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Non-unique Ergodicity for 3D Navier-Stokes and Euler Equations

Offered By: International Centre for Theoretical Sciences via YouTube

Tags

Navier Stokes Equations Courses Fluid Dynamics Courses Energy Conservation Courses Partial Differential Equations Courses Ergodic Theory Courses Onsager Conjecture Courses Statistical Hydrodynamics Courses

Course Description

Overview

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Explore a comprehensive lecture on non-unique ergodicity for 3D Navier-Stokes and Euler equations presented by Rongchan Zhu at the International Centre for Theoretical Sciences. Delve into advanced topics in fluid mechanics as part of the program on Deterministic and Stochastic Analysis of Euler and Navier-Stokes Equations. Gain insights into recent groundbreaking techniques and seminal results in the field of fluid flow equations. Examine the Onsager conjecture, intermittent construction for Navier-Stokes equations, H^{1/2} weak solutions of incompressible 3D Euler equations, and stochastic convex integration methods. Suitable for PhD students, postdocs, and faculty members working on mathematical aspects of fluid flow equations, this lecture offers a unique opportunity to engage with leading researchers and exchange ideas in an inclusive academic environment.

Syllabus

Non-unique Ergodicity for 3D Navier-Stokes and Euler Equations by Rongchan Zhu


Taught by

International Centre for Theoretical Sciences

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