References
- B. Buonomo and C. Vargas-De-Leon, Global stability for an HIV-1 infection model including an eclipse stage of infected cells, J. Math. Anal. Appl. 385 (2012), pp. 709–720.
- A.A. Canabarro, I.M. Gleria, and M.L. Lyra, Periodic solutions and chaos in a nonlinear model for the delayed cellular immune response, Physica 342 (2004), pp. 232–241.
- D. Ebert, C.D. Zschokke-Rohringer, and H.J. Carins, Does effects and density dependent regulation of two microparasites of Daphnia magna, Oecologia 122 (2000), pp. 200–209.
- P. Essunger and A.S. Perelson, Modeling HIV infection of CD4+T cell subpopulations, J. Theor. Biol.170 (1994), pp. 367–391.
- Q.M. Gou and W.D. Wang, Global stability of an SEIS Epidemic model with saturating incidence, J. Biomath. 23 (2008), pp. 265–272.
- B.D. Hassard, N.D. Kazarinoff, and Y.H. wan, Theory and Applications of Hopf Bifurcation, Cambridge University Press, Cambridge, 1981.
- G. Huang, H. Yokoi, Y. Takeuchi, T. Kajiwara, and T. Sasaki, Impact of intracellular delay, immune activation delay and nonlinear incidence on viral dynamics, Jpn J. Ind. Appl. Math. 28 (2011), pp. 383–411.
- A. Korobeinikov, Global properties of basic virus dynamics models, Bull. Math. Biol. 66(4) (2004), pp. 879–883.
- A. Korobeinikov, Global asymptotic properties of virus dynamics models with dose dependent parasite reproduction and virulence, and nonlinear incidence rate, Math. Medi. Biol. 26 (2009), pp. 225–239.
- S. Liu, X. Pan, and W. Zhao, HIV cure: latent HIV eradication and strategies, Journal of Zunyi Medical University 38(2) (2015), pp. 105–110.
- S. Liu and L. Wang, Global stability of an HIV-1 model with distributed intracellular delays and a combination therapy, Math. Biosci. 7 (2010), pp. 675–685.
- X.D. Liu, H. Wang, Z.X. Hu, and W. Ma, Global stability of an HIV pathogenesis model with cure rate, Nonlinear Anal. Real World Appl. 12 (2011), pp. 2947–2961.
- C.F. Lv, L.H. Huang, and Z.H. Yuan, Global stability for an HIV-1 infection model with Beddington-DeAngelis incidence rate and CTL immune response, Commun. Nonlinear Sci. Numer. Simul. 19 (2014), pp. 121–127.
- M. Nasri, M. Dehghan, and M. Jaberi Douraki, Study of a system of non-linear difference equations arising in a deterministic model for HIV infection, Appl. Math. Comput. 171 (2005), pp. 1306–1330.
- L. Rong, M. A. Gilchrist, Z. Feng, and A. S. Perelson, Modeling within-host HIV-1 dynamics and the evolution of drug resistance: trade-offs between viral enzyme function and drug susceptibility, J. Theor. Biol. 247 (2007), pp. 804–818.
- L. Rong and A. S. Perelson, Asymmetric division of activated latently infected cells may explain the decay kinetics of the HIV-1 latent reservoir and intermittent viral blips, Math. Biosci. 217(1) (2009), pp. 77–87.
- M.W. Shen, Y.N. Xiao, and L.B. Rong, Global stability of an infection-age structured HIV-1 model linking within-host and between-host dynamics, Math. Biosci. 263 (2015), pp. 37–50.
- C. Sun, L. Li, and J. Jia, Hopf bifurcation of an HIV-1 virus model with two delays and logistic growth, Math. Model. Nat. Pheno. 15 (2020), pp. 16–20.
- E. Vicenzi and G. Poli, Novel factors interfering with human immunodeficiency virus - type 1 replication in vivo and in vitro, Tissue Antigens 81(2) (2013), pp. 61–71.
- K.F. Wang, W.D. Wang, H.Y. Pang, and X. Liu, Complex dynamic behavior in a viral model with delayed immune response, Physica D. 226 (2007), pp. 197–208.
- X. Wang, A. Elaiw, and X.Y. Song, Global properties of a delayed HIV infection model with CTL immune response, Appl. Math. Comput. 218 (2012), pp. 9405–9414.
- C.J. Xu, Local and global Hopf bifurcation analysis on simplified bidirectional associative memory neural networks with multiple delays, Math. Comput. Simulat. 149 (2018), pp. 69–90.
- R. Xu, Global dynamics of an HIV-1 infection model with distributed intracellular delays, Comput. Math. Appl. 61 (2011), pp. 2799–2805.
- R. Xu, Global stability of an HIV-1 infection model with saturation infection and intracellular delay, J. Math. Anal. Appl. 375 (2011), pp. 75–81.
- C.J. Xu and C. Aouiti, Comparative analysis on Hopf bifurcation of integer order and fractional order two-neuron neural networks with delay, Int. J. Circuit Theory Appl. 48(9) (2020), pp. 1459–1475.
- C.J. Xu, C. Aouiti, and Z. Liu, A further study on bifurcation for fractional order BAM neural networks with multiple delays, Neurocomputing 417 (2020), pp. 501–515.
- C.J. Xu, M. Liao, P. Li, Y. Guo, and S. Yuan, Influence of multiple time delays on bifurcation of fractional-order neural networks, Appl. Math. Comput. 361 (2019), pp. 565–582.
- C.J. Xu and Q. Zhang, Bifurcation analysis of a tri-neuron neural network model in the frequency domain, Nonlinear Dyn. 76(1) (2014), pp. 33–46.
- J.S. Yu, Modeling mosquito population suppression based on delay differential equations, SIAM J. Appl. Math. 78 (2018), pp. 3168–3187.
- J.S. Yu, Existence and stability of a unique and exact two periodic orbits for an interactive wild and sterile mosquito model, J. Differ. Equ. 269 (2020), pp. 10395–10415.
- J.S. Yu and J. Li, Global asymptotic stability in an interactive wild and sterile mosquito model, J. Differ. Equ. 269 (2020), pp. 6193–6215.
- Z.H. Yuan, Z.J. Ma, and X.H. Tang, Global stability of a delayed HIV infection model with nonlinear incidence rate, Nonlinear Dyn. 68 (2012), pp. 207–214.
- R. Zhang and S. Liu, Global dynamics of an age-structured within-host viral infection model with cell-to-cell transmission and general humoral immunity response, Math. Biosci. Eng. 17(2) (2020), pp. 1450–1478.