The eventual shape of the Betti table of mkM
Abstract
Let S be the polynomial ring over a field K in a finite set of variables, and let m be the graded maximal ideal of S. It is known that for a finitely generated graded S-module M and all integers k 0, the module mkM is componentwise linear. For large k we describe the pattern of the Betti table of mkM when char(K)=0 and M is a submodule of a finitely generated graded free S-module. Moreover, we show that for any k 0, mkI has linear quotients if I is a monomial ideal.
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