We prove that for any second order stochastic process X with stationary increments with continuous paths and continuous variance function, there exists a tempered measure mu (for which we give an explicit expression) related with the domain of the Wiener integral with respect to X as follows: the space of tempered distributions f such that the Fourier transform of f is square integrable with respect to mu is always a dense subset of the domain of the Wiener integral. Moreover, we provide sufficient conditions on mu in order that the domain of the integral is exactly this space of distributions. We apply our results. to the fractional Brownian motion. In particular, it is proved that the domain of the Wiener integral with respect to the fractional Brownian motion with Hurst parameter H > 1/2 contains distributions that are not given by locally integrable functions, this fact was suggested by Pipiras and Taqqu (2000) in [5]. We have also considered the example of the process given by Ornstein and Uhlenbeck as a model for the position of a Brownian particle.

• 出版日期2010-6-15