The Cauchy--Szeg\"o Projection for domains in Cn with minimal smoothness: weighted theory

Abstract

Let D⊂ Cn be a bounded, strongly pseudoconvex domain whose boundary bD satisfies the minimal regularity condition of class C2. A 2017 result of Lanzani \& Stein states that the Cauchy--Szeg\"o projection Sω defined with respect to a bounded, positive continuous multiple ω of induced Lebesgue measure, maps Lp(bD, ω) to Lp(bD, ω) continuously for any 1<p<∞. Here we show that Sω satisfies explicit quantitative bounds in Lp(bD, ), for any 1<p<∞ and for any in the maximal class of Ap-measures, that is for p = pσ where p is a Muckenhoupt Ap-weight and σ is the induced Lebesgue measure (with ω's as above being a sub-class). Earlier results rely upon an asymptotic expansion and subsequent pointwise estimates of the Cauchy--Szeg\"o kernel, but these are unavailable in our setting of minimal regularity of bD; at the same time, more recent techniques that allow to handle domains with minimal regularity (Lanzani--Stein 2017) are not applicable to Ap-measures. It turns out that the method of quantitative extrapolation is an appropriate replacement for the missing tools. To finish, we identify a class of holomorphic Hardy spaces defined with respect to Ap-measures for which a meaningful notion of Cauchy--Szeg\"o projection can be defined when p=2.

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