New criteria for the rectifiability of Radon measures in terms of Riesz transforms
Abstract
In this paper we explore the connection between quantitative rectifiability of measures and the L2 boundedness of the codimension one Riesz transform. Among other things, we prove the following. Let μ be a Radon measure in Rn+1 with growth of degree n such that the n-dimensional Riesz transform Rμ is bounded in L2(μ), and let B0⊂ Rn+1 be a suitably doubling ball such that: (i) There exists some (small) ball B1 centered in B0 with r(B1)≤ δ1 r(B0) such that, for some constant α>0, μ(B1)r(B1)n≥ α\,μ(B0)r(B0)n. (ii) For some ε>0, ∫2B0 |Rμ - mμ,2B0(Rμ)|2\,dμ≤ ε\,(μ(B0)r(B0)n)2\,μ(B0). If δ1 is small enough, depending on n and α, and ε is small enough, then there exists a uniformly n-rectifiable set and some τ>0 such that μ( B0) ≥τ\,μ(B0).
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