期刊文献+
任意字段
题名或关键词
题名
关键词
文摘
作者
第一作者
机构
刊名
分类号
参考文献
作者简介
基金资助
栏目信息

Interactional models for adults of two populations with maturation delays

Interactional models for adults of two populations with maturation delays
下载PDF
导出
摘要 This paper is concerned with interactional models for adults of two species delayed by their mature periods. The existence and local stability of equilibria are discussed thoroughly for competitive systems, cooperative systems and predator-prey systems, respectively. For systems with interaction of competition and cooperation, it is found that the two populations are uniformly persistent if the positive equilibrium is stable. For predator-prey interaction, however, some further conditions are needed to guarantee the persistence of the systems. This paper is concerned with interactional models for adults of two species delayed by their mature periods. The existence and local stability of equilibria are discussed thoroughly for competitive systems, cooperative systems and predator-prey systems, respectively. For systems with interaction of competition and cooperation, it is found that the two populations are uniformly persistent if the positive equilibrium is stable. For predator-prey interaction, however, some further conditions are needed to guarantee the persistence of the systems.
作者 HE Ze-rong LI Jian-quan
机构地区 Institute of Operational Research and Cybernetics Department of Applied Mathematics and Physics
出处 《Applied Mathematics(A Journal of Chinese Universities)》 SCIE CSCD 2008年第2期127-135,共9页 高校应用数学学报(英文版)(B辑)
基金 National Natural science Foundation of China(10771048,10671209).
关键词 interactional models mature period equilibrium stability uniform persistence. interactional models, mature period, equilibrium stability, uniform persistence.
分类号 O22 [理学—运筹学与控制论]
  • 相关文献

参考文献9

  • 1Ma Z E. Mathematical Modelling and Study of Population Ecology (in Chinese), Hefei: Anhui Education Press, 1996.
  • 2Kuang Y. Delay Differential Equations with Applications in Population Dynamics, New York: Academic Press, 1993.
  • 3Cushing J M. Integro-differential equations and delay models in population dynamics, In: Lecture Notes in Biomathematics, Vol 20, Berlin/Heidelberg/New York: Springer-Verlag, 1977.
  • 4Freedman H I, Rao V S H. The tradeoff between mutual interference and time lags in predatorprey systems, Bull Math Biol, 1983, 45: 991-1004.
  • 5Freedman H I, So J, Waltman P. Coexistence in a model of competition in the chemostat incorporating discrete time delays, SIAM J Appl Math, 1989, 49: 859-870.
  • 6Wang W D, Ma Z E. Asymptotic behavior of a predator-prey system with diffusion and delays, J Math Anal Appl, 1997, 206: 1914204.
  • 7Jin Z, Ma Z E. Harmless delays for uniform persistence, System Science and Mathematical Science, 2000, 13(2): 126-135.
  • 8Cooke K, Driessche P V D, Zou X. Interaction of maturation delay and nonlinear birth in population and epidemic model, J Math Biol, 1999, 39: 332-352.
  • 9Lakshmaikantham V, Leela S. Differential Integral Inequality-Theory and Application, Vol Ⅱ, New York, London: Academic Press, 1969,34-41.
Applied Mathematics(A Journal of Chinese Universities)
2008年 第2期

相关作者

内容加载中请稍等...

相关机构

内容加载中请稍等...

相关主题

内容加载中请稍等...

浏览历史

内容加载中请稍等...
;
使用帮助 返回顶部