The Muirhead-Rado inequality, 1 Vector majorization and the permutohedron

Abstract

Let a and b be vectors in Rn with nonnegative coordinates. Permuting the coordinates, we can assume that a1 ≥ ·s ≥ an and b1 ≥ ·s ≥ bn. The vector a majorizes the vector b, denoted b a, if Σi=1n bi = Σi=1n ai and Σi=1k bi ≤ Σi=1k ai for all k ∈ \1,…,n-1\. This paper proves theorems of Hardy-Littlewood-P\'olya and Rado that b a if and only if Pa = b for some doubly stochastic matrix P if and only if b is in the Sn-permutohedron generated by a.