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paper

Homological degrees of representations of categories with shift functors

arXiv:1507.08023

Abstract

Let $k$ be a commutative Noetherian ring and $\underline{\mathscr{C}}$ be a locally finite $k$-linear category equipped with a self-embedding functor of degree 1. We show under a moderate condition that finitely generated torsion representations of $\underline{\mathscr{C}}$ are super finitely presented (that is, they have projective resolutions each term of which is finitely generated). In the situation that these self-embedding functors are genetic functors, we give upper bounds for homological degrees of finitely generated torsion modules. These results apply to quite a few categories recently appearing in representation stability theory. In particular, when $k$ is a field of characteristic 0, we obtain another upper bound for homological degrees of finitely generated $\mathrm{FI}$-modules.

Major changes include: A stronger upper bound for homological degrees of torsion modules; a new proof of the Koszulity of categories with shift functors; a new upper bound for homological degrees of FI-modules, etc