Gapfree graphs and powers of edge ideals with linear quotients

Abstract

Let I(G) be the edge ideal of a gapfree graph G. An open conjecture of Nevo and Peeva states that I(G)q has linear resolution for q 0. We present a promising approach to this challenging conjecture by investigating the stronger property of linear quotients. Specifically, we make the conjecture that if I(G)q has linear quotients for some integer q≥ 1, then I(G)s has linear quotients for all s≥ q. We give a partial solution to this conjecture, and identify conditions under which only finitely many powers need to be checked. It is known that if G does not contain a cricket, a diamond, or a C4, then I(G)q has linear resolution for q ≥ 2. We construct a family of gapfree graphs G containing cricket, diamond, C4 together with C5 as induced subgraphs of G for which I(G)q has linear quotients for q 2.

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