A family of singular integral operators which control the Cauchy transform

Abstract

We study the behaviour of singular integral operators Tkt of convolution type on C associated with the parametric kernels kt(z):=( z)3|z|4+t· z|z|2, t∈ R, k∞(z):= z|z|2 1z, z∈ C\0\. It is shown that for any positive locally finite Borel measure with linear growth the corresponding L2-norm of Tk0 controls the L2-norm of Tk∞ and thus of the Cauchy transform. As a corollary, we prove that the L2(H1 E)-boundedness of Tkt with a fixed t∈ (-t0,0), where t0>0 is an absolute constant, implies that E is rectifiable. This is so in spite of the fact that the usual curvature method fails to be applicable in this case. Moreover, as a corollary of our techniques, we provide an alternative and simpler proof of the bi-Lipschitz invariance of the L2-boundedness of the Cauchy transform, which is the key ingredient for the bi-Lipschitz invariance of analytic capacity.