Pseudoshattering Pairs

Abstract

For two vectors x,y∈ [b]k, consider the bipartite graph with two copies of [b] in which i on the left is joined to j on the right if (xt,yt)=(i,j) for some coordinate t. We study the largest size of a family C⊂eq [b]k such that, for every two distinct x,y∈ C, this bipartite graph contains a cycle. We give a natural construction for such families and conjecture that it is optimal whenever k is large relative to b. We prove an LYM-type upper bound that is asymptotically tight with respect to this construction, and is exact when k is large and divisible by b. We then refine the argument using a circular ordering, obtaining the sharp full-support bound when k -1 b. In the case b=3, we prove the exact general result when k -1 3 and k is sufficiently large. The problem is motivated by the Daniely--Shalev-Shwartz dimension and the pseudocube formulation of a higher-alphabet Sauer-Shelah-Perles lemma.