Violent relaxation in two-dimensional flows with varying interaction range
Abstract
Understanding the relaxation of a system towards equilibrium is a longstanding problem in statistical mechanics. Here we address the role of long-range interactions in this process by considering a class of two-dimensional or geophysical flows where the interaction between fluid particles varies with the distance as r^(--2) with \textgreater{} 0. Previous studies in the Euler case = 2 had shown convergence towards a variety of quasi-stationary states by changing the initial state. Unexpectedly, all those regimes are recovered by changing with a prescribed initial state. For small , a coarsening process leads to the formation of a sharp interface between two regions of homogenized -vorticity; for large , the flow is attracted to a stable dipolar structure through a filamentation process.
Cite
@article{arxiv.1503.07904,
title = {Violent relaxation in two-dimensional flows with varying interaction range},
author = {A Venaille and T Dauxois and S Ruffo},
journal= {arXiv preprint arXiv:1503.07904},
year = {2015}
}