A power weighted ineguality for sublinear operator over locally compact vilenkin groups 群上次线性算子的一个加幂权不等式
Complete linear operator 完全线性算子
Weighted inequalities for a class of sublinear operators over locally compact vilenkin groups 群上一类次线性算子的加权不等式
Oint linear operator 伴随线性算子
Closed linear operator 闭线性算子
In this dissertation , the boundedness for a class of sublinear operators are mainly considered 本文主要讨论一类次线性算子的有界性。
The spectral theory of bounded linear operaors is an important direction in functional analysis 线性算子的谱理论是泛函分析中很重要的一个研究方向。
And also we characterize the linear operators that strongly preserve commuting pairs of matrices over boolean algebras 同时也刻画了布尔代数上强保持交换矩阵对的线性算子
Among these works , the linear operators concerned are linear operators on matrix spaces over some fields or rings 在这些工作里我们看到所涉及到的线性算子主要是在域或环上的矩阵空间上的线性算子
In the same way as above , we characterize linear operators that strongly preserve commuting pairs of matrices over general boolean algebras 利用和上述同样的方法,我们刻画了在一般布尔代数上强保持交换矩阵对的线性算子
