Sobolev regularity of polar fractional maximal functions

Abstract

We study the Sobolev regularity on the sphere Sd of the uncentered fractional Hardy-Littlewood maximal operator Mβ at the endpoint p=1, when acting on polar data. We first prove that if q=dd-β, 0<β<d and f is a polar W1,1(Sd) function, we have \|∇ Mβf\|qd,β\|∇ f\|1. We then prove that the map f | ∇ Mβf | is continuous from W1,1(Sd) to Lq(Sd) when restricted to polar data. Our methods allow us to give a new proof of the continuity of the map f |∇ Mβf| from W1,1rad(Rd) to Lq(Rd). Moreover, we prove that a conjectural local boundedness for the centered fractional Hardy-Littlewood maximal operator Mβ implies the continuity of the map f |∇ Mβf| from W1,1 to Lq, in the context of polar functions on Sd and radial functions on Rd.