摘要
本文运用k次剩余理论以及关于素模同余式解数的Lagrange定理,将模p缩系上Wilson定理和Wolstenholme定理推广到它的子系上,得到一系列有趣的对模p、模p2的同余关系.最后。
In this article, the techniques are based on the theory of kth residue and the related Lagrange theorem. Results generalize to its subsystems of residue with respect mod to p congruence relations in Wilson theorem and Wolstenholme theorem. As an example, an application to p=17 is given.
出处
《数学学报(中文版)》
SCIE
CSCD
北大核心
1997年第6期947-950,共4页
Acta Mathematica Sinica:Chinese Series
基金
国家自然科学基金
关键词
同余关系
模
子系
剩余系
WILSON定理
k residue subsystem, ksymmetricsubsystem, 2k restricted irresidual subsystem, Congruence relation
