AbstractWe consider the general nonlinear differential equation x˙=f(x) with x∈R2 and develop a method to determine the basin of attraction of a periodic orbit. Borg's criterion provides a method to prove existence, uniqueness and exponential stability of a periodic orbit and to determine a subset of its basin of attraction. In order to use the criterion one has to find a function W∈C1(R2,R) such that LW(x)=W′(x)+L(x) is negative for all x∈K, where K is a positively invariant set. Here, L(x) is a given function and W′(x) denotes the orbital derivative of W. In this paper we prove the existence and smoothness of a function W such that LW(x)=−μ‖f(x)‖. We approximate the function W, which satisfies the linear partial differential equation W′(x...
Borg's criterion is used to prove the existence of an exponentially asymptotically stable periodic o...
We study the basin of attraction of an asymptotically stable equilibrium of a general autonomous ord...
Abstract. In the paper [Large-amplitude periodic solutions for differential equa-tions with delayed ...
We consider the general nonlinear differential equation x = f (x) with x epsilon R-2 and develop a m...
AbstractWe consider the general nonlinear differential equation x˙=f(x) with x∈R2 and develop a meth...
We study a time-periodic non-smooth differential equation (x)over dot = f(t,x), x is an element of R...
The determination of the basin of attraction of a periodic orbit can be achieved using a Lyapunov fu...
In this paper we consider a general differential equation of the form x=f (x) with f epsilon C-l (R-...
We consider a general nonsmooth ordinary differential equation x over dot = f(t, X), where x is an e...
We consider a general system of ordinary differential equations (x) over dot = f (t, x), where x is ...
We consider second order ordinary differential equations describing periodically forced dynamical sy...
Numerical methods to determine the basin of attraction for autonomous equations focus on a bounded s...
We consider an autonomous differential system in Rn with a periodic orbit and we give a new method f...
19 pages, no figuresInternational audienceWe consider an autonomous differential system in $\mathbb{...
We study a second-order difference equation of the form zn+1 = znF (zn−1) + h, where both F (z) and ...
Borg's criterion is used to prove the existence of an exponentially asymptotically stable periodic o...
We study the basin of attraction of an asymptotically stable equilibrium of a general autonomous ord...
Abstract. In the paper [Large-amplitude periodic solutions for differential equa-tions with delayed ...
We consider the general nonlinear differential equation x = f (x) with x epsilon R-2 and develop a m...
AbstractWe consider the general nonlinear differential equation x˙=f(x) with x∈R2 and develop a meth...
We study a time-periodic non-smooth differential equation (x)over dot = f(t,x), x is an element of R...
The determination of the basin of attraction of a periodic orbit can be achieved using a Lyapunov fu...
In this paper we consider a general differential equation of the form x=f (x) with f epsilon C-l (R-...
We consider a general nonsmooth ordinary differential equation x over dot = f(t, X), where x is an e...
We consider a general system of ordinary differential equations (x) over dot = f (t, x), where x is ...
We consider second order ordinary differential equations describing periodically forced dynamical sy...
Numerical methods to determine the basin of attraction for autonomous equations focus on a bounded s...
We consider an autonomous differential system in Rn with a periodic orbit and we give a new method f...
19 pages, no figuresInternational audienceWe consider an autonomous differential system in $\mathbb{...
We study a second-order difference equation of the form zn+1 = znF (zn−1) + h, where both F (z) and ...
Borg's criterion is used to prove the existence of an exponentially asymptotically stable periodic o...
We study the basin of attraction of an asymptotically stable equilibrium of a general autonomous ord...
Abstract. In the paper [Large-amplitude periodic solutions for differential equa-tions with delayed ...