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

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 × 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× N measurement matrix, can be used to identify up to d defective items in time O(t 2N). In the meantime, a t × N nonrandom measurement matrix with t = O (d2 22N(2(d2N) - 22(d2N))2 ) can be obtained to identify up to d defective items in time poly(t). This is much better than the best well-known bound, t = O ( d2 22N ). For the special case d = 2, there exists an efficient nonrandom construction in which at most two defective items can be identified in time 422N using t = 422N 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 27 = 128 defective items can be identified in less than 16s even for N = 2100.