On the Hilbert depth of the quotient ring of the edge ideal of a star graph
Abstract
Let Sn=K[x1,…,xn,y] and In=(x1y,x2y,…,xny)⊂ Sn be the edge ideal of star graph. We prove that hdepth(Sn/In)≥ n2 + n - 2. Also, we show that for any >0, there exists some integer A=A()≥ 0 such that hdepth(Sn/In)≤ n2 + n + A - 2. We deduce that n∞ 1nhdepth(Sn/In) = 12.
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