A Carleson type measure and a family of M\"obius invariant function   spaces

Guanlong Bao; Fangqin Ye

arXiv:2208.03706·math.CV·December 13, 2022

A Carleson type measure and a family of M\"obius invariant function spaces

Guanlong Bao, Fangqin Ye

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TL;DR

This paper explores the relationship between s-Carleson measures and M"obius invariant function spaces, using operators, Blaschke products, and differential equations to deepen understanding of these complex analysis structures.

Contribution

It establishes new connections between s-Carleson measures and M"obius invariant F(p, p-2, s) spaces through various analytical tools.

Findings

01

Characterization of s-Carleson measures in relation to invariant spaces

02

Analysis of Volterra type operators on these spaces

03

Solutions to differential equations with prescribed zeros

Abstract

For $0 < s < 1$ , let ${z_{n}}$ be a sequence in the open unit disk such that $\sum_{n} (1 - ∣ z_{n} ∣^{2})^{s} δ_{z_{n}}$ is an $s$ -Carleson measure. In this paper, we consider the connections between this $s$ -Carleson measure and the theory of M\"obius invariant $F (p, p - 2, s)$ spaces by the Volterra type operator, the reciprocal of a Blaschke product, and second order complex differential equations having a prescribed zero sequence.

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Taxonomy

TopicsAdvanced Harmonic Analysis Research · Differential Equations and Boundary Problems · Holomorphic and Operator Theory