Intuitionistic fuzzy lattice ordered G-modules
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Date
2024
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Journal of Fuzzy Extension and Applications
Abstract
The investigation of mathematics underlines accuracy, precision, and flawlessness, yet in numerous genuine
circumstances, individuals face equivocalness, ambiguity, imprecision, and so forth. Intuitionistic fuzzy set
theory, rough set theory, and soft set theory are three noble techniques in mathematics that are utilised
for decision-making in vague and uncertain information systems. Intuitionistic fuzzy algebra-based math
plays a huge part in the current era of mathematical research, and it deals with the algebraic concepts
and models of intuitionistic fuzzy sets. The investigation of different ordered algebraic structures, like
lattice-ordered groups, Riesz spaces, etc., is of great importance in algebra. The theory of lattice-ordered
G-modules is very useful in the study of lattice-ordered groups and similar algebraic structures. In
this article, the theories of intuitionistic fuzzy sets and lattice-ordered G-modules are synchronised in
a reasonable way to develop a novel concept in mathematics, i.e., intuitionistic fuzzy lattice-ordered
G-modules, which would pave the way for new researchers in intuitionistic fuzzy mathematics to explore
much more in this field.