Faber-Krahn Inequalities for some Linear Problems and its Consequences (2/3)

Datum

06.12.2013

Zeit

13:00 - 14:30

Sprecher

Prof. Dr. Marcello Lucia

Zugehörigkeit

City University New York

Sprache

en

Hauptthema

Mathematik

Andere Themen

Mathematik

Host

Prof. Dr. R. Schilling / Dipl.-Math J. Hollender

Beschreibung

Ein Vortrag im Rahmen der "Graduate Lectures in Mathematics" The classical isoperimetric inequality in the Euclidean space states that among all open sets of given volume, the ball minimizes the perimeter. This nice geometrical inequality allows to derive a lower bound on the first eigenvalue of the (negative) Laplacian with zero boundary condition, the so-called 'Faber-Krahn' inequality. Though such a lower bound fails for Neumann boundary condition, we will see that it holds for the first eigenvalue of the Laplacian acting on some other spaces of functions. Application to a class of nonlinear problem will be given, and if times permit a discussion of similar problems on the sphere will be given.

Links

• Webseite der Graduate Lectures in Mathematics

Letztmalig verändert: 15.10.2013, 18:22:43