| Lyapunov functionals for delay differential equations model of viral infections G Huang, Y Takeuchi, W Ma SIAM Journal on Applied Mathematics 70 (7), 2693-2708, 2010 | 288 | 2010 |
| Global asymptotic stability of an SIR epidemic model with distributed time delay E Beretta, T Hara, W Ma, Y Takeuchi Nonlinear analysis, theory, methods & applications 47 (6), 4107-4115, 2001 | 285 | 2001 |
| Global asymptotic properties of a delay SIR epidemic model with finite incubation times Y Takeuchi, W Ma, E Beretta Nonlinear Analysis: Theory, Methods & Applications 42 (6), 931-947, 2000 | 268 | 2000 |
| Global stability of an SIR epidemicmodel with time delay W Ma, M Song, Y Takeuchi Applied Mathematics Letters 17 (10), 1141-1145, 2004 | 252 | 2004 |
| Global stability for delay SIR and SEIR epidemic models with nonlinear incidence rate G Huang, Y Takeuchi, W Ma, D Wei Bulletin of mathematical biology 72, 1192-1207, 2010 | 244 | 2010 |
| Asymptotic properties of a HIV-1 infection model with time delay D Li, W Ma Journal of Mathematical Analysis and Applications 335 (1), 683-691, 2007 | 224 | 2007 |
| Global properties for virus dynamics model with Beddington–DeAngelis functional response G Huang, W Ma, Y Takeuchi Applied Mathematics Letters 22 (11), 1690-1693, 2009 | 223 | 2009 |
| Analysis of SIR epidemic models with nonlinear incidence rate and treatment Z Hu, W Ma, S Ruan Mathematical biosciences 238 (1), 12-20, 2012 | 165 | 2012 |
| Permanence of an SIR epidemic model with distributed time delays W Ma, Y Takeuchi, T Hara, E Beretta Tohoku Mathematical Journal, Second Series 54 (4), 581-591, 2002 | 163 | 2002 |
| Global analysis for delay virus dynamics model with Beddington–DeAngelis functional response G Huang, W Ma, Y Takeuchi Applied Mathematics Letters 24 (7), 1199-1203, 2011 | 154 | 2011 |
| Global stability analysis for delayed virus infection model with general incidence rate and humoral immunity T Wang, Z Hu, F Liao, W Ma Mathematics and Computers in Simulation 89, 13-22, 2013 | 100 | 2013 |
| A necessary and sufficient condition for permanence of a Lotka–Volterra discrete system with delays Y Saito, W Ma, T Hara Journal of Mathematical Analysis and Applications 256 (1), 162-174, 2001 | 100 | 2001 |
| Periodic solution of a prey–predator model with nonlinear state feedback control T Zhang, W Ma, X Meng, T Zhang Applied Mathematics and computation 266, 95-107, 2015 | 94 | 2015 |
| Bifurcations of an SIRS epidemic model with nonlinear incidence rate Z Hu, P Bi, W Ma, S Ruan Discrete Contin. Dyn. Syst. Ser. B 15 (3), 93-112, 2011 | 78 | 2011 |
| Permanence of a delayed SIR epidemic model with density dependent birth rate M Song, W Ma, Y Takeuchi Journal of Computational and Applied Mathematics 201 (2), 389-394, 2007 | 69 | 2007 |
| Necessary and sufficient conditions for permanence and global stability of a Lotka–Volterra system with two delays Y Saito, T Hara, W Ma Journal of Mathematical Analysis and Applications 236 (2), 534-556, 1999 | 64 | 1999 |
| Global dynamics of a delayed chemostat model with harvest by impulsive flocculant input T Zhang, W Ma, X Meng Advances in Difference Equations 2017, 1-17, 2017 | 52 | 2017 |
| Dynamics analysis of a delayed viral infection model with logistic growth and immune impairment Z Hu, J Zhang, H Wang, W Ma, F Liao Applied Mathematical Modelling 38 (2), 524-534, 2014 | 50 | 2014 |
| Stability analysis on a predator-prey system with distributed delays W Ma, Y Takeuchi Journal of computational and applied mathematics 88 (1), 79-94, 1998 | 50 | 1998 |
| Repulsion effect on superinfecting virions by infected cells for virus infection dynamic model with absorption effect and chemotaxis W Wang, W Ma, X Lai Nonlinear Analysis: Real World Applications 33, 253-283, 2017 | 48 | 2017 |
Gang Huang(黄 刚)School of Mathematics and Physics, China University of Geosciences在 cug.edu.cn 的电子邮件经过验证
