TOPOLOGY II

MATH 550A--Fall 2009

1. SCHEDULE: Tu Th 4:00-5:30 pm     LOCATION: LA5-151     SCHEDULE CODE: 6492
   

2. INSTRUCTOR: S. Watson
   OFFICE: FO3-200   OFFICE PHONE: 562-985-5784
   OFFICE HOURS:  T Th 3:00-3:50 pm and  T 6:00- 6:50 pm, and by appointment
   E-MAIL: saleem@csulb.edu   WEBSITE:  www.csulb.edu/~saleem
   

3. PREREQUISITES: MATH 361B
   

4. TEXTBOOK: Algebraic Topology: An Introduction, by W. S. Massehy, Springer (ISBN: 0387902716)
   

5. COURSE CONTENT: We will study basic concepts in homotopy theory and homology theory for compact manifolds. Homotopy: the fundamental group, Brower's fixed point theorem, homotopy equivalence, free groups and group presentations, Seifert-Van Kampen theorem, topological groups and group actions, covering spaces. Homology: complexes and polyhedra, simplicial homology, Euler-Poncare theorem, simplicial approximation and induced homomorphisms, Brower-Poincare theorem, the Lefschetz fixed-point theorem. The relationship between the fundamental group and the first homotopy group, Cech homology and the invariance of the homology groups. 
   

6. GRADING: Grades will be based on assignments and in-class presentations.
   

7. REFERENCES: 
   1. F. Croom, Basic Concepts of Algebraic Topology, Springer-Verlag.
   2. J. G. Hocking and G. S. Young, Topology, Addison-Wesley.
   3. M. A. Armstrong, Basic Topology, Springer-Verlag.
   4. Stillwell, Classical Topology and Combinatorial Group Theory, Springer-Verlag.
   5. J. Dieudonne, History of Algebraic and Differential Topology 1900-1960, Springer-Verla