中文

$q$-Gaussian processes: non-commutative and classical aspects

funct-an 2009-10-28 v1 凝聚态物理 高能物理 - 理论 算子代数 量子代数 q-alg

摘要

We examine, for 1<q<1-1<q<1, qq-Gaussian processes, i.e. families of operators (non-commutative random variables) Xt=at+atX_t=a_t+a_t^* -- where the ata_t fulfill the qq-commutation relations asatqatas=c(s,t)\ida_sa_t^*-qa_t^*a_s=c(s,t)\cdot \id for some covariance function c(,)c(\cdot,\cdot) -- equipped with the vacuum expectation state. We show that there is a qq-analogue of the Gaussian functor of second quantization behind these processes and that this structure can be used to translate questions on qq-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 qq-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}.

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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