Forbidden Configurations and Boundary Cases

Abstract

Let F be a k× (0,1)-matrix. Define a (0,1)-matrix A 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. Define a matrix to be simple if it is a (0,1)-matrix with no repeated columns. 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). Determining forb(m,F) requires determining bounds and constructions of matrices in Avoid(m,F). The paper considers some column maximal k-rowed simple F that have the bound (mk-2) and yet adding a column increases bound to (mk-1). By a construction, forb(m,F) is determined exactly.