On Energy Conservation for the hydrostatic Euler equations: an Onsager Conjecture

Add to your list(s) Download to your calendar using vCal

• Daniel Boutros (University of Cambridge)
• Wednesday 15 June 2022, 11:00-12:00
• Seminar Room 2, Newton Institute.

If you have a question about this talk, please contact nobody.

FDE2 - Fractional differential equations

Onsager’s conjecture states that the incompressible Euler equations conserve kinetic energy (the L^2 norm in space) if the velocity field is Hölder continuous in space with exponent bigger than 1/3. In case the exponent is less than 1/3 energy dissipation can occur. We consider an analogue of Onsager’s conjecture for the hydrostatic Euler equations. These equations arise from the Euler equations under the assumption of the hydrostatic balance, as well as the small aspect ratio limit (in which the vertical scale is much smaller compared to the horizontal scales). Unlike the Euler equations, in the case of the hydrostatic Euler equations the vertical velocity is one degree spatially less regular compared to the horizontal velocities. The fact that the equations are anisotropic in regularity and nonlocal makes it possible to prove a range of sufficient criteria for energy conservation, which are independent of each other. This means that there probably is a ‘family’ of Onsager conjectures for these equations. This is joint work with Simon Markfelder and Edriss S. Titi.

This talk is part of the Isaac Newton Institute Seminar Series series.

This talk is included in these lists:

• All CMS events
• Featured lists
• INI info aggregator
• Isaac Newton Institute Seminar Series
• School of Physical Sciences
• Seminar Room 2, Newton Institute
• bld31

Note that ex-directory lists are not shown.