On k-antichains in the unit n-cube

Abstract

A chain in the unit n-cube is a set C⊂ [0,1]n such that for every x=(x1,…,xn) and y=(y1,…,yn) in C we either have xi yi for all i∈ [n], or xi yi for all i∈ [n]. We consider subsets, A, of the unit n-cube [0,1]n that satisfy \[ card(A C) k, \, for all chains \, C ⊂ [0,1]n \, , \] where k is a fixed positive integer. We refer to such a set A as a k-antichain. We show that the (n-1)-dimensional Hausdorff measure of a k-antichain in [0,1]n is at most kn and that the bound is asymptotically sharp. Moreover, we conjecture that there exist k-antichains in [0,1]n whose (n-1)-dimensional Hausdorff measure equals kn and we verify the validity of this conjecture when n=2.