References
- Ahn, C.K. (2014). A new solution to the induced I(infinity) finite impulse response filtering problem based on two matrix inequalities. International Journal of Control, 87, 404–409.
- Ahmad, S., & Stamov, G.T. (2009). Almost periodic solutions of N-dimensional impulsive competitive systems. Nonlinear Analysis: Real World Applications, 10, 1846–1853.
- Arthi, G., Park, J.H., & Jung, H.Y. (2015). Exponential stability for second-order neutral stochastic differential equations with impulses. International Journal of Control, 88, 1300–1309.
- Bainov, D.D., & Simeonov, P.S. (1993). Impulsive differential equations: Periodic solutions and applications. London: Longman Scientific and Technical.
- Du, Z.J., & Lv, Y.S. (2013). Permanence and almost periodic solution of a Lotka–Volterra model with mutual interference and time delays. Applied Mathematical Modelling, 37, 1054–1068.
- Jin, Z., Han, M.A., & Li, G.H. (2005). The persistence in a Lotka–Volterra competition systems with impulsive. Chaos Solitons Fractals, 24, 1105–1117.
- He, M.X., Chen, F.D., & Li, Z. (2010). Almost periodic solution of an impulsive differential equation model of plankton allelopathy. Nonlinear Analysis: Real World Applications, 11, 2296–2301.
- He, X., & Gopalsamy, K. (1997). Persistence, attractivity and delay in fraultative mutualism. Journal of Mathematical Analysis and Applications, 215, 154–173.
- Lakshmikantham, V., Bainov, D.D., & Simeonov, P.S. (1989). Theory of impulsive differential equations. Singapore: World Scientific.
- Li, Y.K., Zhang, T.W., & Ye, Y. (2011). On the existence and stability of a unique almost periodic sequence solution in discrete predator–prey models with time delays. Applied Mathematical Modelling, 35, 5448–5459.
- Lin, S., & Lu, Z. (2006). Permanence for two-species Lotka–Volterra systems with delays. Mathematical Biomedical Engineering, 3, 137–144.
- Lin, X., & Chen, F.D. (2009). Almost periodic solution for a Volterra model with mutual interference and Beddington–DeAngelis functional response. Applied Mathematics and Computing, 214, 548–556.
- Liu, X.G., & Meng, J.X. (2012). The positive almost periodic solution for Nicholson-type delay systems with linear harvesting terms. Applied Mathematical Modelling, 36, 3289–3298.
- Liu, Z.J., & Chen, L.S. (2007). Periodic solution of a two-species competitive system with toxicant and birth pulse. Chaos Solitons Fractals, 32, 1703–1712.
- Lu, G., & Lu, Z. (2008). Permanence for two species Lotka–Volterra cooperative systems with delays. Mathematical Biomedical Engineering, 5, 477–484.
- Lu, G.C., Lu, Z.Y., & Lian, X.Z. (2010). Delay effect on the permanence for Lotka–Volterra cooperative systems. Nonlinear Analysis: Real World Applications, 11, 2810–2816.
- Meng, X.Z., & Chen, L.S. (2006). Almost periodic solution of non-autonomous Lotka–Volterra predator–prey dispersal system with delays. Journal of Theoretical Biology, 243, 562–574.
- Muroya, Y. (2003). Uniform persistence for Lotka–Volterra-type delay differential systems. Nonlinear Analysis: Real World Applications, 4, 689–710.
- Nakata, Y., & Muroya, Y. (2010). Permanence for nonautonomous Lotka–Volterra cooperative systems with delays. Nonlinear Analysis: Real World Applications, 11, 528–534.
- Samoilenko, A.M., & Perestyuk, N.A. (1995). Impulsive differential equations. Singapore: World Scientific.
- Stamov, G.T. (2009). On the existence of almost periodic solutions for the impulsive Lasota–Wazewska model. Applied Mathematics Letters, 22, 516–520.
- Stamov, G.T. (2012). Almost periodic solutions of impulsive differential equations. Springer, Berlin: Lecture Notes in Mathematics.
- Wang, L.J. (2013). Almost periodic solution for Nicholson's blowflies model with patch structure and linear harvesting terms. Applied Mathematical Modelling, 37, 2153–2165.
- Zhang, H., Li, Y.Q., Jing, B., & Zhao, W.Z. (2014). Global stability of almost periodic solution of multispecies mutualism system with time delays and impulsive effects. Applied Mathematics and Computing, 232, 1138–1150.
- Zhang, T.W. (2013). Multiplicity of positive almost periodic solutions in a delayed Hassell–Varley type predator–prey model with harvesting on prey. Mathematical Methods in the Applied Sciences, 37, 686–697.
- Zhang, T.W. (2014). Almost periodic oscillations in a generalized Mackey–Glass model of respiratory dynamics with several delays. International Journal of Biomathematics, 7, 1450029.
- Zhang, T.W., & Gan, X.R. (2013). Existence and permanence of almost periodic solutions for Leslie–Gower predator–prey model with variable delays. Electronic Journal of Differential Equations, 2013, 1–21.
- Zhang, T.W., & Gan, X.R. (2014). Almost periodic solutions for a discrete fishing model with feedback control and time delays. Communications in Nonlinear Science and Numerical Simulation, 19, 150–163.
- Zhang, T.W., & Li, Y.K. (2011). Positive periodic solutions for a generalized impulsive n-species Gilpin–Ayala competition system with continuously distributed delays on time scales. International Journal of Biomathematics, 4, 23–34.
- Zhang, T.W., Li, Y.K., & Ye, Y. (2011). Persistence and almost periodic solutions for a discrete fishing model with feedback control. Communications in Nonlinear Science and Numerical Simulation, 16, 1564–1573.
- Zhang, T.W., Li, Y.K., & Ye, Y. (2012). On the existence and stability of a unique almost periodic solution of Schoener's competition model with pure-delays and impulsive effects. Communications in Nonlinear Science and Numerical Simulation, 17, 1408–1422.