In this paper, a nonlinear delay population model is investigated. Choosing the delay as a bifurcation parameter, we demonstrate that Hopf bifurcation will occur when the delay exceeds a critical value. Global existence of bifurcating periodic solutions is established. Numerical simulations supporting the theoretical findings are included
In this paper, a delayed prototype model is studied. Regarding the delay as a bifurcation parameter,...
Applying a frequency domain approach, we investigate a phytoplankton model with time delay. We use ...
AbstractPeriodic solutions for a class of delay integral equations modeling epidemics are shown to b...
In this paper, we study a three-stage tick population model with three development delays. Using the...
A SI-type ecoepidemiological model that incorporates reproduction delay of predator is studied. Cons...
In this paper we study the Hopf bifurcation for the tumor-immune system model with one delay. This m...
In this paper, our attention is focused on the global existence of bifurcating periodic solutions. W...
In this paper we consider a generic differential equation with a cubic nonlinearity and delay. This ...
AbstractIn this paper we develop Kaplan–Yorke's method and consider the existence of periodic soluti...
We consider periodic solutions which bifurcate from equilibria in simple population models which inc...
AbstractThis paper deals with the model for matured population growth proposed in Cooke et al. [Inte...
AbstractIn this paper we consider a generic differential equation with a cubic nonlinearity and dela...
Abstract. In this paper we study the Hopf bifurcation for the tumor-immune system model with one del...
Abstract. We consider a model of genetic network that has been previously presented by J. Lewis. Thi...
In this paper, a delayed prototype model is studied. Regarding the delay as a bifurcation parameter,...
In this paper, a delayed prototype model is studied. Regarding the delay as a bifurcation parameter,...
Applying a frequency domain approach, we investigate a phytoplankton model with time delay. We use ...
AbstractPeriodic solutions for a class of delay integral equations modeling epidemics are shown to b...
In this paper, we study a three-stage tick population model with three development delays. Using the...
A SI-type ecoepidemiological model that incorporates reproduction delay of predator is studied. Cons...
In this paper we study the Hopf bifurcation for the tumor-immune system model with one delay. This m...
In this paper, our attention is focused on the global existence of bifurcating periodic solutions. W...
In this paper we consider a generic differential equation with a cubic nonlinearity and delay. This ...
AbstractIn this paper we develop Kaplan–Yorke's method and consider the existence of periodic soluti...
We consider periodic solutions which bifurcate from equilibria in simple population models which inc...
AbstractThis paper deals with the model for matured population growth proposed in Cooke et al. [Inte...
AbstractIn this paper we consider a generic differential equation with a cubic nonlinearity and dela...
Abstract. In this paper we study the Hopf bifurcation for the tumor-immune system model with one del...
Abstract. We consider a model of genetic network that has been previously presented by J. Lewis. Thi...
In this paper, a delayed prototype model is studied. Regarding the delay as a bifurcation parameter,...
In this paper, a delayed prototype model is studied. Regarding the delay as a bifurcation parameter,...
Applying a frequency domain approach, we investigate a phytoplankton model with time delay. We use ...
AbstractPeriodic solutions for a class of delay integral equations modeling epidemics are shown to b...
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