Characterization of n-rectifiability in terms of Jones' square function: Part II

Abstract

We show that a Radon measure μ in Rd which is absolutely continuous with respect to the n-dimensional Hausdorff measure Hn is n-rectifiable if the so called Jones' square function is finite μ-almost everywhere. The converse of this result is proven in a companion paper by the second author, and hence these two results give a classification of all n-rectifiable measures which are absolutely continuous with respect to Hn. Further, in this paper we also investigate the relationship between the Jones' square function and the so called Menger curvature of a measure with linear growth.