Abstract
A 0, 1 matrix is balanced if it does not contain a square submatrix of odd order with two ones per row and per column. We show that a balanced 0, 1 matrix is either totally unimodular or its bipartite representation has a cutset consisting of two adjacent nodes and some of their neighbors. This result yields a polytime recognition algorithm for balancedness. To prove the result, we first prove a decomposition theorem for balanced 0, 1 matrices that are not strongly balanced. © 1999 Academic Press.
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CITATION STYLE
Conforti, M., Cornuéjols, G., & Rao, M. R. (1999). Decomposition of Balanced Matrices. Journal of Combinatorial Theory. Series B, 77(2), 292–406. https://doi.org/10.1006/jctb.1999.1932
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