CR eigenvalue estimate and Kohn-Rossi cohomology

Abstract

Let X be a compact connected CR manifold with a transversal CR S1-action of real dimension 2n-1, which is only assumed to be weakly pseudoconvex. Let b be the ∂b-Laplacian, with respect to a T-rigid Hermitian metric (see Definition 3.2 of T-rigid Hermitian metric). Eigenvalue estimate of b is a fundamental issue both in CR geometry and analysis. In this paper, we are able to obtain a sharp estimate of the number of eigenvalues smaller than or equal to λ of b acting on the m-th Fourier components of smooth (n-1,q)-forms on X, where m∈ Z+ and q=0,1,·s, n-1. Here the sharp means the growth order with respect to m is sharp. In particular, when λ=0, we obtain the asymptotic estimate of the growth for m-th Fourier components Hn-1,qb,m(X) of Hn-1,qb(X) as m → +∞. Furthermore, we establish a Serre type duality theorem for Fourier components of Kohn-Rossi cohomology which is of independent interest. As a byproduct, the asymptotic growth of the dimensions of the Fourier components H0,qb,-m(X) for m∈ Z+ is established. We also give appilcations of our main results, including Morse type inequalities, asymptotic Riemann-Roch type theorem, Grauert-Riemenscheider type criterion, and an orbifold version of our main results which provides an answer towards a folklore open problem informed to us by Hsiao.