Current teaching
In 2020/2021 I am teaching 2C Introduction to Real Analysis. Detailed course information is
available
on Moodle.
Projects
I am
happy to supervise projects at level 5 related to functional
analysis, geometry and algebra. Please contact me for project
proposals if you are interested.
Various and sundry
Here are old
lecture notes from courses I have been teaching.
Introduction
to
cyclic homology
A short introduction to some basic concepts in cyclic homology,
including background material on homological algebra.
The last chapter contains a detailed proof of the analytical version of
the
Hochschild-Kostant-Rosenberg Theorem. |
K-theory
for
C*-algebras (in
german).
Notes
from a course on operator K-theory, containing a
detailed derivation of the main properties of K-theory for
C*-algebras. Only few examples are discussed though.
|
Quantum
groups and
the Baum-Connes
conjecture
These
notes from lectures I gave in 2010 contain an exposition of
the Baum-Connes conjecture for the dual of SU_q(2). Preliminaries on equivariant KK-theory are explained in
some detail.
|
|