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The American Statistician Volume 78, 2024 - Issue 2
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General

Counting the Unseen: Estimation of Susceptibility Proportions in Zero-Inflated Models Using a Conditional Likelihood Approach

Wen-Han Hwanga Institute of Statistics, National Tsing Hua University, Hsinchu, TaiwanView further author information
,
Lu-Fang Chenb Department of Mechanical Engineering, Minghsin University of Science and Technology, Xinfeng, TaiwanView further author information
&
Jakub Stoklosac School of Mathematics and Statistics, The University of New South Wales, Sydney, AustraliaCorrespondence[email protected]
View further author information
Pages 161-170 | Received 21 Dec 2022, Accepted 30 Jul 2023, Published online: 22 Sep 2023

References

  • Agarwal, D. K., Gelfand, A. E., and Citron-Pousty, S. (2002), “Zero-Inflated Models with Application to Spatial Count Data,” Environmental and Ecological Statistics, 9, 341–355. DOI: 10.1023/A:1020910605990.
  • Böhning, D., Dietz, E., Schlattmann, P., Mendonca, L., and Kirchner, U. (1999), “The Zero-Inflated Poisson Model and the Decayed, Missing and Filled Teeth Index in Dental Epidemiology,” Journal of the Royal Statistical Society, Series A, 162, 195–209. DOI: 10.1111/1467-985X.00130.
  • Cameron, A. C., and Trivedi, P. K. (2013), Regression Analysis of Count Data, 2nd ed., Cambridge: Cambridge University Press.
  • Eren, M. I., Chao, A., Hwang, W. H., and Colwell, R. K. (2012), “Estimating the Richness of a Population When the Maximum Number of Classes is Fixed: A Nonparametric Solution to an Archaeological Problem,” PLoS One, 7, e34179. DOI: 10.1371/journal.pone.0034179.
  • Glymour, M., Pearl, J., and Jewell, N. P. (2016), Causal Inference in Statistics: A Primer, Chichester: Wiley.
  • Godambe, V. P. (1960), “An Optimum Property of Regular Maximum Likelihood Estimation,” The Annals of Mathematical Statistics, 31, 1208–1211. DOI: 10.1214/aoms/1177705693.
  • Godambe, V. P. (1976), “Conditional Likelihood and Unconditional Optimum Estimating Equations,” Biometrika, 63, 277–284. DOI: 10.1093/biomet/63.2.277.
  • Hall, D. B. (2000), “Zero-Inflated Poisson and Binomial Regression with Random Effects: A Case Study,” Biometrics, 56, 1030–1039. DOI: 10.1111/j.0006-341x.2000.01030.x.
  • Hwang, W. H., and Huggins, R. (2005), “An Examination of the Effect of Heterogeneity on the Estimation of Population Size Using Capture-Recapture Data,” Biometrika, 92, 229–233. DOI: 10.1093/biomet/92.1.229.
  • Hwang, W. H., Huggins, R. M., and Chen, L. F. (2017), “A Note on the Inverse Birthday Problem with Applications,” The American Statistician, 71, 191–201. DOI: 10.1080/00031305.2016.1255657.
  • Hwang, W. H., Stoklosa, J., and Chen, L. F. (2022), “On Estimating the Proportion of Susceptibility with Zero-Inflated Models [Data set],” Zenodo. DOI: 10.5281/zenodo.6644071.
  • Karavarsamis, N., and Huggins, R. M. (2019), “Two-Stage Approaches to the Analysis of Occupancy Data II. The Heterogeneous Model and Conditional Likelihood,” Computational Statistics and Data Analysis, 133, 195–207. DOI: 10.1016/j.csda.2018.09.009.
