Author(s): Rafiqul Islam
Abstract:
Group theory is a fundamental branch of abstract algebra that studies algebraic structures known as groups, which capture the essence of symmetry and transformation in mathematical systems. Originating from attempts to solve polynomial equations, group theory has evolved into a unifying framework with wide-ranging applications across mathematics and the natural sciences. This paper examines the core principles of group theory, including its formal definition, axiomatic foundation, and classification into Abelian and non-Abelian groups. It further explores essential concepts such as subgroups, cyclic groups, group order, homomorphisms, and isomorphisms, along with key results like Lagrange’s theorem. Emphasis is placed on both the theoretical significance and practical relevance of group theory, particularly in fields such as physics, chemistry, and cryptography. By presenting a structured and coherent analysis, the study highlights the role of group theory as a powerful tool for understanding structural relationships and symmetries in diverse domains.
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