The eventual shape of Betti tables of powers of ideals

Let $G$ be an abelian group and $S$ be a $G$-graded a Noetherian algebra over a commutative ring $A \subseteq S_0$. Let $I_1, \dots, I_s$ be $G$-homogeneous ideals in $S$, and let $M$ be a finitely generated $G$-graded $S$-module. We show that the shape of non-zero $G$-graded Betti numbers of $MI_1^{t_1} \cdots I_s^{t_s}$ exhibit an eventual linear behavior as the $t_i$s get large.

Keywords

Betti numbers, asymptotic linearity, multigraded

2010 Mathematics Subject Classification

13D02, 13D45

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Published 13 June 2014