This paper studies the effect of jump-diffusion random environmental perturbations on the asymptotic behaviour and extinction of Lotka-Volterra population dynamics with delays. The contributions of this paper lie in the following: (a) to consider delay stochastic differential equation with jumps, we introduce a proper initial data space, in which the initial data may be discontinuous function with downward jumps; (b) we show that the delay stochastic differential equation with jumps associated with our model has a unique global positive solution and give sufficient conditions that ensure stochastically ultimate boundedness, moment average boundedness in time, and asymptotic polynomial growth of our model; (c) the sufficient conditions for t...
We consider stochastic suppression and stabilization for nonlinear delay differential system. The sy...
In this paper, we propose the stochastic Lotka–Volterra model with delay disturbed by G-Brownian mot...
AbstractThis paper studies a class of time-delay reaction–diffusion systems modeling the dynamics of...
We reveal in this paper that the environmental noise will not only suppress a potential population e...
This paper examines the asymptotic behaviour of the stochastic extension of a fundamentally importa...
This paper considers a stochastic competitive system with distributed delay and general Lévy jumps. ...
In this paper we stochastically perturb the classical Lotka{Volterra model x_ (t) = diag(x1(t); ; xn...
AbstractWe reveal in this paper that the environmental noise will not only suppress a potential popu...
AbstractIn this paper we stochastically perturb the delay Lotka–Volterra model x˙(t)=diag(x1(t),…,xn...
This paper considers competitive Lotka-Volterra population dynamics with jumps. The contributions of...
We consider a one-dimensional population whose evolution is described by a jump-diffusion equation a...
This paper is concerned with a delay Lotka-Volterra model under regime switching diffusion in random...
This paper examines the asymptotic behaviour of the stochastic extension of a fundamentally importan...
AbstractPopulations of biological species are often subject to different types of environmental nois...
This paper considers competitive Lotka–Volterra population dynamics with jumps. The contributions of...
We consider stochastic suppression and stabilization for nonlinear delay differential system. The sy...
In this paper, we propose the stochastic Lotka–Volterra model with delay disturbed by G-Brownian mot...
AbstractThis paper studies a class of time-delay reaction–diffusion systems modeling the dynamics of...
We reveal in this paper that the environmental noise will not only suppress a potential population e...
This paper examines the asymptotic behaviour of the stochastic extension of a fundamentally importa...
This paper considers a stochastic competitive system with distributed delay and general Lévy jumps. ...
In this paper we stochastically perturb the classical Lotka{Volterra model x_ (t) = diag(x1(t); ; xn...
AbstractWe reveal in this paper that the environmental noise will not only suppress a potential popu...
AbstractIn this paper we stochastically perturb the delay Lotka–Volterra model x˙(t)=diag(x1(t),…,xn...
This paper considers competitive Lotka-Volterra population dynamics with jumps. The contributions of...
We consider a one-dimensional population whose evolution is described by a jump-diffusion equation a...
This paper is concerned with a delay Lotka-Volterra model under regime switching diffusion in random...
This paper examines the asymptotic behaviour of the stochastic extension of a fundamentally importan...
AbstractPopulations of biological species are often subject to different types of environmental nois...
This paper considers competitive Lotka–Volterra population dynamics with jumps. The contributions of...
We consider stochastic suppression and stabilization for nonlinear delay differential system. The sy...
In this paper, we propose the stochastic Lotka–Volterra model with delay disturbed by G-Brownian mot...
AbstractThis paper studies a class of time-delay reaction–diffusion systems modeling the dynamics of...