On the Structure of Small Strength-2 Covering Arrays

Abstract

A covering array CA(N;t,k,v) of strength t is an N × k array of symbols from an alphabet of size v such that in every N × t subarray, every t-tuple occurs in at least one row. A covering array is optimal if it has the smallest possible N for given t, k, and v, and uniform if every symbol occurs N/v or N/v times in every column. Prior to this paper the only known optimal covering arrays for t=2 were orthogonal arrays, covering arrays with v=2 constructed from Sperner's Theorem and the Erdos-Ko-Rado Theorem, and eleven other parameter sets with v>2 and N > v2. In all these cases, there is a uniform covering array with the optimal size. It has been conjectured that there exists a uniform covering array of optimal size for all parameters. In this paper a new lower bound as well as structural constraints for small uniform strength-2 covering arrays are given. Moreover, covering arrays with small parameters are studied computationally. The size of an optimal strength-2 covering array with v > 2 and N > v2 is now known for 21 parameter sets. Our constructive results continue to support the conjecture.