Square functions of fractional homogeneity and Wolff potentials

Abstract

In this paper it is shown that for anymeasure μ in Rd and for a non-integer 0<s<d, the Wolff energy 0∞(μ(B(x,r))rs)2\,drrdμ(x) is comparable to 0∞(μ(B(x,r))rs - μ(B(x,2r))(2r)s)2\,drrdμ(x), unlike in the case when s is an integer. We also study the relation with the L2-norm of s-Riesz transforms, 0<s<1, and we provide a counterexample in the integer case.