Graph decompositions in projective geometries
Abstract
Let PG be the -dimensional projective space over and let be a simple graph of order for some . A 2 design over is a collection of graphs (\textit{blocks}) isomorphic to with the following properties: the vertex set of every block is a subspace of PG; every two distinct points of PG are adjacent in exactly blocks. This new definition covers, in particular, the well known concept of a 2 design over corresponding to the case that is complete. In this work of a foundational nature we illustrate how difference methods allow us to get concrete non-trivial examples of -decompositions over or for which is a cycle, a path, a prism, a generalized Petersen graph, or a Moebius ladder. In particular, we will discuss in detail the special and very hard case that is complete and , i.e., the Steiner 2-designs over a finite field. Also, we briefly touch the new topic of near resolvable 2- designs over . This study has led us to some (probably new) collateral problems concerning difference sets. Supported by multiple examples, we conjecture the existence of infinite families of -decompositions over a finite field that can be obtained by suitably labeling the vertices of with the elements of a Singer difference set.
Cite
@article{arxiv.1907.03194,
title = {Graph decompositions in projective geometries},
author = {Marco Buratti and Anamari Nakic and Alfred Wassermann},
journal= {arXiv preprint arXiv:1907.03194},
year = {2020}
}