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Caltech

Analysis Seminar

Wednesday, May 8, 2024
3:00pm to 4:00pm
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Online Event
Dispersive decay for the energy-critical nonlinear Schrödinger equation
Matt Kowalski, Mathematics Department, UCLA,

It is well known that global solutions to the energy-critical nonlinear Schrödinger equation scatter, and hence approach the linear evolution asymptotically. In this talk, we show that solutions further parallel the linear evolution by exhibiting dispersive decay pointwise in time. Previous work in this direction required solutions to have high regularity and did not demonstrate a linear dependence on the initial data. We resolve these issues by using a Lorentz improvement of Strichartz inequalities and finding global Lorentz spacetime bounds. This allows us to show dispersive decay for solutions in the (scaling-critical) energy space and recover linear dependence on the initial data.

For more information, please contact Math Department by phone at 626-395-4335 or by email at [email protected] or visit https://ucla.zoom.us/j/9264073849.