Efficient designs for threshold group testing without gap
Abstract
Given d defective items in a population of n items with d n, in threshold group testing without gap, the outcome of a test on a subset of items is positive if the subset has at least u defective items and negative otherwise, where 1 ≤ u ≤ d. The basic goal of threshold group testing is to quickly identify the defective items via a small number of tests. In non-adaptive design, all tests are designed independently and can be performed in parallel. The decoding time in the non-adaptive state-of-the-art work is a polynomial of (d/u)u (d/(d-u))d - u, d, and n. In this work, we present a novel design that significantly reduces the number of tests and the decoding time to polynomials of \uu, (d - u)d - u\, d, and n. In particular, when u is a constant, the number of tests and the decoding time are O(d3 (2n) (n/d) ) and O(d3 (2n) (n/d) + d2 (n) 3(n/d) ), respectively. For a special case when u = 2, with non-adaptive design, the number of tests and the decoding time are O(d3 (n) (n/d) ) and O(d2 (n + 2(n/d)) ), respectively. Moreover, with 2-stage design, the number of tests and the decoding time are O(d2 2(n/d) ).
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