Characterizing Multigraded Regularity on Products of Projective Spaces
Abstract
We explore the relationship between multigraded CastelnuovoMumford regularity, truncations, Betti numbers, and virtual resolutions. We prove that on a product of projective spaces $X$, the multigraded regularity region of a module $M$ is determined by the minimal graded free resolutions of the truncations $M_{\geq\mathbf{d}}$ for $\mathbf{d}\in\operatorname{Pic}X$. Further, by relating the minimal graded free resolutions of $M$ and $M_{\geq\mathbf{d}}$ we provide a new bound on multigraded regularity of $M$ in terms of its Betti numbers. Using this characterization of regularity and this bound we also compute the multigraded CastelnuovoMumford regularity for a wide class of complete intersections.
 Publication:

arXiv eprints
 Pub Date:
 October 2021
 arXiv:
 arXiv:2110.10705
 Bibcode:
 2021arXiv211010705B
 Keywords:

 Mathematics  Commutative Algebra;
 Mathematics  Algebraic Geometry;
 13D02;
 14M25
 EPrint:
 29 pages