Projection inequalities for antichains

Abstract

A set A ⊂eq Rn is called an antichain (resp. antichain) if it does not contain two distinct elements x=(x1,…, xn) and y=(y1,…, yn) satisfying xi yi (resp. xi < yi) for all i∈ \1,…,n\. We show that the Hausdorff dimension of a weak antichain A in the n-dimensional unit cube [0,1]n is at most n-1 and that the (n-1)-dimensional Hausdorff measure of A is at most n, which are the best possible bounds. This result is derived as a corollary of the following projection inequality, which may be of independent interest: The (n-1)-dimensional Hausdorff measure of a (weak) antichain A⊂eq [0, 1]n cannot exceed the sum of the (n-1)-dimensional Hausdorff measures of the n orthogonal projections of A onto the facets of the unit n-cube containing the origin. For the proof of this result we establish a discrete variant of the projection inequality applicable to weak antichains in Zn and combine it with ideas from geometric measure theory.