  • Lambert, D. (1992), “Zero-Inflated Poisson Regression, with an Application to Defects in Manufacturing,” Technometrics, 34, 1–14. DOI: 10.2307/1269547.
  • Lukusa, T. M., Lee, S. M., and Li, C. S. (2016), “Semiparametric Estimation of a Zero-Inflated Poisson Regression Model with Missing Covariates,” Metrika, 79, 457–483. DOI: 10.1007/s00184-015-0563-7.
  • MacKenzie, D. I., Nichols, J. D., Lachman, G. B., Droege, S., Andrew Royle, J., and Langtimm, C. A. (2002), “Estimating Site Occupancy Rates When Detection Probabilities Are Less than One,” Ecology, 83, 2248–2255. DOI: 10.1890/0012-9658(2002)083[2248:ESORWD.2.0.CO;2]
  • MacKenzie, D. I., Nichols, J. D., Royle, J. A., Pollock, K. H., Bailey, L.L., and Hines, J. E. (2017), Occupancy Estimation and Modelling: Inferring Patterns and Dynamics of Species Occurrence, London: Elsevier.
  • Min, Y., and Agresti, A. (2005), “Random Effect Models for Repeated Measures of Zero-Inflated Count Data,” Statistical Modelling, 5, 1–19. DOI: 10.1191/1471082X05st084oa.
  • Rivest, L. P. (2008), “Why a Time Effect Often has a Limited Impact on Capture–Recapture Estimates in Closed Populations,” Canadian Journal of Statistics, 36, 75–84. DOI: 10.1002/cjs.5550360108.
  • Royle, J. A. (2006), “Site Occupancy Models with Heterogeneous Detection Probabilities,” Biometrics, 62, 97–102. DOI: 10.1111/j.1541-0420.2005.00439.x.
  • Roeder, K., Lynch, K. G., and Nagin, D. S. (1999), “Modeling Uncertainty in Latent Class Membership: A Case Study in Criminology,” Journal of the American Statistical Association, 94, 766–776. DOI: 10.1080/01621459.1999.10474179.
  • Sanathanan, L. (1977), “Estimating the Size of a Truncated Sample,” Journal of the American Statistical Association, 72, 669–672. DOI: 10.1080/01621459.1977.10480634.
  • Shankar, V., Milton, J., and Mannering, F. (1997), “Modelling Accident Frequencies as Zero-Altered Probability Processes: An Empirical Inquiry,” Accident Analysis & Prevention, 29, 829–837. DOI: 10.1016/s0001-4575(97)00052-3.
  • Shmueli, G., Minka, T. P., Kadane, J. B., Borle, S., and Boatwright, P. (2005), “A Useful Distribution for Fitting Discrete Data: Revival of the Conway–Maxwell–Poisson Distribution,” Journal of the Royal Statistical Society, Series C, 54, 127–142. DOI: 10.1111/j.1467-9876.2005.00474.x.
  • Todem, D., Kim, K., and Hsu, W. W. (2016), “Marginal Mean Models for Zero-Inflated Count Data,” Biometrics, 72, 986–994. DOI: 10.1111/biom.12492.
  • Van Der Heijden, P. G., Bustami, R., Cruyff, M. J., Engbersen, G., and Van Houwelingen, H. C. (2003), “Point and Interval Estimation of the Population Size Using the Truncated Poisson Regression Model,” Statistical Modelling, 3, 305–322. DOI: 10.1191/1471082X03st057oa.
  • Ver Hoef, J. M., and Jansen, J. K. (2007), “Space-Time Zero-Inflated Count Models of Harbor Seals,” Environmetrics, 18, 697–712. DOI: 10.1002/env.873.
  • Wenger, S. J., and Freeman, M. C. (2008), “Estimating Species Occurrence, Abundance, and Detection Probability Using Zero-Inflated Distributions,” Ecology, 89, 2953–2959. DOI: 10.1890/07-1127.1.
  • White, G. C., and Bennetts, R. E. (1996), “Analysis of Frequency Count Data Using the Negative Binomial Distribution,” Ecology, 77, 2549–2557. DOI: 10.2307/2265753.

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