No Local Double Exponential Gradient Growth in Hyperbolic Flow for the Euler equation
Abstract
We consider smooth, double-odd solutions of the two-dimensional Euler equation in with periodic boundary conditions. It is tempting to think that the symmetry in the flow induces possible double-exponential growth in time of the vorticity gradient at the origin, in particular when conditions are such that the flow is "hyperbolic". This is because examples of solutions with -regularity were already constructed with exponential gradient growth by A. Zlatos. We analyze the flow in a small box around the origin in a strongly hyperbolic regime and prove that the compression of the fluid induced by the hyperbolic flow alone is not sufficient to create double-exponential growth of the gradient.
Cite
@article{arxiv.1405.7756,
title = {No Local Double Exponential Gradient Growth in Hyperbolic Flow for the Euler equation},
author = {Vu Hoang and Maria Radosz},
journal= {arXiv preprint arXiv:1405.7756},
year = {2016}
}
Comments
44 pages, 4 figures. Fixed some typos, improved heuristic discussion, some remarks added