Existence of principal values of some singular integrals on Cantor sets, and Hausdorff dimension

Abstract

Consider a standard Cantor set in the plane of Hausdorff dimension 1. If the linear density of the associated measure μ vanishes, then the set of points where the principal value of the Cauchy singular integral of μ exists has Hausdorff dimension 1. The result is extended to Cantor sets in Rd of Hausdorff dimension α and Riesz singular integrals of homogeneity -α, 0 < α < d : the set of points where the principal value of the Riesz singular integral of μ exists has Hausdorff dimension α. A martingale associated with the singular integral is introduced to support the proof.