The time-fractional stochastic heat equation driven by time-space white noise

Abstract

We study the time-fractional stochastic heat equation driven by time-space white noise with space dimension d∈N=\1,2,...\ and the fractional time-derivative is the Caputo derivative of order α ∈ (0,2). We consider the equation in the sense of distribution, and we find an explicit expression for the S'-valued solution Y(t,x), where S' is the space of tempered distributions. Following the terminology of Y. Hu Hu, we say that the solution is mild if Y(t,x) ∈ L2(P) for all t,x, where P is the probability law of the underlying time-space Brownian motion. It is well-known that in the classical case with α = 1, the solution is mild if and only if the space dimension d=1. We prove that if α ∈ (1,2) the solution is mild if d=1 or d=2. If α < 1 we prove that the solution is not mild for any d.

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