3-nets realizing a diassociative loop in a projective plane
Abstract
A \textit{-net} of order is a finite incidence structure consisting of points and three pairwise disjoint classes of lines, each of size , such that every point incident with two lines from distinct classes is incident with exactly one line from each of the three classes. The current interest around -nets (embedded) in a projective plane , defined over a field of characteristic , arose from algebraic geometry. It is not difficult to find -nets in as far as . However, only a few infinite families of -nets in are known to exist whenever , or . Under this condition, the known families are characterized as the only -nets in which can be coordinatized by a group. In this paper we deal with -nets in which can be coordinatized by a diassociative loop but not by a group. We prove two structural theorems on . As a corollary, if is commutative then every non-trivial element of has the same order, and has exponent or . We also discuss the existence problem for such -nets.
Cite
@article{arxiv.1603.00242,
title = {3-nets realizing a diassociative loop in a projective plane},
author = {Gábor Korchmáros and Gábor P. Nagy},
journal= {arXiv preprint arXiv:1603.00242},
year = {2016}
}