On the Castelnuovo-Mumford regularity of squarefree powers of edge ideals
Abstract
Assume that G is a graph with edge ideal I(G) and matching number match(G). For every integer s≥ 1, we denote the s-th squarefree power of I(G) by I(G)[s]. It is shown that for every positive integer s≤ match(G), the inequality reg(I(G)[s])≤ match(G)+s holds provided that G belongs to either of the following classes: (i) very well-covered graphs, (ii) semi-Hamiltonian graphs, or (iii) sequentially Cohen-Macaulay graphs. Moreover, we prove that for every Cameron-Walker graph G and for every positive integer s≤ match(G), we have reg(I(G)[s])= match(G)+s
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