Admissible matchings and the Castelnuovo-Mumford regularity of square-free powers

Abstract

Let I be any square-free monomial ideal, and HI denote the hypergraph associated with I. Refining the concept of k-admissible matching of a graph defined by Erey and Hibi, we introduce the notion of generalized k-admissible matching for any hypergraph. Using this, we give a sharp lower bound on the (Castelnuovo-Mumford) regularity of I[k], where I[k] denotes the kth square-free power of I. In the special case when I is equigenerated in degree d, this lower bound can be described using a combinatorial invariant aim(HI,k), called the k-admissible matching number of HI. Specifically, we prove that reg(I[k]) (d-1)aim(HI,k)+k, whenever I[k] is non-zero. Even for the edge ideal I(G) of a graph G, it turns out that aim(G,k)+k is the first general lower bound for the regularity of I(G)[k]. In fact, when G is a forest, aim(G,k) coincides with the k-admissible matching number introduced by Erey and Hibi. Next, we show that if G is a block graph, then reg(I(G)[k])= aim(G,k)+k, and this result can be seen as a generalization of the corresponding regularity formula for forests. Additionally, for a Cohen-Macaulay chordal graph G, we prove that reg(I(G)[2])= aim(G,2)+2. Finally, we propose a conjecture on the regularity of square-free powers of edge ideals of chordal graphs.

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