About:

Fluid is one of the most omnipresent substances on the planet. Mathematical analysis of the fundamental partial differential equations of fluid dynamics such as the Navier-Stokes equations was pioneered by Leray in 1934. Gaining insights into the behavior of the solutions to such equations is crucial for our understanding of the physical phenomena that we experience in our daily lives. Very recently, multiple breakthrough works such as the blow-up of three-dimensional Euler equations, the development of the convex integration technique, and the solution theory of singular stochastic partial differential equations, have intensified the research on the partial differential equations of fluid dynamics. Many long-standing conjectures from physicists and mathematicians have come to a resolution. Organized in partnership with the Clay Mathematics Institute, this interdisciplinary conference will serve as a forum for leading experts, emerging early-career researchers, and under-represented groups with complementary strength to explore recent developments, exchange insights, and address key challenges in the pursuit of better understanding of various issues. Through collaborative engagement and discussions, we aspire to deepen our understanding of the intricate interplay within the phenomena of irregularity, turbulence, and stochasticity in fluid dynamics. 

We acknowledge the support of London Mathematical Society and the Clay Mathematics Institute. 

Information on participation to follow in due course.