Topology IV.b - homotopy theory
Summary
We propose an introduction to homotopy theory for topological spaces. We define higher homotopy groups and relate them to homology groups. We introduce (co)fibration sequences, loop spaces, and suspensions. We study long exact sequences. We construct Eilenberg-Mac Lane spaces.
Content
1. Higher homotopy groups
2. Cofibrations and fibrations
3. Loop spaces and suspension
4. Long exact sequences for homotopy groups
5. Eilenberg-Mac Lane spaces
6. Hurewicz homomorphism
Keywords
Homotopy groups, Cofibrations and fibrations, Loop spaces and suspension, Long exact sequence, Eilenberg-Mac Lane space, Hurewicz homomorphism
Learning Prerequisites
Required courses
Topology I, II, and II, Group Theory, Rings and Fields
Recommended courses
Rings and modules
Important concepts to start the course
Fundamental group, Homology groups, cell complexes, excision in homology
Learning Outcomes
By the end of the course, the student must be able to:
- Perform elementary computations of homotopy groups
- Compare homotopy with homology groups
- Define the notions introduced in the course
- State the main theorems and prove them
- Manipulate fibrations and cofibrations
- Apply the tools developed in the course to examples
Teaching methods
ex-cathedra teaching, exercise classes
Expected student activities
Attend the lectures and exercise sessions, solve exercises, hand in homework, prepare a presentation
Assessment methods
The final grade will be assigned based on:
20% - homework in groups
20% - oral presentation during an exercise session
60% - written exam
Dans le cas de l'art. 3 al. 5 du Règlement de section, l'€™eantdécide de la forme de l'€™examen qu'€™il communique aux étudiants concernés.
Supervision
| Office hours | Yes |
| Assistants | Yes |
| Forum | Yes |
Resources
Bibliography
Algebraic Topology, Allen Hatcher
Algebraic Topology, Tammo Tom Dieck
Algebraic Topology, Edwin Spanier
Introduction to Homotopy Theory, Paul Selick
Modern Classical Homotopy Theory, Jeffrey Strom
Ressources en bibliothèque
- Algebraic Topology / Dieck
- Introduction to Homotopy Theory / Selick
- Algebraic Topology / Hatcher
- Algebraic Topology / Spanier
Moodle Link
In the programs
- Semester: Spring
- Exam form: Written (summer session)
- Subject examined: Topology IV.b - homotopy theory
- Lecture: 2 Hour(s) per week x 14 weeks
- Exercises: 2 Hour(s) per week x 14 weeks
- Type: optional
- Semester: Spring
- Exam form: Written (summer session)
- Subject examined: Topology IV.b - homotopy theory
- Lecture: 2 Hour(s) per week x 14 weeks
- Exercises: 2 Hour(s) per week x 14 weeks
- Type: optional
- Semester: Spring
- Exam form: Written (summer session)
- Subject examined: Topology IV.b - homotopy theory
- Lecture: 2 Hour(s) per week x 14 weeks
- Exercises: 2 Hour(s) per week x 14 weeks
- Type: optional
Reference week
| Mo | Tu | We | Th | Fr | |
| 8-9 | |||||
| 9-10 | |||||
| 10-11 | |||||
| 11-12 | |||||
| 12-13 | |||||
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| 14-15 | |||||
| 15-16 | |||||
| 16-17 | |||||
| 17-18 | |||||
| 18-19 | |||||
| 19-20 | |||||
| 20-21 | |||||
| 21-22 |
Légendes:
Lecture
Exercise, TP
Project, labs, other