English

Levy Diffusion and Classes of Universal Parametric Correlations

chao-dyn 2016-08-31 v1 Condensed Matter Chaotic Dynamics

Abstract

A general formulation of translationally invariant, parametrically correlated random matrix ensembles, is used to classify universality in correlation functions. Surprisingly, the range of possible physical systems is bounded, and can be labeled by a parameter α(0,2]\alpha\in (0,2], in a manner analogous to L\'evy diffusion. Universality is obtained after scaling by the (anomalous) diffusion constant DαD_\alpha (the usual scaling is divergent for α<2\alpha<2). For each α\alpha, correlation functions are universal, and distinct. The previous results in the literature correspond to the limiting case of superdiffusion, α=2\alpha=2.

Keywords

Cite

@article{arxiv.chao-dyn/9504007,
  title  = {Levy Diffusion and Classes of Universal Parametric Correlations},
  author = {Dimitri Kusnezov and Caio H. Lewenkopf},
  journal= {arXiv preprint arXiv:chao-dyn/9504007},
  year   = {2016}
}

Comments

4 pages, uuencoded and compressed postscript