Responsible: Christian Bär
This lecture course will introduce to the analysis on manifolds. We will first learn about fundamental analytic concepts such as Sobolev and Hölder spaces of functions on manifolds, linear and nonlinear elliptic differential operators and their regularity theory, the maximum principle and the like. Then we will apply those tools to study two famous problems. Firstly, the Yamabe problem deals with finding a geometrically nice metric on a manifold. More precisely, given any metric we want to apply a conformal change to make it have constant scalar curvature. Secondly, we will prove the positive mass theorem, which has its origin in general relativity theory, for spin manifolds.
The lecture course will be given in English.
Lecture and exercise programme:
All necessary information can be found here: Moodle. If you are interested, please register without obligation so as not to miss anything.
Modul Numbers:
MATVMD824, MATVMD825,MATVMD921, MATVMD922
Required prior knowledge:
Riemannian geometry
Literature:
Will be announced in the moodle.