Topology -  MATH 302

Class Meeting: Wednesday:10:00 - 12:00

1. University Course Catalog Description

Topological space, open sets, closed sets, derived set, interior, closure. T1 spaces and Hausdorff spaces. Subspace toplogy, convergence, metric Topology. Continuous functions, basis and subbasis, homeomorphisms, open maps, closed maps. Compactness, connectedness, seperation axioms, product toplogy

2. Course Objectives

By the end of the course, students will be able to

    - Learn basic concepts about  topological spaces.
    - Learn about  concepts of open, closed and compact spaces
    - Learn examples of different topologies on R

3. Required Texts and Materials

         Topology / James R. Munkres. - 2nd ed. - New Jersey : Prentice Hall, 2000

   Supplementary (Optional) Texts and Materials

    - Stephen Willard, General Toplogy, Dover Pubns,2004).
    - Stephen Gaa, Point Set Topology, Dover Pubns, 2009

Download course syllabus as PDF