Nilpotency and Theory of<i>L</i>-Subgroups of an<i>L</i>-Group

Ajmal, Naseem; Jahan, Iffat

doi:10.1016/j.fiae.2014.06.001

Cited by 12 publications

(14 citation statements)

References 14 publications

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“…Here we also mention that the dual of completely distributive law is valid in a completely distributive lattice whereas the infinitely meet and join distributive laws are independent from each other. Next, we recall the following from [1,2,5,8,13,17]:…”

Section: Preliminariesmentioning

confidence: 99%

“…Remark 1. In order to study the level subsets of maximal L-subgroups of an L-group, we recall the notion of jointly supstar L-subsets from [5]. It is worthwile to mention here that this notion is a generalization of the noion of sup-property and lends itself easily for applications Proposition 3.3.…”

Section: Preliminariesmentioning

confidence: 99%

“…However, in the studies of fuzzy groups such an effort is lacking. Recently, a systematic study of L-subgroups (lattice valued fuzzy subgroups) of an L-group has been carried out in a series of papers [3,4,5,6,7] wherein a number of concepts of classical group theory have been extended to L-setting specially keeping in view their compatibility. The present paper is an endeavour to develop and study the maximal L-subgroup of an L-group along with its application to the notion of Frattini subgroups.…”

Section: Introductionmentioning

confidence: 99%

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Maximal and Frattini L-Subgroups of an L-Group

Jahan¹,

Manas²

2020

Preprint

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In this paper, the concept of a maximal L-subgroup of an L-group has been defined in the spirit of classical group theory. Then, a level subset characterization has been established for the same. Then, this notion of maximal L-subgroups has been used to define Frattini L-subgroups. Further, the concept of non-generators of an L-group has been developed and its relation with the Frattini L-subgroup of an L-group has been established like their classical counterparts. Moreover, several properties pertaining to the concepts of maximal L-subgroups and Frattini L-subgroup have also been investigated. These two notions have been illustrated through several examples.

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Section: Preliminariesmentioning

confidence: 99%

Section: Preliminariesmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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Maximal and Frattini L-Subgroups of an L-Group

Jahan¹,

Manas²

2020

Preprint

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“…In this paper, we present a systematic and successful development of L-group theory which has been made in papers [2][3][4][5][6][7]10]. The important concepts of nilpoent L-subgroups, solvable L-subgroups have been introduced and studied and their inter-relationship is established in [3,6]. Moreover, the concept of normalizer of an L-subgroup in an L-group is formulated in [2].…”

Section: Introductionmentioning

confidence: 99%

“…Let L be an upper well ordered chain and η, θ ∈ L µ . Then, η and θ are jointly supstar if and only if η and θ possess sup-property.Below, we recall the definition of descending central chain of an L-subgroup η of µ from[3]:Take γ 0 (η) = η, γ 1 (η) = [γ 0 (η), η].And in general, for each i, we defineγ i (η) = [γ i−1 (η), η]. Proposition 9.…”

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confidence: 99%

Subnormality and Theory of L-subgroups

Jahan¹,

Ajmal²,

Davvaz³

2022

Eur. J. Pure Appl. Math.

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The main focus in this work is to establish that L-group theory, which uses the language of functions instead of formal set theoretic language, is capable of capturing most of the refined ideas and concepts of classical group theory. We demonstrate this by extending the notion of subnormality to the L-setting and investigating its properties. We develop a mechanism to tackle the join problem of subnormal L-subgroups. The conjugate L-subgroup as is defined in our previous paper [4] has been used to formulate the concept of normal closure and normal closure series of an L-subgroup which, in turn, is used to define subnormal L-subgroups. Further, the concept of subnormal series has been introduced in L-setting and utilized to establish the subnor-mality of L-subgroups. Also, several results pertaining to the notion of subnormality have been established. Lastly, the level subset characterization of a subnormal L-subgroup is provided after developing a necessary mechanism. Finally, we establish that every subgroup of a nilpotent L-group is subnormal. In fact, it has been exhibited through this work that L-group theory presents a modernized approach to study classical group theory.

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An L-Point Characterization of Normality and Normalizer of an L-Subgroup of an L-Group

Ajmal¹,

Jahan²

2014

Fuzzy Information and Engineering

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Nilpotency and Theory ofL-Subgroups of anL-Group

Cited by 12 publications

References 14 publications

Maximal and Frattini L-Subgroups of an L-Group

Maximal and Frattini L-Subgroups of an L-Group

Subnormality and Theory of L-subgroups

An L-Point Characterization of Normality and Normalizer of an L-Subgroup of an L-Group

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