English

Commutative algebraic groups up to isogeny. II

Algebraic Geometry 2017-04-12 v2 Representation Theory

Abstract

This paper develops a representation-theoretic approach to the isogeny category C\underline{\mathcal{C}} of commutative group schemes of finite type over a field kk, studied in arXiv:1602:00222. We construct a ring RR such that C\underline{\mathcal{C}} is equivalent to the category RR-mod of all left RR-modules of finite length. We also construct an abelian category of RR-modules, RR-mod~\widetilde{\rm mod}, which is hereditary, has enough projectives, and contains RR-mod as a Serre subcategory; this yields a more conceptual proof of the main result of [loc. cit.], asserting that C\underline{\mathcal{C}} is hereditary. We show that RR-mod~\widetilde{\rm mod} is equivalent to the isogeny category of commutative quasi-compact kk-group schemes.

Keywords

Cite

@article{arxiv.1612.03634,
  title  = {Commutative algebraic groups up to isogeny. II},
  author = {Michel Brion},
  journal= {arXiv preprint arXiv:1612.03634},
  year   = {2017}
}

Comments

35 pages. Minor changes, to appear at the proceedings of the 2016 International Conference on Representations of Algebras

R2 v1 2026-06-22T17:20:26.964Z