|
|||||
|
|
| Banach空间中线性算子的Tseng度量广义逆 | |
| 引用本文: | 王玉文(),季大琴(). Banach空间中线性算子的Tseng度量广义逆[J]. 系统科学与数学, 2000, 20(2): 203-209 |
| 作者姓名: | 王玉文() 季大琴() |
| 作者单位: | 哈尔滨师范大学数学系!哈尔滨 150080,海军广州舰艇学院基础部!广州 510431 |
| 基金项目: | 国家自然科学基金,黑龙江省自然科学基金 |
| 摘 要: | 在 Banach空间中,利用 Banach几何方法及度量投影算子,将 E.H.Moors的学生,曾远荣(Y.Y. Tseng)在 Hilbert空间中为线性算子引入的 Tseng广义道,推广到 Banach空间,引入 Tseng度量广义逆(此时的 Tseng度量广义逆一般为齐性算子,而非线性算子),利用 Banach空间对偶映射与广义正交分解定理给出 Tseng度量广义道存在的充分必要条件.讨论了最大Tseng度量广义逆在最优化,控制论及微分方程不适定问题有着直接应用的一些基础性质. |
| 关 键 词: | Banach空间 Tseng度量广义逆 对偶映射 齐性算子 |
THE TSENG-METRIC GENERALIZED INVERSE OF LINEAR OPERATOR IN BANACH SACES |
|
| Yu Wen WANG,Da Qin JI. THE TSENG-METRIC GENERALIZED INVERSE OF LINEAR OPERATOR IN BANACH SACES[J]. Journal of Systems Science and Mathematical Sciences, 2000, 20(2): 203-209 | |
| Authors: | Yu Wen WANG Da Qin JI |
| Affiliation: | (1)Department of Mathematics, Harbin Nomal University, Harbin 150080,P.R.China;(2)Department of Basic Science, Naval Vessels College, Guangzhou 510431,P.R.China |
| Abstract: | The concept of Tseng-metric generalized inverse of linear operator in Banach spaces is introduced in this papert by Tseng Y.Y, a student of E.H. Moors, for Hilbert spaces generalizing that defined. Unlike the case in Hilbert spaces, the Tseng-metric generalized inverse of linear operator in Banach space is usually homogeneous, and nonlinear. By means of the dual mapping and geometric properties of Banach spaces, the necessary and sufficient condition for existence of the Tseng metric generalized inverse is given, and the properties of the maximum Tseng metric generalized inverse is disscused in this paper as well. |
| Keywords: | Banach space Tseng-metric generalized inverse dual mapping homogeneous operator. |
| 本文献已被 CNKI 等数据库收录! | |
| 点击此处可从《系统科学与数学》浏览原始摘要信息 | |
| 点击此处可从《系统科学与数学》下载全文 | |