Nondegenerate 2 × k × (k+1) Hypermatrices

Abstract

We construct an extension of Gaussian elimination to show that if F is a topological field, then there is a transitive, free, and continuous action of a natural quotient of GLk(F) × GLk+1(F) on the set Mk(F) of 2 × k × (k+1) hypermatrices over F with nonzero hyperdeterminant. We use this action to answer a number of questions including determining the homotopy groups of Mk(C), counting elements of Mk(Fq) (generalizing an unpublished result of Lewis and Sam), and computing hyperdeterminants for 2 × k × (k+1) hypermatrices in O(k4) time, which we use to compute explicit formulas in some special cases.