Depth of edge ideals and vertex connectivity of finite graphs
Abstract
Let G be a finite graph on [n]:=\1, …, n\ and (G) its vertex connectivity. Let S=K[x1, …, xn] denote the polynomial ring in n variables over a field K and I(Gc) the edge ideal of the complementary graph Gc of G. It is a classical result that depth S/I(Gc) ≤ (G) + 1. We give a sharp lower bound of depth S/I(Gc) in terms of n and (G). Furthermore, a sharp lower bound of depth S/I(Gc)2 as well as that of depth S/I(Gc)(2) in terms of n and (G) is given.
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