The dimension of an orbitope based on a solution to the Legendre pair problem

Abstract

The Legendre pair problem is a particular case of a rank-1 semidefinite description problem that seeks to find a pair of vectors (u,v) each of length such that the vector (u,v) satisfies the rank-1 semidefinite description. The group (Z×Z) Z× acts on the solutions satisfying the rank-1 semidefinite description by ((i,j),k)(u,v)=((i,k)u,(j,k)v) for each ((i,j),k) ∈ (Z×Z) Z×. By applying the methods based on representation theory in Bulutoglu [Discrete Optim. 45 (2022)], and results in Ingleton [Journal of the London Mathematical Society s(1-31) (1956), 445-460] and Lam and Leung [Journal of Algebra 224 (2000), 91-109], for a given solution (u,v) satisfying the rank-1 semidefinite description, we show that the dimension of the convex hull of the orbit of u under the action of Z or Z× is -1 provided that =pn or =pqi for i=1,2, any positive integer n, and any two odd primes p,q. Our results lead to the conjecture that this dimension is -1 in both cases. We also show that the dimension of the convex hull of all feasible points of the Legendre pair problem of length is 2-2 provided that it has at least one feasible point.