal CR S1-action, we establish the small-time asymptotics of the S1-equivariant heat kernel of the Kohn Laplacian with values in Lk. As an application we define the S1-equivariant Quillen metric with values in Lk and study its dependence on changes of the metrics. Finally, we establish the asymptotics, as k ∞, of the S1-equivariant analytic torsion with values in Lk.