Density estimates and the fractional Sobolev inequality for sets of zero s-mean curvature
Abstract
We prove that measurable sets E⊂ Rn with locally finite perimeter and zero s-mean curvature satisfy the surface density estimates: align* Per (E; BR(x)) ≥ CRn-1 align* for all R>0, x∈ ∂ E. The C depends only on n and s, and remains bounded as s 1-. As an application, we prove that the fractional Sobolev inequality holds on the boundary of sets with zero s-mean curvature.
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