Cauchy transforms and Szegő projections in dual Hardy spaces: inequalities and Möbius invariance

David E. Barrett, Luke D. Edholm
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Abstract

Dual pairs of interior and exterior Hardy spaces associated to a simple closed Lipschitz planar curve are considered, leading to a M\"obius invariant function bounding the norm of the Cauchy transform $\bf{C}$ from below. This function is shown to satisfy strong rigidity properties and is closely connected via the Berezin transform to the square of the Kerzman-Stein operator. Explicit example calculations are presented. For ellipses, a new asymptotically sharp lower bound on the norm of $\bf{C}$ is produced.
对偶哈代空间中的考奇变换和斯格ő投影:不等式和莫比乌斯不变性
考虑了与简单封闭的利普希茨平面曲线相关的内部和外部哈代空间的双对,从而得出一个从下往上约束考奇变换 $\bf{C}$ 的规范的 M\"obius 不变函数。这个函数被证明满足强刚度特性,并通过贝雷津变换与凯尔兹曼-斯泰因算子的平方紧密相连。文中给出了明确的计算示例。对于椭圆,产生了一个关于 $\bf{C}$ 的规范的新的渐近尖锐下界。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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