The second largest Erdo{combining double acute accent}s-Ko-Rado sets of generators of the hyperbolic quadrics Q⁺(4n + 1, q)

Authors

Maarten De Boeck, Universiteit Gent

Abstract

An Erdo{combining double acute accent}s-Ko-Rado set of generators of a hyperbolic quadric is a set of generators which are pairwise not disjoint. In this article we classify the second largest maximal Erdo{combining double acute accent}s-Ko-Rado set of generators of the hyperbolic quadrics Q+(4n + 1, q), q ≥ 3.

Publication Title

Advances in Geometry

Recommended Citation

De Boeck, M. (2016). The second largest Erdo{combining double acute accent}s-Ko-Rado sets of generators of the hyperbolic quadrics Q⁺(4n + 1, q). Advances in Geometry, 16 (2), 253-263. https://doi.org/10.1515/advgeom-2015-0034