Bias correction in multiple systems estimation
Bias correction in multiple systems estimation
If part of a population is hidden but two or more samples are available that each cover parts of this population, multiple systems estimation can be applied to estimate the size of this population. A problem is that these estimates suffer from finite-sample bias that can be substantial in case of a small sample or a small population size. This problem was recognized by Chapman, who derived his essentially unbiased Chapman-estimator for two samples. Because more than two samples may be required to correct for sample dependence, we propose a Generalized Chapman-estimator that can be applied with any number of samples. In a Monte Carlo experiment, this new estimator shows hardly any bias and has smaller standard errors than competing bias-reduced estimators. It is also compared to the usual maximum likelihood estimates for the case of estimating the number of homeless people in the Netherlands, where it shows notably different outcomes.
Chapman-estimator, finite-sample bias, log-linear model, multiple systems estimation
495-518
Zult, Daan B.
ce9fcd6b-0119-443e-af59-d83a69c11cfa
van der heijden, Peter G.M.
85157917-3b33-4683-81be-713f987fd612
Bakker, Bart F.M.
8b086ec4-999b-4966-bef5-f23cfc098fd7
1 March 2025
Zult, Daan B.
ce9fcd6b-0119-443e-af59-d83a69c11cfa
van der heijden, Peter G.M.
85157917-3b33-4683-81be-713f987fd612
Bakker, Bart F.M.
8b086ec4-999b-4966-bef5-f23cfc098fd7
Zult, Daan B., van der heijden, Peter G.M. and Bakker, Bart F.M.
(2025)
Bias correction in multiple systems estimation.
Journal of Official Statistics, 41 (1), .
(doi:10.1177/0282423X251314294).
Abstract
If part of a population is hidden but two or more samples are available that each cover parts of this population, multiple systems estimation can be applied to estimate the size of this population. A problem is that these estimates suffer from finite-sample bias that can be substantial in case of a small sample or a small population size. This problem was recognized by Chapman, who derived his essentially unbiased Chapman-estimator for two samples. Because more than two samples may be required to correct for sample dependence, we propose a Generalized Chapman-estimator that can be applied with any number of samples. In a Monte Carlo experiment, this new estimator shows hardly any bias and has smaller standard errors than competing bias-reduced estimators. It is also compared to the usual maximum likelihood estimates for the case of estimating the number of homeless people in the Netherlands, where it shows notably different outcomes.
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zult-et-al-2025-bias-correction-in-multiple-systems-estimation
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e-pub ahead of print date: 20 February 2025
Published date: 1 March 2025
Keywords:
Chapman-estimator, finite-sample bias, log-linear model, multiple systems estimation
Identifiers
Local EPrints ID: 500006
URI: http://eprints.soton.ac.uk/id/eprint/500006
ISSN: 0282-423X
PURE UUID: 335d5322-ffb1-4131-b670-da14ef96b7a4
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Date deposited: 11 Apr 2025 16:35
Last modified: 22 Aug 2025 02:08
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Author:
Daan B. Zult
Author:
Bart F.M. Bakker
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