# Graph decompositions in projective geometries

**Authors:** Marco Buratti, Anamari Nakic, Alfred Wassermann

arXiv: 1907.03194 · 2020-11-30

## TL;DR

This paper introduces a new framework for graph decompositions in projective geometries over finite fields, providing concrete examples and exploring special cases like Steiner designs, with implications for difference sets.

## Contribution

It develops a foundational approach to graph decompositions over finite fields, including explicit constructions for various graph types and analysis of the Steiner 2-designs case.

## Key findings

- Constructed non-trivial $	ext{Gamma}$-decompositions over $	ext{F}_2$ and $	ext{F}_3$
- Analyzed the complex case of Steiner 2-designs over finite fields
- Proposed conjectures on infinite families of $	ext{Gamma}$-decompositions using difference sets

## Abstract

Let PG$(\mathbb{F}_q^v)$ be the $(v-1)$-dimensional projective space over $\mathbb{F}_q$ and let $\Gamma$ be a simple graph of order ${q^k-1\over q-1}$ for some $k$. A 2$-(v,\Gamma,\lambda)$ design over $\mathbb{F}_q$ is a collection $\cal B$ of graphs (\textit{blocks}) isomorphic to $\Gamma$ with the following properties: the vertex set of every block is a subspace of PG$(\mathbb{F}_q^v)$; every two distinct points of PG$(\mathbb{F}_q^v)$ are adjacent in exactly $\lambda$ blocks. This new definition covers, in particular, the well known concept of a 2$-(v,k,\lambda)$ design over $\mathbb{F}_q$ corresponding to the case that $\Gamma$ is complete.   In this work of a foundational nature we illustrate how difference methods allow us to get concrete non-trivial examples of $\Gamma$-decompositions over $\mathbb{F}_2$ or $\mathbb{F}_3$ for which $\Gamma$ 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 $\Gamma$ is complete and $\lambda=1$, i.e., the Steiner 2-designs over a finite field. Also, we briefly touch the new topic of near resolvable 2-$(v,2,1)$ designs over $\mathbb{F}_q$.   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 $\Gamma$-decompositions over a finite field that can be obtained by suitably labeling the vertices of $\Gamma$ with the elements of a Singer difference set.

## Full text

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## References

37 references — full list in the complete paper: https://tomesphere.com/paper/1907.03194/full.md

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Source: https://tomesphere.com/paper/1907.03194