2-Modular Matrices
Abstract
A rank-r integer matrix A is -modular if the determinant of each r × r submatrix has absolute value at most . The class of 1-modular, or unimodular, matrices is of fundamental significance in both integer programming theory and matroid theory. A 1957 result of Heller shows that the maximum number of nonzero, pairwise non-parallel rows of a rank-r unimodular matrix is r + 1 2. We prove that, for each sufficiently large integer r, the maximum number of nonzero, pairwise non-parallel rows of a rank-r 2-modular matrix is r + 2 2 - 2.
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