q-Wiener (α,q)- Ornstein-Uhlenbeck processes. A generalization of known processes

Abstract

We collect, scattered through literature, as well as we prove some new properties of two Markov processes that in many ways resemble Wiener and Ornstein--Uhlenbeck processes. Although processes considered in this paper were defined either in non-commutative probability context or through quadratic harnesses we define them once more as so to say 'continuous time ' generalization of a simple, symmetric, discrete time process satisfying simple conditions imposed on the form of its first two conditional moments. The finite dimensional distributions of the first one (say X=(Xt)t≥0 called q-Wiener) depends on one parameter q∈(-1,1] and of the second one (say Y=(Yt)t∈R called (α,q)- Ornstein--Uhlenbeck) on two parameters (α,q)∈(0,∞)×(-1,1]. The first one resembles Wiener process in the sense that for q=1 it is Wiener process but also that for |q|<1 and ∀n≥1: tn/2Hn(Xt/|q), where (Hn)n≥0 are the so called q-Hermite polynomials, are martingales. It does not have however neither independent increments not allows continuous sample path modification. The second one resembles Ornstein--Uhlenbeck process. For q=1 it is a classical OU process. For |q|<1 it is also stationary with correlation function equal to exp(-α|t-s|) and has many properties resembling those of its classical version. We think that these process are fascinating objects to study posing many interesting, open questions.

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