Regularity of 3-Path Ideals of Trees and Unicyclic Graphs

Abstract

Let G be a simple graph and I3(G) be its 3-path ideal in the corresponding polynomial ring R. In this article, we prove that for an arbitrary graph G, reg(R/I3(G)) is bounded below by 23(G), where 3(G) denotes the 3-path induced matching number of G. We give a class of graphs, namely, trees for which the lower bound is attained. Also, for a unicyclic graph G, we show that reg(R/I3(G))≤ 23(G)+2 and provide an example that shows that the given upper bound is sharp.

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