%0 Journal Article %T A time delay model of single-species growth with stage structure %A W. G. Aiello %A H. I. Freedman %J Math. Biosci. %D 1990 %V 101 %F Aiello1990 %0 Journal Article %T Permanence of a three-species food chain system with impulsive perturbations %A H. Baek %A H. H. Lee %J Kyungpook Math. J. %D 2008 %V 48 %F Baek2008 %0 Journal Article %T The Orgins and Evolution of Predator-Prey Theory %A A. A. Berryman %J Ecology %D 1992 %V 73 %F Berryman1992 %0 Journal Article %T Stability loss delay in harvesting competing populations %A H. Boudjellaba %A T. Sari %J J. Differential Equations %D 1999 %V 152 %F Boudjellaba1999 %0 Book %T Animal Ecology %A K. Charles Kendeigh %D 1961 %I Prentice-Hall %C New York %F Kendeigh1961 %0 Journal Article %T Global stability of a stage-structured predator-prey system %A F. Chen %A H. Wang %A Y. Lin %A W. Chen %J Appl. Math. Comput. %D 2013 %V 223 %F Chen2013 %0 Journal Article %T The effect of dispersal on population growth with stage-structure %A J. Cui %A L. Chen %A W. Wang %J Comput. Math. Appl. %D 2000 %V 39 %F Cui2000 %0 Journal Article %T Periodic time-dependent predator-prey system %A J. M. Cushing %J SIAM J. Appl. Math. %D 1977 %V 32 %F Cushing1977 %0 Journal Article %T Chaotic dynamics of a three species prey-predator competition model with noise in ecology %A K. Das %A K. Reddy %A M. Srinivas %A N. Gazi %J Appl. Math. Comput. %D 2014 %V 231 %F Das2014 %0 Journal Article %T Hopf bifurcation analysis for a ratio-dependent predator-prey system with two delays and stage structure for the predator %A L. Deng %A X. Wang %A M. Peng %J Appl. Math. Comput. %D 2014 %V 231 %F Deng2014 %0 Journal Article %T Stability and bifurcation for a delayed predator-prey model and the effect of diffusion %A T. Faria %J J. Math. Anal. Appl. %D 2001 %V 254 %F Faria2001 %0 Journal Article %T Permanence of variable coefficients predator-prey system with stage structure %A W. Fengying %A W. Ke %J Appl. Math. Comput. %D 2006 %V 180 %F Fengying2006 %0 Journal Article %T Stability and delays in a predator-prey system %A X. He %J J. Math. Anal. Appl. %D 1996 %V 198 %F He1996 %0 Journal Article %T Stability and Hopf bifurcation in a delayed predator-prey system with stage structure for prey %A H. Hu %A L. Huang %J Nonlinear Anal. Real World Appl. %D 2010 %V 11 %F Hu2010 %0 Journal Article %T Stability and Hopf bifurcation for a delayed predator-prey model with disease in the prey %A G. Hu %A X. Li %J Chaos Solitons Fractals %D 2012 %V 45 %F Hu2012 %0 Journal Article %T Convergence dynamics of stochastic Cohen-Grossberg neural networks with unbounded distributed delays %A C. Huang %A J. Cao %J IEEE Trans. Neural Netw. %D 2011 %V 22 %F Huang2011 %0 Journal Article %T Stability analysis of switched cellular neural networks: A mode-dependent average dwell time approach %A C. Huang %A J. Cao %A J. Cao %J Neural Netw. %D 2016 %V 82 %F Huang2016 %0 Journal Article %T Dynamics analysis of a class of delayed economic model %A C. Huang %A C. Peng %A X. Chen %A F. Wen %J Abstr. Appl. Anal. %D 2013 %V 2013 %F Huang2013 %0 Journal Article %T On the basins of attraction for a class of delay differential equations with non-monotone bistable nonlinearities %A C. Huang %A Z. Yang %A T. Yi %A X. Zou %J J. Differential Equations %D 2014 %V 256 %F Huang2014 %0 Journal Article %T Stability and bifurcation analysis of a stage structured predator-prey model with time delay %A T. K. Kar %A S. Jana %J Appl. Math. Comput. %D 2012 %V 219 %F Kar2012 %0 Journal Article %T Analysis of a delayed two-stage population with space-limited recruitment %A Y. Kuang %A J. W.