English

Operator Kantor Pairs

Rings and Algebras 2024-11-15 v2 Group Theory

Abstract

Kantor pairs, (quadratic) Jordan pairs, and similar structures have been instrumental in the study of Z\mathbb{Z}-graded Lie algebras and algebraic groups. We introduce the notion of an operator Kantor pair, a generalization of Kantor pairs to arbitrary (commutative, unital) rings, similar in spirit as to how quadratic Jordan pairs and algebras generalize linear Jordan pairs and algebras. Such an operator Kantor pair is formed by a pair of Φ\Phi-groups (G+,G)(G^+,G^-) of a specific kind, equipped with certain homogeneous operators. For each such a pair (G+,G)(G^+,G^-), we construct a 55-graded Lie algebra LL together with actions of G±G^\pm on LL as automorphisms. Moreover, we can associate a group G(G+,G)Aut(L)G(G^+,G^-) \subset \operatorname{Aut}(L) to this pair generalizing the projective elementary group of Jordan pairs. If the non-00-graded part of LL is projective, we can uniquely recover G+,GG^+,G^- from G(G+,G)G(G^+,G^-) and the grading on LL alone. We establish, over rings Φ\Phi with 1/30Φ1/30 \in \Phi, a one to one correspondence between Kantor pairs and operator Kantor pairs. Finally, we construct operator Kantor pairs for the different families of central simple structurable algebras.

Keywords

Cite

@article{arxiv.2303.13208,
  title  = {Operator Kantor Pairs},
  author = {Sigiswald Barbier and Tom De Medts and Michiel Smet},
  journal= {arXiv preprint arXiv:2303.13208},
  year   = {2024}
}

Comments

65 pages

R2 v1 2026-06-28T09:29:46.912Z