The fraction of an Sn-orbit on a hyperplane

Abstract

Huang, McKinnon, and Satriano conjectured that if v ∈ Rn has distinct coordinates and n ≥ 3, then a hyperplane through the origin other than Σi xi = 0 contains at most 2 n/2 (n-2)! of the vectors obtained by permuting the coordinates of v. We prove this conjecture.