Dimension of the singular set in the parabolic obstacle problem
Abstract
In this paper we study the singular set in the parabolic obstacle problem for general obstacles ∈ C2,1. We prove that the singular set has parabolic Hausdorff dimension at most n-1. Prior to our result, this was only known when -1. Our approach combines a truncated parabolic frequency formula and monotonicity estimates with an iterative argument showing that the frequency is saturated for all values of the truncation parameter between 2 and 3.
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