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Column-partitioned matrices over rings without invertible transversal submatrices

Foldes, Stephan; Lehtonen, Erkko

Ars Combinatoria, 97 (2010), 33-39
http://hdl.handle.net/10993/3227 (preprint - http://arxiv.org/abs/math/0611551)

Let the columns of a p×q matrix M over any ring be partitioned into n blocks, M = [M1,...,Mn]. If no p×p submatrix of M with columns from distinct blocks Mi is invertible, then there is an invertible p×p matrix Q and a positive integer m <= p such that QM = [QM1,...,QMn] is in reduced echelon form and in all but at most m - 1 blocks QMi the last m entries of each column are either all zero or they include a non-zero non-unit.