Optimal sets for a geometric oscillation energy
Abstract
We investigate the nonlocal energy corresponding to the p-oscillation of the unit normal vector for hypersurfaces, or the unit tangent vector for curves. The energy satisfies geometric inequalities with optimal constants c(n,p) and C(n,p) which are determined by a variational problem over the probability measures on the sphere. The extremal measures for such problem depend critically on the value of p. We prove existence of optimal sets for this energy under perimeter and volume constraint, and characterize their shape.
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