@article{Jawad2025, 
author = {Muhammad Jawad and Niat Nigar and Sarka Hoskova-Mayerova and Bijan Davvaz and Muhammad Haris Mateen},
title = {Fundamental theorems of group isomorphism under the framework of complex intuitionistic fuzzy set},
year = {2025},
journal = {AIMS Mathematics},
volume = {10},
number = {1},
pages = {1900-1920},
keywords = {complex intuitionistic fuzzy subgroup, complex intuitionistic fuzzy homomorphism, complex intuitionistic fuzzy isomorphism},
url = {https://www.sciopen.com/article/10.3934/math.2025088},
doi = {10.3934/math.2025088},
abstract = {Algebraic homomorphisms are essential mathematical structures that sustain operations across algebraic systems such as groups, rings, and fields. These mappings not only preserve the validity of algebraic operations but also make it easier to investigate structural similarities and equivalences across distinct algebraic entities. In this article, we establish the group isomorphism under the complex intuitionistic fuzzy set, an extended form of the complex fuzzy set that adds the complex degree of non-membership functions, which plays a significant role in the decision-making process. The complex algebraic structure provides effective tools for understanding complex phenomena. We discuss the more intricate features of homomorphism and isomorphism in the framework of a complex intuitionistic fuzzy set. In addition, we introduce the complex intuitionistic fuzzy normal subgroups. We establish the relationship between two complex intuitionistic fuzzy subgroups and analyze of complex intuitionistic fuzzy isomorphisms among these subgroups, proving the important theorems. Furthermore, we establish examples to explore the concept of complex intuitionistic fuzzy subgroups.}
}