Bounds for the Number of Tests in Non-Adaptive Randomized Algorithms for Group Testing
Bshouty, Nader H., Haddad, George, Haddad-Zaknoon, Catherine A.
We study the group testing problem with non-adaptive randomized algorithms. Several models have been discussed in the literature to determine how to randomly choose the tests. For a model ${\cal M}$, let $m_{\cal M}(n,d)$ be the minimum number of tests required to detect at most $d$ defectives within $n$ items, with success probability at least $1-\delta$, for some constant $\delta$. In this paper, we study the measures $$c_{\cal M}(d)=\lim_{n\to \infty} \frac{m_{\cal M}(n,d)}{\ln n} \mbox{ and } c_{\cal M}=\lim_{d\to \infty} \frac{c_{\cal M}(d)}{d}.$$ In the literature, the analyses of such models only give upper bounds for $c_{\cal M}(d)$ and $c_{\cal M}$, and for some of them, the bounds are not tight. We give new analyses that yield tight bounds for $c_{\cal M}(d)$ and $c_{\cal M}$ for all the known models~${\cal M}$.
Nov-5-2019
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- New York > New York County > New York City (0.04)
- Asia
- Middle East > Israel
- Haifa District > Haifa (0.04)
- Japan > Honshū
- Kansai > Kyoto Prefecture > Kyoto (0.04)
- Middle East > Israel
- North America > United States
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- Research Report (0.64)
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