Dynamical approach to the jamming problem
Abstract
A simple dynamical model, Biased Random Organization, BRO, appears to produce configurations known as Random Close Packing (RCP) as BRO's densest critical point in dimension . We conjecture that BRO likewise produces RCP in any dimension; if so, then RCP does not exist in (where BRO dynamics lead to crystalline order). In , BRO produces isostatic configurations and previously estimated RCP volume fractions 0.64, 0.46, and 0.30, respectively. For all investigated dimensions (), we find that BRO belongs to the Manna universality class of dynamical phase transitions by measuring critical exponents associated with the steady-state activity and the long-range density fluctuations. Additionally, BRO's distribution of near-contacts (gaps) displays behavior consistent with the infinite-dimensional theoretical treatment of RCP when . The association of BRO's densest critical configurations with Random Close Packing implies that RCP's upper-critical dimension is consistent with the Manna class .
Keywords
Cite
@article{arxiv.2212.09913,
title = {Dynamical approach to the jamming problem},
author = {Sam Wilken and Ashley Z. Guo and Dov Levine and Paul M. Chaikin},
journal= {arXiv preprint arXiv:2212.09913},
year = {2023}
}