Holder continuity for stochastic fractional heat equation with colored noise
Abstract
In this paper, we consider semilinear stochastic fractional heat equation ∂∂ tuβ,t(x)=α/2uβ,t(x)+σ(uβ,t(x))ηβ. The Gaussian noise ηβ is assumed to be colored in space with covariance of the form E(ηβ(t,x)ηβ(s,y))=δ(t-s)fβ(x-y), where fβ is the Riesz kernel fβ(x) |x|-β. We obtain the spatial and temporal Holder continuity of the mild solution.
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