[论文解读] Second order estimates for equations with sums of Hessian operators on Hermitian manifolds

研究动机与目标

• Motivate and study fully nonlinear complex Hessian equations on compact Hermitian manifolds.
• Establish a priori second-order estimates for admissible solutions under a dynamic plurisubharmonic condition.
• Extend existing Hessian estimate results to equations involving sums of Hessians with gradient terms.
• Handle non-convexity in gradient dependence without requiring convexity of psi in Du.

提出的方法

• Formulate the equation F(lambda)=psi(z,Du,u) with lambda the eigenvalues of the metric g relative to omega.
• Work within the admissible cone Gamma_k^(n+m) and use Real Root Hypothesis (RR) for a polynomial P(t).
• Develop a key concavity inequality (Lemma 3.1) for the complex sum-of-Hessian operator to control third-order negative terms.
• Derive and utilize complex Hessian structural formulas, including F^{p\bar{q}} and F^{p\bar{q},r\bar{s}} computations.
• Perform detailed coordinate computations using the Chern connection on Hermitian manifolds, including commutation relations and derivative estimates.
• Prove the main a priori estimate |D\bar{D}u|_ω ≤ C under hypotheses on χ, ψ, and gradient-structure g.

实验结果