Discrete octonionic analysis: a unified approach to the split-octonionic and classical settings

TL;DR

This paper develops a unified discrete octonionic analysis framework that includes both classical and split-octonionic cases, addressing practical discretisation needs for mathematical physics boundary problems.

Contribution

It introduces a comprehensive approach to discretise octonionic analysis, including the split-octonionic case, unifying various eight-dimensional algebraic structures.

Findings

Unified discrete octonionic framework proposed

Addresses discretisation for split-octonionic analysis

Enables practical applications in mathematical physics

Abstract

Various problems of mathematical physics consider octonions and split-octonions as a mathematical structure, which underpins the eight-dimensional nature of these problems. Therefore, it is not surprising that octonionic analysis has become an area of active research in recent years. One of the main goals of octonionic analysis is to develop tools of an octonionic operator calculus for solving boundary value problems of mathematical physics that benefit from the use of the octonionic structure. However, when we want to apply the operator calculus in practice, it becomes evident that adequate discrete counterparts of continuous constructions need to be defined. In previous works, we have proposed several approaches to discretise the classical continuous octonionic analysis. However, the split-octonionic case, which is particularly important for practical applications concretely investigated in the last years, has not been considered until now. Therefore, one of the goals of this paper is to explain how to particularly address the discrete split-octonionic setting. Additionally, we propose a general umbrella to cover all different discrete octonionic settings in one unified approach that also encompasses the different eight-dimensional algebraic structures.