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Analysis Seminar

Wednesday, September 18, 2024
3:00pm to 4:00pm
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Linde Hall 187
Nonuniqueness of solutions to the Euler equations with integrable vorticity
Anuj Kumar, Department of Mathematics, UC Berkeley,

Yudovich established the well-posedness of the two-dimensional incompressible Euler equations for solutions with bounded vorticity. DiPerna and Majda proved the existence of weak solutions with vorticity in L^p ( p > 1). A celebrated open question is whether the uniqueness result can be generalized to solutions with L^p vorticity. In this talk, we resolve this question in negative for some p > 1. To prove nonuniqueness, we devise a new convex integration scheme that employs non-periodic, spatially-anisotropic perturbations, an idea that was inspired by our recent work on the transport equation. To construct the perturbation, we introduce a new family of building blocks based on the Lamb-Chaplygin dipole. This is a joint work with Elia Bruè and Maria Colombo.

For more information, please contact Math Department by phone at 626-395-4335 or by email at [email protected].