On the harmonic generalized Cauchy-Kovalevskaya extension and its connection with the Fueter-Sce theorem

TL;DR

This paper develops a generalized Cauchy-Kovalevskaya extension for axially harmonic functions, explores its relation to the Fueter-Sce theorem, and introduces new harmonic polynomial bases in Clifford analysis.

Contribution

It establishes a harmonic CK extension expressed via Bessel functions, connects it with the Fueter-Sce theorem, and constructs bases for axially harmonic functions and polynomials.

Findings

Harmonic CK extension expressed as a power series with Bessel functions

Connection established between harmonic CK extension and Fueter-Sce map

New basis for axially harmonic functions and polynomials

Abstract

One of the primary objectives of this paper is to establish a generalized Cauchy-Kovalevskaya extension for axially harmonic functions. We demonstrate that the result can be expressed as a power series involving Bessel-type functions of specific differential operators acting on two initial functions. Additionally, we analyze the decomposition of the harmonic CK extension in terms of integrals over the sphere $ \mathbb{S}^{m-1} $ involving functions of plane wave type. Another key goal of this paper is to explore the relationship between the harmonic Cauchy-Kovalevskaya extension and the Fueter-Sce theorem. The Fueter-Sce theorem outlines a two-step process for constructing axially monogenic functions in $ \mathbb{R}^{m+1}$ starting from holomorphic functions in one complex variable. The first step generates the class of slice monogenic functions, while the second step produces axially monogenic functions by applying the pointwise differential operator $ \Delta_{\mathbb{R}{^{m+1}}}^{\frac{m-1}{2}} $ with $m$ being odd, known as the Fueter-Sce map, to a slice monogenic function. By suitably factorizing the Fueter-Sce map, we introduce the set of axially harmonic functions, which serves as an intermediate class between slice monogenic and axially monogenic functions. In this paper, we establish a connection between the harmonic CK extension and the factorization of the Fueter-Sce map. This connection leads to a new notion of harmonic polynomials, which we show to form a basis for the Riesz potential. Finally, we also construct a basis for the space of axially harmonic functions.