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[1] Z. Hu, H. Wang, F. Liao and W. Ma, Stability analysis of a computer virus model in latent period, Chaos Solitons and Fractals, 75(2015), 20-28..
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[2] B. G. Sampath Aruna Pradeep, W. Ma and S. Guo, Stability properties of a delayed HIV model with nonlinear functional response and absorption effect, J. Natl. Sci. Found. Sri Lanka, 43(2015), No.3, 235-245..
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[3] T. Zhang, W. Ma and X. Meng, Dynamical analysis of a continuous-culture and harvest chemostat model with impulsive effect, J. Biol. Syst., 23 (2015), 555–575..
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[4] F. Li, W. Ma, Z. Jiang and D. Li,Stability and Hopf bifurcation in a delayed HIV infection model with general incidence rate and immune impairment,Comput. Math. Methods Medicine,2105(2015), ID 206205, 14 pages..
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[5] Z. Jiang and W. Ma, Delayed feedback control and bifurcation analysis in a chaotic Chemostat system, Int. J. Bifurcat. Chaos, 25(2015), No.6, 1550087 (13 pages)..
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[6] B. G. Sampath Aruna Pradeep and W. Ma, Global stability analysis for vector transmission disease dynamic model with non-linear incidence and two time delays. J. Interdisciplinary Math. 18 (2015), No. 4, 395–415..
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[7] T. Zhang, W. Ma, X. Meng and T. Zhang, Periodic solution of a prey–predator model with nonlinear state feedback control, Appl. Math. Comput., 266 (2015), 95–107..
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[8] Y. Liu, W. Ma, Magdi S. Mahmoud and S. M. Lee, Improved delay-dependent exponential stability criteria for neutral-delay systems with nonlinear uncertainties, Appl. Math. Modelling, 39(2015), 3164-3174..
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[9] B. G. Sampath Aruna Pradeep and W. Ma, Global stability of a delayed Mosquito- transmitted disease model with stage structure, Elect. J. Differ. Equations, 2015 (2015), No. 10, 1-19..
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[10] J. Dong and W. Ma, Sufficient conditions for global attractivity of a class of neutral Hopfield-type neural networks, Neurocomputing, 153(2015), 89-95..
