A family of singular integral operators which control the Cauchy transform

TL;DR

This paper introduces a family of singular integral operators that generalize the Cauchy transform, demonstrating their boundedness properties imply rectifiability of sets and providing new insights into the invariance of analytic capacity under bi-Lipschitz maps.

Contribution

It establishes a novel family of convolution-type singular integral operators controlling the Cauchy transform and proves their boundedness implies rectifiability, offering a new proof of bi-Lipschitz invariance of analytic capacity.

Findings

Boundedness of $T_{k_0}$ controls $T_{k_ fty}$ and the Cauchy transform.

$L^2$-boundedness of $T_{k_t}$ implies rectifiability of the set.

Provides a simpler proof of bi-Lipschitz invariance of analytic capacity.

Abstract

We study the behaviour of singular integral operators $T_{k_t}$ of convolution type on $\mathbb{C}$ associated with the parametric kernels $$ k_t(z):=\frac{(\Re z)^{3}}{|z|^{4}}+t\cdot \frac{\Re z}{|z|^{2}}, \quad t\in \mathbb{R},\qquad k_\infty(z):=\frac{\Re z}{|z|^{2}}\equiv \Re \frac{1}{z},\quad z\in \mathbb{C}\setminus\{0\}. $$ It is shown that for any positive locally finite Borel measure with linear growth the corresponding $L^2$-norm of $T_{k_0}$ controls the $L^2$-norm of $T_{k_\infty}$ and thus of the Cauchy transform. As a corollary, we prove that the $L^2(\mathcal{H}^1\lfloor E)$-boundedness of $T_{k_t}$ with a fixed $t\in (-t_0,0)$, where $t_0>0$ 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 $L^2$-boundedness of the Cauchy transform, which is the key ingredient for the bi-Lipschitz invariance of analytic capacity.