A Modern Theory of Factorial DesignsFractional Factorial Designs: General Case
A Modern Theory of Factorial Designs: Fractional Factorial Designs: General Case
2006-01-01 00:00:00
[Fractional factorial designs with factors at s levels, s > 2, are used in practice, especially when the investigator anticipates a curvature effect of a quantitative factor or when a qualitative factor has several levels. Extension of the work in Chapter 3 to such designs with s being a prime or prime power is considered here. A general discussion on minimum aberration designs and the method of complementary designs are presented. A catalogue of three-level designs with 27 and 81 runs is given.]
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A Modern Theory of Factorial DesignsFractional Factorial Designs: General Case
[Fractional factorial designs with factors at s levels, s > 2, are used in practice, especially when the investigator anticipates a curvature effect of a quantitative factor or when a qualitative factor has several levels. Extension of the work in Chapter 3 to such designs with s being a prime or prime power is considered here. A general discussion on minimum aberration designs and the method of complementary designs are presented. A catalogue of three-level designs with 27 and 81 runs is given.]
Published: Jan 1, 2006
Keywords: Projective Geometry; Fractional Factorial Design; Maximum Resolution; Minimum Aberration; Independent Point
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