Multiscale analysis of 1-rectifiable measures: necessary conditions

Abstract

We repurpose tools from the theory of quantitative rectifiability to study the qualitative rectifiability of measures in Rn, n≥ 2. To each locally finite Borel measure μ, we associate a function J2(μ, x) which uses a weighted sum to record how closely the mass of μ is concentrated on a line in the triples of dyadic cubes containing x. We show that J2(μ, x) < ∞ μ-a.e. is a necessary condition for μ to give full mass to a countable family of rectifiable curves. This confirms a conjecture of Peter Jones from 2000. A novelty of this result is that no assumption is made on the upper Hausdorff density of the measure. Thus we are able to analyze generic 1-rectifiable measures that are mutually singular with the 1-dimensional Hausdorff measure.