Quasi-forest simplicial complexes and almost Cohen-Macaulay
Abstract
In this paper we study the quasi-forest simplicial complexes and we define the concept of simplicial k-cycle (denoted by Sk) and simplicial k-point (denoted by Pk). We show that a simplicial complex is quasi-forest if and only if it does not have any Pk and any Sk for k≥ 3. Furthermore we characterize almost Cohen-Macaulay quasi-forest simplicial complexes. In the end we show that the cycle graph G=Cn is almost Cohen-Macaulay if and only if n=3,4,5,6,7,8,9,11.
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