Some Families of Designs for Multistage Experiments: Mutually Balanced Youden Designs when the Number of Treatments is Prime Power or Twin Primes. I

Annals of Mathematical Statistics Pub Date : 1972-10-01 DOI:10.1214/AOMS/1177692384

A. Hedayat, E. Seiden, W. Federer

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引用次数: 13

Abstract

The concepts of balance for ordered and for unordered pairs of treatments are introduced. Methods for constructing multistage experimental designs which are Youden designs at each stage, are given. In the construction of these designs an attempt was made to accommodate as much orthogonality and balance (both in our sense and in the classical sense) as is possible. These constructions are presented in several theorems. In one theorem, we give a uniform method of converting $t$ mutually orthogonal Latin squares of order $n$ into a $t$-stage balanced $(n - 1) \times n$ Youden designs. Since the known methods of constructing orthogonal Latin squares of order $n = 4t + 2$, for $t > 1$, are not uniform, a uniform method for constructing two-stage $(n - 1) \times n$ Youden designs for all even $n$ has been developed. In another theorem, a method of constructing $(2\lambda + 1)$-stage balanced $(2\lambda + 1) \times (4\lambda + 3)$ Youden designs, for $4\lambda + 3$ a prime power, is presented. A method of constructing $(p^\alpha - 1)$-stage balanced $(\nu - 1)/2 \times \nu$ Youden designs is given in another theorem for the case when $v = 4\lambda + 3$ and is the product of twin primes, i.e., $\nu = p^\alpha q^\beta, q^\beta = p^\alpha + 2$. Difference sets based on the elements of Galois fields were utilized for these constructions. Other miscellaneous results are given.

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多阶段实验设计的若干族:处理数为质因数或双质因数时的相互平衡约登设计。我

引入了有序处理对和无序处理对的平衡概念。给出了构建多级实验设计的方法，每个阶段采用约登设计。在这些设计的构造中，试图尽可能多地适应正交性和平衡(无论是在我们的意义上还是在古典意义上)。这些构造用几个定理来表示。在一个定理中，我们给出了将阶为$n$的$t$相互正交拉丁方转化为阶为$t$的平衡的$(n - 1) \times n$约登设计的统一方法。由于已知的构造阶为$n = 4t + 2$的正交拉丁方的方法对于$t > 1$是不一致的，因此开发了一种构造两阶段$(n - 1) \times n$约登设计的统一方法，适用于所有甚至是$n$。在另一个定理中，给出了一种构造$(2\lambda + 1)$级平衡$(2\lambda + 1) \times (4\lambda + 3)$约登设计的方法，对于$4\lambda + 3$为一个素数幂。在另一个定理中，给出了构造$(p^\alpha - 1)$ -级平衡$(\nu - 1)/2 \times \nu$约登设计的方法，当$v = 4\lambda + 3$和是双素数的乘积时，即$\nu = p^\alpha q^\beta, q^\beta = p^\alpha + 2$。基于伽罗瓦场元素的差分集被用于这些构造。给出了其他杂项结果。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Annals of Mathematical Statistics

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