Extinction in nonautonomous competitive Lotka–Volterra systems with infinite delay
作者: Francisco Montes de Oca , Liliana Pérez
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摘要: Abstract The principle of competitive exclusion is extended to n -species nonautonomous Lotka–Volterra competition systems differential equations with infinite delay. It shown that if the coefficients are bounded, continuous and satisfy certain inequalities, then any solution initial function in an appropriate space will have − 1 its components tend zero, while remaining one stabilize at a logistic equation.
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K. Gopalsamy, Xue-Zhong He, Dynamics of an almost periodic logistic integrodifferential equation Methods and Applications of Analysis. ,vol. 2, pp. 38- 66 ,(1995) , 10.4310/MAA.1995.V2.N1.A3
Francisco Montes de Oca, Mary Lou Zeeman, Extinction in nonautonomous competitive Lotka-Volterra systems Proceedings of the American Mathematical Society. ,vol. 124, pp. 3677- 3687 ,(1996) , 10.1090/S0002-9939-96-03355-2
Francisco Montes de Oca, Miguel Vivas, Extinction in a two dimensional Lotka–Volterra system with infinite delay Nonlinear Analysis-real World Applications. ,vol. 7, pp. 1042- 1047 ,(2006) , 10.1016/J.NONRWA.2005.09.005
Shair Ahmad, Convergence and ultimate bounds of solutions of the nonautonomous Volterra-Lotka competition equations Journal of Mathematical Analysis and Applications. ,vol. 127, pp. 377- 387 ,(1987) , 10.1016/0022-247X(87)90116-8
Shair Ahmad, On the nonautonomous Volterra-Lotka competition equations Proceedings of the American Mathematical Society. ,vol. 117, pp. 199- 204 ,(1993) , 10.1090/S0002-9939-1993-1143013-3
Bernard D. Coleman, Nonautonomous logistic equations as models of the adjustment of populations to environmental change Mathematical Biosciences. ,vol. 45, pp. 159- 173 ,(1979) , 10.1016/0025-5564(79)90057-9
S. Ahmad, M.R.M. Rao, Asymptotically Periodic Solutions of N-Competing Species Problem with Time Delays Journal of Mathematical Analysis and Applications. ,vol. 186, pp. 559- 571 ,(1994) , 10.1006/JMAA.1994.1317
K. Gopalsamy, Stability and Oscillations in Delay Differential Equations of Population Dynamics ,(1992)