Robustness of Group Testing in the Estimation of Proportions

Hung, Ming-Chin; Swallow, William H.

doi:10.1111/j.0006-341x.1999.00231.x

Cited by 64 publications

(49 citation statements)

References 25 publications

(37 reference statements)

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“…This strategy and its variations developed later, often referred to as group testing or pooled testing, have received substantial attention for efficient identification of an event or estimation of the probability that the event occurs; see Sobel & Groll (1959), Sobel & Elashoff (1975), Le (1981), Gastwirth & Hammick (1989), Chen & Swallow (1990), Farrington (1992), Gastwirth & Johnson (1994), Hughes-Oliver & Swallow (1994), Litvak et al (1994), Tu et al (1995), Barcellos et al (1997), Brookmeyer (1999), Hung & Swallow (1999), Hughes-Oliver & Rosenberger (2000) and Tebbs & Swallow (2003). An attractive feature of group testing is that retesting on individuals is not necessary if one is only interested in estimation of the probability of a positive test.…”

Section: Introductionmentioning

confidence: 99%

Optimality of group testing in the presence of misclassification

Liu

Zhang

et al. 2011

Biometrika

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Section: Introductionmentioning

confidence: 99%

Optimality of group testing in the presence of misclassification

Liu

Zhang

et al. 2011

Biometrika

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“…For example, tests currently used in HIV screening are reported to have negligible loss in both sensitivity and specificity for group sizes up to 15 (Emmanuel et al, 1988;Cahoon-Young et al, 1989;Kline et al, 1989;Monzon et al, 1992;Tu et al, 1995). If, in fact, testing errors do exist but are rare, group testing with small-sized pools is often still efficient when the prevalence is small (Chen and Swallow, 1995;Hung and Swallow, 1999).…”

Section: Introductionmentioning

confidence: 99%

More Powerful Likelihood Ratio Tests for Isotonic Binomial Proportions

Tebbs

Swallow

2003

Biometrical J

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SummaryBinomial group testing involves pooling individuals into groups and observing a binary response on each group. Results from the group tests can then be used to draw inference about population proportions. Its use as an experimental design has received much attention in recent years, especially in public-health screening experiments and vector-transfer designs in plant pathology. We investigate the benefits of group testing in situations wherein one desires to test whether or not probabilities are increasingly ordered across the levels of an observed qualitative covariate, i.e., across strata of a population or among treatment levels. We use a known likelihood ratio test for individual testing, but extend its use to group-testing situations to show the increases in power conferred by using group testing when operating in this constrained parameter space. We apply our methods to data from an HIV study involving male subjects classified as intraveneous drug users.

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“…A defective group is one that includes one or more defective individuals. The purpose of group testing is either to identify the defective units in the groups tested or to estimate the proportion of defective units in the population (Hung and Swallow, 1999). The former is regarded a classification problem and the latter as an estimation problem.…”

Section: Introductionmentioning

confidence: 99%

Cost Considerations in Choosing Group Size for Group Testing in the Seed Potato Certification Program

Chiang

Lai

Chung³

et al. 2010

Am. J. Pot Res

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Viral diseases that can reduce yield and tuber quality are major concerns for potato growers. To produce healthy potato tubers and prevent yield reduction, a certification scheme for foundation class seed potato propagation has been established at the Seed Improvement and Propagation Station in Taiwan. The certification scheme uses an ELISA technique to index specific virus diseases such as Potato virus Y (PVY), Potato leafroll virus (PLRV), Potato virus X (PVX), Potato virus A (PVA), and Potato virus S (PVS). In order to produce foundation class potato tubers, the Dorfman group testing procedure is adopted. The Dorfman testing procedure utilizes a two-stage sampling scheme. The first stage comprises making measurements on all groups. The second stage involves no retesting for negative testing groups and exhaustive testing of all constituent individual samples of positive testing groups. In the seed potato certification scheme in Taiwan, field investigations have usually used groups of 20 plants. However, because of the limitations of available financial resources, the effect of group size on cost is an important consideration. Thus, selection of group size for design considerations is a critical issue. In order to solve the problem, we present the expected cost model as a nonlinear integer programming problem and determine the optimal group size such that the expected cost is minimized. The result demonstrates that the optimal sample size for group testing is 13 plants per group and that the cost, using this optimal group size, is not greatly different from the cost when using 20 plants per group. Thus, 20 plants per group is reasonable for the group testing procedure with regard to cost considerations. The result of this research could be useful in the execution of the seed potato certification program

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Robustness of Group Testing in the Estimation of Proportions

Cited by 64 publications

References 25 publications

Optimality of group testing in the presence of misclassification

Optimality of group testing in the presence of misclassification

More Powerful Likelihood Ratio Tests for Isotonic Binomial Proportions

Cost Considerations in Choosing Group Size for Group Testing in the Seed Potato Certification Program

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