Field Equations in the Complex Quaternion Spaces

TL;DR

This paper develops a unified mathematical framework using complex quaternion and octonion spaces to describe electromagnetic and gravitational fields, revealing their distinct features within a combined algebraic structure.

Contribution

It introduces a novel octonionic formulation that unifies electromagnetic and gravitational field equations in a single mathematical framework.

Findings

Quaternion space effectively describes gravitational features.

S-quaternion space accurately depicts electromagnetic features.

Octonionic approach unifies two fundamental fields mathematically.

Abstract

The paper aims to adopt the complex quaternion and octonion to formulate the field equations for electromagnetic and gravitational fields. Applying the octonionic representation enables one single definition to combine some physics contents of two fields, which were considered to be independent of each other in the past. J. C. Maxwell applied simultaneously the vector terminology and the quaternion analysis to depict the electromagnetic theory. This method edified the paper to introduce the quaternion and octonion spaces into the field theory, in order to describe the physical feature of electromagnetic and gravitational fields, while their coordinates are able to be the complex number. The octonion space can be separated into two subspaces, the quaternion space and the S-quaternion space. In the quaternion space, it is able to infer the field potential, field strength, field source, field equations, and so forth, in the gravitational field. In the S-quaternion space, it is able to deduce the field potential, field strength, field source, and so forth, in the electromagnetic field. The results reveal that the quaternion space is appropriate to describe the gravitational features; meanwhile the S-quaternion space is proper to depict the electromagnetic features.