- Lecturer: Cornelia Drutu
General Prerequisites:
Some familiarity with Cayley graphs, fundamental group and covering spaces (as for example in the course B3.5 Topology & Groups) would be a helpful though not essential prerequisite.
Course Term: Hilary
Course Lecture Information: 16 lectures.
Course Weight: 1
Course Level: M
Assessment Type: Written Examination
Course Overview:
The aim of this course is to introduce the fundamental methods and problems of geometric group theory and discuss their relationship to topology and geometry.
The first part of the course begins with an introduction to presentations and the list of problems of M. Dehn. It continues with the theory of group actions on trees and the structural study of fundamental groups of graphs of groups.
The second part of the course focuses on modern geometric techniques and it provides an introduction to the theory of Gromov hyperbolic groups.
The first part of the course begins with an introduction to presentations and the list of problems of M. Dehn. It continues with the theory of group actions on trees and the structural study of fundamental groups of graphs of groups.
The second part of the course focuses on modern geometric techniques and it provides an introduction to the theory of Gromov hyperbolic groups.
Course Synopsis:
Free groups. Group presentations. Dehn's problems. Residually finite groups.
Group actions on trees. Amalgams, HNN-extensions, graphs of groups, subgroup theorems for groups acting on trees.
Quasi-isometries. Hyperbolic groups. Solution of the word and conjugacy problem for hyperbolic groups.
If time allows: Small Cancellation Groups, Stallings Theorem, Boundaries.
Group actions on trees. Amalgams, HNN-extensions, graphs of groups, subgroup theorems for groups acting on trees.
Quasi-isometries. Hyperbolic groups. Solution of the word and conjugacy problem for hyperbolic groups.
If time allows: Small Cancellation Groups, Stallings Theorem, Boundaries.