Add to ORKGWe study the stability of scalar delayed equations of logistic type with a positive equilibrium and a linear logistic term. The global asymptotic stability of the positive equilibrium, called the carrying capacity, is proven imposing a condition on a negative feedback term without delay dominating the delayed effect. It turns out that this assumption is a necessary and sufficient condition for the linearized equation about the positive equilibrium to be asymptotically stable, globally in the delays. The global stability of more general scalar delay differential equations is also addressed
International audienceLinear scalar differential equations with distributed delays appear in the stu...
Abstract. Sufficient conditions are obtained for all positive solutions of •(t) = N(t) [b- a • N(t-...
International audienceLinear scalar differential equations with distributed delays appear in the stu...
For a scalar Lotka{Volterra-type delay equation _x(t) = b(t)x(t)[1¡L(xt)], where L: C ([¡r; 0];R) !...
Abstract. Linear scalar differential equations with distributed delays appear in the study of the lo...
We study bounded, unbounded and blow-up solutions of a delay logistic equation without assuming the ...
We study bounded, unbounded and blow-up solutions of a delay logistic equation without assuming the ...
A new criterion is proposed for the global asymptotic stability of the positive periodic solutions t...
A new criterion is proposed for the global asymptotic stability of the positive periodic solutions t...
AbstractIn this paper we study the global asymptotic stability for a class of delay logistic equatio...
AbstractWe obtain new conditions of the permanence and “contractivity” of solutions and the global a...
We give conditions under which the trivial solution of a first-order nonlinear variable-delay dynami...
Abstract. We consider scalar delay differential equations x′(t) = −δx(t)+f(t, xt) (∗) with non-line...
In this paper, a logistic equation with multiple piecewise constant arguments is investigated in det...
For scalar functional differential equations x'(t) = f (t,x_t ), we refine the method of Yorke and 3...
International audienceLinear scalar differential equations with distributed delays appear in the stu...
Abstract. Sufficient conditions are obtained for all positive solutions of •(t) = N(t) [b- a • N(t-...
International audienceLinear scalar differential equations with distributed delays appear in the stu...
For a scalar Lotka{Volterra-type delay equation _x(t) = b(t)x(t)[1¡L(xt)], where L: C ([¡r; 0];R) !...
Abstract. Linear scalar differential equations with distributed delays appear in the study of the lo...
We study bounded, unbounded and blow-up solutions of a delay logistic equation without assuming the ...
We study bounded, unbounded and blow-up solutions of a delay logistic equation without assuming the ...
A new criterion is proposed for the global asymptotic stability of the positive periodic solutions t...
A new criterion is proposed for the global asymptotic stability of the positive periodic solutions t...
AbstractIn this paper we study the global asymptotic stability for a class of delay logistic equatio...
AbstractWe obtain new conditions of the permanence and “contractivity” of solutions and the global a...
We give conditions under which the trivial solution of a first-order nonlinear variable-delay dynami...
Abstract. We consider scalar delay differential equations x′(t) = −δx(t)+f(t, xt) (∗) with non-line...
In this paper, a logistic equation with multiple piecewise constant arguments is investigated in det...
For scalar functional differential equations x'(t) = f (t,x_t ), we refine the method of Yorke and 3...
International audienceLinear scalar differential equations with distributed delays appear in the stu...
Abstract. Sufficient conditions are obtained for all positive solutions of •(t) = N(t) [b- a • N(t-...
International audienceLinear scalar differential equations with distributed delays appear in the stu...