RC-positivity, comparison theorems and prescribed Hermitian-Yang-Mills tensors I
Mingwei Wang, Xiaokui Yang, Shing-Tung Yau
Abstract
In this paper, we solve the prescribed Hermitian-Yang-Mills tensor problem. Let $ E $ be a holomorphic vector bundle over a compact Kähler manifold $(M,ω_g) $. Suppose that there exists a smooth Hermitian metric $ h_0 $ on $E$ such that the Hermitian-Yang-Mills tensor $ Λ_{ω_g}\sqrt{-1} R^{h_0} $ is positive definite. Then for any Hermitian positive definite tensor $ P\in Γ\left(M,E^*\otimes \bar E^*\right) $, there exists a unique smooth Hermitian metric $ h $ on $E$ such that $$Λ_{ω_g} \sqrt{-1} R^h=P.$$ As applications, we obtain quantitative Chern number inequalities applicable to both holomorphic vector bundles and Fano manifolds. The proof is based on a new comparison theorem for Hermitian-Yang-Mills tensors.