The $\Pi$-operator on Some Conformally Flat Manifolds and the Upper Half Space

TL;DR

This paper constructs and analyzes the $ abla$-operator on conformally flat manifolds and the upper half space, extending its properties and applications to solving Beltrami equations in these geometric contexts.

Contribution

It introduces a generalized $ abla$-operator on conformally flat manifolds and the upper half space, and explores its use in solving Beltrami equations within these settings.

Findings

The $ abla$-operator is constructed on conformally flat manifolds.

The operator preserves $L^2$ isometry and has bounded $L^p$ norms.

Applications to Beltrami equations are demonstrated in these geometric contexts.

Abstract

The $\Pi$-operator, also known as Ahlfors-Beurling transform, plays an important role in solving the existence of locally quasiconformal solutions of Beltrami equations. In this paper, we first construct the $\Pi$-operator on a general Clifford-Hilbert module. This $\Pi$-operator is also an $L^2$ isometry. Further, it can also be used for solving certain Beltrami equations when the Hilbert space is the $L^2$ space of a measure space. Then, we show that this technique can be applied to construct the classical $\Pi$-operator in the complex plane and some other examples on some conformally flat manifolds, which are constructed by $U/\Gamma$, where $U$ is a simply connected subdomain of either $\mathbb{R}^{n}$ or $\mathbb{S}^{n}$, and $\Gamma$ is a Kleinian group acting discontinuously on $U$. The $\Pi$-operators on those manifolds also preserve the isometry property in certain $L^2$ spaces, and their $L^p$ norms are bounded by the $L^p$ norms of the $\Pi$-operators on $\mathbb{R}^{n}$ or $\mathbb{S}^{n}$, depending on where $U$ lies. The applications of the $\Pi$-operator to solutions of the Beltrami equations on those conformally flat manifolds are also discussed. At the end, we investigate the $\Pi$-operator theory in the upper-half space with the hyperbolic metric.