摘要
矩阵是高等代数的重要内容,伴随矩阵在矩阵运算和应用中起着非常重要的作用.关于伴随矩阵的特征值与特征向量,朱焕、关丽杰、范惠玲给出了这方面的3个性质;张建航、李宗成、贾云锋、张毅敏、黎勇、王松华又给出了类似的3个性质.这里将其综合并推广到k-伴随矩阵的情形.
Matrix is very important in advance algebra, and adjoint matrix plays a very key role in matrix operation and application. As to Characteristic value and characteristic vector of adjoint matrix, Zhu huan, Guan Lijie, Fan Huiling gave the three natures of this as- pect; Zhang Jianhang, Li Zongcheng, Jia Yun feng, Zhang Yimin, Li Yong and Wang Songhua also gave three similar natures. The auth- or of this paper consolidates and extendeds to its k-adjoint matrix case.
出处
《合肥师范学院学报》
2013年第5期82-83,87,共3页
Journal of Zunyi Normal University
基金
贵州省自科项目(黔科合J字LKZS[2012]08号)
贵州省社科规划项目(12GZZC37)
贵州省教育厅资助项目(黔教科(2011)050
2010B038)
合肥师范学院资助项目(2010001
10ZYJ031)
关键词
伴随矩阵
k-伴随矩阵
特征值
特征向量
adjoint matrix
k-adjoint matrix
characteristic value
characteristic vector
