Samenvatting
This paper attaches a frame to a natural class of combinatorial problems and points out that this class includes many important special cases.
A matrix M is said to avoid a set of matrices if M does not contain any element of as (ordered) submatrix. For a fixed set of matrices, we consider the problem of deciding whether the rows and columns of a matrix can be permuted in such a way that the resulting matrix M avoids all matrices in .
We survey several known and new results on the algorithmic complexity of this problem, mostly dealing with (0,1)-matrices. Among others, we will prove that the problem is polynomial time solvable for many sets containing a single, small matrix and we will exhibit some example sets for which the problem is NP-complete.
Originele taal-2 | Engels |
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Pagina's (van-tot) | 223-248 |
Tijdschrift | Discrete Applied Mathematics |
Volume | 60 |
Nummer van het tijdschrift | 1-3 |
DOI's | |
Status | Gepubliceerd - 1995 |