Radon measures and Lipschitz graphs

Abstract

For all 1≤ m≤ n-1, we investigate the interaction of locally finite measures in Rn with the family of m-dimensional Lipschitz graphs. For instance, we characterize Radon measures μ, which are carried by Lipschitz graphs in the sense that there exist graphs 1,2,… such that μ(Rn1∞i)=0, using only countably many evaluations of the measure. This problem in geometric measure theory was classically studied within smaller classes of measures, e.g.~for the restrictions of m-dimensional Hausdorff measure Hm to E⊂eq Rn with 0<Hm(E)<∞. However, an example of Cs\"ornyei, K\"aenm\"aki, Rajala, and Suomala shows that classical methods are insufficient to detect when a general measure charges a Lipschitz graph. To develop a characterization of Lipschitz graph rectifiability for arbitrary Radon measures, we look at the behavior of coarse doubling ratios of the measure on dyadic cubes that intersect conical annuli. This extends a characterization of graph rectifiability for pointwise doubling measures by Naples by mimicking the approach used in the characterization of Radon measures carried by rectifiable curves by Badger and Schul.