English

The $(q,t)$-Gaussian Process

Operator Algebras 2012-03-22 v4 Mathematical Physics Combinatorics math.MP Quantum Algebra

Abstract

We introduce a two-parameter deformation of the classical Bosonic, Fermionic, and Boltzmann Fock spaces that is a refinement of the qq-Fock space of [BS91]. Starting with a real, separable Hilbert space HH, we construct the (q,t)(q,t)-Fock space and the corresponding creation and annihilation operators, {aq,t(h)}hH\{a_{q,t}(h)^\ast\}_{h\in H} and {aq,t(h)}hH\{a_{q,t}(h)\}_{h\in H}, satifying the (q,t)(q,t)-commutation relation aq,t(f)aq,t(g)qaq,t(g)aq,t(f)=<f,g>HtN,a_{q,t}(f)a_{q,t}(g)^\ast-q \,a_{q,t}(g)^\ast a_{q,t}(f)= <f,g>_{_H}\, t^{N}, for h,gHh,g\in H, with NN denoting the number operator. Interpreting the bounded linear operators on the (q,t)(q,t)-Fock space as non-commutative random variables, the analogue of the Gaussian random variable is given by the deformed field operator sq,t(h):=aq,t(h)+aq,t(h)s_{q,t}(h):=a_{q,t}(h)+a_{q,t}(h)^\ast, for hHh\in H. The resulting refinement is particularly natural, as the moments of sq,t(h)s_{q,t}(h) are encoded by the joint statistics of crossings \emph{and nestings} in pair partitions. Furthermore, the orthogonal polynomial sequence associated with the normalized (q,t)(q,t)-Gaussian sq,ts_{q,t} is that of the (q,t)(q,t)-Hermite orthogonal polynomials, a deformation of the qq-Hermite sequence that is given by the recurrence zHn(z;q,t)=Hn+1(z;q,t)+[n]q,tHn1(z;q,t),zH_n(z;q,t)=H_{n+1}(z;q,t)+[n]_{q,t}H_{n-1}(z;q,t), with H0(z;q,t)=1H_0(z;q,t)=1, H1(z;q,t)=zH_1(z;q,t)=z, and [n]q,t=i=1nqi1tni[n]_{q,t}=\sum_{i=1}^n q^{i-1}t^{n-i}. The q=0<tq=0<t specialization yields a new single-parameter deformation of the full Boltzmann Fock space of free probability. The probability measure associated with the corresponding deformed semicircular operator turns out to be encoded, in various forms, via the Rogers-Ramanujan continued fraction, the Rogers-Ramanujan identities, the tt-Airy function, the tt-Catalan numbers of Carlitz-Riordan, and the first-order statistics of the reduced Wigner process.

Keywords

Cite

@article{arxiv.1111.6565,
  title  = {The $(q,t)$-Gaussian Process},
  author = {Natasha Blitvić},
  journal= {arXiv preprint arXiv:1111.6565},
  year   = {2012}
}

Comments

The present version reverts to v2, by removing former Lemma 13 that contained an error

R2 v1 2026-06-21T19:42:45.406Z