On the Boundedness of Multilinear Fractional Strong Maximal Operator with multiple weights

Abstract

In this paper, we investigated the boundedness of multilinear fractional strong maximal operator MR,α associated with rectangles or related to more general basis with multiple weights A(p,q),R. In the rectangles setting, we first gave an end-point estimate of MR,α, which not only extended the famous linear result of Jessen, Marcinkiewicz and Zygmund, but also extended the multilinear result of Grafakos, Liu, P\'erez and Torres (α=0) to the case 0<α<mn. Then, in one weight case, we gave several equivalent characterizations between MR,α and A(p,q),R, by applying a different approach from what we have used before. Moreover, a sufficient condition for the two weighted norm inequality of MR,α was presented and a version of vector-valued two weighted inequality for the strong maximal operator was established when m=1. In the general basis setting, we further studied the properties of the multiple weights A(p,q),R conditions, including the equivalent characterizations and monotonic properties, which essentially extended one's previous understanding. Finally, a survey on multiple strong Muckenhoupt weights was given, which demonstrates the properties of multiple weights related to rectangles systematically.