\(n\)eq -代数的-折叠滤子

IF 0.6 Q2 Arts and Humanities

Bulletin of the Section of Logic Pub Date : 2022-10-14 DOI:10.18778/0138-0680.2022.09

Batoul Ganji Saffar, R. Borzooei, M. Kologani

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引用次数: 1

摘要

在本文中，我们将\（n）-折叠滤子的概念应用于\（EQ）-代数，并在\（EQ\）-代数（\mathcal｛E｝\）上引入\（n \）-折叠正蕴涵滤子（蕴涵、顽固、奇异）（前）的概念。然后我们研究了它们之间的一些性质和关系。我们证明了由（EQ）-代数（\mathcal｛E｝）的1倍正蕴涵滤子构成的商结构（\mathcal{E｝/F）是一个好的EQ-代数，由好的EQ-代数的1倍奇异滤子形成的商结构是（IEQ）-代数。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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\(n\)-fold filters of EQ-algebras

In this paper, we apply the notion of \(n\)-fold filters to the \(EQ\)-algebras and introduce the concepts of \(n\)-fold positive implicative (implicative, obstinate, fantastic) (pre)filter on an \(EQ\)-algebra \(\mathcal{E}\). Then we investigate some properties and relations among them. We prove that the quotient structure \(\mathcal{E}/F\) that is made by an 1-fold positive implicative filter of an \(EQ\)-algebra \(\mathcal{E}\) is a good \(EQ\)-algebra and the quotient structure \(\mathcal{E}/F\) that is made by an 1-fold fantastic filter of a good \(EQ\)-algebra \(\mathcal{E}\) is an \(IEQ\)-algebra.

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来源期刊

Bulletin of the Section of Logic Arts and Humanities-Philosophy

CiteScore

0.90

自引率

0.00%

发文量

审稿时长

8 weeks