On Morrey's inequality in Sobolev-Slobodeckiĭ spaces

We study the sharp constant in the Morrey inequality for fractional Sobolev-Slobodeckiĭ spaces on the whole RN. By generalizing a recent work by Hynd and Seuffert, we prove existence of extremals, together with some regularity estimates. We also analyze the sharp asymptotic behaviour of this constant as we reach the borderline case sp=N, where the inequality fails. This can be done by means of a new elementary proof of the Morrey inequality, which combines: a local fractional Poincaré inequality for punctured balls, the definition of capacity of a point and Hardy's inequality for the punctured space. Finally, we compute the limit of the sharp Morrey constant for s↗1, as well as its limit for p↗∞. We obtain convergence of extremals, as well.