Generalized pseudo empirical likelihood inferences for complex surveys
From MaRDI portal
Publication:5247412
DOI10.1002/cjs.11237zbMath1314.62037OpenAlexW1979604055MaRDI QIDQ5247412
Publication date: 24 April 2015
Published in: Canadian Journal of Statistics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1002/cjs.11237
confidence intervalsauxiliary informationKullback-Leibler distancesurvey designcalibration techniques
Related Items (5)
Calibration Weighting Methods for Complex Surveys ⋮ Calibration Techniques Encompassing Survey Sampling, Missing Data Analysis and Causal Inference ⋮ Modelling multilevel data under complex sampling designs: an empirical likelihood approach ⋮ Model-assisted SCAD calibration for non-probability samples ⋮ Model-assisted calibration with SCAD to estimated control for non-probability samples
Cites Work
- Unnamed Item
- Unnamed Item
- Bootstrap procedures for the pseudo empirical likelihood method in sample surveys
- Rate of convergence to normal distribution for the Horvitz-Thompson estimator.
- Empirical likelihood and general estimating equations
- Weighted empirical likelihood inference.
- Bounded, efficient and doubly robust estimation with inverse weighting
- Post-Sampling Efficient QR-Prediction in Large-Sample Surveys
- Nonparametric Confidence Limits by Resampling Methods and Least Favorable Families
- Sampling Statistics
- Pseudo-empirical likelihood ratio confidence intervals for complex surveys
- A Distributional Approach for Causal Inference Using Propensity Scores
- Empirical likelihood ratio confidence intervals for a single functional
- Calibration Estimators in Survey Sampling
- Using empirical likelihood methods to obtain range restricted weights in regression estimators for surveys
- Towards optimal regression estimation in sample surveys
- Simple design-efficient calibration estimators for rejective and high-entropy sampling
- Asymptotic Theory of Rejective Sampling with Varying Probabilities from a Finite Population
- On Information and Sufficiency
This page was built for publication: Generalized pseudo empirical likelihood inferences for complex surveys
