On Lusin's theorem for non-additive measures that take values in an ordered topological vector space

Toshikazu Watanabe; Tamaki Tanaka

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On Lusin's theorem for non-additive measures that take values in an ordered topological vector space

机译：关于在有序拓扑向量空间中取值的非加法测度的卢辛定理

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摘要

Lusin's theorem was established for real-valued monotone measures under an equivalent condition to Egoroff's theorem recently. In this paper, we show that the same result remains valid for non-additive measures that take values in an ordered topological vector space. We apply our result to several ordered topological vector spaces.

机译：Lusin定理是在最近与Egoroff定理等效的条件下建立的，用于实值单调测度。在本文中，我们表明，对于在有序拓扑向量空间中采用值的非可加测度，相同的结果仍然有效。我们将结果应用于几个有序的拓扑向量空间。

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来源
《Fuzzy sets and systems》 |2014年第1期|41-50|共10页
作者
Toshikazu Watanabe; Tamaki Tanaka;
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作者单位

Graduate School of Science and Technology, Niigata University, 8050, Ikarashi 2-no-cho, Nishi-ku, Niigata, 950-2181, Japan;

Graduate School of Science and Technology, Niigata University, 8050, Ikarashi 2-no-cho, Nishi-ku, Niigata, 950-2181, Japan;

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收录信息美国《科学引文索引》(SCI);美国《工程索引》(EI);
原文格式 PDF
正文语种 eng
中图分类
关键词
Non-additive measure; Egoroff's theorem; Lusin's theorem; Ordered vector space; Locally full topology; Pseudometric generating property;

机译：非累加措施;埃戈罗夫定理;鲁辛定理;有序向量空间;本地完整拓扑;伪计量生成属性;
入库时间 2022-08-18 02:59:07

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1. On a sufficient condition of Lusin's theorem for non-additive measures that take values in an ordered topological vector space [J] . Toshikazu Watanabe, Toshiharu Kawasaki, Tamaki Tanaka Fuzzy sets and systems . 2012,第期

机译：在Lusin定理的充分条件下，可以对有序拓扑向量空间中的值进行非加法
2. On sufficient conditions for the Egoroff theorem of an ordered topological vector space-valued non-additive measure [J] . Toshikazu Watanabe Fuzzy sets and systems . 2011,第1期

机译：有序拓扑向量空间值非可加测度的Egoroff定理的充分条件
3. Lusin's Theorem for monotone set-valued measures on topological spaces [J] . Wu Yi, Wu Jian-Rong Fuzzy sets and systems . 2019,第JUNa1期

机译：拓扑空间上单调集值度量的Lusin定理
4. On Lusin's Theorem for Non-additive Measure [C] . Tamaki Tanaka, Toshikazu Watanabe Nonlinear mathematics for uncertainty and its applications . 2011

机译：关于非加性度量的卢辛定理
5. Finite point configurations and projection theorems in vector spaces over finite fields [D] . Chapman, Jeremy 2010

机译：有限域上向量空间中的有限点配置和投影定理
6. Fixed-point and Minimax Theorems in Locally Convex Topological Linear Spaces [O] . Ky Fan 1952

机译：局部凸拓扑线性空间中的不动点定理和极小极大定理
7. Two Fixed Point Theorems in Topological vector space Valued Cone Metric Spaces with Complete Topological Algebra Cones [O] . Tadesse Bekeshie Tadesse Bekeshie 2012

机译：具有完全拓扑代数锥体的拓扑矢量空间值锥形度量空间的两个固定点定理
8. Constrained minimization under vector-valued criteria in linear topological spaces [R] . Da Cunha, N. O., Polak, E. 1967

机译：线性拓扑空间中向量值准则下的约束最小化

On Lusin's theorem for non-additive measures that take values in an ordered topological vector space

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