Cones, rectifiability, and singular integral operators

Abstract

Let μ be a Radon measure on Rd. We define and study conical energies Eμ,p(x,V,α), which quantify the portion of μ lying in the cone with vertex x∈Rd, direction V∈ G(d,d-n), and aperture α∈ (0,1). We use these energies to characterize rectifiability and the big pieces of Lipschitz graphs property. Furthermore, if we assume that μ has polynomial growth, we give a sufficient condition for L2(μ)-boundedness of singular integral operators with smooth odd kernels of convolution type.