Group Divisible Second Order Rotatable Designs
Copyright policy )Group Divisible Second Order Rotatable Designs
AbstractThe Group Divisible Rotatable (GDR) designs are the designs in which the factors get divided into groups such that for the factors within group, the designs are rotatable. In the present paper we have obtained a series of Group Divisible Second Order Rotatable designs, by decomposing the v‐dimensional space corresponding to v‐factors under consideration into three mutually orthogonal spaces. We have given the least squares estimates of the parameters, the analysis and construction of such designs.
balanced designs, Factorial statistical designs, factors, group divisible second order rotatable designs, least squares estimates, response surface
balanced designs, Factorial statistical designs, factors, group divisible second order rotatable designs, least squares estimates, response surface
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