摘要
利用不变积分核(Berndtsson核),复Finsler度量和联系于Chern-Finsler联络的非线性联络,研究复Finsler流形上具有逐块光滑C^((1))边界的有界域上(p,q)型微分形式的积分表示,得到了(p,q)型微分形式的Koppelman-Leray-Norguet公式和■-方程的解.作为应用,利用复Finsler度量和联系于Chern-Finsler联络的非线性联络,给出了Stein流形上具有逐块光滑C^((1))边界的有界域上(p,q)型微分形式的Koppelman- Leray-Norguet公式以及■-方程的解,并且得到了Stein流形上实非退化强拟凸多面体上(p,q)型微分形式的积分表示式和■-方程的解.
By means of the invariant integral kernel (the Berndtsson kernel), complex Finsler metric and non-linear connection associated with Chern-Finsler connection to research the integral representations for the differential forms of type (p, q) on a bounded domain with piecewise smooth C^(1) boundaries on a complex Finsler manifold, the Koppelman-Leray-Norguet formulas are obtained, and the R-equations are solved. As an application, with the help of the complex Finsler metric and non-linear connection associated with Chern-Finsler connection, we give the Koppelman-Leray-Norguet formulas of (p, q) differential forms and the solutions of δ-equation on a bounded domain with piecewise smooth C^(1) boundaries on a Stein manifold. Moreover, we obtain the integral formulas of (p, q) differential forms and the solutions of δ-equation on a real non-degenerate strictly pseudoconvex polyhedra on a Stein manifold.
出处
《数学学报(中文版)》
SCIE
CSCD
北大核心
2007年第3期641-652,共12页
Acta Mathematica Sinica:Chinese Series
基金
国家自然科学基金(10271097
10571144)
厦门大学新世纪优秀人才支持计划
