A three-state independence in non-commutative probability
Operator Algebras
2022-12-22 v3 Probability
Abstract
We define a new independence in non-commutative probability, called -freeness, with respect to a triplet of states. This concept unifies several independences in non-commutative probability, in particular, free, monotone, antimonotone and Boolean ones as well as conditionally free, conditionally monotone and conditionally antimonotone independences. Moreover, the associative law of -freeness is transferred to the other independences. As a consequence, -free cumulants unify the cumulants for free, monotone, antimonotone and Boolean independences. The central limit theorem for -freeness is computed. The limit distribution turns out to be a triplet of the Kesten distributions.
Keywords
Cite
@article{arxiv.1009.1505,
title = {A three-state independence in non-commutative probability},
author = {Takahiro Hasebe},
journal= {arXiv preprint arXiv:1009.1505},
year = {2022}
}
Comments
Thorough revision of v1; minor changes to v2