Spreading grid cells

Abstract

Let S be a set of n2 symbols. Let A be an n× n square grid with each cell labeled by a distinct symbol in S. Let B be another n× n square grid, also with each cell labeled by a distinct symbol in S. Then each symbol in S labels two cells, one in A and one in B. Define the combined distance between two symbols in S as the distance between the two cells in A plus the distance between the two cells in B that are labeled by the two symbols. Bel\'en Palop asked the following question at the open problems session of CCCG 2009: How to arrange the symbols in the two grids such that the minimum combined distance between any two symbols is maximized? In this paper, we give a partial answer to Bel\'en Palop's question. Define cp(n) = A,Bs,t ∈ S \p(A,s,t) + p(B,s,t) \, where A and B range over all pairs of n× n square grids labeled by the same set S of n2 distinct symbols, and where p(A,s,t) and p(B,s,t) are the Lp distances between the cells in A and in B, respectively, that are labeled by the two symbols s and t. We present asymptotically optimal bounds cp(n) = (n) for all p=1,2,...,∞. The bounds also hold for generalizations to d-dimensional grids for any constant d 2. Our proof yields a simple linear-time constant-factor approximation algorithm for maximizing the minimum combined distance between any two symbols in two grids.