In the two-way heterogeneity setting, the optimality of a generalized Youden design (GYD) has been proved by Kiefer (1975a). A GYD is a design which is a balanced block design (BBD) when each of {rows} and {columns} is considered as blocks. It is observed in the present paper that when the number of rows is equal to the number of columns, a design is optimal as long as the rows and columns together form a BBD. Such a design is termed a pseudo-Youden design (PYD). A square GYD is also a PYD, but the converse is not true. Thus, the stringent conditions imposed on the definition of a GYD are substantially relaxed. A PYD is easier to construct and has the same efficiency as a GYD if they exist simultaneously. Patchwork and geometric methods are combined to construct a family of PYD's. It is also indicated when the construction of a GYD is impossible. A $6 \times 6$ PYD with 9 varieties is constructed. This design has the property that the number of rows is less than the number of varieties, which is never achieved by a square GYD. There is also an analogous theory for higher-dimensional designs.

Publié le : 1981-01-14
Classification:  Generalized Youden design,  pseudo-Youden design,  balanced block design,  $A$-optimality,  $D$-optimality,  $E$-optimality,  62K05,  62K10,  05B05

@article{1176345348,
     author = {Cheng, Ching-Shui},
     title = {Optimality and Construction of Pseudo-Youden Designs},
     journal = {Ann. Statist.},
     volume = {9},
     number = {1},
     year = {1981},
     pages = { 201-205},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1176345348}
}

Cheng, Ching-Shui. Optimality and Construction of Pseudo-Youden Designs. Ann. Statist., Tome 9 (1981) no. 1, pp.  201-205. http://gdmltest.u-ga.fr/item/1176345348/