Asymptotic linear bounds of Castelnuovo-Mumford regularity in multigraded modules
Abstract
Let A be a Noetherian standard N-graded algebra over an Artinian local ring A0. Let I1,…,It be homogeneous ideals of A and M a finitely generated N-graded A-module. We prove that there exist two integers k and k' such that \[ reg(I1n1 ·s Itnt M) ≤ (n1 + ·s + nt) k + k' for all ~n1,…,nt ∈ N. \]
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