Parametric Realization of the Lorentz Transformation Group in Pseudo-Euclidean Spaces

TL;DR

This paper introduces a parametric framework for the Lorentz transformation group in pseudo-Euclidean spaces, leading to the concept of bi-gyrogroups, which generalize gyrogroups and groups with potential broad applications.

Contribution

It presents a novel parametrization of $SO(m,n)$ and introduces bi-gyrogroups, extending the algebraic structures related to Lorentz transformations beyond traditional groups.

Findings

Parametrization of $SO(m,n)$ with a new composition law.

Introduction of bi-gyrogroups as a generalization of gyrogroups.

Potential universal computational role of bi-gyrogroups.

Abstract

The Lorentz transformation group $SO(m,n)$ is a group of Lorentz transformations of order $(m,n)$, that is, a group of special linear transformations in a pseudo-Euclidean space of signature $(m,n)$ that leave the pseudo-Euclidean inner product invariant. A parametrization of $SO(m,n)$ is presented, giving rise to the composition law of Lorentz transformations of order $(m,n)$ in terms of parameter composition. The parameter composition, in turn, gives rise to a novel group-like structure called a bi-gyrogroup. Bi-gyrogroups form a natural generalization of gyrogroups where the latter form a natural generalization of groups. Like the abstract gyrogroup, the abstract bi-gyrogroup can play a universal computational role which extends far beyond the domain of pseudo-Euclidean spaces.