# Equivalence of slice semi-regular functions via Sylvester operators

**Authors:** Amedeo Altavilla, Chiara de Fabritiis

arXiv: 1907.07385 · 2020-08-24

## TL;DR

This paper investigates the properties of slice semi-regular functions over quaternions using Sylvester operators, providing a matrix framework and characterizing function equivalences, idempotents, and zero divisors.

## Contribution

It introduces a matrix interpretation of Sylvester-type operators on slice semi-regular functions and characterizes their invertibility, equivalence, and divisors in quaternionic analysis.

## Key findings

- Characterization of when functions are equivalent under $*$-conjugation
- Description of kernel and image of Sylvester operators
- Classification of idempotents and zero divisors on product domains

## Abstract

The aim of this paper is to study some features of slice semi-regular functions $\mathcal{RM}(\Omega)$ on a circular domain $\Omega$ contained in the skew-symmetric algebra of quaternions $\mathbb{H}$ via the analysis of a family of linear operators built from left and right $*$-multiplication on $\mathcal{RM}(\Omega)$; this class of operators includes the family of Sylvester-type operators $\mathcal{S}_{f,g}$. Our strategy is to give a matrix interpretation of these operators as we show that $\mathcal{RM}(\Omega)$ can be seen as a $4$-dimensional vector space on the field $\mathcal{RM}_{\mathbb{R}}(\Omega)$. We then study the rank of $\mathcal{S}_{f,g}$ and describe its kernel and image when it is not invertible. By using these results, we are able to characterize when the functions $f$ and $g$ are either equivalent under $*$-conjugation or intertwined by means of a zero divisor, thus proving a number of statements on the behaviour of slice semi-regular functions. We also provide a complete classification of idempotents and zero divisors on product domains of $\mathbb{H}$.

## Full text

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## References

28 references — full list in the complete paper: https://tomesphere.com/paper/1907.07385/full.md

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Source: https://tomesphere.com/paper/1907.07385