-H. So %J SIAM J. Appl. Math. %D 1995 %V 55 %F Kuang1995 %0 Journal Article %T Permanence extinction and global asymptotic stability in a stage structured system with distributed delays %A S. Liu %A B. Kouche %A N.-E. Tatar %J J. Math. Anal. Appl. %D 2005 %V 301 %F Liu2005 %0 Journal Article %T Permanence of a predator-prey system with stage structure and time delay %A Z.-H. Ma %A Z.-Z. Li %A S.-F. Wang %A T. Li %A F.-P. Zhang %J Appl. Math. Comput. %D 2008 %V 201 %F Ma2008 %0 Journal Article %T Prey, predator and super-predator model with disease in the super-predator %A W. Mbava %A J. Y. T. Mugisha %A J. W. Gonsalves %J Appl. Math. Comput. %D 2017 %V 297 %F Mbava2017 %0 Journal Article %T Effect of time-delay on a ratio-dependent food chain model %A B. Patra %A A. Maiti %A G. Samanta %J Nonlinear Anal. Model. Control %D 2009 %V 14 %F Patra2009 %0 Journal Article %T Versal unfoldings of predator-prey systems with ratio-dependent functional response %A S. Ruan %A Y. Tang %A W. Zhang %J J. Differential Equations %D 2010 %V 249 %F Ruan2010 %0 Journal Article %T Permanence and extinction of a three-species ratio-dependent food chain model with delay and prey diffusion %A C. Shen %A M. You %J Appl. Math. Comput. %D 2010 %V 217 %F Shen2010 %0 Journal Article %T The extinction in nonautonomous prey-predator Lotka-Volterra systems %A Z. Teng %A Y. Yu %J Acta Math. Appl. Sinica %D 1999 %V 15 %F Teng1999 %0 Journal Article %T Extinction and persistence of a nonautonomous stochastic food-chain system with impulsive perturbations %A B. Tian %A S. Zhong %A Z. Liu %J Int. J. Biomath. %D 2016 %V 2016 %F Tian2016 %0 Journal Article %T Permanence and global asymptotical stability of a predator-prey model with mutual interference %A K.Wang %J Nonlinear Anal. Real World Appl. %D 2011 %V 12 %F K.Wang 2011 %0 Journal Article %T Permanence and stability of a stage-structured predator-prey model %A W. Wang %A G. Mulone %A F. Salemi %A V. Salone %J J. Math. Anal. Appl. %D 2001 %V 262 %F Wang2001 %0 Journal Article %T Global stability of Lotka-Volterra type predator-prey model with stage structure and time delay %A R. Xu %A M. A. J. Chaplain %A F. A. Davidson %J Appl. Math. Comput. %D 2004 %V 159 %F Xu2004 %0 Journal Article %T Global dynamics of a predator-prey model with defense mechanism for prey %A C. Xu %A S. Yuan %A T. Zhang %J Appl. Math. Lett. %D 2016 %V 62 %F Xu2016 %0 Journal Article %T A delay digestion process with application in a three-species ecosystem %A P. Yongzhen %A M. Guo %A C. Li %J Commun. Nonlinear Sci. Numer. Simul. %D 2011 %V 16 %F Yongzhen2011 %0 Journal Article %T Permanence and extinction of a periodic predator-prey delay system with functional response and stage structure for prey %A H. Zhang %A L. Chen %A R. Zhu %J Appl. Math. Comput. %D 2007 %V 184 %F Zhang2007