Efficiently Decodable Non-Adaptive Threshold Group Testing

Abstract

We consider non-adaptive threshold group testing for identification of up to d defective items in a set of n items, where a test is positive if it contains at least 2 ≤ u ≤ d defective items, and negative otherwise. The defective items can be identified using t = O ( ( du )u ( dd - u )d-u (u du + 1ε ) · d2 n ) tests with probability at least 1 - ε for any ε > 0 or t = O ( ( du )u ( dd -u )d - u d3 n · nd ) tests with probability 1. The decoding time is t × poly(d2 n). This result significantly improves the best known results for decoding non-adaptive threshold group testing: O(nn + n 1ε) for probabilistic decoding, where ε > 0, and O(nu n) for deterministic decoding.