MATH-323 / 5 credits

Teacher: Monin Leonid

Language: English


Summary

Homology is one of the most important tools to study topological spaces and it plays an important role in many fields of mathematics. The aim of this course is to introduce this notion, understand its properties and learn how to compute it. There will be many examples and applications.

Content

- Simplicial and singular homology

- Exact sequences and excision

- Mayer-Vietoris sequence

- Eilenberg-Steenrod axioms

- CW complexes

- Cellular homology

- Cohomology

 

 

 

Keywords

Homology, cohomology, cell complexes

Learning Prerequisites

Required courses

 

- Metric and topological spaces

- Topology

 

 

Learning Outcomes

By the end of the course, the student must be able to:

  • Define the main concepts introduced in the course
  • State the theorems covered in the course and give the main ideas of their proofs
  • Apply the results covered in the course to examples
  • Compute the homology groups of CW complexes
  • Prove easy topological facts
  • Express topological arguments

Teaching methods

lectures, exercise classes

Expected student activities

Attending the course, homework assignments, participating atively in the course and the exercise

 

 

 

Assessment methods

Exam written

Supervision

Office hours Yes
Assistants Yes
Forum Yes

Resources

Moodle Link

In the programs

  • Semester: Spring
  • Exam form: Written (summer session)
  • Subject examined: Topology III - Homology
  • Lecture: 2 Hour(s) per week x 14 weeks
  • Exercises: 2 Hour(s) per week x 14 weeks
  • Type: optional

Reference week

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