Chord-arc curves and the Beurling transform

Abstract

We study the relation between the geometric properties of a quasicircle~ and the complex dilatation~μ of a quasiconformal mapping that maps the real line onto~. Denoting by~S the Beurling transform, we characterize Bishop-Jones quasicircles in terms of the boundedness of the operator~(I-μ S) on a particular weighted L2~space, and chord-arc curves in terms of its invertibility. As an application we recover the~L2 boundedness of the Cauchy integral on chord-arc curves.