Properties of symbolic powers of edge ideals of weighted oriented graphs
Abstract
Let D be a weighted oriented graph and I(D) be its edge ideal. We provide one method to find all the minimal generators of I⊂eq C , where C is a maximal strong vertex cover of D and I⊂eq C is the intersections of irreducible ideals associated to the strong vertex covers contained in C. If D is an induced digraph of D, under certain condition on the strong vertex covers of D and D, we show that I(D)(s) ≠ I(D)s for some s ≥ 2 implies I(D)(s) ≠ I(D)s . We characterize all the maximal strong vertex covers of D such that at most one edge is oriented into each of its vertex and w(x) ≥ 2 if D(x)≥ 2 for all x ∈ V(D). If D is a weighted rooted tree with degree of root is 1 and w(x) ≥ 2 when D(x) ≥ 2 for all x ∈ V(D) , we show that I(D)(s) = I(D)s for all s ≥ 2
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