English

$*$-exponential of slice-regular functions

Complex Variables 2019-01-03 v1

Abstract

According to [5] we define the *-exponential of a slice-regular function, which can be seen as a generalization of the complex exponential to quaternions. Explicit formulas for exp(f)\exp_*(f) are provided, also in terms of suitable sine and cosine functions. We completely classify under which conditions the *-exponential of a function is either slice-preserving or CJ\mathbb{C}_J-preserving for some JSJ\in\mathbb{S} and show that exp(f)\exp_*(f) is never-vanishing. Sharp necessary and sufficient conditions are given in order that exp(f+g)=exp(f)exp(g)\exp_*(f+g)=\exp_*(f)*\exp_*(g), finding an exceptional and unexpected case in which equality holds even if ff and gg do not commute. We also discuss the existence of a square root of a slice-preserving regular function, characterizing slice-preserving functions (defined on the circularization of simply connected domains) which admit square roots. Square roots of this kind of functions are used to provide a further formula for exp(f)\exp_{*}(f). A number of examples is given throughout the paper.

Keywords

Cite

@article{arxiv.1806.10446,
  title  = {$*$-exponential of slice-regular functions},
  author = {Amedeo Altavilla and Chiara de Fabritiis},
  journal= {arXiv preprint arXiv:1806.10446},
  year   = {2019}
}

Comments

15 pages; to appear in Proceedings of the American Mathematical Society

R2 v1 2026-06-23T02:43:29.599Z