Subquadratic non-adaptive threshold group testing

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摘要

We consider threshold group testing – a generalization of group testing, which asks to identify a set of positive individuals in a population, by performing tests on pools of elements. Each test is represented by a subset Q of individuals and its output is yes if Q contains at least one positive element and no otherwise. Threshold group testing is the natural generalization, introduced by P. Damaschke in 2005, arising when we are given a threshold t>0 and the answer to a test Q is yes if Q contains at least t positives and no otherwise. We give upper and lower bounds for this general problem, showing a complexity separation with the classical group testing. Next, we introduce a further generalization in which the goal is minimizing not only the number of tests, but also the number of thresholds which is related to the accuracy of the tests.

论文关键词:Group testing,Threshold group testing,Non-adaptive strategies,Probabilistic method,Deterministic algorithms

论文评审过程:Received 23 December 2017, Revised 31 January 2020, Accepted 3 February 2020, Available online 19 February 2020, Version of Record 24 March 2020.

论文官网地址:https://doi.org/10.1016/j.jcss.2020.02.002