Iterative construction of Hermitian-Einstein metrics on stable bundles

Abstract

Let E be a stable holomorphic vector bundle over a compact Kähler (or Gauduchon) manifold (M,ωg). We show that for any real number μ>0 and any initial Hermitian metric h0 on E, there exists a unique iteration sequence \hm\ satisfying Λωg(-1Rhm+1) =(λE-μ)hm+1+μhm, and \hm\ converges smoothly to a Hermitian-Einstein metric h∞ on E satisfying Λωg(-1Rh∞) =λEh∞, where λE∈ R is the stability constant. A key feature of this proof is that it is independent of Donaldson's variational framework and applies to non-Kähler manifolds.