Algebraic structures is a branch of mathematics that studies the basic properties and relationships of mathematical structures defined by algebraic operations. These structures include groups, rings, fields, vector spaces, and lattices, among others. The main focus of research in algebraic structures is on understanding the fundamental properties of these structures, their interactions, and generalizations. This area of mathematics plays a crucial role in many other branches of mathematics and has applications in various fields such as computer science, physics, and cryptography. Researchers in algebraic structures aim to develop new theories, methods, and applications related to these mathematical structures.