Buchsteiner loops: associators and constructions

Ales Drapal; Michael Kinyon

Buchsteiner loops: associators and constructions

Group Theory 2008-12-03 v1

Authors: Ales Drapal , Michael Kinyon

Abstract

Let $Q$ be a Buchsteiner loop. We describe the associator calculus in three variables, and show that $|Q| \ge 32$ if $Q$ is not conjugacy closed. We also show that $|Q| \ge 64$ if there exists $x \in Q$ such that $x^2$ is not in the nucleus of $Q$ . Furthermore, we describe a general construction that yields all proper Buchsteiner loops of order 32. Finally, we produce a Buchsteiner loop of order 128 that is nilpotency class 3 and possesses an abelian inner mapping group.

Cite

@article{arxiv.0812.0412,
  title  = {Buchsteiner loops: associators and constructions},
  author = {Ales Drapal and Michael Kinyon},
  journal= {arXiv preprint arXiv:0812.0412},
  year   = {2008}
}

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22 pages

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