Embedding theorems and integration operators on Hardy--Carleson type tent spaces induced by doubling weights

TL;DR

This paper investigates the structure of Hardy--Carleson--type tent spaces influenced by doubling weights, providing characterizations of measure embeddings, Littlewood--Paley formulas, and boundedness of Volterra-type operators.

Contribution

It introduces new characterizations of measure embeddings, Littlewood--Paley formulas, and criteria for the boundedness of Volterra-type operators on these tent spaces.

Findings

Characterization of measures for bounded embeddings between tent spaces.

Establishment of a Littlewood--Paley formula for $AT_q^ty()$.

Complete criteria for boundedness and compactness of Volterra-type operators.

Abstract

This paper develops the function and operator theory of Hardy--Carleson--type analytic tent spaces $AT_q^\infty(\omega)$ induced by radial weights $\omega$ satisfying a two-sided doubling condition. We first characterize the positive Borel measures $\mu$ for which the embedding from $AT_p^\infty(\omega)$ into the tent space $T_q^\infty(\mu)$ is bounded for all $0 < p, q < \infty$. A Littlewood--Paley formula for $AT_q^\infty(\omega)$ is then established. Using these results, we give a complete characterization of the boundedness (compactness) of Volterra-type integration operators between $AT_p^\infty(\omega)$ and $AT_q^\infty(\omega)$.