Carleson measures for weighted Bergman--Zygmund spaces

TL;DR

This paper characterizes when weighted Bergman--Zygmund spaces can be embedded into Lebesgue--Zygmund spaces via Carleson measures, and applies these results to integral operators between such spaces.

Contribution

It provides new characterizations of bounded and compact embeddings and integral operators for weighted Bergman--Zygmund spaces under doubling and monotonicity conditions.

Findings

Characterization of bounded embeddings $A_{ ext{weighted}}^{p} o L^{q}$.

Criteria for compactness of embeddings.

Boundedness and compactness of integral operators between these spaces.

Abstract

For $0<p<\infty$, $\Psi:[0,\infty)\to(0,\infty)$ and a finite positive Borel measure $\mu$ on the unit disc $\mathbb{D}$, the Lebesgue--Zygmund space $L^p_{\mu,\Psi}$ consists of all measurable functions $f$ such that $\lVert f \rVert_{L_{\mu, \Psi}^{p}}^p =\int_{\mathbb{D}}|f|^p\Psi(|f|)\,d\mu< \infty$. For an integrable radial function $\omega$ on $\mathbb{D}$, the corresponding weighted Bergman-Zygmund space $A_{\omega, \Psi}^{p}$ is the set of all analytic functions in $L_{\mu, \Psi}^{p}$ with $d\mu=\omega\,dA$. The purpose of the paper is to characterize bounded (and compact) embeddings $A_{\omega,\Psi}^{p}\subset L_{\mu, \Phi}^{q}$, when $0<p\le q<\infty$, the functions $\Psi$ and $\Phi$ are essential monotonic, and $\Psi,\Phi,\omega$ satisfy certain doubling properties. The tools developed on the way to the main results are applied to characterize bounded and compact integral operators acting from $A^p_{\omega,\Psi}$ to $A^q_{\nu,\Phi}$, provided $\nu$ admits the same doubling property as $\omega$.