One-Way Random Effects Model For Asymmetric Trimmed Means
There are two very important concerns for the random effects model. The first concern being the assumption of equal variances of groups and the second concern is assuming normality. Violations of these result in unsatisfactory Type I errors and considerable loss of power. Jeyaratnam-Othman (1985)...
Saved in:
| 主要作者: | |
|---|---|
| 格式: | Thesis |
| 语言: | English |
| 出版: |
2019
|
| 主题: | |
| 在线阅读: | http://eprints.usm.my/55745/1/CHIN_EE_LAINE_2019_MASTERS%20cut.pdf http://eprints.usm.my/55745/ |
| 标签: |
添加标签
没有标签, 成为第一个标记此记录!
|
| 总结: | There are two very important concerns for the random effects model. The
first concern being the assumption of equal variances of groups and the second
concern is assuming normality. Violations of these result in unsatisfactory Type I
errors and considerable loss of power. Jeyaratnam-Othman (1985) addresses the first
concern in dealing with unequal variances while assuming normality. Wilcox in 1994
continued the study by suggesting a generalization on Jeyaratnam-Othman’s
procedure based on symmetric trimmed means. The procedure resulted in significant
gain in power but was unsatisfactory for skewed distributions with unequal group
sizes. This research replaces Wilcox’s symmetric trimmed means with asymmetric
ones aiming to obtain good, if not, better Type I errors. Two hinge estimators by
Reed and Stark (1996), Q1 and Q2, were employed to obtain the asymmetric trimmed
means for this research. Simulations were carried out for Jeyaratnam-Othman (1985),
Wilcox (1994) and the two proposed procedures for a four-group design subjected to
different data distributions. Good control of Type I errors was evident for both
proposed procedures for balanced designs with values ranging from 0.026 to 0.082.
Good power averaging 0.782 was also obtained. However, power and Type I errors
for the unbalanced design were very unsatisfactory. |
|---|