Hitting Probabilities for Systems of Non-Linear Stochastic Heat Equations with Additive Noise
Abstract
We consider a system of d coupled non-linear stochastic heat equations in spatial dimension 1 driven by d-dimensional additive space-time white noise. We establish upper and lower bounds on hitting probabilities of the solution \u(t, x)\t ∈ R+, x ∈ [0, 1], in terms of respectively Hausdorff measure and Newtonian capacity. We also obtain the Hausdorff dimensions of level sets and their projections. A result of independent interest is an anisotropic form of the Kolmogorov continuity theorem.
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