$q$-Gaussian processes: non-commutative and classical aspects
摘要
We examine, for , -Gaussian processes, i.e. families of operators (non-commutative random variables) -- where the fulfill the -commutation relations for some covariance function -- equipped with the vacuum expectation state. We show that there is a -analogue of the Gaussian functor of second quantization behind these processes and that this structure can be used to translate questions on -Gaussian processes into corresponding (and much simpler) questions in the underlying Hilbert space. In particular, we use this idea to show that a large class of -Gaussian processes possess a non-commutative kind of Markov property, which ensures that there exist classical versions of these non-commutative processes. This answers an old question of Frisch and Bourret \cite{FB}.
引用
@article{arxiv.funct-an/9604010,
title = {$q$-Gaussian processes: non-commutative and classical aspects},
author = {Marek Bozejko and Burkhard Kummerer and Roland Speicher},
journal= {arXiv preprint arXiv:funct-an/9604010},
year = {2009}
}
备注
AMS-TeX 2.1