Endpoint Sobolev Bounds for Fractional Hardy-Littlewood Maximal Operators

Abstract

Let 0<α<d and 1≤ p<d/α. We present a proof that for all f∈ W1,p(Rd) both the centered and the uncentered Hardy-Littlewood fractional maximal operator Mα f are weakly differentiable and \|∇ Mα f\|p* ≤ Cd,α,p \|∇ f\|p , where p* = (p-1-α/d)-1 . In particular it covers the endpoint case p=1 for 0<α<1 where the bound was previously unknown. For p=1 we can replace W1,1(Rd) by BV(Rd). The ingredients used are a pointwise estimate for the gradient of the fractional maximal function, the layer cake formula, a Vitali type argument, a reduction from balls to dyadic cubes, the coarea formula, a relative isoperimetric inequality and an earlier established result for α=0 in the dyadic setting. We use that for α>0 the fractional maximal function does not use certain small balls. For α=0 the proof collapses.