Neutrosophic sets and their variants
On refined neutrosophic finite p-group

Sunday Adesina Adebisi; Florentin Smarandache

Volume 4, Issue 2 , June 2023, , Pages 136-140

https://doi.org/10.22105/jfea.2022.368215.1236

Abstract
  The neutrosophic automorphisms of a neutrosophic groups  G (I) , denoted by Aut(G (I)) is a neu-trosophic group under the usual mapping composition. It is a permutation of  G (I) which is also a neutrosophic homomorphism. Moreover, suppose that X1 = X(G (I)) is the neutrosophic group of inner ...  Read More

Fuzzy sets and their variants
The nilpotent ( p-group) of (D25 X C2n) for m > 5

Sunday Adesina Adebisi; Mike Ogiugo; Michael Enioluwafe

Volume 4, Issue 1 , March 2023, , Pages 1-7

https://doi.org/10.22105/jfea.2022.360304.1231

Abstract
  Every finite p-group is nilpotent. The nilpotence property is an hereditary one. Thus, every finite p-group possesses certain remarkable characteristics. Efforts are carefully being intensified to calculate, in this paper, the explicit formulae for the number of distinct fuzzy subgroups of the cartesian ...  Read More

Fuzzy sets and their variants
The fuzzy subgroups for the nilpotent ( p-group) of (d23 × c2m) for m ≥ 3

Sunday Adesina Adebisi; Mike Ogiugo; Michael Enioluwafe

Volume 3, Issue 3 , July 2022, , Pages 212-218

https://doi.org/10.22105/jfea.2022.337181.1215

Abstract
  A group is nilpotent if it has a normal series of a finite length n. By this notion, every finite p-group is nilpotent. The nilpotence property is an hereditary one. Thus, every finite p-group possesses certain remarkable characteristics. In this paper, the explicit formulae is given for the number of ...  Read More