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Auteurs principaux: H., Sameera Bharadwaja, Murthy, Chandra R.
Format: Preprint
Publié: 2024
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Accès en ligne:https://arxiv.org/abs/2412.00466
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author H., Sameera Bharadwaja
Murthy, Chandra R.
author_facet H., Sameera Bharadwaja
Murthy, Chandra R.
contents We consider the problem of identifying the defectives from a population of items via a non-adaptive group testing framework with a random pooling-matrix design. We analyze the sufficient number of tests needed for approximate set identification, i.e., for identifying almost all the defective and non-defective items with high confidence. To this end, we view the group testing problem as a function learning problem and develop our analysis using the probably approximately correct (PAC) framework. Using this formulation, we derive sufficiency bounds on the number of tests for three popular binary group testing algorithms: column matching, combinatorial basis pursuit, and definite defectives. We compare the derived bounds with the existing ones in the literature for exact recovery theoretically and using simulations. Finally, we contrast the three group testing algorithms under consideration in terms of the sufficient testing rate surface and the sufficient number of tests contours across the range of the approximation and confidence levels.
format Preprint
id arxiv_https___arxiv_org_abs_2412_00466
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle A Probably Approximately Correct Analysis of Group Testing Algorithms
H., Sameera Bharadwaja
Murthy, Chandra R.
Information Theory
Machine Learning
We consider the problem of identifying the defectives from a population of items via a non-adaptive group testing framework with a random pooling-matrix design. We analyze the sufficient number of tests needed for approximate set identification, i.e., for identifying almost all the defective and non-defective items with high confidence. To this end, we view the group testing problem as a function learning problem and develop our analysis using the probably approximately correct (PAC) framework. Using this formulation, we derive sufficiency bounds on the number of tests for three popular binary group testing algorithms: column matching, combinatorial basis pursuit, and definite defectives. We compare the derived bounds with the existing ones in the literature for exact recovery theoretically and using simulations. Finally, we contrast the three group testing algorithms under consideration in terms of the sufficient testing rate surface and the sufficient number of tests contours across the range of the approximation and confidence levels.
title A Probably Approximately Correct Analysis of Group Testing Algorithms
topic Information Theory
Machine Learning
url https://arxiv.org/abs/2412.00466