English

Lagrange's Theorem For Hom-Groups

Group Theory 2018-12-10 v2

Abstract

Hom-groups are nonassociative generalizations of groups where the unitality and associativity are twisted by a map. We show that a Hom-group (G, {\alpha}) is a pointed idempotent quasigroup (pique). We use Cayley table of quasigroups to introduce some examples of Hom-groups. Introducing the notions of Hom-subgroups and cosets we prove Lagrange's theorem for finite Hom-groups. This states that the order of any Hom-subgroup H of a finite Hom-group G divides the order of G. We linearize Hom-groups to obtain a class of nonassociative Hopf algebras called Hom-Hopf algebras. As an application of our results, we show that the dimension of a Hom-sub-Hopf algebra of the finite dimensional Hom-group Hopf algebra KG divides the order of G. The new tools introduced in this paper could potentially have applications in theories of quasigroups, nonassociative Hopf algebras, Hom-type objects, combinatorics, and cryptography.

Keywords

Cite

@article{arxiv.1803.07678,
  title  = {Lagrange's Theorem For Hom-Groups},
  author = {Mohammad Hassanzadeh},
  journal= {arXiv preprint arXiv:1803.07678},
  year   = {2018}
}

Comments

To appear in Rocky Mountain Journal of Mathematics

R2 v1 2026-06-23T00:59:36.711Z