Rahim Zaare-Nahandi scite author profile

For a positive integer k and a non-negative integer t a class of simplicial complexes, to be denoted by k-CMt, is introduced. This class generalizes two notions for simplicial complexes: being k-Cohen-Macaulay and k-Buchsbaum. In analogy with the Cohen-Macaulay and Buchsbaum complexes, we give some characterizations of CMt(=1-CMt) complexes, in terms of vanishing of some homologies of its links and, in terms of vanishing of some relative singular homologies of the geometric realization of the complex and its punctured space. We show that a complex is k-CMt if and only if the links of its nonempty faces are k-CM t−1 . We prove that for an integer s ≤ d, the (d−s−1)-skeleton of a (d−1)-dimensional k-CMt complex is (k+s)-CMt. This result generalizes Hibi's result for Cohen-Macaulay complexes and Miyazaki's result for Buchsbaum complexes.2000 Mathematics Subject Classification. 05C75, 13H10.

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Gröbner basis and free resolution of the ideal of 2-minors of a 2 ×nmatrix of linear forms^*

Zaare-Nahandi

2000

Communications in Algebra

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A generalization of Eagon–Reiner’s theorem and a characterization of bi-CM_t bipartite and chordal graphs

Haghighi

Fakhari

Yassemi

et al. 2018

Communications in Algebra

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IDEALS OF MINORS DEFINING GENERIC SINGULARITIES AND THEIR GRöBNER BASES

Salmon

Zaare-Nahandi

2005

Communications in Algebra

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