Square Roots of -1 in Real Clifford Algebras

TL;DR

This paper explores the algebraic and geometric structures of square roots of -1 within Clifford algebras of various dimensions, extending previous research beyond dimension limits and providing explicit classifications and tables.

Contribution

It generalizes the characterization of roots of -1 in Clifford algebras to higher dimensions using matrix algebra isomorphisms, offering new insights and tools for geometric Fourier transforms.

Findings

Explicit classification of roots of -1 in Clifford algebras with n=5,7

Tables of representative roots for algebras with associated ring 

Application to geometric Fourier transformations

Abstract

It is well known that Clifford (geometric) algebra offers a geometric interpretation for square roots of -1 in the form of blades that square to minus 1. This extends to a geometric interpretation of quaternions as the side face bivectors of a unit cube. Systematic research has been done [32] on the biquaternion roots of -1, abandoning the restriction to blades. Biquaternions are isomorphic to the Clifford (geometric) algebra $Cl(3,0)$ of $\mathbb{R}^3$. Further research on general algebras $Cl(p,q)$ has explicitly derived the geometric roots of -1 for $p+q \leq 4$ [17]. The current research abandons this dimension limit and uses the Clifford algebra to matrix algebra isomorphisms in order to algebraically characterize the continuous manifolds of square roots of -1 found in the different types of Clifford algebras, depending on the type of associated ring ($\mathbb{R}$, $\mathbb{H}$, $\mathbb{R}^2$, $\mathbb{H}^2$, or $\mathbb{C}$). At the end of the paper explicit computer generated tables of representative square roots of -1 are given for all Clifford algebras with $n=5,7$, and $s=3 \, (mod 4)$ with the associated ring $\mathbb{C}$. This includes, e.g., $Cl(0,5)$ important in Clifford analysis, and $Cl(4,1)$ which in applications is at the foundation of conformal geometric algebra. All these roots of -1 are immediately useful in the construction of new types of geometric Clifford Fourier transformations.