Home /  Workshop /  Schedules /  Transport equations and ODEs with nonsmooth coefficients (Part 2)

Transport equations and ODEs with nonsmooth coefficients (Part 2)

[Moved Online] Introductory Workshop: Mathematical problems in fluid dynamics January 25, 2021 - February 05, 2021

January 25, 2021 (09:30 AM PST - 10:30 AM PST)
Speaker(s): Camillo De Lellis (Institute for Advanced Study)
Location: SLMath: Online/Virtual
Tags/Keywords

  • incompressible Euler equations

  • dissipative solutions

  • Onsager conjecture

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

Transport Equations And ODEs With Nonsmooth Coefficients (Part 2)
Abstract

In these three lectures I will give an overview of the DiPerna-Lions theory for transport equations and ODEs with Sobolev coefficients, including the developments of the last two decades, namely Ambrosio's extension to the case of BV coefficients, Lagrangian estimates and Bressan's mixing conjecture, near incompressibility of the flow versus bounds on the divergence of the field, the role of summability and the impact of convex integration techniques. I will try to cover the general ideas of several results, without going into the technical details, and I will give a special emphasis on open problems.
Supplements No Notes/Supplements Uploaded
Video/Audio Files

Transport Equations And ODEs With Nonsmooth Coefficients (Part 2)

Troubles with video?

Please report video problems to itsupport@slmath.org.

See more of our Streaming videos on our main VMath Videos page.