English

Powers and alternative laws

Group Theory 2015-09-21 v1

Abstract

A groupoid is alternative if it satisfies the alternative laws x(xy)=(xx)yx(xy)=(xx)y and x(yy)=(xy)yx(yy)=(xy)y. These laws induce four partial maps on N+×N+\mathbb{N}^+\times \mathbb{N}^+, (r,s)(2r,sr)(r,\,s)\mapsto (2r,\,s-r), (rs,2s)(r-s,\,2s), (r/2,s+r/2)(r/2,\,s+r/2), (r+s/2,s/2)(r+s/2,\,s/2) that taken together form a dynamical system. We describe the orbits of this dynamical system, which allows us to show that nnth powers in a free alternative groupoid on one generator are well-defined if and only if n5n\le 5. We then discuss some number theoretical properties of the orbits, and the existence of alternative loops without two-sided inverses.

Cite

@article{arxiv.1509.05698,
  title  = {Powers and alternative laws},
  author = {Nicholas Ormes and Petr Vojtěchovský},
  journal= {arXiv preprint arXiv:1509.05698},
  year   = {2015}
}
R2 v1 2026-06-22T11:00:01.407Z