Cohen-Macaulayness of powers of edge ideals of edge-weighted graphs
Abstract
In this paper, we characterize the Cohen-Macaulayness of the second power I(Gω)2 of the weighted edge ideal I(Gω) when the underlying graph G is a very well-covered graph. We also characterize the Cohen-Macaulayness of all ordinary powers of I(Gω)n when G is a tree with a perfect matching consisting of pendant edges and the induced subgraph G[V(G) S] of G on V(G) S is a star, where S is the set of all leaf vertices, or if G is a connected graph with a perfect matching consisting of pendant edges and the induced subgraph G[V(G) S] of G on V(G) S is a complete graph and the weight function ω satisfies ω(e)=1 for all e∈ E(G[V(G) S]).
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