On Finding a Subset of Healthy Individuals from a Large Population

Abstract

In this paper, we derive mutual information based upper and lower bounds on the number of nonadaptive group tests required to identify a given number of "non defective" items from a large population containing a small number of "defective" items. We show that a reduction in the number of tests is achievable compared to the approach of first identifying all the defective items and then picking the required number of non-defective items from the complement set. In the asymptotic regime with the population size N → ∞, to identify L non-defective items out of a population containing K defective items, when the tests are reliable, our results show that Cs K1-o(1) ((α0, β0) + o(1)) measurements are sufficient, where Cs is a constant independent of N, K and L, and (α0, β0) is a bounded function of α0 N→ ∞ LN-K and β0 N→ ∞ K N-K. Further, in the nonadaptive group testing setup, we obtain rigorous upper and lower bounds on the number of tests under both dilution and additive noise models. Our results are derived using a general sparse signal model, by virtue of which, they are also applicable to other important sparse signal based applications such as compressive sensing.