Add to ORKGWe study a periodic Kolmogorov model with m predators and n prey. By means of the comparison theorem and a Liapunov function, a set of easily verifiable sufficient conditions that guarantee the existence, uniqueness and global attractivity of the positive periodic solution is obtained. Finally, some suitable applications are given to illustrate that the conditions of the main theorem are feasible. 1
We study a periodic Kolmogorov system describing two species nonlinear competition. We discuss coexi...
We study a periodic Kolmogorov system describing two species nonlinear competition. We discuss coexi...
We study a periodic Kolmogorov system describing two species nonlinear competition. We discuss coexi...
AbstractA Lotka–Volterra periodic model withm-predators andn-preys is studied in this paper. A set o...
In this article, we consider a predator-prey system with mutual interference and Crowley-Martin fun...
AbstractIn this paper, based on the comparison theorem and Lyapunov method, we study the following p...
AbstractIn this paper, based on the comparison theorem and Lyapunov method, we study the following p...
In the present paper, we investigate the existence and the global attractivity of positive periodic ...
AbstractBy using comparison theorem and constructing suitable Lyapunov functional, we study the foll...
AbstractIn this paper we use a continuation argument to prove the existence of global attractors for...
AbstractIn this paper, by utilizing the coincidence degree theorem and constructing a suitable Lyapu...
The coexistence states for periodic planar Kolmogorov systems are studied. The system is limited to ...
We prove the existence of positive periodic solutions for a class of predator prey periodic systems
In this paper we consider a biological system consisting of several preys and several predators. We ...
AbstractA system of ODE's is considered as a model of two populations competing for a nutrient, wher...
We study a periodic Kolmogorov system describing two species nonlinear competition. We discuss coexi...
We study a periodic Kolmogorov system describing two species nonlinear competition. We discuss coexi...
We study a periodic Kolmogorov system describing two species nonlinear competition. We discuss coexi...
AbstractA Lotka–Volterra periodic model withm-predators andn-preys is studied in this paper. A set o...
In this article, we consider a predator-prey system with mutual interference and Crowley-Martin fun...
AbstractIn this paper, based on the comparison theorem and Lyapunov method, we study the following p...
AbstractIn this paper, based on the comparison theorem and Lyapunov method, we study the following p...
In the present paper, we investigate the existence and the global attractivity of positive periodic ...
AbstractBy using comparison theorem and constructing suitable Lyapunov functional, we study the foll...
AbstractIn this paper we use a continuation argument to prove the existence of global attractors for...
AbstractIn this paper, by utilizing the coincidence degree theorem and constructing a suitable Lyapu...
The coexistence states for periodic planar Kolmogorov systems are studied. The system is limited to ...
We prove the existence of positive periodic solutions for a class of predator prey periodic systems
In this paper we consider a biological system consisting of several preys and several predators. We ...
AbstractA system of ODE's is considered as a model of two populations competing for a nutrient, wher...
We study a periodic Kolmogorov system describing two species nonlinear competition. We discuss coexi...
We study a periodic Kolmogorov system describing two species nonlinear competition. We discuss coexi...
We study a periodic Kolmogorov system describing two species nonlinear competition. We discuss coexi...