A nonparametric dispersion test for unreplicated two-level fractional factorial designs

A consistent product/process will have little variability, i.e. dispersion. The widely-used unreplicated two-level fractional factorial designs can play an important role in detecting dispersion effects with a minimum expenditure of resources. In this paper we develop a nonparametric dispersion test for unreplicated two-level fractional factorial designs. The test statistic is defined, critical values are provided, and large sample approximations are given. Through simulations and examples from the literature, the test is compared to general nonparametric dispersion tests and a parametric test based on a normality assumption. These comparisons show the test to be the most robust of those studied and even superior to the normality-based test under normality in some situations. An example is given where this new test is the only one of those studied that does not incorrectly detect a spurious dispersion effect.

[1]  A. Mood On the Asymptotic Efficiency of Certain Nonparametric Two-Sample Tests , 1954 .

[2]  C. Daniel Use of Half-Normal Plots in Interpreting Factorial Two-Level Experiments , 1959 .

[3]  G. Pan The Impact of Unidentified Location Effects on Dispersion-Effects Identification From Unreplicated Factorial Designs , 1999, Technometrics.

[4]  Guohua Pan The Impact of Unidentified Location Effects on Dispersion-Effects Identification From Unreplicated Factorial Designs , 1999, Technometrics.

[5]  Narayanaswamy Balakrishnan,et al.  ANALYZING UNREPLICATED FACTORIAL EXPERIMENTS: A REVIEW WITH SOME NEW PROPOSALS , 1998 .

[6]  George E. P. Box,et al.  Dispersion Effects From Fractional Designs , 1986 .

[7]  Dennis K. J. Lin,et al.  Confounding of Location and Dispersion Effects in Unreplicated Fractional Factorials , 2001 .

[8]  R. Lenth Quick and easy analysis of unreplicated factorials , 1989 .

[9]  O. L. Davies,et al.  Design and analysis of industrial experiments , 1954 .

[10]  Guohua Pan,et al.  On a levene type test for equality of two variances , 1999 .

[11]  T. Obremski Practical Nonparametric Statistics (2nd ed.) , 1981 .

[12]  H. Levene Robust tests for equality of variances , 1961 .

[13]  J. Klotz,et al.  Nonparametric Tests for Scale , 1962 .

[14]  R. Daniel Meyer,et al.  An Analysis for Unreplicated Fractional Factorials , 1986 .

[15]  D. Montgomery USING FRACTIONAL FACTORIAL DESIGNS FOR ROBUST PROCESS DEVELOPMENT , 1990 .

[16]  Cuthbert Daniel,et al.  Applications of Statistics to Industrial Experimentation: Daniel/Applications , 1976 .

[17]  J. Tukey,et al.  A Nonparametric Sum of Ranks Procedure for Relative Spread in Unpaired Samples , 1960 .

[18]  Peter Hall,et al.  Adaptive inference for the two-sample scale problem , 1997 .

[19]  Michael A. Fligner,et al.  Distribution-Free Two-Sample Tests for Scale , 1976 .

[20]  B. Bergman,et al.  Dispersion effects from unreplicated designs in the 2 k-p series , 1997 .

[21]  Intraclass rank tests for independence , 1981 .

[22]  Dennis K. J. Lin,et al.  Testing Multiple Dispersion Effects in Unreplicated Fractional Factorial Designs , 2001, Technometrics.

[23]  A. R. Ansari,et al.  Rank-Sum Tests for Dispersions , 1960 .

[24]  David J. Groggel,et al.  Distribution-Free Tests for Main Effects in Multifactor Designs , 1986 .