Coupled Anti Q-Fuzzy Subgroups using t-Conorms

IF 1.1 4区 化学 Q4 PHYSICS, ATOMIC, MOLECULAR & CHEMICAL
C. Ampadu
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引用次数: 0

Abstract

In this paper we study coupled anti Q-fuzzy subgroups of G with respect to t-conorm C. We also discuss the union, normal and direct product of them. Moreover, the homomorphic image and pre-image of them is investigated under group homomorphisms and anti homomorphisms. 1 Some Old and New Notions and Notations Remark 1.1. (a) In this paper we assume G is a group as defined in [1]. (b) We assume the notions of homomorphism and anti-homomorphism as defined in [1]. (c) We assume C : [0, 1]× [0, 1] 7→ [0, 1] is a t-conorm as defined in [1]. (d) By idempotent, we refer to t-conorm C as defined in [1]. Definition 1.2. Let G be an arbitrary group with multiplicative binary operation and identity e. By a fuzzy subset of G×G we mean a function from G×G into [0, 1]. The set of all fuzzy subsets of G×G will be called the [0, 1]-power set of G×G, and will be denoted by [0, 1]G×G. Received: February 1, 2021; Accepted: March 7, 2021 2010 Mathematics Subject Classification: 08A72, 20-XX, 47A30, 20N25, 20K27, 20K30.
利用t-正则的耦合反q -模糊子群
本文研究了G关于t-锥型C的耦合反Q-模糊子群,并讨论了它们的并集、正规积和直积。此外,在群同态和反同态下研究了它们的同态映象和预映象。1一些新旧概念和符号注1.1。(a) 在本文中,我们假设G是[1]中定义的一个群。(b) 我们假定了[1]中定义的同态和反同态的概念。(c) 我们假设c:[0,1]×[0,1]7→ [0,1]是如[1]中所定义的t-锥型。(d) 通过幂等性,我们引用了[1]中定义的t-锥型C。定义1.2。设G是一个具有乘法二进制运算和恒等式e的任意群。通过G×G的模糊子集,我们指的是从G×G到[0,1]的函数。G×G的所有模糊子集的集合称为G×G上的[0,1]-幂集,并表示为[0,1]G×G。接收日期:2021年2月1日;受理日期:2021年3月7日2010年数学科目分类:08A72、20-XX、47A30、20N25、20K27、20K30。
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来源期刊
CiteScore
2.40
自引率
7.70%
发文量
16
审稿时长
>12 weeks
期刊介绍: JMS - European Journal of Mass Spectrometry, is a peer-reviewed journal, devoted to the publication of innovative research in mass spectrometry. Articles in the journal come from proteomics, metabolomics, petroleomics and other areas developing under the umbrella of the “omic revolution”.
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