A fractal perspective on optimal antichains and intersecting subsets of the unit n-cube

Abstract

An n-cube antichain is a subset of the unit n-cube [0,1]n that does not contain two elements x=(x1, x2,…, xn) and y=(y1, y2,…, yn) satisfying xi yi for all i∈ \1,…,n\. Using a chain partition of an adequate finite poset we show that the Hausdorff dimension of an n-cube antichain is at most n-1.We conjecture that the (n-1)-dimensional Hausdorff measure of an n-cube antichain is at most n times the Hausdorff measure of a facet of the unit n-cube and we verify this conjecture for n=2 as well as under the assumption that the n-cube antichain is a smooth surface. Our proofs employ estimates on the Hausdorff measure of an n-cube antichain in terms of the sum of the Hausdorff measures of its injective projections. Moreover, by proceeding along devil's staircase, we construct a 2-cube antichain whose 1-dimensional Hausdorff measure equals 2. Additionally, we discuss a problem with an intersection condition in a similar setting.