References
- Agarwal, R. P., Cuevas, C., & Soto, H. (2011). Pseudo-almost periodic solutions of a class of semilinear fractional differential equations. Journal of Applied Mathematics and Computing, 37, 625–634.
- Ahmad, B., & Nieto, J. J. (2011). Existence of solutions for impulsive anti-periodic boundary value problems of fractional order. Taiwanese Journal of Mathematics, 15, 981–993.
- Benchohra, M., Henderson, J., & Ntouyas, S. K. (2006). Impulsive differential equations and inclusions. New York, NY: Hindawi.
- El-Borai, M. M., & Debbouche, A. (2009). Almost periodic solutions of some nonlinear fractional differential equations. International Journal of Contemporary Mathematical Sciences, 4, 1373–1387.
- Feckan, M., Zhou, Y., & Wang, J. R. (2012). On the concept and existence of solution for impulsive fractional differential equations. Communications in Nonlinear Science and Numerical Simulation, 17, 3050–3060.
- Hilfer, R. (2006). Applications of fractional calculus in physics. Singapore: World Scientific.
- Lee, L., Kou, K. I., Zhang, W., Liang, J., & Liu, Y. (2016). Robust finite-time boundedness of multi-agent systems subject to parametric uncertainties and disturbances. International Journal of Systems Science, 47, 2466–2474.
- Li, Y., & Li, Y. (2013). Existence and exponential stability of almost periodic solution for neutral delay BAM neural networks with time-varying delays in leakage terms. Journal of the Franklin Institute, 350, 2808–2825.
- Li, C., & Zhang, J. (2016). Synchronisation of a fractional-order chaotic system using finite-time input-to-state stability. International Journal of Systems Science, 47, 2440–2448.
- Liu, B. (2007). Uncertainty theory (2nd ed.). Berlin: Springer-Verlag.
- Liu, B., Liu, X., & Liao, X. (2004). Robust stability of uncertain impulsive dynamical systems. Journal of Mathematical Analysis and Applications, 290, 519–533.
- Magin, R. L. (2006). Fractional calculus in bioengineering. Danbury, CT: Begell House.
- Peng, J., & Yao, K. (2011). A new option pricing model for stocks in uncertainty markets. International Journal of Operations Research, 8, 18–26.
- Podlubny, I. (1999). Fractional differential equations. San Diego, CA: Academic Press.
- Stamov, G. T. (2009). Uncertain impulsive differential-difference equations and stability of moving invariant manifolds. Journal of Mathematical Sciences, 161, 320–326.
- Stamov, G. T. (2012). Almost periodic solutions of impulsive differential equations. Berlin: Springer.
- Stamov, G. T., & Stamov, A. G. (2013). On almost periodic processes in uncertain impulsive delay models of price fluctuations in commodity markets. Applied Mathematics and Computation, 219, 5376–5383.
- Stamov, G. T., & Stamova, I. M. (2014). Almost periodic solutions for impulsive fractional differential equations. Dynamical Systems, 29, 119–132.
- Stamov, G. T., & Stamova, I. M. (2015). Second method of Lyapunov and almost periodic solutions for impulsive differential systems of fractional order. IMA Journal of Applied Mathematics, 80, 1619–1633.
- Stamov, G. T., & Stamova, I. M. (2017). Impulsive fractional-order neural networks with time-varying delays: Almost periodic solutions. Neural Computing and Applications, 28, 3307–3316.
- Stamova, I. M. (2009). Stability analysis of impulsive functional differential equations. Berlin: Walter de Gruyter.
- Stamova, I. M. (2014). Global stability of impulsive fractional differential equations. Applied Mathematics and Computation, 237, 605–612.
- Stamova, I. M., & Stamov, G. T. (2017). Functional and impulsive differential equations of fractional order: Qualitative analysis and applications. Boca Raton, FL: CRC Press.
- Wang, C., & Shi, J. (2007). Positive almost periodic solutions of a class of Lotka–Volterra type competitive system with delays and feedback controls. Applied Mathematics and Computation, 193, 240–252.
- Zhu, H., Zhu, Z., & Wang, Q. (2011). Positive almost periodic solution for a class of Lasota–Wazewska model with infinite delays. Applied Mathematics and Computation, 218, 4501–4506.