Abstract
Let \(\mathcal{C}\) be a uniform clutter and let A be the incidence matrix of \(\mathcal{C}\) . We denote the column vectors of A by v 1,…,v q . Under certain conditions we prove that \(\mathcal{C}\) is vertex critical. If \(\mathcal{C}\) satisfies the max-flow min-cut property, we prove that A diagonalizes over ℤ to an identity matrix and that v 1,…,v q form a Hilbert basis. We also prove that if \(\mathcal{C}\) has a perfect matching such that \(\mathcal{C}\) has the packing property and its vertex covering number is equal to 2, then A diagonalizes over ℤ to an identity matrix. If A is a balanced matrix we prove that any regular triangulation of the cone generated by v 1,…,v q is unimodular. Some examples are presented to show that our results only hold for uniform clutters. These results are closely related to certain algebraic properties, such as the normality or torsion-freeness, of blowup algebras of edge ideals and to finitely generated abelian groups. They are also related to the theory of Gröbner bases of toric ideals and to Ehrhart rings.
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The second author was partially supported by CONACyT grant 49251-F and SNI.
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Dupont, L.A., Villarreal, R.H. Algebraic and combinatorial properties of ideals and algebras of uniform clutters of TDI systems. J Comb Optim 21, 269–292 (2011). https://doi.org/10.1007/s10878-009-9244-7
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DOI: https://doi.org/10.1007/s10878-009-9244-7