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Nonuniqueness of Generalised Weak Solutions to the Primitive and Prandtl Equations

Published version
Peer-reviewed

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Abstract

We develop a convex integration scheme for constructing nonunique weak solutions to the hydrostatic Euler equations (also known as the inviscid primitive equations of oceanic and atmospheric dynamics) in both two and three dimensions. We also develop such a scheme for the construction of nonunique weak solutions to the three-dimensional viscous primitive equations, as well as the two-dimensional Prandtl equations. While in Boutros et al. (Calc Var Partial Differ Equ 62(8):219, 2023) the classical notion of weak solution to the hydrostatic Euler equations was generalised, we introduce here a further generalisation. For such generalised weak solutions, we show the existence and nonuniqueness for a large class of initial data. Moreover, we construct infinitely many examples of generalised weak solutions which do not conserve energy. The barotropic and baroclinic modes of solutions to the hydrostatic Euler equations (which are the average and the fluctuation of the horizontal velocity in the z-coordinate, respectively) that are constructed have different regularities.

Description

Funder: Cambridge Trust; doi: http://dx.doi.org/10.13039/501100003343


Funder: Cantab Capital Institute for Mathematics of Information


Funder: Prince Bernhard Culture Fund


Funder: Alexander von Humboldt-Stiftung; doi: http://dx.doi.org/10.13039/100005156

Keywords

42B37, Secondary 35Q35, Baroclinic mode, Nonuniqueness of weak solutions, Onsager’s conjecture, 35D30, Hydrostatic Navier–Stokes equations, Energy dissipation, Convex integration, Prandtl equations, Barotropic mode, 76D03, Primary 76B03, Primitive equations of oceanic and atmospheric dynamics, Weak solutions, Hydrostatic Euler equations, 35A02, 35A01, 42B35

Journal Title

Journal of Nonlinear Science

Conference Name

Journal ISSN

0938-8974
1432-1467

Volume Title

34

Publisher

Springer US
Sponsorship
Isaac Newton Institute for Mathematical Sciences (EP/K032208/1, EP/K032208/1, EP/K032208/1)
Deutsche Forschungsgemeinschaft (CRC 1114, Project Number 235221301, Project C06)