Nicolas Bouleau
Published 2006-10-17Version 1
The arbitrary functions principle says that the fractional part of $nX$ converges stably to an independent random variable uniformly distributed on the unit interval, as soon as the random variable $X$ possesses a density or a characteristic function vanishing at infinity. We prove a similar property for random variables defined on the Wiener space when the stochastic measure $dB\_s$ is crumpled on itself.
Journal: Comptes rendus de l'acad\'{e}mie des sciences, Math\'{e}matiques 343 (2006) 329-332
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