# On the Structure of Small Strength-$2$ Covering Arrays

**Authors:** Janne I. Kokkala, Karen Meagher, Reza Naserasr, Kari J. Nurmela,, Patric R. J. \"Osterg{\aa}rd, Brett Stevens

arXiv: 1901.03594 · 2019-07-01

## TL;DR

This paper establishes new lower bounds and structural properties for small strength-2 covering arrays, providing computational results that support the conjecture of the existence of uniform optimal arrays for all parameters.

## Contribution

It introduces a new lower bound and structural constraints for small uniform strength-2 covering arrays, and computationally determines sizes for 21 parameter sets.

## Key findings

- New lower bound for small uniform strength-2 covering arrays
- Structural constraints for these arrays
- Determined sizes for 21 parameter sets

## Abstract

A covering array $\rm{CA}(N;t,k,v)$ of strength $t$ is an $N \times k$ array of symbols from an alphabet of size $v$ such that in every $N \times t$ subarray, every $t$-tuple occurs in at least one row. A covering array is \emph{optimal} if it has the smallest possible $N$ for given $t$, $k$, and $v$, and \emph{uniform} if every symbol occurs $\lfloor N/v \rfloor$ or $\lceil N/v \rceil$ times in every column. Prior to this paper the only known optimal covering arrays for $t=2$ were orthogonal arrays, covering arrays with $v=2$ constructed from Sperner's Theorem and the Erd\H{o}s-Ko-Rado Theorem, and eleven other parameter sets with $v>2$ and $N > v^2$. In all these cases, there is a uniform covering array with the optimal size. It has been conjectured that there exists a uniform covering array of optimal size for all parameters. In this paper a new lower bound as well as structural constraints for small uniform strength-$2$ covering arrays are given. Moreover, covering arrays with small parameters are studied computationally. The size of an optimal strength-$2$ covering array with $v > 2$ and $N > v^2$ is now known for $21$ parameter sets. Our constructive results continue to support the conjecture.

## Full text

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## Figures

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## References

46 references — full list in the complete paper: https://tomesphere.com/paper/1901.03594/full.md

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Source: https://tomesphere.com/paper/1901.03594