Harmonic Functions on Four Dimensions
Abstract
This paper develops theory for a newly-defined bicomplex hyperbolic harmonic function with four real-dimensional inputs, in a way that generalizes the connection between real harmonic functions with two real-dimensional inputs and complex analytic functions. For example, every bicomplex hyperbolic harmonic function appears as this paper's newly-defined hyperbolic real part of a bicomplex analytic function, just as every real harmonic function with two real-dimensional inputs is the real part of a complex analytic function. In addition, this connection produces a unique (up to additive constant) and newly-defined hyperbolic harmonic conjugate function, just as every real harmonic function has a unique (up to additive constant) real harmonic conjugate. Finally, the paper determines a bicomplex Poisson kernel function that produces a corresponding integral representation for bicomplex harmonic functions, one that generalizes the complex harmonic function Poisson integral representation.
Cite
@article{arxiv.2311.17033,
title = {Harmonic Functions on Four Dimensions},
author = {William Johnston and Sara Moore and Rebecca G. Wahl},
journal= {arXiv preprint arXiv:2311.17033},
year = {2025}
}
Comments
Significant revision