A permutation model for free random variables and its classical analogue
Abstract
In this paper, we generalize a permutation model for free random variables which was first proposed by Biane in \cite{biane}. We also construct its classical probability analogue, by replacing the group of permutations with the group of subsets of a finite set endowed with the symmetric difference operation. These constructions provide new discrete approximations of the respective free and classical Wiener chaos. As a consequence, we obtain explicit examples of non random matrices which are asymptotically free or independent. The moments and the free (resp. classical) cumulants of the limiting distributions are expressed in terms of a special subset of (noncrossing) pairings. At the end of the paper we present some combinatorial applications of our results.
Keywords
Cite
@article{arxiv.0801.4229,
title = {A permutation model for free random variables and its classical analogue},
author = {Florent Benaych-Georges and Ion Nechita},
journal= {arXiv preprint arXiv:0801.4229},
year = {2015}
}
Comments
13 pages, to appear in Pacific Journal of Mathematics