Rad−⊕−补充晶格

IF 0.9 4区数学 Q1 Mathematics

Miskolc Mathematical Notes Pub Date : 2023-01-01 DOI:10.18514/mmn.2023.4030

Ç. Biçer, C. Nebiyev

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引用次数: 0

摘要

．本文定义了Rad−⊕-补充格和强Rad−⊕-补充格，并给出了这些格的一些性质。我们将Rad−⊕−补充模的一些性质推广到格上。设L是一个晶格，1 = a 1⊕a 2⊕…★★★★★★★★★， a n∈L。如果a i / 0为Rad−⊕−，对于每个i = 1,2，…，则L也是Rad−⊕−的补充。设L是一个分布的Rad−⊕−补格。则对于每一个u∈L, 1 / u为Rad−⊕−补充。我们还定义了完全Rad−⊕-补充格，并证明了所有具有SSP性质的Rad−⊕-补充格都是完全Rad−⊕-补充格。

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Rad−⊕−supplemented lattices

. In this work, we deﬁne Rad −⊕− supplemented and strongly Rad −⊕− supplemented lattices and give some properties of these lattices. We generalize some properties of Rad − ⊕ − supplemented modules to lattices. Let L be a lattice and 1 = a 1 ⊕ a 2 ⊕ ... ⊕ a n with a 1 , a 2 ,..., a n ∈ L . If a i / 0 is Rad −⊕− supplemented for every i = 1 , 2 ,..., n , then L is also Rad −⊕− supplemented. Let L be a distributive Rad −⊕− supplemented lattice. Then 1 / u is Rad −⊕− supplemented for every u ∈ L . We also deﬁne completely Rad −⊕− supplemented lattices and prove that every Rad −⊕− supplemented lattice with SSP property is completely Rad −⊕− supplemented.

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来源期刊

Miskolc Mathematical Notes Mathematics-Algebra and Number Theory

CiteScore

2.00

自引率

0.00%

发文量

期刊介绍： Miskolc Mathematical Notes, HU ISSN 1787-2405 (printed version), HU ISSN 1787-2413 (electronic version), is a peer-reviewed international mathematical journal aiming at the dissemination of results in many fields of pure and applied mathematics.