Construction and Optimality of Affine-Resolvable Designs
从正交数组构造仿射可分解设计,证明其在可分解设计中按常用准则是最优的,并给出最多七个重复的构造方法,实验数据可用伪因子简单分析。
Affine-resolvable designs are constructed from orthogonal arrays and shown to be optimal among resolvable designs with respect to the usual criteria. Tables and text show how to construct such designs in up to seven replicates whenever the number of treatments properly divides the square of the block size. Data from experiments which use affine-resolvable designs can be simply analysed by using pseudofactors.