The homological shift algebra of a monomial ideal
Abstract
Let S=K[x1,…,xn] be the polynomial ring over a field K, and let I⊂ S be a monomial ideal. In this paper, we introduce the ith homological shift algebras HSi(R(I))=k1HSi(Ik) of I. If I has linear powers, these algebras have the structure of a finitely generated bigraded module over the Rees algebra R(I) of I. Hence, many invariants of HSi(Ik), such as depth, associated primes, regularity, and the v-number, exhibit well behaved asymptotic behavior. We determine several families of monomial ideals I for which HSi(Ik) has linear resolution for all k0. Finally, we show that HSi(Ik) is Golod for all monomial ideals I⊂ S with linear powers and all k0.
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