应用数学2002,Vol.15Issue(2):117-120,4.
实可分Banach空间中K正定算子方程的逼近解
Approximation of a Solution for a K-Positive Definite Operator Equation in Real Separable Banach Spaces
柏传志1
作者信息
- 1. 南京师范大学数学系,江苏,南京,210097
- 折叠
摘要
Abstract
Let E be a real separable Banach space with a strictly convex dual and letA: D(A) ∪ E→E be a K-positive definite operator. Let f ∈ E be arbitrary. A new iterative process with errors is constructed which converges strongly to the unique solution of the equation Ax = f. Our work extends some of the known results in [1,3-4].关键词
可分Banach空间/K正定算子/带误差的迭代过程Key words
Separable Banach space/K-positive definite operator/Iterative process with errors分类
数理科学引用本文复制引用
柏传志..实可分Banach空间中K正定算子方程的逼近解[J].应用数学,2002,15(2):117-120,4.
