A heat flow approach to Onsager's conjecture for the Euler equations on manifolds
- Creators
-
Isett, Philip
- Oh, Sung-Jin
Abstract
We give a simple proof of Onsager's conjecture concerning energy conservation for weak solutions to the Euler equations on any compact Riemannian manifold, extending the results of Constantin-E-Titi and Cheskidov-Constantin-Friedlander-Shvydkoy in the flat case. When restricted to T^d or R^d, our approach yields an alternative proof of the sharp result of the latter authors. Our method builds on a systematic use of a smoothing operator defined via a geometric heat flow, which was considered by Milgram-Rosenbloom as a means to establish the Hodge theorem. In particular, we present a simple and geometric way to prove the key nonlinear commutator estimate, whose proof previously relied on a delicate use of convolutions.
Additional Information
© 2015 American Mathematical Society. Received by the editors May 4, 2014 and, in revised form, August 25, 2015. Article electronically published on November 17, 2015. The second author is a Miller research fellow, and would like to thank the Miller Institute for support.Attached Files
Submitted - 1310.7947.pdf
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Additional details
- Eprint ID
- 87374
- Resolver ID
- CaltechAUTHORS:20180627-084240647
- Miller Institute for Basic Research in Science
- Created
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2018-06-27Created from EPrint's datestamp field
- Updated
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2022-08-04Created from EPrint's last_modified field