Solutions of Weinstein equations representable by Bessel Poisson   integrals of BMO functions

Jorge J. Betancor; Alejandro J. Castro; Juan C. Fari\~na; Lourdes; Rodr\'iguez-Mesa

arXiv:1407.2436·math.CA·October 26, 2023

Solutions of Weinstein equations representable by Bessel Poisson integrals of BMO functions

Jorge J. Betancor, Alejandro J. Castro, Juan C. Fari\~na, Lourdes, Rodr\'iguez-Mesa

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TL;DR

This paper characterizes solutions to a Weinstein-type PDE on the upper half-plane that can be represented by Bessel-Poisson integrals of BMO functions, linking their behavior to Carleson measure conditions.

Contribution

It provides a characterization of Weinstein equation solutions representable by Bessel-Poisson integrals of BMO functions using Carleson measure properties.

Findings

01

Solutions are characterized by Carleson measure conditions.

02

Solutions can be represented via Bessel-Poisson integrals of BMO functions.

03

The paper extends the understanding of Weinstein equations in harmonic analysis.

Abstract

We consider the Weinstein type equation $L_{λ} u = 0$ on $(0, \infty) \times (0, \infty)$ , where $L_{λ} = \partial_{t}^{2} + \partial_{x}^{2} - \frac{λ ( λ - 1 )}{x ^{2}}$ , with $λ > 1$ . In this paper we characterize the solutions of $L_{λ} u = 0$ on $(0, \infty) \times (0, \infty)$ representable by Bessel-Poisson integrals of BMO-functions as those ones satisfying certain Carleson properties.

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Taxonomy

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