Matrix models as solvable glass models
arXiv:cond-mat/9407086 · doi:10.1103/PhysRevLett.74.1012
Abstract
We present a family of solvable models of interacting particles in high dimensionalities without quenched disorder. We show that the models have a glassy regime with aging effects. The interaction is controlled by a parameter $p$. For $p=2$ we obtain matrix models and for $p>2$ `tensor' models. We concentrate on the cases $p=2$ which we study analytically and numerically.
10 pages + 2 figures, Univ.Roma I, 1038/94, ROM2F/94/27