NewEvery arXiv paper, its researchers & institutions — mapped.
paper

Hölder Continuous Euler Flows in Three Dimensions with Compact Support in Time

arXiv:1211.4065

Abstract

Building on the recent work of C. De Lellis and L. Székelyhidi, we construct global weak solutions to the three-dimensional incompressible Euler equations which are zero outside of a finite time interval and have velocity in the Hölder class $C_{t,x}^{1/5 - ε}$. By slightly modifying the proof, we show that every smooth solution to incompressible Euler on $(-2, 2) \times {\mathbb T}^3$ coincides on $(-1, 1) \times {\mathbb T}^3$ with some Hölder continuous solution that is constant outside $(-3/2, 3/2) \times {\mathbb T}^3$. We also propose a conjecture related to our main result that would imply Onsager's conjecture that there exist energy dissipating solutions to Euler whose velocity fields have Hölder exponent $1/3 - ε$.

Minor corrections throughout text and some added details