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Global dynamics of nonlinear dispersive equations

Introductory Workshop: Randomness and long time dynamics in nonlinear evolution differential equations August 24, 2015 - August 28, 2015

August 28, 2015 (03:30 PM PDT - 04:30 PM PDT)
Speaker(s): Kenji Nakanishi (Osaka University)
Location: SLMath: Eisenbud Auditorium
Tags/Keywords
  • NLS equation

  • NLS equation with potential

  • radially symmetric solution

  • existence and uniqueness results

  • dispersive PDEs

  • scattering results

Primary Mathematics Subject Classification
Secondary Mathematics Subject Classification No Secondary AMS MSC
Video

14353

Abstract

Solutions of nonlinear dispersive equations exhibit various space-time behavior, such as blow-up, soliton, and scattering, due to competition between the dispersion and the nonlinearity. Drastic changes are also possible along the evolution. It is hence an important and challenging problem to predict the behavior in all the future and the past from the initial data. Combining variational, dispersive, and spectral analysis, it has become possible to describe the structure of solutions and of initial data in some simple cases. In this talk I will mostly focus on the nonlinear Schrodinger equations with or without potential, which have stable and/or unstable solitons. The main goal is to obtain a global dynamical picture which contains deformation between different types of solitons

Supplements
24229?type=thumb Nakanishi Notes 502 KB application/pdf Download
Video/Audio Files

14353

H.264 Video 14353.mp4 292 MB video/mp4 rtsp://videos.msri.org/data/000/024/128/original/14353.mp4 Download
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