Almost periodic solution for a Volterra model with mutual interference and Beddington-DeAngelis functional response
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[1] Fei Chen,et al. Existence of almost periodic solution in a ratio-dependent Leslie system with feedback controls , 2008 .
[2] Shengqiang Liu,et al. Coexistence and stability of predator–prey model with Beddington–DeAngelis functional response and stage structure , 2008 .
[3] Michael P. Hassell,et al. DENSITY-DEPENDENCE IN SINGLE-SPECIES POPULATIONS , 1975 .
[4] A. Fink. Almost Periodic Differential Equations , 1974 .
[5] Peiguang Wang,et al. The existence of almost periodic solutions of some delay differential equations , 2004 .
[6] Xitao Yang. Global attractivity and positive almost periodic solution of a single species population model , 2007 .
[7] Lansun Chen,et al. Permanence, extinction and balancing survival in nonautonomous Lotka-Volterra system with delays , 2002, Appl. Math. Comput..
[8] Fei Han,et al. Existence of multiple positive periodic solutions for differential equation with state-dependent delays , 2006 .
[9] Jifa Jiang,et al. Multiple periodic solutions in delayed Gause-type ratio-dependent predator-prey systems with non-monotonic numerical responses , 2008, Math. Comput. Model..
[10] Chunxia Shen,et al. Permanence and global attractivity of the food-chain system with Holling IV type functional response , 2007, Appl. Math. Comput..
[11] Zhidong Teng,et al. Permanence for a delayed periodic predator-prey model with prey dispersal in multi-patches and predator density-independent ✩ , 2008 .
[12] Wang Qi,et al. Almost periodic solution for n-species Lotka-Volterra competitive system with delay and feedback controls , 2008, Appl. Math. Comput..
[13] R. Arditi,et al. Empirical Evidence of the Role of Heterogeneity in Ratio‐Dependent Consumption , 1993 .
[14] Xinyu Song,et al. Dynamic behaviors of the periodic predator–prey model with modified Leslie-Gower Holling-type II schemes and impulsive effect , 2008 .
[15] Rong Yuan,et al. Global attractivity and positive almost periodic solution for delay logistic differential equation , 2008 .
[16] Alan A. Berryman,et al. The Orgins and Evolution of Predator‐Prey Theory , 1992 .
[17] Jinlin Shi,et al. Periodicity in a Nonlinear Predator-prey System with State Dependent Delays , 2005 .
[18] Yang Kuang,et al. Dynamics of a nonautonomous predator-prey system with the Beddington-DeAngelis functional response , 2004 .
[19] A. Gutierrez. Physiological Basis of Ratio-Dependent Predator-Prey Theory: The Metabolic Pool Model as a Paradigm , 1992 .
[20] Zhihui Yang,et al. Periodic solutions in higher-dimensional Lotka-Volterra neutral competition systems with state-dependent delays , 2007, Appl. Math. Comput..
[21] Fengde Chen. Almost periodic solution of the non-autonomous two-species competitive model with stage structure , 2006, Appl. Math. Comput..
[22] Lansun Chen,et al. Profitless delays for a nonautonomous Lotka-Volterra predator-prey almost periodic system with dispersion , 2007, Appl. Math. Comput..
[23] Yanling Zhu,et al. Global attractivity of positive periodic solution for a Volterra model , 2008, Appl. Math. Comput..
[24] Xinyu Song,et al. Analysis of nonautonomous predator-prey model with nonlinear diffusion and time delay , 2008, Appl. Math. Comput..
[25] Fengde Chen,et al. The permanence and extinction of a nonlinear growth rate single-species non-autonomous dispersal models with time delays , 2007 .
[26] R. Arditi,et al. Coupling in predator-prey dynamics: Ratio-Dependence , 1989 .