Fp-projective periodicity
Abstract
The phenomenon of periodicity, discovered by Benson and Goodearl, is linked to the behavior of the objects of cocycles in acyclic complexes. It is known that any flat -periodic module is projective, any fp-injective -periodic module is injective, and any -periodic module is cotorsion. It is also known that any pure -periodic module is pure-projective and any pure -periodic module is pure-injective. Generalizing a result of Saroch and Stovicek, we show that every -periodic module is weakly fp-projective. The proof is quite elementary, using only a strong form of the pure-projective periodicity and the Hill lemma. More generally, we prove that, in a locally finitely presentable Grothendieck category, every -periodic object is weakly fp-projective. In a locally coherent category, all weakly fp-projective objects are fp-projective. We also present counterexamples showing that a non-pure -periodic module over a regular finitely generated commutative algebra (or a hereditary finite-dimensional associative algebra) over a field need not be pure-projective.
Keywords
Cite
@article{arxiv.2212.02300,
title = {Fp-projective periodicity},
author = {Silvana Bazzoni and Michal Hrbek and Leonid Positselski},
journal= {arXiv preprint arXiv:2212.02300},
year = {2023}
}
Comments
LaTeX 2e, 30 pages; v.2: Remark 4.11 and Example 6.9 inserted; v.3: end of Section 0.2, proof of Theorem 4.2, and Example 6.9 expanded; v.4: small corrections