-symmetric measures and related singular integrals

Abstract

Let S ⊂ C be the circle in the plane, and let : S S be an odd bi-Lipschitz map with constant 1+δ, where δ>0 is small. Assume also that is twice continuously differentiable. Motivated by a question raised by Mattila and Preiss in [MP95], we prove the following: if a Radon measure μ has positive lower density and finte upper density almost everywhere, and the limit ε 0 ∫C B(x,ε) ((x-y)/|x-y|)|x-y| \, dμ(y) exists μ-almost everywhere, then μ is 1-rectifiable. To achieve this, we prove first that if an Ahlfors-David 1-regular measure μ is symmetric with respect to , that is, if ∫B(x,r) |x-y|(x-y|x-y|) \, dμ(y) = 0 for all x ∈ spt(μ) and r>0, then μ is flat, or, in other words, there exists a constant c>0 and a line L so that μ= c H1|L.