Abstract
Adaptive cluster sampling (ACS) is an efficient sampling design for estimating parameters of rare and clustered populations. It is widely used in ecological research. The modified Hansen-Hurwitz (HH) and Horvitz-Thompson (HT) estimators based on small samples under ACS have often highly skewed distributions. In such situations, confidence intervals based on traditional normal approximation can lead to unsatisfactory results, with poor coverage properties. Christman and Pontius (Biometrics 56:503–510, 2000) showed that bootstrap percentile methods are appropriate for constructing confidence intervals from the HH estimator. But Perez and Pontius (J Stat Comput Simul 76:755–764, 2006) showed that bootstrap confidence intervals from the HT estimator are even worse than the normal approximation confidence intervals. In this article, we consider two pseudo empirical likelihood functions under the ACS design. One leads to the HH estimator and the other leads to a HT type estimator known as the Hájek estimator. Based on these two empirical likelihood functions, we derive confidence intervals for the population mean. Using a simulation study, we show that the confidence intervals obtained from the first EL function perform as good as the bootstrap confidence intervals from the HH estimator but the confidence intervals obtained from the second EL function perform much better than the bootstrap confidence intervals from the HT estimator, in terms of coverage rate.
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References
Chen J, Chen S, Rao JNK (2003) Empirical likelihood confidence intervals for the mean of a population containing many zero values. Can J Stat 31: 53–68
Chen J, Qin J (1993) Empirical likelihood estimation for finite populations and the effective usage of auxiliary information. Biometrika 80: 107–116
Chen J, Sitter RR (1999) A pseudo empirical likelihood approach to the effective use of auxiliary information in complex survey. Stat Sin 9: 385–406
Chen J, Sitter RR, Wu C (2002) Using empirical likelihood methods to obtain range restricted weights in regression estimators for surveys. Biometrika 55: 547–557
Chrisman MC, Pontius JS (2000) Bootstrap confidence intervals for adaptive cluster sampling. Biometrics 56: 503–510
Efron B, Tibshirani RJ (1993) An introduction to the bootstrap. Chapman and Hall, New York
Goldberg NA, Heine JN, Brown JA (2007) The application of adaptive cluster sampling for rare subtidal macroalgae. Mar Biol 151: 1343–1348
Gross S (1980) Median estimation in sample surveys. In: Proceedings of the section on survey research methods. American Statistical Association, Alexanderia, Virginia, pp 181–184
Hájek J (1971) Comment on a paper by D.Basu. In: Godambe VP, Sprott DA(eds) Foundations of statistical inference. Holt, Rinehart and Winson, Toronto, p 236
Hartley HO, Rao JNK (1968) A new estimation theory for sample surveys. Biometrika 55: 547–557
Kvanli AH, Shen YK, Deng LY (1998) Construction of confidence intervals for the mean of a population containing many zero values. J Bus Econ Stat 16: 362–368
Magnussen S, Kurz W, Leckie DG, Paradine D (2005) Adaptive cluster sampling for estimation of deforestation rates. Eur J For Res 124: 207–220
Owen AB (1988) Empirical likelihood confidence intervals for a single functional. Biometrika 75: 237–249
Owen AB (1990) Empirical likelihood ratio confidence regions. Ann Stat 18: 90–120
Owen AB (2001) Empirical likelihood. Chapman and Hall, New York
Perez TD, Pontius JS (2006) Conventional bootstrap and normal confidence interval estimation under adaptive cluster sampling. J Stat Comput Simul 76: 755–764
Philippi T (2005) Adaptive cluster sampling for estimation of abundances within local populations of low-abundance plants. Ecology 86: 1091–1100
Rao JNK, Wu CFJ (1988) Resampling inference with complex survey data. J Am Stat Assoc 83: 231–241
Roesch FA Jr (1993) Adaptive cluster sampling for forest inventories. For Sci 39: 655–669
Salehi MM (2003) Comparison between Hansen-Hurwitz and Horvitz-Thompson estimators for adaptive cluster sampling.. Environ Ecol Stat 10: 115–127
Särndal CE, Swensson B, Wretman JH (1992) Model assisted survey sampling. Springer, New York
Sitter RR (1992) A resampling procedure for complex survey data. J Am Stat Assoc 87: 755–765
Thompson SK (2002) Sampling. Wiley, New York
Thompson SK, Seber GAF (1996) Adaptive sampling. Wiley, New York
Turk B, Borkowski JJ (2005) A review of adaptive cluster sampling: 1990-2003. Environ Ecol Stat 12: 55–94
Wu C (2004) Some algorithmic aspects of the empirical likelihood method in survey sampling. Stat Sin 14: 1057–1067
Wu C (2005) Algorithms and R codes for the pseudo empirical likelihood methods in survey sampling. Survey Methodol 31: 239–243
Wu C, Rao JNK (2006) Pseudo empirical likelihood ratio confidence intervals for complex surveys. Can J Stat 34: 359–375
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Salehi, M., Mohammadi, M., Rao, J.N.K. et al. Empirical likelihood confidence intervals for adaptive cluster sampling. Environ Ecol Stat 17, 111–123 (2010). https://doi.org/10.1007/s10651-008-0105-9
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DOI: https://doi.org/10.1007/s10651-008-0105-9