ZHANG Xue. Bifurcation and Control of DifferentialAlgebraic Biological Model with Time Delay[J]. Journal of Northeastern University Natural Science, 2014, 35(5): 635-639.
[1] Ling L,Wang W M.Dynamics of a Ivlevtype predatorprey system with constant rate harvesting[J].Chaos,Solitons & Fractals,2009,41(4):2139/2153. [2] Ji L L,Wu C Q.Qualitative analysis of a predatorprey model with constantrate prey harvesting incorporating a constant prey refuge[J].Nonlinear Analysis:Real World Applications,2010,11(4):2285/2295. [3] Kar T K,Ghorai A.Dynamic behaviour of a delayed predatorprey model with harvesting[J].Applied Mathematics and Computation,2011,217(22):9085/9104. [4] Li Y K,Zhang T W,Ye Y.On the existence and stability of a unique almost periodic sequence solution in discrete predatorprey models with time delays[J].Applied Mathematical Modelling,2011,35(11):5448/5459. [5] Li F,Li H W.Hopf bifurcation of a predatorprey model with time delay and stage structure for the prey[J].Mathematical and Computer Modelling,2012,55(3/4):672/679. [6] Kar T K,Pahari U K.Nonselective harvesting in preypredator models with delay[J].Communications in Nonlinear Science and Numerical Simulation,2006,11(4):499/509. [7] Gordon H S.Economic theory of a common property resource:the fishery[J].Journal of Political Economy,1954,63:116/139. [8] Zhang X,Zhang Q L,Zhang Y.Bifurcations of a class of singular biological economic models[J].Chaos Solitons & Fractals,2009,40(3):1309/1318. [9] Liu W,Fu C J,Chen B S.Hopf bifurcation for a predatorprey biological economic system with holling type II functional response[J].Journal of the Franklin Institute,2011,348(6):1114/1127. [10] Guckenheimer J,Holmes P.Nonlinear oscillations,dynamical systems,and bifurcations of vector fields[M].New York:SpringerVerlag,1983:117/156.
