Camillo De Lellis, László Székelyhidi Jr
Published 2007-02-05, updated 2007-11-27Version 3
In this paper we propose a new point of view on weak solutions of the Euler equations, describing the motion of an ideal incompressible fluid in $\mathbb{R}^n$ with $n\geq 2$. We give a reformulation of the Euler equations as a differential inclusion, and in this way we obtain transparent proofs of several celebrated results of V. Scheffer and A. Shnirelman concerning the non-uniqueness of weak solutions and the existence of energy--decreasing solutions. Our results are stronger because they work in any dimension and yield bounded velocity and pressure.
Comments: 16 pages; v2: corrected typos, simplified some proofs; v3: 20 pages, added a second (more direct) proof
Journal: Ann. of Math. (2) 170 (2009), no. 3, 1417-1436
The $h$-principle and the equations of fluid dynamics
Instability and non-uniqueness in the Cauchy problem for the Euler equations of an ideal incompressible fluid. Part I
Propagation of Striated Regularity of Velocity for the Euler Equations
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