Bounds for the Number of Tests in Non-Adaptive Randomized Algorithms for Group Testing

Abstract

We study the group testing problem with non-adaptive randomized algorithms. Several models have been discussed in the literature to determine how to randomly choose the tests. For a model M, let m M(n,d) be the minimum number of tests required to detect at most d defectives within n items, with success probability at least 1-δ, for some constant δ. In this paper, we study the measures c M(d)=n ∞ m M(n,d) n and c M=d ∞ c M(d)d. In the literature, the analyses of such models only give upper bounds for c M(d) and c M, and for some of them, the bounds are not tight. We give new analyses that yield tight bounds for c M(d) and c M for all the known models~ M.