On Besov regularity and local time of the stochastic heat equation
Abstract
Sharp Besov regularities in time and space variables are investigated for (u(t,x),\; t∈ [0,T],\; x∈ R), the mild solution to the stochastic heat equation driven by space-time white noise. Existence, H\"older continuity, and Besov regularity of local times are established for u(t,x) viewed either as a process in the space variable or time variable. Hausdorff dimensions of their corresponding level sets are also obtained.
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