Existence and stability of periodic solution of a stage‐structured model with state‐dependent impulsive effects

A single population growth model with stage-structured and state-dependent impulsive control is proposed. By using the Poincar'e map and the analogue of Poincare's criterion, we prove the existence and the stability of positive order-1 or order-2 periodic solution. Moreover, we show that there is no periodic solution with order greater than or equal to three. Numerical results are carried out to illustrate the feasibility of our main results and the superiority of state feedback control strategy is also discussed. Copyright © 2011 John Wiley & Sons, Ltd.

[1]  A. A. S. Zaghrout,et al.  Analysis of a model of stage-structured population dynamics growth with time state-dependent time delay , 1996 .

[2]  Zhidong Teng,et al.  The dynamics of a Lotka-Volterra predator-prey model with state dependent impulsive harvest for predator , 2009, Biosyst..

[3]  A non‐autonomous epidemic model with time delay and vaccination , 2009 .

[4]  Lansun Chen,et al.  Effects of toxicants on a stage-structured population growth model , 2001, Appl. Math. Comput..

[5]  Alberto d’Onofrio,et al.  Pulse vaccination strategy in the sir epidemic model: Global asymptotic stable eradication in presence of vaccine failures , 2002 .

[6]  Alberto d'Onofrio,et al.  Stability properties of pulse vaccination strategy in SEIR epidemic model. , 2002, Mathematical biosciences.

[7]  Zhidong Teng,et al.  Existence and stability of periodic solution of a predator-prey model with state-dependent impulsive effects , 2009, Math. Comput. Simul..

[8]  Elena Braverman,et al.  Linearized oscillation theory for a nonlinear delay impulsive equation , 2003 .

[9]  H. I. Freedman,et al.  Analysis of a model representing stage-structured population growth with state-dependent time delay , 1992 .

[10]  Guirong Jiang,et al.  Impulsive state feedback control of a predator-prey model , 2007 .

[11]  Sami Souissi,et al.  Qualitative behavior of stage-structured populations: application to structural validation , 1998 .

[12]  Wang Ke,et al.  The optimal harvesting problems of a stage-structured population , 2004 .

[13]  Sanyi Tang,et al.  State-dependent impulsive models of integrated pest management (IPM) strategies and their dynamic consequences , 2005, Journal of mathematical biology.

[14]  Zhidong Teng,et al.  Existence and stability of periodic solution of a Lotka-Volterra predator-prey model with state dependent impulsive effects , 2009 .

[15]  Ivanka M. Stamova,et al.  Asymptotic stability of competitive systems with delays and impulsive perturbations , 2007 .

[16]  Snezhana Hristova,et al.  Existence of periodic solutions of nonlinear systems of differential equations with impulse effect , 1987 .

[17]  Lansun Chen,et al.  Density-dependent birth rate, birth pulses and their population dynamic consequences , 2002, Journal of mathematical biology.

[18]  P. S. Simeonov,et al.  Orbital stability of periodic solutions of autonomous systems with impulse effect , 1988 .

[19]  Guangzhao Zeng,et al.  Existence of periodic solution of order one of planar impulsive autonomous system , 2006 .

[20]  Jing Wang,et al.  Optimal control of harvesting for single population , 2004, Appl. Math. Comput..

[21]  Xinzhi Liu Stability results for impulsive differential systems with applications to population growth models , 1994 .

[22]  Zvia Agur,et al.  Theoretical examination of the pulse vaccination policy in the SIR epidemic model , 2000 .