论文信息 - Multiple periodic solutions for a discrete time model of plankton allelopathy

Multiple periodic solutions for a discrete time model of plankton allelopathy

We study a discrete time model of the growth of two species of plankton with competitive and allelopathic effects on each other N1(k+1) = N1(k)exp{r1(k)-a11(k)N1(k)-a12(k)N2(k)-b1(k)N1(k)N2(k)}, N2(k+1) = N2(k)exp{r2(k)-a21(k)N2(k)-b2(k)N1(k)N1(k)N2(k)}. A set of sufficient conditions is obtained for the existence of multiple positive periodic solutions for this model. The approach is based on Mawhin's continuation theorem of coincidence degree theory as well as some a priori estimates. Some new results are obtained.

Hui Fang | Jianbao Zhang | Jianbao Zhang | H. Fang

[1] R. Arditi,et al. Variation in Plankton Densities Among Lakes: A Case for Ratio-Dependent Predation Models , 1991, The American Naturalist.

[2] Ke Wang,et al. Periodic solutions of a discrete time nonautonomous ratio-dependent predator-prey system , 2002 .

[3] Jianhong Wu,et al. Periodic solutions of single-species models with periodic delay , 1992 .

[4] Zhien Ma,et al. Periodic solutions for delay differential equations model of plankton allelopathy , 2002 .

[5] R. Gaines,et al. Coincidence Degree and Nonlinear Differential Equations , 1977 .

[6] Yuming Chen,et al. Multiple periodic solutions of delayed predator–prey systems with type IV functional responses , 2004 .

[7] John Maynard Smith. Models in ecology , 1974 .

[8] S. Jørgensen. Models in Ecology , 1975 .

[9] N. Rose,et al. Differential Equations With Applications , 1967 .

[10] Joydev Chattopadhyay,et al. Effect of toxic substances on a two-species competitive system , 1996 .

[11] J. Chattopadhyay,et al. A delay differential equations model of plankton allelopathy. , 1998, Mathematical biosciences.

[12] Zhicheng Wang,et al. Periodic solutions of a single species discrete population model with periodic harvest/stock , 2000 .