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无限和有限状态空间上单生过程击中时矩的表示 被引量:4

EXPRESSIONS ON MOMENTS OF HITTING TIME FOR SINGLE BIRTH PROCESS IN INFINITE AND FINITE SPACE
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摘要 给出了正则情形单生过程各点首中时和回返时以及非正则情形下最小单生过程∞点首中时的n阶矩的显式表达;对有限状态单生过程,可以得到类似结果且其平稳分布简洁的显式表示亦获得,并计算了一些例子. The expressions are presented on n order moments for the first hitting time or returning time of single birth processes under regular condition and first hitting time of ∞ for minimal single birth processes in irregular case respectively. In finite space, similar results and explicit expression of stationary distribution are obtained. Some examples are computed in details.
作者 张余辉
机构地区 北京师范大学数学科学学院
出处 《北京师范大学学报(自然科学版)》 CAS CSCD 北大核心 2013年第5期445-452,共8页 Journal of Beijing Normal University(Natural Science)
基金 国家教育部"985"计划资助项目 高校博士点专项研究基金资助项目(20100003110005) 国家自然科学基金重点资助项目(11131003) 中央高校基本科研业务费专项资金资助项目
关键词 单生过程 首中时 回返时 平稳分布 single birth process first hitting time returning time stationary distribution
分类号 O211.62 [理学—概率论与数理统计]
  • 相关文献

参考文献23

  • 1Anderson W J. Continuous-Time Markov Chains [M]. New York: Springer-Verlag, 19 91.
  • 2Brockwell P J. The extinction time of a birth, death and catastrophe process and of a related diffusion model[J]. Adv Appl Prob, 1985, 17:42.
  • 3Broekwell P J. The extinction time of a general birth and death proeess with catastrophes[J]. J Appl Prob, 1986, 23 : 851.
  • 4Brockwell P J, Gani J, Resnick S I. Birth, immigration and catastrophe proeesses[JJ. Adv Appl Prob, 1982, 14:709.
  • 5Cairns B, Pollett P K. Extinction times for a general birth, death and catastrophe process[J]. J Appl Prob, 2004, 41:1211.
  • 6Chen A Y, Pollett P K, Zhang H J, et al. Uniqueness criteria for continuous-time Markov chains with general transition structure[J]. Adv Appl Prob, 2005, 37 : 1056.
  • 7Fill J A. On hitting times and fastest strong stationary times for skip-free and more general chains[J]. J Theor Probab, 2009, 22:587.
  • 8Pakes A G. The Markov branching-catastrophe process [J]. Stoehastie Proc Appl, 1986, 23:1.
  • 9CHEN MUFA(Department of Mathematics,Beijing Normal University,Beijing 100875,China).SINGLE BIRTH PROCESSES[J].Chinese Annals of Mathematics,Series B,1999,20(1):77-82. 被引量:16
  • 10Chen Mufa. From Markov chains to non-equilibrium particle systems [ M ]. 2nd ed. Singapore: World Scientific, 2004.

二级参考文献37

  • 1MAO Yonghua.Ergodic degrees for continuous-time Markov chains[J].Science China Mathematics,2004,47(2):161-174. 被引量:17
  • 2CHEN MUFA(Department of Mathematics,Beijing Normal University,Beijing 100875,China).SINGLE BIRTH PROCESSES[J].Chinese Annals of Mathematics,Series B,1999,20(1):77-82. 被引量:16
  • 3张余辉,赵倩倩.几类单生Q矩阵[J].北京师范大学学报(自然科学版),2006,42(2):111-115. 被引量:7
  • 4张余辉.一维马氏链保序耦合的构造[J].应用概率统计,1996,12(4):376-382. 被引量:7
  • 5Anderson W J. Continuous-time Markov Chains [M]. New York:Springer-Verlag, 1991.
  • 6Brockwell P J. The extinction time of a birth, death and catastrophe process and of a related diffusion model[J]. Adv Appl Prob, 1985, 17: 42.
  • 7Brockwell P J. The extinction time of a general birth and death process with catastrophes[J]. J Appl Prob, 1986, 23 : 851.
  • 8Brockwell P J, Gani J, Resnick S L Birth, immigration and catastrophe processes[J]. Adv Appl Prob, 1982, 14:709.
  • 9Cairns B, Pollett P K. Extinction times for a general birth, death and catastrophe process[J]. J Appl Prob, 2004, 41:1211.
  • 10Chen Murk From Markov chains to non-equilibrium particle systems [M]. 2nd ed. Singapore: World Scientific, 2004.

共引文献21

同被引文献39

引证文献4

二级引证文献7

北京师范大学学报(自然科学版)
2013年 第5期

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