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Cohomological Methods in Group Theory
Last Updated: 2026-02-05 16:22:19
Abstract
Nachdiplom lecture
Content
Group cohomology is an area of mathematics relying on a rich interaction between algebra and topology. In this course we will introduce some important concepts in group cohomology using both algebraic and topological methods. In particular, we shall cover: - Definition of group cohomology (for discrete groups) via free resolutions (necessary background in homological algebra will be introduced). - Topological interpretation, group presentations, the presentation-2-complex, Eilenberg-Mac Lane spaces - Cohomological finiteness conditions (for discrete groups): cohomological dimension, groups of type FP, groups of type F, Brown’s criterion - Totally disconnected locally compact (tdlc) groups - Discrete cohomology for tdlc groups - Overview of finiteness conditions for tdlc groups - Classifying spaces for families of subgroups and their finiteness conditions/ Bredon cohomology (for discrete and tdlc groups)
General Information
- Language
- English
- Levels
- DR
Examination
- Type
- ungraded semester performance
Course Components
| Type | Title | Time & Place | Hours |
|---|---|---|---|
| lecture |
Cohomological Methods in Group Theory
If you would like to attend the lecture please register by 24 February. For the registration form see
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24 h semesterly |
Offered In
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Doctorate Mathematics (More Information at: )
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Subject Specialisation (The list of courses (together with the allocated credit points) eligible for doctoral students is published each semester in the newsletter of the ZGSM.)
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Graduate School (Official website of the Zurich Graduate School in Mathematics: )
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