The maximum, spectrum and supremum for critical set sizes in (0,1)-matrices

Abstract

If D is a partially filled-in (0,1)-matrix with a unique completion to a (0,1)-matrix M (with prescribed row and column sums), we say that D is a defining set for M. A critical set is a minimal defining set (the deletion of any entry results in more than one completion). We give a new classification of critical sets in (0,1)-matrices and apply this theory to 2mm, the set of (0,1)-matrices of dimensions 2m× 2m with uniform row and column sum m. The smallest possible size for a defining set of a matrix in 2mm is m2 Cav, and the infimum (the largest smallest defining set size for members of 2mm) is known asymptotically CR. We show that no critical set of size larger than 3m2-2m exists in an element of 2mm and that there exists a critical set of size k in an element of 2mm for each k such that m2≤ k≤ 3m2-4m+2. We also bound the supremum (the smallest largest critical set size for members of 2mm) between (3m2-2m+1)/2 and 2m2-m.