Abstract
Nonresponse is a potential source of errors in sample surveys. It introduces bias and large variance in the estimation of finite population parameters. Regression models have been recognized as one of the techniques of reducing bias and variance due to random nonresponse using auxiliary data. In this study, it is assumed that random nonresponse occurs in the survey variable in the second stage of cluster sampling, assuming full auxiliary information is available throughout. Auxiliary information is used at the estimation stage via a regression model to address the problem of random nonresponse. In particular, auxiliary information is used via an improved Nadaraya–Watson kernel regression technique to compensate for random nonresponse. The asymptotic bias and mean squared error of the estimator proposed are derived. Besides, a simulation study conducted indicates that the proposed estimator has smaller values of the bias and smaller mean squared error values compared to existing estimators of a finite population mean. The proposed estimator is also shown to have tighter confidence interval lengths at 95% coverage rate. The results obtained in this study are useful for instance in choosing efficient estimators of a finite population mean in demographic sample surveys.
Highlights
Many authors such as [1,2,3,4] have looked at estimation of a finite population mean in the presence of nonresponse using various assumptions
In the sequence of improving estimation of a finite population mean in the presence of random nonresponse, an improved Nadaraya–Watson kernel regression estimator is proposed in this study. e improved Nadaraya–Watson kernel regression technique was first fronted by [5]
To compensate for random nonresponse, auxiliary information is used in this study via an improved Nadaraya–Watson kernel regression technique due to [5]
Summary
Many authors such as [1,2,3,4] have looked at estimation of a finite population mean in the presence of nonresponse using various assumptions. In the sequence of improving estimation of a finite population mean in the presence of random nonresponse, an improved Nadaraya–Watson kernel regression estimator is proposed in this study. To compensate for random nonresponse, auxiliary information is used in this study via an improved Nadaraya–Watson kernel regression technique due to [5]. Where a is an arithmetic mean given by a ni 1 mj 1 m(X ij)/mn while α is a sensitivity parameter which satisfies 0 ≤ α ≤ 1. It has been suggested by [8] that taking α (1/2) produces good results
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