Efficient (nonrandom) construction and decoding for non-adaptive group testing

TL;DR

This paper presents an efficient, nonrandom construction and decoding method for non-adaptive group testing that significantly reduces the number of tests needed to identify defective items, with practical applications demonstrated through experiments.

Contribution

It introduces a novel nonrandom measurement matrix construction that improves test efficiency and decoding speed for non-adaptive group testing, especially for small numbers of defectives.

Findings

Achieves faster identification with fewer tests than previous bounds.

Provides practical algorithms with polynomial decoding time.

Experimental results confirm theoretical improvements.

Abstract

The task of non-adaptive group testing is to identify up to $d$ defective items from $N$ items, where a test is positive if it contains at least one defective item, and negative otherwise. If there are $t$ tests, they can be represented as a $t \times N$ measurement matrix. We have answered the question of whether there exists a scheme such that a larger measurement matrix, built from a given $t\times N$ measurement matrix, can be used to identify up to $d$ defective items in time $O(t \log_2{N})$. In the meantime, a $t \times N$ nonrandom measurement matrix with $t = O \left(\frac{d^2 \log_2^2{N}}{(\log_2(d\log_2{N}) - \log_2{\log_2(d\log_2{N})})^2} \right)$ can be obtained to identify up to $d$ defective items in time $\mathrm{poly}(t)$. This is much better than the best well-known bound, $t = O \left( d^2 \log_2^2{N} \right)$. For the special case $d = 2$, there exists an efficient nonrandom construction in which at most two defective items can be identified in time $4\log_2^2{N}$ using $t = 4\log_2^2{N}$ tests. Numerical results show that our proposed scheme is more practical than existing ones, and experimental results confirm our theoretical analysis. In particular, up to $2^{7} = 128$ defective items can be identified in less than $16$s even for $N = 2^{100}$.