Workshop on Resonances in Linear and Nonlinear Schrodinger Equations
Description
The aim of this workshop is to bring together specialists in the area of asymptotic stability, resonance of embedded eigenvalues and decay of bound states in the linear and nonlinear Schrodinger equations. The workshop accompanies the research-in-team programme "Rigorous analysis of nonlinear parametric resonance of dispersion-managed solitons" organized at Fields Institute in the period of August 18-29, 2003. The workshop includes 50-min talks from participants of the programme and other leading experts. All talks will take place at The Fields Institute.
Invited Speakers:
S. Cuccagna (University of Virginia)
E. Kirr (University of Chicago)
A. Tovbis (University of Central Florida)
M. Weinstein (Bell Laboratories)
Organizer:
D. Pelinovsky (McMaster University)
Registration
Registration and coffee for the workshop is free. Travel to Fields Institute and other expenses must be covered by the participants. A limited support can be available for graduate students and postdoctoral fellows, upon request.
If you wish to participate in this meeting, please send e-mail to the organizer. mailto:dmpeli (at )math.mcmaster.ca
Schedule
09:30 to 10:00 |
Registration and Continental Breakfast
|
10:00 to 10:50 |
Resonance problems for dispersion wave equations
Michael Weinstein, Columbia University |
10:50 to 11:40 |
Trains of pulse like perturbations in Schroedinger Equation
Eduard Kerr |
11:40 to 12:30 |
Solitary waves in singularly perturbed systems and the Stokes phenomenon
Alexander Tovbis, University of Central Florida |
12:30 to 14:00 |
Lunch Break
|
14:00 to 14:50 |
Nonlinear pulse propagation with weak anomalous dispersion
Peter Miller, University of Michigan |
14:50 to 15:40 |
Parametric resonance of dispersion-managed solitons
Dmitry Pelinovsky, McMaster University |
15:40 to 16:00 |
Afternoon Tea
|
16:00 to 16:50 |
Perturbation theory for linearized operators associated to the Nonlinear Schrodinger Equation
Scipio Cuccagna |
16:50 to 17:40 |
Reduction of negative index for the linearized NLS problem
Vitali Vougalter, University of Cape Town and University of Toronto |