Exact Bounds for Forbidden Configurations and the Extremal Matrices

Abstract

Let F be a k× (0,1)-matrix. A matrix is simple if it is a (0,1)-matrix with no repeated columns. A (0,1)-matrix A is said to have a F as a configuration if there is a submatrix of A which is a row and column permutation of F. In the language of sets, a configuration is a trace. Let Avoid(m,F) be all simple m-rowed matrices A with no configuration F. Define forb(m,F) as the maximum number of columns of any matrix in Avoid(m,F). The 2× (p+1) (0,1)-matrix F(0,p,1,0) consists of a row of p 1's and a row of one 1 in the remaining column. The paper determines forb(m,F(0,p,1,0)) for 1 p 9 and the extremal matrices are characterized. A construction may be extremal for all p.