Optimal critical exponent Lp inequalities of Hardy type on the sphere via Xiao's method

Abstract

First, we correct the proof presented in [Abimbola Abolarinwa, Kamilu Rauf, Songting Yin, Sharp Lp Hardy type and uncertainty principle inequalities on the sphere, Journal of Mathematical Inequalities, 13, 4 (2019), 1011 - 1022] and obtain a correct sharp version of an Lp Hardy inequality on the sphere Sn for all 2≤ p<n. Secondly, we prove sharp critical exponent Ln inequalities on the sphere Sn in Rn+1, n≥ 2. The singularity in this problem is the geodesic distance from an arbitrary point on the sphere.