Generic regularity in time for solutions of the Stefan problem in 4+1 dimensions
Abstract
We show that the free boundary of a solution of the Stefan problem in R4+1 is a 3-dimensional manifold of class C∞ in R4 for almost every time. This is achieved by showing that for all dimensions n the singular set ⊂ Rn+1 can be decomposed in two parts =∞ *, where ∞ is covered by one (n-1)-dimensional manifold of class C∞ in Rn+1 and its projection onto the time axis has Hausdorff dimension 0, while * is parabolically countably (n-2)-rectifiable.
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