This book is designed for aspirants of the CSIR NET (JRF) in Mathematical Sciences, with a focused approach on topology-an essential part of the exam syllabus. It aims to provide students with a deep understanding of fundamental topological concepts, structured across four well-organized chapters.
Chapter 1 begins with the foundations of basic topology, introducing the concept of topological spaces and the basis for a topology. The chapter further discusses dense sets and their significance in analysis, equipping students with core tools essential for deeper mathematical exploration.
Chapter 2 addresses subspace and product topology, starting with the definition and examples of subspace topology and moving towards the construction of product topology through Cartesian products. This chapter provides clarity on these key constructions, helping students grasp their practical applications in both theoretical and applied contexts.
Chapter 3 explores the separation axioms-including T₀, T₁, and T₂-with particular emphasis on Hausdorff spaces. These axioms are pivotal for distinguishing between different types of topological spaces and are of great importance in both analysis and geometry, making them critical for exam preparation.
Chapter 4 delves into two of the most significant concepts in topology: connectedness and compactness. It provides an in-depth discussion on connected sets, which help define the structure of topological spaces, and the concept of compactness, which plays a vital role in analysis, particularly in ensuring the existence of limit points and convergence in various contexts.
Throughout the book, each concept is accompanied by detailed examples and exercises, allowing students to apply the theory and strengthen their problem-solving skills. The goal is to provide a clear, systematic guide that will enable students to build a solid foundation in topology and approach the CSIR NET (JRF) exam with confidence.
