摘要
本文主要刻画了定义于偶数维欧氏空间中光滑曲面而取值于复Clifford代数的isotonic柯西型积分的边界性质.对具有H(o|¨)lder密度函数的isotonic柯西型积分,得到了Privalov定理和Sokhotskii-Plemelj公式,并证明了多复变函数论中经典Bochner-Martinelli型积分的Privalov定理和Sokhotskii-Plemelj公式为其特殊情形.
The holomorphic functions of several complex variables are closely related to the so-called isotonic Dirac system in which different Dirac operators in the half dimension act from the left and from the right on the functions considered.In this paper we mainly study the boundary properties of the isotonic Cauchy type integral operator over the smooth surface in Euclidean space of even dimension with values in a complex Clifford algebra.We obtain Privarlov tneorem inducing Sokhotskii-Plemelj formula as the special case for the isotonic Cauchy type integral operator with H(o|¨)lder density functions taking values in a complex Clifford algebra,and show that Privalov theorem of the classical Bochner-Martinelli type integral and the classical Sokhotskii-Plemelj formula over the smooth surface of Euclidean space for holomorphic functions of several complex variables may be derived from it.
出处
《数学学报(中文版)》
SCIE
CSCD
北大核心
2011年第2期177-186,共10页
Acta Mathematica Sinica:Chinese Series
基金
国家863项目(2009AA011906)
国家自然科学基金资助项目(10871150,60873249)
博士后基金(20090460316,201003111)
