On the fine structure of the free boundary for the classical obstacle problem

Abstract

In the classical obstacle problem, the free boundary can be decomposed into "regular" and "singular" points. As shown by Caffarelli in his seminal papers C77,C98, regular points consist of smooth hypersurfaces, while singular points are contained in a stratified union of C1 manifolds of varying dimension. In two dimensions, this C1 result has been improved to C1,α by Weiss W99. In this paper we prove that, for n=2 singular points are locally contained in a C2 curve. In higher dimension n 3, we show that the same result holds with C1,1 manifolds (or with countably many C2 manifolds), up to the presence of some "anomalous" points of higher codimension. In addition, we prove that the higher dimensional stratum is always contained in a C1,α manifold, thus extending to every dimension the result in W99. We note that, in terms of density decay estimates for the contact set, our result is optimal. In addition, for n3 we construct examples of very symmetric solutions exhibiting linear spaces of anomalous points, proving that our bound on their Hausdorff dimension is sharp.