On a flow of transformations of a Wiener space
Abstract
In this paper, we define, via Fourier transform, an ergodic flow of transformations of a Wiener space which preserves the law of the Ornstein-Uhlenbeck process and which interpolates the iterations of a transformation previously defined by Jeulin and Yor. Then, we give a more explicit expression for this flow, and we construct from it a continuous gaussian process indexed by R2, such that all its restriction obtained by fixing the first coordinate are Ornstein-Uhlenbeck processes.
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