Course: MAT 382 2.0 Topology (Compulsory)
Course Content:
Some Basics of Real valued functions; Usual Topology on the Real line; Topology of the plane; Definition and examples of a Topological Space, Interior, Cluster points, Closure, Bases for a Topological space; Metric spaces; Metrization; Properties of Metric spaces; Subspaces; Seperation; Convergence of a sequence in a Topological space.
Recommended Readings:
- Topology – James R Munkres
- Basic Topology – M A Armstrong (Springer)
- Introduction to Topology (2nd ed) TW Gamelin and RE Greene (Dover Publications)