English

Exploiting degeneracy in projective geometric algebra

Rings and Algebras 2024-12-13 v2 Metric Geometry

Abstract

The last two decades, since the seminal work of Selig, has seen projective geometric algebra (PGA) gain popularity as a modern coordinate-free framework for doing classical Euclidean geometry and other Cayley-Klein geometries. This framework is based upon a degenerate Clifford algebra, and it is the purpose of this paper to delve deeper into its internal algebraic structure and extract meaningful information for the purposes of PGA. This includes exploiting the split extension structure to realise the natural decomposition of elements of this Clifford algebra into Euclidean and ideal parts. This leads to a beautiful demonstration of how Playfair's axiom for affine geometry arises from the ambient degenerate quadratic space. The highlighted split extension property of the Clifford algebra also corresponds to a splitting of the group of units and the Lie algebra of bivectors. Central to these results is that the degenerate Clifford algebra Cl(V)\mathrm{Cl}(V) is isomorphic to the twisted trivial extension Cl(V/Fe0)αCl(V/Fe0)\mathrm{Cl}(V/\mathbb Fe_0)\ltimes_\alpha\mathrm{Cl}(V/\mathbb Fe_0), where e0e_0 is a degenerate vector and α\alpha is the grade-involution.

Keywords

Cite

@article{arxiv.2408.13441,
  title  = {Exploiting degeneracy in projective geometric algebra},
  author = {John Bamberg and Jeff Saunders},
  journal= {arXiv preprint arXiv:2408.13441},
  year   = {2024}
}

Comments

17 pages. Submitted to Advances in Applied Clifford Algebras

R2 v1 2026-06-28T18:22:44.115Z