Degenerating Hermitian metrics, canonical bundle and spectral convergence

Abstract

Let (M,J) be a compact complex manifold of complex dimension m and let gs be a one-parameter family of Hermitian forms on M that are smooth and positive definite for each fixed s∈ (0,1] and that somehow degenerates to a Hermitian pseudometric h for s tending to 0. In this paper under rather general assumptions on gs we prove various spectral convergence type theorems for the family of Hodge-Kodaira Laplacians ∂,m,0,s associated to gs and acting on the canonical bundle of M. In particular we show that, as s tends to zero, the eigenvalues, the heat operators and the heat kernels corresponding to the family ∂,m,0,s converge to the eigenvalues, the heat operator and the heat kernel of ∂,m,0,abs, a suitable self-adjoint operator with entirely discrete spectrum defined on the limit space (A,h|A).