On the Hilbert depth of a special class of squarefree monomial ideals

Abstract

Let r and n be two positive integers and S=K[x1,…,xn+r-1], the ring of polynomials in n+r-1 variable, over a field K. We consider the squarefree monomial ideal In,r:= x1 ·s xr-1 (xr,…,xr+n-1) ⊂ S and we prove several results regarding the Hilbert depth of S/In,r. Also, we consider the special case n=r.

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