Componentwise linearity of ideals arising from graphs
Abstract
Let G be a simple undirected graph on n vertices. Francisco and Van Tuyl have shown that if G is chordal, then \xi,xj\∈ EG < xi,xj> is componentwise linear. A natural question that arises is for which tij>1 the ideal \xi,xj\∈ EG< xi, xj>tij is componentwise linear, if G is chordal. In this report we show that \xi,xj\∈ EG < xi, xj>t is componentwise linear for all n≥ 3 and positive t, if G is a complete graph. We give also an example where G is chordal, but the intersection ideal is not componentwise linear for any t>1.
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