| Language |
English
|
| From |
2013/10/30 13:30
|
| To |
2013/10/30 15:00
|
| Place | Room 552, Building No.3, Faculty of Science, Kyoto University |
| Seminar Name | Kansai Probability Theory Seminar |
| Title |
Fractional harmonic maps and applications |
| Field |
Analysis
Other
|
| Speakers | Armin Schikorra |
| Affiliation | Max Planck Institute |
| Abstract | Fractional harmonic mappings are critical points of a generalized
Dirichlet Energy where the gradient is replaced with a (non-local)
differential operator of possibly non-integer order. I will present
aspects of the regularity theory of (non-local) fractional harmonic maps
into manifolds, which extends (and contains) the theory of
(poly-)harmonic mappings. I also will mention, how one can show
regularity for critical points of the Moebius (Knot-) Energy, applying
the techniques developed in this theory. |
| Note | *いつもと曜日・時間が違います |
| Link | http://www.math.kyoto-u.ac.jp/probability/seminar/index_j.html |
|