Quickly-Decodable Group Testing with Fewer Tests: Price-Scarlett and Cheraghchi-Nakos's Nonadaptive Splitting with Explicit Scalars
Abstract
We modify Cheraghchi-Nakos [CN20] and Price-Scarlett's [PS20] fast binary splitting approach to nonadaptive group testing. We show that, to identify a uniformly random subset of k infected persons among a population of n, it takes only (2 - 4) -2 k n tests and decoding complexity O(-2 k n), for any small > 0, with vanishing error probability. In works prior to ours, only two types of group testing schemes exist. Those that use (2)-2 k n or fewer tests require linear-in-n complexity, sometimes even polynomial in n; those that enjoy sub-n complexity employ O(k n) tests, where the big-O scalar is implicit, presumably greater than (2)-2. We almost achieve the best of both worlds, namely, the almost-(2)-2 scalar and the sub-n decoding complexity. How much further one can reduce the scalar (2)-2 remains an open problem.
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