A bit better: Variants of duality in geometric algebras with degenerate metrics

Abstract

Multiplication by the pseudoscalar I has been traditionally used in geometric algebra to perform non-metric operations such as calculating coordinates and the regressive product. In algebras with degenerate metrics, such as euclidean PGA P(R*3,0,1), this approach breaks down, leading to a search for non-metric forms of duality. The article compares the dual coordinate map J: G → G*, a double algebra duality, and Hodge duality H: G → G , a single algebra duality for this purpose. While the two maps are computationally identical, only J is coordinate-free and provides direct support for geometric duality, whereby every geometric primitive appears twice, once as a point-based and once as a plane-based form, an essential feature not only of projective geometry but also of euclidean kinematics and dynamics. Our analysis concludes with a proposed duality-neutral software implementation, requiring a single bit field per multi-vector.