On inscribed trapezoids and affinely 3-regular maps

Abstract

We show that any embedding Rd R2d+2γ(d)-1 inscribes a trapezoid or maps three points to a line, where 2γ(d) is the smallest power of 2 satisfying 2γ(d) ≥ (d), and (d) denotes the Hurwitz--Radon function. The proof is elementary and includes a novel application of nonsingular bilinear maps. As an application, we recover recent results on the nonexistence of affinely 3-regular maps, for infinitely many dimensions d, without resorting to sophisticated algebraic techniques.