Points of slow growth for parabolic SPDEs
Abstract
Consider the stochastic PDE, ∂tu = ∂2x u + σ(u) W on R+×R, subject to u(0)1, where W denotes space-time white noise on R+×R and σ:R is Lipschitz continuous. It is known that u(t\,,x)-1 has approximately a Gaussian distribution for every x when t≈0. Here we prove that there exist random points x∈R where the fluctuations of the solution near times zero are almost surely of sharp order t1/4. Our work bears some loose resemblance to the study of the slow points of Brownian motion increments, though significant challenges arise due to the infinite-dimensional nature of the present problem.
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