Fractional diffusion in Gaussian noisy environment
Abstract
We study the fractional diffusion in a Gaussian noisy environment as described by the fractional order stochastic partial equations of the following form: Dtα u(t, x)=Bu+u· WH, where Dtα is the fractional derivative of order α with respect to the time variable t, B is a second order elliptic operator with respect to the space variable x∈Rd, and WH a fractional Gaussian noise of Hurst parameter H=(H1, ·s, Hd). We obtain conditions satisfied by α and H so that the square integrable solution u exists uniquely .
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