Two sufficient conditions for rectifiable measures

Abstract

We identify two sufficient conditions for locally finite Borel measures on Rn to give full mass to a countable family of Lipschitz images of Rm. The first condition, extending a prior result of Pajot, is a sufficient test in terms of Lp affine approximability for a locally finite Borel measure μ on Rn satisfying the global regularity hypothesis r 0 μ(B(x,r))/rm <∞ at μ-a.e. x∈Rn to be m-rectifiable in the sense above. The second condition is an assumption on the growth rate of the 1-density that ensures a locally finite Borel measure μ on Rn with r 0 μ(B(x,r))/r=∞ μ-a.e. x∈Rn is 1-rectifiable.