English

Graded-division algebras over arbitrary fields

Rings and Algebras 2019-12-30 v1

Abstract

A graded-division algebra is an algebra graded by a group such that all nonzero homogeneous elements are invertible. This includes division algebras equipped with an arbitrary group grading (including the trivial grading). We show that a classification of finite-dimensional graded-central graded-division algebras over an arbitrary field F\mathbb{F} can be reduced to the following three classifications, for each finite Galois extension L\mathbb{L} of F\mathbb{F}: (1) finite-dimensional central division algebras over L\mathbb{L}, up to isomorphism; (2) twisted group algebras of finite groups over L\mathbb{L}, up to graded-isomorphism; (3) F\mathbb{F}-forms of certain graded matrix algebras with coefficients in ΔLC\Delta\otimes_{\mathbb{L}}\mathcal{C} where Δ\Delta is as in (1) and C\mathcal{C} is as in (2). As an application, we classify, up to graded-isomorphism, the finite-dimensional graded-division algebras over the field of real numbers (or any real closed field) with an abelian grading group. We also discuss group gradings on fields.

Keywords

Cite

@article{arxiv.1912.11911,
  title  = {Graded-division algebras over arbitrary fields},
  author = {Yuri Bahturin and Alberto Elduque and Mikhail Kochetov},
  journal= {arXiv preprint arXiv:1912.11911},
  year   = {2019}
}

Comments

24 pages

R2 v1 2026-06-23T12:56:54.270Z