An eigenvalue estimate for the ∂-Laplacian associated to a nef line bundle

Abstract

We study the ∂-Laplacian on forms taking values in Lk, a high power of a nef line bundle on a compact complex manifold, and give an estimate of the number of the eigenforms whose corresponding eigenvalues smaller than or equal to λ. In particular, the λ=0 case gives an asymptotic estimate for the order of the corresponding cohomology groups. It helps to generalize the Grauert--Riemenschneider conjecture. At last, we discuss the λ=0 case on a pseudo-effective line bundle.