L2 vanishing theorem on some K\"ahler manifolds
Abstract
Let E be a Hermitian vector bundle over a complete K\"ahler manifold (X,ω), CX=n, with a d(bounded) K\"ahler form ω, dA be a Hermitian connection on E. The goal of this article is to study the L2-Hodge theory on the vector bundle E. We extend the results of Gromov's Gro to the Hermitian vector bundle. At last, as an application, we prove a gap result for Yang-Mills connection on the bundle E over X.
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