5.00 credits
0 h + 22.5 h
Q1
This biannual learning unit is being organized in 2022-2023
Teacher(s)
Lederle Waltraud;
Language
English
Prerequisites
Depending on the subject, mathematics skills at the level of the end of the Bachelor in Mathematics or first year Master in Mathematics.
Main themes
The topic considered varies from year to year depending on the research interests of the course instructor.
Learning outcomes
At the end of this learning unit, the student is able to : | |
1 | Contribution of the course to learning outcomes in the Master in Mathematics programme. By the end of this activity, students will have made progress in:
The course aims to initiate research in the field under consideration. Specific learning outcomes vary depending on the field. |
Content
We will treat finitely generated groups as geometric objects. We will look at them from "far away" and study properties that give information about this large-scale perspective.
Our main goal is to prove the following result: If a group is quasi-isometric to a free group, then it contains a free group of finite index.
We will cover group presentations and free groups, groups acting on trees (Bass-Serre theory), Cayley graphs, quasi-isometry, Milnor-Schwarz Lemma and ends of groups.
If time permits, and depending on the interest of the audience, we will talk about growth, Gromov hyperbolicity or some other quasi-isometry invariants.
Our main goal is to prove the following result: If a group is quasi-isometric to a free group, then it contains a free group of finite index.
We will cover group presentations and free groups, groups acting on trees (Bass-Serre theory), Cayley graphs, quasi-isometry, Milnor-Schwarz Lemma and ends of groups.
If time permits, and depending on the interest of the audience, we will talk about growth, Gromov hyperbolicity or some other quasi-isometry invariants.
Bibliography
I expect that everything that we'll cover is contained in the book by Drutu and Kapovich
Faculty or entity
MATH
Programmes / formations proposant cette unité d'enseignement (UE)
Title of the programme
Sigle
Credits
Prerequisites
Learning outcomes
Master [120] in Mathematics