Regularity and continuity of the multilinear strong maximal operators

Abstract

Let m 1, in this paper, our object of investigation is the regularity and and continuity properties of the following multilinear strong maximal operator MR(f)(x)=R x R∈RΠi=1m1|R|∫R|fi(y)|dy, where x∈Rd and R denotes the family of all rectangles in Rd with sides parallel to the axes. When m=1, denote MR by MR.Then, MR coincides with the classical strong maximal function initially studied by Jessen, Marcinkiewicz and Zygmund. We showed that MR is bounded and continuous from the Sobolev spaces W1,p1(Rd)× ·s× W1,pm(Rd) to W1,p (Rd), from the Besov spaces Bsp1,q (Rd)×·s× Bspm,q(Rd) to Bsp,q(Rd), from the Triebel-Lizorkin spaces Fsp1,q(Rd)×·s× Fspm,q(Rd) to Fsp,q(Rd). As a consequence, we further showed that MR is bounded and continuous from the fractional Sobolev spaces Ws,p1(Rd)× ·s× Ws,pm(Rd) to Ws,p(Rd) for 0<s≤ 1 and 1<p<∞. As an application, we obtain a weak type inequality for the Sobolev capacity, which can be used to prove the p-quasicontinuity of MR. The discrete type of the strong maximal operators has also been considered. We showed that this discrete type of the maximal operators enjoys somewhat unexpected regularity properties.