ALTERNATIVE ESTIMATOR IN THE ANALYSIS OF VARIANCE TECHNIQUE IN THE PRESENCE OF OUTLIERS

Authors

  • A. K. Odior Department of Statistics, Delta-State Polytechnic Otefe Oghara, Nigeria Author
  • G. M. Oyeyemi Department of Statistics, University of Ilorin, Ilorin, Nigeria Author

Keywords:

Cut Off Point, Data Dependent, RMSE, Estimators, Robust, Adaptive, Outliers

Abstract

The estimation of ANOVA model parameters in the presence of outliers is one of the most pervasive problems in data analysis, statistical applications and inferences. The regularity of heavy tailed error distributions due to the presence of outliers in both experimental and observational data is of keen interest to researchers due its negative impact on most useful classical techniques in the field of statistical inferences. Authors at various times have examined empirically the problems of outliers in data analysis and inference from different considerations and various estimators including the classes of M estimators with fixed cut off point have been suggested in literature to address the limitations of the classical methods. Consequently, this paper examines the efficiency of the proposed alternative estimator: Adaptive Robust M Estimator (ARME) with data dependent (flexible) cut off point. The efficiency
(robustness) of the proposed method and the other existing methods: Huber M Fixed Cut off (HMFC), Bisquare M Fixed Cut off (BMFC) and Least Square Estimator (LSE) was compared using Monte Carlos simulated data for One-Way ANOVA with varying percentages of outliers on the response variable crossed with different sample size. The performance of the estimators was assess using Root Mean Square Error (RMSE). The results of the study revealed that the performance of the proposed estimator (ARME) is substantially better when compare with the existing methods using RMSE as measure of efficiency and goodness of fit at different degree of outliers.

         Views | Downloads: 94 / 17

Downloads

Download data is not yet available.

References

Avi, G. (2006). Robust analysis of variance. Process design and quality improvement. International Journal of Productivity and Quality Management, 1(3) 1-14.

Barnett, V., and Lewis, T. (1993). Outliers in statistical data, third ed. Wiley, New -York.

Blanca, M. J., Arnau, J., and Rebecca, B. (2017). Non-normal data: Is ANOVA still a valid option? Psicothema, 29(4) 552-557.

Bruno, B. and Roberta, V. (2007). Robust analysis of variance: An approach based on the forward search. Computational Statistics and Data Analysis, 51(7), 5172 – 5183.

Carling, K. (2000). Resistant outlier rules and non –Gaussian case. Computational Statistics and Data Analysis, 33, 249-258

Dinesh, I. R. and Padmini, V. P. (2015). Robust ANOVA: An illustrative study in horticultural crop research, International Journal of Mathematics and Computational Sciences, 9(2), 85-89

Huber, J. P. (1964). Robust estimation of a location parameter. The Annals of Mathematical Statistics, 73-101.

Kevin, D. B. (2004). Analysis of Variance via Confidence Intervals. Sage Publications, London.

Markus, H. (2016). ANOVA-The effect of outliers. A thesis submitted to the department of Statistics Uppsala University, Uppsala, Sweden.

Montgomery, (2010). Design and analysis of experiments. John Wiley and sons, New -York.

Staudtle, R. G. and Sheather, S. J. (1990). Robust Estimation and Testing. Wiley, New- York.

Wayne, W. D & Chad, L. C. (2013). Biostatistics: A Foundation for Analysis in the Health Sciences. Wiley, New-York.

Downloads

Published

2023-08-01

How to Cite

ALTERNATIVE ESTIMATOR IN THE ANALYSIS OF VARIANCE TECHNIQUE IN THE PRESENCE OF OUTLIERS. (2023). The Journals of the Nigerian Association of Mathematical Physics, 65, 217 – 224. https://nampjournals.org.ng/index.php/home/article/view/50

Share

Similar Articles

21-30 of 55

You may also start an advanced similarity search for this article.