Dynamics of a stochastic predator-prey model with mutual interference
Dynamics of a stochastic predator-prey model with mutual interference
参考文献35
-
1A. Lotka, Elements of Physical Biology (Williams and Wilkins, Baltimore, Md, 1924).
-
2V. Volterra, Lecons Sur la Theorie Mathematique de la Lutte pour la Vie (GauthierVillars, Paris, 1931).
-
3S. Ahmad, On the non autonomous Volterra-Lotka competition equations, Proc. Amer. Math. Soc. 117 (1993) 199-204.
-
4L. Chen, Mathematical Models and Methods in Ecology (Science Press, Beijing, 1988) (in Chinese).
-
5F. Chen, Y. Chen, S. Guo and Z. Li, Global attractivity of a generalized LotkaVolterra competition model, Differ. Equations Dynam. Syst. 18 (2010) 303-315.
-
6C. Egami and N. Hirano, Periodic solutions in a class of periodic delay predator-prey systems, Yokohama Math. J. 51 (2004) 45-6l.
-
7M. Fan, K. Wang and D. Jiang, Existence and global attractivity of positive periodic solutions of periodic n-species Lotka-Volterra competition systems with several deviating arguments, Math. Biol. 160 (1999) 47-6l.
-
8X. He, The Lyapunov functionals for delay Lotka-Volterra-type models, SIAM J. Appl. Math. 58 (1998) 1222-1236.
-
9S. Hsu, The application of the Poincare-transform to the Lotka-Volterra model, J. Math. BioI. 6 (1978) 67-73.
-
10Y. Kuang and H. Smith, Global stability for infinite delay Lotka-Volterra type systems, 1. Differential Equations 103 (1993) 221-246.
-
1郝新颖,王金凤,史峻平,王玉文.一类带捕获项的捕食模型的定性分析[J].哈尔滨师范大学自然科学学报,2009,25(2):31-33.
-
2Shengbin Yu,Fengde Chen.Almost periodic solution of a modified Leslie-Gower predator-prey model with Holling-type II schemes and mutual interference[J].International Journal of Biomathematics,2014,7(3):81-95. 被引量:8
-
3M. Sivakumar M. Sambath K. Balachandran.Stability and Hopf bifurcation analysis of a diffusive predator-prey model with Smith growth[J].International Journal of Biomathematics,2015,8(1):163-180. 被引量:4
-
4靳艳飞.Moment stability for a predator–prey model with parametric dichotomous noises[J].Chinese Physics B,2015,24(6):177-183. 被引量:1
-
5龙鹏飞,张纯,贺亮.基于捕食模型与蚁群算法的多约束QoS路由选择[J].计算机工程与应用,2009,45(14):116-118. 被引量:3
-
6Na Wang,Jianqiang Xu,Lian Chen.ASYMPTOTIC SOLUTION TO SINGULARLY PERTURBED DELAYED EQUATION FOR PREDATOR-PREY MODEL[J].Annals of Differential Equations,2014,30(4):424-431.
-
7靳艳飞,谢文贤.Stability of a delayed predator prey model in a random environment[J].Chinese Physics B,2015,24(11):140-145. 被引量:1
-
8邓慈云,刘泽文,宁林一.多约束QoS路由选择算法研究[J].电脑知识与技术,2012,8(8):5321-5323.
-
9梁文,罗文坚,曹先彬,王煦法.基于生态捕食模型的多目标优化问题求解算法[J].中国科学技术大学学报,2005,35(3):360-366. 被引量:8
-
10陈俊,乔海波,魏宏彬.捕食模型高精度参数的估计[J].数学的实践与认识,2007,37(14):67-76. 被引量:2