The prescribed Hermitian-Yang-Mills flow I
Abstract
In this paper, we introduce a broad class of flows, including the prescribed Hermitian-Yang-Mills flow: ∂ h∂ t=-Λωg( Rh)+P where P∈Γ(M,E*E*) is a prescribed Hermitian tensor associated with a holomorphic vector bundle E over a Kähler (or Hermitian) manifold (M,ωg). We establish the long-time convergence of the flow to a limiting metric h∞ and use it to solve the prescribed Hermitian-Yang-Mills tensor equation Λωg( Rh∞)=P, for a general class of prescribed Hermitian tensors P. The crucial uniform C0-estimate of \h(t)\ along the flow is obtained via a parabolic comparison principle.
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