Cornell Math - Math 651 (SP01)
Math 651 — Spring 2001
Introduction to Algebraic Topology
| Instructor: | Marshall Cohen |
| Time: | MW 3:10–4:25 |
| Room: | MT 207 (M); MT 206 (W) |
Course Outline:
- INTRODUCTION: Categories and Functors
(wherein we learn to trade hard problems for easier ones)
- Homotopy and the fundamental group
(the first functor in topology)
- Covering spaces
(the geometric expression of fundamental groups; natural objects in complex analysis and combinatorial group theory)
- CW and simplicial complexes
(spaces which are built of cells; ideal for a combinatorial analysis)
- Simplicial homology
(a functor which associates to each simplicial complex a graded abelian group)
- The homology process
(the algebra motivated by Part 5)
- Singular homology
(a homology functor for arbitrary spaces; application of this to get cellular homology - the homology of CW complexes)
- Applications
(Lefschetz fixed point theorem, Jordan-Brouwer separation theorem, invariance of domain, etc.)
Prerequisite: Mathematics 453 (Introduction to Topology) and Mathematics 434 (Honors Algebra — in particular the basics of group theory).