On the binary adder channel with complete feedback, with an application to quantitative group testing
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We determine the exact value of the optimal symmetric rate point in the Dueck zero-error capacity region of the binary adder channel with complete feedback. Our motivation is a problem in quantitative group testing. Given a set of n elements two of which are defective, the quantitative group testing problem asks for the identification of these two defectives through a series of tests. Each test gives the number of defectives contained in the tested subset, and the outcomes of previous tests are assumed known at the time of designing the current test. We establish that the minimum number of tests is asymptotic to (log_2 n) / r, where the constant r ≈ 0.78974 lies strictly between the lower bound 5/7 ≈ 0.71428 due to Gargano et al. and the information-theoretic upper bound (log_2 3) / 2 ≈ 0.79248.
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