| 拟Banach空间与K-凸集上Minkowski泛函 |
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| 引用本文: | 徐永春.拟Banach空间与K-凸集上Minkowski泛函[J].河北大学学报(自然科学版),2004,24(4):345-349. |
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| 作者姓名: | 徐永春 |
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| 作者单位: | 河北北方学院,数学系,河北,张家口,075000 |
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| 摘 要: | 拟Banach空间即是完备的赋拟范线性空间,一般的拟Banach空间,不是局部凸的拓扑线性空间.然而,这类非局部凸空间又有其特有的拓扑结构,从而使泛函分析理论中许多基本内容可以建立在这一类空间上.该文讨论了赋拟范线性空间与拟Banach空间基本拓扑结构,尤其是拟范数与K-凸集上MinkowSki泛函的关系.
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| 关 键 词: | 赋拟范线性空间 拟范数 K-凸集 Minkowski泛函 |
| 文章编号: | 1000-1565(2004)04-0345-05 |
| 修稿时间: | 2004年1月25日 |
Quasi-banach Spaces and Minkowski Functional of K-convex |
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| XU Yong-chun.Quasi-banach Spaces and Minkowski Functional of K-convex[J].Journal of Hebei University (Natural Science Edition),2004,24(4):345-349. |
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| Authors: | XU Yong-chun |
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| Abstract: | Quasi-Banach spaces are complete Quasi-normed linear spaces. These spaces are not locally convex linear topological spaces. However these non-locally convex spaces are still with characteristic topologicl structures, so that many fundamental theories on the functional analysis can be established on these spaces. In this paper, the fundamental concepts for quasi-normed linear spaces and theory of cone are studied. |
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| Keywords: | guasi-normed linear space guasi-norm K- convex set Minkowski functional |
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