Square-free powers of Cohen-Macaulay simplicial forests

Abstract

Let I()[k] denote the kth square-free power of the facet ideal of a simplicial complex in a polynomial ring R. Square-free powers are intimately related to the `Matching Theory' and `Ordinary Powers'. In this article, we show that if is a Cohen-Macaulay simplicial forest, then R/I()[k] is Cohen-Macaulay for all k 1. This result is quite interesting since all ordinary powers of a graded radical ideal can never be Cohen-Macaulay unless it is a complete intersection. To prove the result, we introduce a new combinatorial notion called special leaf, and using this, we provide an explicit combinatorial formula of depth(R/I()[k]) for all k 1, where is a Cohen-Macaulay simplicial forest. As an application, we show that the normalized depth function of a Cohen-Macaulay simplicial forest is nonincreasing.

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