The geometry of sedenion zero divisors
Abstract
The sedenion algebra S is a non-commutative, non-associative, 16-dimensional real algebra with zero divisors. It is obtained from the octonions through the Cayley-Dickson construction. The zero divisors of S can be viewed as the submanifold Z( S) ⊂ S × S of normalized pairs whose product equals zero, or as the submanifold ZD( S) ⊂ S of normalized elements with non-trivial annihilators. We prove that Z( S) is isometric to the excepcional Lie group G2, equipped with a naturally reductive left-invariant metric. Moreover, Z( S) is the total space of a Riemannian submersion over the excepcional symmetric space of quaternion subalgebras of the octonion algebra, with fibers that are locally isometric to a product of two round 3-spheres with different radii. Additionally, we prove that ZD( S) is isometric to the Stiefel manifold V2( R7), the space of orthonormal 2-frames in R7, endowed with a specific G2-invariant metric. By shrinking this metric along a circle fibration, we construct new examples of an Einstein metric and a family of homogenous metrics on V2( R7) with non-negative sectional curvature.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.