Description: |
[DMS-PDE Seminar] Dr Saikat Mazumdar (NTIS/ZCU, Czech Republic) -- Higher Order Elliptic Problems with Critical Sobolev Growth on a Compact Riemannian Manifold: Best Constants and Existence |
Date: |
Wednesday, Aug 24, 2016 |
Time: |
11:30 a.m. - 12:30 p.m. |
Venue: |
108, Lecture Hall Complex |
Details: |
We investigate the existence of solutions to a nonlinear elliptic problem involv-
ing the critical Sobolev exponent for a Polyharmomic operator on a Riemannian
manifold M. We first show that the best constant of the Sobolev embedding on
a manifold can be chosen as close as one wants to the Euclidean one, and as a
consequence derive the existence of minimizers when the energy functional goes be-
low a quantified threshold. Next, higher energy solutions are obtained by Coron’s
topological method, provided that the minimizing solution does not exist and the
manifold satisfies a certain topological assumption. To perform the topological ar-
gument, we obtain a decomposition of Palais-Smale sequences as a sum of bubbles
and adapt Lions’s concentration-compactness lemma. |
Calendar: |
Seminar Calendar (entered by saugata.bandyopadhyay) |