Dyadic weights on Rn and reverse Holder inequalities

Abstract

We prove that for any weight φ defined on [0,1]n that satisfies a reverse Holder inequality with exponent p > 1 and constant c1 upon all dyadic subcubes of [0,1]n, it's non increasing rearrangement satisfies a reverse Holder inequality with the same exponent and constant not more than 2nc-2n + 1, upon all subintervals of [0; 1] of the form [0; t]. This gives as a consequence, according to the results in [8], an interval [p; p0(p; c)) = Ip,c, such that for any q ∈ Ip,c, we have that φ is in Lq.