Strictly monotonic multidimensional sequences and stable sets in pillage games

Abstract

Let S ⊂ Rn have size |S| > 2n-1. We show that there are distinct points \x1,..., x+1\ ⊂ S such that for each i ∈ [n], the coordinate sequence (xji)j=1+1 is strictly increasing, strictly decreasing, or constant, and that this bound on |S| is best possible. This is analogous to the -Szekeres theorem on monotonic sequences in . We apply these results to bound the size of a stable set in a pillage game. We also prove a theorem of independent combinatorial interest. Suppose \a1,b1,...,at,bt\ is a set of 2t points in n such that the set of pairs of points not sharing a coordinate is precisely \\a1,b1\,...,\at,bt\\. We show that t ≤ 2n-1, and that this bound is best possible.