摘要
利用局部化技巧及李轮焕结果,研究了Stein流形上实非退化Weil多面体积分表示的边界性质,得到Coxo-Plemelj公式及其边界值的连续性。
In this paper, by means of the technique of localization & the results of Li Lunhuan,the authors study the boundary behaviour of integral representation on the real nondegenerate Weil polyhedron on Stein manifolds. The -Plemelj formula and continuous character of boundary value are obtained.
出处
《厦门大学学报(自然科学版)》
CAS
CSCD
北大核心
1991年第3期235-238,共4页
Journal of Xiamen University:Natural Science
基金
国家自然科学基金
关键词
STEIN流形
Weil多面体
积分
边界值
Stein manifolds , real nondegenerate, Weil polyhedron, Coxoukim-Plemelj formula, the technique of ocalization
