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

Abstract

In this paper it is shown that if μ is a finite Radon measure in Rd which is n-rectifiable and 1≤ p≤ 2, then ∫0∞ βμ,pn(x,r)2\,drr<∞ for μ-a.e. x∈ Rd, where βμ,pn(x,r) = ∈fL (1rn ∫ B(x,r) ( dist(y,L)r)p\,dμ(y))1/p, with the infimum taken over all the n-planes L⊂ Rd. The βμ,pn coefficients are the same as the ones considered by David and Semmes in the setting of the so called uniform n-rectifiability. An analogous necessary condition for n-rectifiability in terms of other coefficients involving some variant of the Wasserstein distance W1 is also proved.