Simplicial complexes which are minimal Cohen-Macaulay
Abstract
Let be a (d-1)-dimensional pure f-simplicial complex over vertex set [n]. In this paper, it is proved that n=2d holds true if is minimal Cohen-Macaulay. It is also indicated that the recent work of Dao2020 implies that shellable condition on a pure simplicial complex is identical with CM properties of a full series of subcomplexes of .
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