A Boxing Inequality for the Fractional Perimeter

Abstract

We prove the Boxing inequality: Hd-α∞(U) ≤ Cα(1-α)∫U ∫Rd U dy \, dz|y-z|α+d, for every α ∈ (0,1) and every bounded open subset U ⊂ Rd, where Hd-α∞(U) is the Hausdorff content of U of dimension d -α and the constant C > 0 depends only on d. We then show how this estimate implies a trace inequality in the fractional Sobolev space Wα, 1(Rd) that includes Sobolev's Ldd - α embedding, its Lorentz-space improvement, and Hardy's inequality. All these estimates are thus obtained with the appropriate asymptotics as α tends to 0 and 1, recovering in particular the classical inequalities of first order. Their counterparts in the full range α ∈ (0, d) are also investigated.