Small maximal partial ovoids in generalized quadrangles
Metric Geometry
2013-08-09 v1 Combinatorics
Probability
Abstract
A {\em maximal partial ovoid} of a generalized quadrangle is a maximal set of points no two of which are collinear. The problem of determining the smallest size of a maximal partial ovoid in quadrangles has been extensively studied in the literature. In general, theoretical lower bounds on the size of a maximal partial ovoid in a quadrangle of order are linear in . In this paper, in a wide class of quadrangles of order we give a construction of a maximal partial ovoid of size at most , which is within a polylogarithmic factor of theoretical lower bounds. The construction substantially improves previous quadratic upper bounds in quadrangles of order , in particular in the well-studied case of the elliptic quadrics .
Cite
@article{arxiv.1308.1899,
title = {Small maximal partial ovoids in generalized quadrangles},
author = {Jeroen Schillewaert and Jacques Verstraete},
journal= {arXiv preprint arXiv:1308.1899},
year = {2013}
}