English

Sample Variance in Free Probability

Operator Algebras 2019-07-29 v4 Probability

Abstract

Let X1,X2,,XnX_1, X_2,\dots, X_n denote i.i.d.~centered standard normal random variables, then the law of the sample variance Qn=i=1n(XiXˉ)2Q_n=\sum_{i=1}^n(X_i-\bar{X})^2 is the χ2\chi^2-distribution with n1n-1 degrees of freedom. It is an open problem in classical probability to characterize all distributions with this property and in particular, whether it characterizes the normal law. In this paper we present a solution of the free analog of this question and show that the only distributions, whose free sample variance is distributed according to a free χ2\chi^2-distribution, are the semicircle law and more generally so-called \emph{odd} laws, by which we mean laws with vanishing higher order even cumulants. In the way of proof we derive an explicit formula for the free cumulants of QnQ_n which shows that indeed the odd cumulants do not contribute and which exhibits an interesting connection to the concept of RR-cyclicity.

Keywords

Cite

@article{arxiv.1607.06586,
  title  = {Sample Variance in Free Probability},
  author = {Wiktor Ejsmont and Franz Lehner},
  journal= {arXiv preprint arXiv:1607.06586},
  year   = {2019}
}

Comments

Final version to appear in J of Funct Anal; 24 pages;Corollary 4.14 generalized; gap in the proof of Prop 4.13 fixed

R2 v1 2026-06-22T15:01:24.081Z