关于正交可加带算子和正交可加不相交保持算子

IF 0.8 4区 数学 Q2 MATHEMATICS Turkish Journal of Mathematics Pub Date : 2023-01-01 DOI:10.55730/1300-0098.3425
Bahri̇ Turan, Demet Tülü
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引用次数: 0

摘要

设M和N为阿基米德向量格。引入M ~ N范围内的正交加性带算子和正交加性逆带算子,并研究了它们的性质。研究了正交加性带算子与正交加性保持不连算子之间的关系,证明了在向量格M或N的某些假设下,这两类算子是相同的。利用这一关系,我们证明了如果µ是一个双射正交加性带算子。从M到N的正交加性不相交保持算子,则µ−1:N→M是一个正交加性带算子。正交加性不相交保持算子)。
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On orthogonally additive band operators and orthogonally additive disjointness preserving operators
: Let M and N be Archimedean vector lattices. We introduce orthogonally additive band operators and orthogonally additive inverse band operators from M to N and examine their properties. We investigate the relationship between orthogonally additive band operators and orthogonally additive disjointness preserving operators and show that under some assumptions on vector lattices M or N , these two classes are the same. By using this relation, we show that if µ is a bijective orthogonally additive band operator (resp. orthogonally additive disjointness preserving operator) from M into N then µ − 1 : N → M is an orthogonally additive band operator (resp. orthogonally additive disjointness preserving operator).
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来源期刊
CiteScore
1.80
自引率
10.00%
发文量
161
审稿时长
6-12 weeks
期刊介绍: The Turkish Journal of Mathematics is published electronically 6 times a year by the Scientific and Technological Research Council of Turkey (TÜBİTAK) and accepts English-language original research manuscripts in the field of mathematics. Contribution is open to researchers of all nationalities.
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