Bounding regularity of VIm-modules
Abstract
Fix a finite field F. Let VI be a skeleton of the category of finite dimensional F-vector spaces and injective F-linear maps. We study VIm-modules over a noetherian commutative ring in the nondescribing characteristic case. We prove that if a finitely generated VIm-module is generated in degree ≤slant d and related in degree ≤slant r, then its regularity is bounded above by a function of m, d, and r. A key ingredient of the proof is a shift theorem for finitely generated VIm-modules.
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