Large deviation principles for hypersingular Riesz gases
Abstract
We study -particle systems in R^d whose interactions are governed by a hypersingular Riesz potential , , and subject to an external field. We provide both macroscopic results as well as microscopic results in the limit as for random point configurations with respect to the associated Gibbs measure at scaled inverse temperature . We show that a large deviation principle holds with a rate function of the form `-Energy +Entropy', yielding that the microscopic behavior (on the scale ) of such -point systems is asymptotically determined by the minimizers of this rate function. In contrast to the asymptotic behavior in the integrable case , where on the macroscopic scale -point empirical measures have limiting density independent of , the limiting density for is strongly -dependent.
Cite
@article{arxiv.1702.02894,
title = {Large deviation principles for hypersingular Riesz gases},
author = {Douglas P. Hardin and Thomas Leblé and Edward B. Saff and Sylvia Serfaty},
journal= {arXiv preprint arXiv:1702.02894},
year = {2017}
}
Comments
33p