Heat kernel asymptotics for Kodaira Laplacians of high power of line bundle over complex manifolds

Abstract

This paper presents a simple method to prove the heat kernel asymptotics for the Kodaira Laplacian with respect to the high power of a holomorphic Hermitian line bundle (L,hL) over a possibly non-compact Hermitian manifold (M,ω). As a consequence, we give a direct proof of the holomorphic Morse inequalities on covering manifolds. Furthermore, we generalize it to the vector bundle via the L2 Le Potier isomorphism and provide an algebraic version of the holomorphic Morse inequalities. The approach used in this work employs a scaling technique and is applicable to M regardless of its compactness.

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