The Variation of the Fractional Maximal Function of a Radial Function

Abstract

In this paper we study the regularity of the non-centered fractional maximal operator Mβ. As the main result, we prove that there exists C(n,β) such that if q=n/(n-β) and f is a radial function, then \|DMβf\|Lq(Rn)≤ C(n,β)\|Df\|L1(Rn). The corresponding result was previously known only if n=1 or β=0. Our proofs are almost free from one-dimensional arguments. Therefore, we believe that the new approach may be very useful when trying to extend the result for all f∈ W1,1(Rn).