New Steiner systems from old ones by paramodifications
Combinatorics
2020-05-05 v2
Abstract
Techniques of producing new combinatorial structures from old ones are commonly called trades. The switching principle applies for a broad class of designs: it is a local transformation that modifies two columns of the incidence matrix. In this paper, we present a construction, which is a generalization of the switching transform for the class of Steiner 2-designs. We call this construction paramodification of Steiner 2-designs, since it modifies the parallelism of a subsystem. We study in more detail the paramodifications of affine planes, Steiner triple systems, and abstract unitals. Computational results show that paramodification can construct many new unitals.
Keywords
Cite
@article{arxiv.2003.09233,
title = {New Steiner systems from old ones by paramodifications},
author = {Dávid Mezőfi and Gábor P. Nagy},
journal= {arXiv preprint arXiv:2003.09233},
year = {2020}
}
Comments
Revised version based on remarks of anonymous referee