Global Solutions for Nonlinear Dispersive Waves - Part 4
Institut des Hautes Etudes Scientifiques (IHES) via YouTube
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This lecture, the fourth in a series by Daniel Tataru from UC Berkeley, explores global solutions for nonlinear dispersive waves over nearly two hours. Examine the fundamental balance between linear dispersion and nonlinear effects that determines the long-term behavior of nonlinear dispersive flows. Understand how linear dispersive flows feature waves with different frequencies traveling at different group velocities, creating dispersive decay, while nonlinear flows introduce wave interactions that complicate the dynamics. Discover a new set of conjectures aimed at describing global well-posedness and dispersive properties of solutions in cases where nonlinear effects dominate, even with small initial data—an area that remained largely mysterious until recent years. Learn about cutting-edge results in this field from Tataru's collaborative work with Mihaela Ifrim from the University of Wisconsin, Madison. This scientific presentation is available on carmin.tv, a French video platform specializing in mathematics and interdisciplinary research content.
Syllabus
Daniel Tataru - 4/4 Global Solutions for Nonlinear Dispersive Waves
Taught by
Institut des Hautes Etudes Scientifiques (IHES)