| 1. | A replacement scheme on the construction of orthogonal arrays 构造正交表的一种替换模式 |
| 2. | The kronecker product of projection matrices and related orthogonal array 积及其相关的正交表 |
| 3. | People usually use the pure mathematical approaches to construct orthogonal tables 人们对正交表的构造大都是纯数学方法。 |
| 4. | As applications of these methods , some combinatorial properties of orthogonal arrays are studied 同时,应用这些方法研究了正交表的组合性质。 |
| 5. | As an application of orthogonal decomposition of projection matrices , the method of juxtaposition is generalized 从而使所构造的正交表具有更高的饱和率。 |
| 6. | This paper we use the quasi - physical and quasi - sociological methods to solve the problem of constructing orthogonal tables 本文应用拟物拟人方法来求解若干正交表的构造问题。 |
| 7. | And how t o construct particular orthogonal designs for practical uses remains an open question in most instances 怎样为实际的应用构造特定的正交表在大多数情况下仍然是一个开问题。 |
| 8. | Also , two classes of orthogonal arrays with 4n2 - and 9n2 - runs are constructed , respectively . and series of orthogonal arrays are obtained 且给出了试验次数为4n ~ 2和9n ~ 2两类正交表的构造。 |
| 9. | One of the reasons why orthogonal arrays are so popular in experimental design is that they can be used as orthogonal main - effect plans 正交表在试验设计方面广泛流行的原因之一是它能够用作正交主效应设计。 |
| 10. | Ortheogonal table , which has wide applications in experimental design , coding theory and computer security is an importan sort of array structres 正交表是一类非常重要的数组结构,它在正交实验设计、编码理论、计算机安全等领域有着广泛的应用。 |