Besicovitch Covering Property on groups and applications to measure differentiation
Event details
| Date | 21.12.2016 |
| Hour | 15:10 › 16:30 |
| Speaker | Enrico Le Donne |
| Location |
MA10
|
| Category | Conferences - Seminars |
The Besicovitch Covering Property is a fundamental tool to obtain differentiation theorems for Borel measures. Nowadays, there is particular interest in differentiating measures in various non-Euclidean settings such as homogeneous groups and in particular Carnot groups. In this talk, all these notions will be defined and discussed. Moreover, we shall see which are the groups that admits the differentiation theorem for measures. Applications to sub-Riemannian geometry may be discussed.
Practical information
- Informed public
- Free
Organizer
- Louis Merlin