泛函分析中一种重要的算子。 算子(映射)有线性和非线性之分.线性算子又分为有界和无界两类,有界线性算子是线性赋范空问的基本概念。
Using James theorem, we prove that the natural extension of the bounded linear operator on Banach space is continuous on hyperspace such as W_k ( X )and W_(kc)( X ).
利用James定理,证明了Banach空间上的有界线性算子的在W_k ( X ), W_(kc)( X )等超空间上的自然扩张映射也是连续的。
参考来源 - 几种超空间动力系统的拓扑传递性·2,447,543篇论文数据,部分数据来源于NoteExpress
本文研究积分双半群与有界线性算子双半群的关系。
The relationship between integrated bisemigroups and bisemigroups of linear bounded operators is investigated.
证明了模糊赋范空间上有界线性算子的一个保范延拓定理。
Naught space properties of compact linear operator in normed space;
结论算子范数对于估计有界线性算子乘积与和的谱半径是至关重要的。
Conclusion Norm of operator is very important to estimate the spectral radius of operator.
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