A Feynman-Kac approach for the spatial derivative of the solution to the Wick stochastic heat equation driven by time homogeneous white noise
Abstract
We consider the (unique) mild solution u(t,x) of a 1-dimensional stochastic heat equation on [0,T]× R driven by time-homogeneous white noise in the Wick-Skorokhod sense. The main result of this paper is the computation of the spatial derivative of u(t,x), denoted by ∂x u(t,x), and its representation as a Feynman-Kac type closed form. The chaos expansion of ∂x u(t,x) makes it possible to find its (optimal) H\"older regularity especially in space.
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