Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by Crossref.
Alvarez, Carlos
and
Lazer, Alan C.
1986.
An application of topological degree to the periodic competing species problem.
The Journal of the Australian Mathematical Society. Series B. Applied Mathematics,
Vol. 28,
Issue. 2,
p.
202.
Gopalsamy, K.
1986.
Global asymptotic stability in an almost-periodic Lotka-Volterra system.
The Journal of the Australian Mathematical Society. Series B. Applied Mathematics,
Vol. 27,
Issue. 3,
p.
346.
Ahmad, Shair
1987.
Convergence and ultimate bounds of solutions of the nonautonomous Volterra-Lotka competition equations.
Journal of Mathematical Analysis and Applications,
Vol. 127,
Issue. 2,
p.
377.
Tineo, Antonio
and
Alvarez, Carlos
1991.
A different consideraton about the globally asymptotically stable solution of the periodic n-competing species problem.
Journal of Mathematical Analysis and Applications,
Vol. 159,
Issue. 1,
p.
44.
Zhao, Xiao-Qiang
1991.
The qualitative analysis of n-species Lotka-Volterra periodic competition systems.
Mathematical and Computer Modelling,
Vol. 15,
Issue. 11,
p.
3.
Tineo, Antonio
1992.
On the asymptotic behavior of some population models.
Journal of Mathematical Analysis and Applications,
Vol. 167,
Issue. 2,
p.
516.
Zanolin, Fabio
1992.
Permanence and Positive Periodic Solutions for Kolmogorov Competing Species Systems.
Results in Mathematics,
Vol. 21,
Issue. 1-2,
p.
224.
Tineo, Antonio
1994.
Nonautonomous n-species competing problems.
Applicable Analysis,
Vol. 53,
Issue. 1-2,
p.
97.
Ahmad, Shair
and
Lazer, A.C.
1995.
On the nonautonomous N-competing species problems.
Applicable Analysis,
Vol. 57,
Issue. 3-4,
p.
309.
Zhonghua, Lu
and
Lansun, Chen
1995.
Global asymptotic stability of the periodic Lotka-Volterra System with two-predators and one-prey.
Applied Mathematics,
Vol. 10,
Issue. 3,
p.
267.
Yeung, David W.K.
and
Stewart, Sally E.A.
1995.
Stationary probability distributions of some lotka-volterra types of stochastic predation systems.
Stochastic Analysis and Applications,
Vol. 13,
Issue. 4,
p.
503.
Weng, Peixuan
1996.
Global attractivity in a periodic competition system with feedback controls.
Acta Mathematicae Applicatae Sinica,
Vol. 12,
Issue. 1,
p.
11.
de Oca, Francisco
and
Zeeman, Mary
1996.
Extinction in nonautonomous competitive Lotka-Volterra systems.
Proceedings of the American Mathematical Society,
Vol. 124,
Issue. 12,
p.
3677.
Wendi, Wang
Fergola, P
and
Tenneriello, C
1997.
Global Attractivity of Periodic Solutions of Population Models.
Journal of Mathematical Analysis and Applications,
Vol. 211,
Issue. 2,
p.
498.
Liu, Pingzhou
and
Gopalsamy, K.
1997.
On a model of competition in periodic environments.
Applied Mathematics and Computation,
Vol. 82,
Issue. 2-3,
p.
207.
Sanyi, Tang
Yanni, Xiao
and
Jufang, Chen
1998.
Positive periodic solutions of competitive kolmogorov diffusion systems with interference constants.
Mathematical and Computer Modelling,
Vol. 27,
Issue. 6,
p.
39.
Vuuren, Jan H. van
and
Norbury, John
1998.
Permanence and asymptotic stability in diagonally convex reaction–diffusion systems.
Proceedings of the Royal Society of Edinburgh: Section A Mathematics,
Vol. 128,
Issue. 1,
p.
147.
Battauz, Anna
and
Zanolin, Fabio
1998.
Coexistence States for Periodic Competitive Kolmogorov Systems.
Journal of Mathematical Analysis and Applications,
Vol. 219,
Issue. 2,
p.
179.
Wendi, Wang
and
Zhien, Ma
1998.
Permanence of a nonautomonous population model.
Acta Mathematicae Applicatae Sinica,
Vol. 14,
Issue. 1,
p.
86.
Ahmad, Shair
and
Lazer, Alan C.
1998.
Necessary and sufficient average growth in a Lotka–Volterra system.
Nonlinear Analysis: Theory, Methods & Applications,
Vol. 34,
Issue. 2,
p.
191.