| 1. | Class of similar birth and death processes in random environment
随机环境中的相似生灭过程族 |
| 2. | A general repairable spare part demand model based on quasi birth and death process
可修备件需求量的通用拟生灭过程模型 |
| 3. | The basic concepts and existence of birth and death process in random environment
随机环境中的生灭过程的基本概念及存在性 |
| 4. | The limiting properties of bi - immigration birth and death process in random environment
随机环境中双移民生灭过程的极限性质 |
| 5. | Criterion of sevral ergoclicity of a general continuous time quasi - birth and death process and its application
一般形式的连续时间拟生灭过程各种遍历性判定准则及其应用 |
| 6. | Now , we have settled the characteristic numbers and their probability meaning of the birth and death process with zero as its two barriers
至此,本文已解决了以0为两种壁的生灭过程的特征数及其概率意义。 |
| 7. | At last , we apply the above results to the birth and death process and obtain the numeral descriptions of the above conditions
Iw在c 。上生成正的压缩半群的充要条件是存在人0 ,使得? q ; ;在ll上是单射 |
| 8. | Markov chain : discret - time markov chains , classification of states , ergodic , stationary distribution . continuous - time markov chains , birth and death process
马尔可夫链:离散时间的马尔可夫链,状态的分类,遍历性,平稳分布。连续时间的马尔可夫链,生灭过程。 |
| 9. | The characteristic numbers and their probability meaning of the birth and death process have been settled by both professor yang in [ 1 ] and professor wang in [ 2 ]
杨向群教授在文献[ 1 ] ,王梓坤教授在文献[ 2 ]中,对以0为反射壁的生灭过程的特征数及其概率意义已解决。 |
| 10. | Chapter 6 is devoted to studying convergence rate of the birth and death processes . for a conservative birth and death q - matrix , we prove that the minimal q - function is strongly ergodic if and only if r - and s < . suppose a birth and death q - matrix satisfies r < and s <
第六章对生灭过程中的收敛速度进行了研究,得到了对保守生灭q -矩阵,最小q -函数是强遍历的充要条件是r =和s ;且当r和s时,存在唯一可配称诚实q -函数是强遍历的。 |
