论文信息 - Measures of Lack of Fit for Response Surface Designs and Predictor Variable Transformations

Measures of Lack of Fit for Response Surface Designs and Predictor Variable Transformations

Some first-order (2 k–p two-level factorials and fractional factorials plus center points) and second-order (cube plus star plus center-point composite) response surface designs are discussed from the point of view of their ability to detect certain likely kinds of lack of fit of degree one higher than has been fitted. This leads to consideration of conditions for representationa adequacy of first- and second-order models in transformed predictor variables. It is shown how to use the estimated regression coefficients from the higher degree model to check if power transformations of the predictor variables could eliminate the lack of fit, and also actually to estimate the transformations.

George E. P. Box | Norman R. Draper | G. Box | N. Draper

[1] D. Cox,et al. An Analysis of Transformations , 1964 .

[2] George E P Box,et al. Criteria for Judging Adequacy of Estimation by an Approximating Response Function. , 1973 .

[3] N. Draper,et al. Applied Regression Analysis , 1966 .

[4] Norman R. Draper,et al. Applied regression analysis (2. ed.) , 1981, Wiley series in probability and mathematical statistics.

[5] Bartlett Ms. The use of transformations. , 1947 .

[6] William G. Hunter,et al. Transformations: Some Examples Revisited , 1969 .

[7] G. Box,et al. On the Experimental Attainment of Optimum Conditions , 1951 .

[8] R. M. DeBaun,et al. Block Effects in the Determination of Optimum Conditions , 1956 .