The local structure of q-Gaussian processes
Abstract
The local structure of q-Ornstein-Uhlenbeck processes and q-Brownian motions are investigated, for all q∈(-1,1). These are the classical Markov processes corresponding to the noncommutative q-Gaussian processes. These processes have discontinuous sample paths, and the local small jumps are characterized by tangent processes. It is shown that for all q∈(-1,1), the tangent processes at inner domain are scaled Cauchy processes possibly with drifts, and the tangent processes at the boundary of the domain are related to the free 1/2-stable law via Biane's construction.
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