Global regularity and free boundary geometry in the planar Chon\'e-Rochet model

Abstract

In this paper, we study minimizers of the Chon\'e--Rochet variational problem in dimension two. We first establish global C1 regularity on arbitrary bounded convex domains, and then prove global C1,1 regularity on bounded strictly convex domains or, more generally, whenever the zero set of u has positive measure. Next, we construct smooth bounded convex domains with a flat boundary segment for which no prescribed modulus of continuity controls the gradient; this shows that, without additional geometric assumptions, global C1 regularity is optimal. Finally, we prove that the tamed free boundary (that is, the interface between the strictly convex and non-strictly convex regions of the solution) is locally a C1 embedded curve, significantly strengthening previously known regularity results.

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