Neighborly boxes and bipartite coverings; constructions and conjectures

Abstract

Two axis-aligned boxes in Rd are k-neighborly if their intersection has dimension at least d-k and at most d-1. The maximum number of pairwise k-neighborly boxes in Rd is denoted by n(k,d). It is known that n(k,d)=(dk), for fixed 1≤slant k≤slant d, but exact formulas are known only in three cases: k=1, k=d-1, and k=d. In particular, the formula n(1,d)=d+1 is equivalent to the famous theorem of Graham and Pollak on bipartite partitions of cliques. In this paper we are dealing with the case k=2. We give a new construction of k-neighborly codes giving better lower bounds on n(2,d). The construction is recursive in nature and uses a kind of ``algebra'' on lists of ternary strings, which encode neighborly boxes in a familiar way. Moreover, we conjecture that our construction is optimal and gives an explicit formula for n(2,d). This supposition is supported by some numerical experiments and some partial results on related open problems which are recalled.