An extremal problem on crossing vectors

Abstract

For positive integers w and k, two vectors A and B from Zw are called k-crossing if there are two coordinates i and j such that A[i]-B[i]≥ k and B[j]-A[j]≥ k. What is the maximum size of a family of pairwise 1-crossing and pairwise non-k-crossing vectors in Zw? We state a conjecture that the answer is kw-1. We prove the conjecture for w≤ 3 and provide weaker upper bounds for w≥ 4. Also, for all k and w, we construct several quite different examples of families of desired size kw-1. This research is motivated by a natural question concerning the width of the lattice of maximum antichains of a partially ordered set.