Existence of twisted Hermitian-Einstein metrics on unstable vector bundles

Abstract

In this paper, we demonstrate that twisted Hermitian-Einstein metrics on holomorphic vector bundles exist without obstruction. More precisely, for an arbitrary holomorphic vector bundle E over a compact Kähler manifold (M,ωg), we prove that the twisted Hermitian-Einstein equation Λωg(-1Rh) = λh + P admits a unique smooth solution h, provided that P∈Γ(M,E*E*) is positive-definite and λ<λE-. The constant λE- is intrinsically associated with the stability constant of E. This result extends the classical Donaldson-Uhlenbeck-Yau (DUY) theorem for stable bundles and, in the limit P→0, gives a new proof of the DUY theorem. As an application, we obtain an intrinsic Chern number inequality for unstable vector bundles: ∫M ((r-1)c1(E)2 - 2rc2(E)) ωgn-2 ≤ r24 (λE+-λE-)24π2 n2 ∫M ωgn.