A Tauberian Approach to an Analog of Weyl's law for the Kohn Laplacian on Compact Heisenberg Manifolds

Abstract

Let M= Hd be a compact quotient of the d-dimensional Heisenberg group Hd by a lattice subgroup . We show that the eigenvalue counting function N(λ) for any fixed element of a family of second order differential operators \Lα\ on M has asymptotic behavior N(λ) Cd,α vol(M) λd + 1, where Cd,α is a constant that only depends on the dimension d and the parameter α. As a consequence, we obtain an analog of Weyl's law (both on functions and forms) for the Kohn Laplacian on M. Our main tools are Folland's description of the spectrum of Lα and Karamata's Tauberian theorem.