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...
AbstractSecond-order differential equations with small nonlinearity and weak dissipation, such as th...
We consider second order ordinary differential equations describing periodically forced dynamical sy...
This paper considers an application of a local theory of exponentially asymptotically stability of n...
AbstractWe consider the general nonlinear differential equation x˙=f(x) with x∈R2 and develop a meth...
We consider the general nonlinear differential equation x = f (x) with x epsilon R-2 and develop a m...
The determination of the basin of attraction of a periodic orbit can be achieved using a Lyapunov fu...
This paper establishes the conditions for existence, uniqueness, and exponentially asymptotically st...
We study a time-periodic non-smooth differential equation (x)over dot = f(t,x), x is an element of R...
In this paper we consider a general differential equation of the form x=f (x) with f epsilon C-l (R-...
Numerical methods to determine the basin of attraction for autonomous equations focus on a bounded s...
We consider a general system of ordinary differential equations (x) over dot = f (t, x), where x is ...
We consider a general nonsmooth ordinary differential equation x over dot = f(t, X), where x is an e...
AbstractWe give a result on existence of periodic orbits for autonomous differential systems with ar...
We prove a conjecture by Elaydi and Yakubu which states that the basin of attraction of an attractin...
Contraction analysis uses a local criterion to prove the long-term behaviour of a dynamical system. ...
AbstractSecond-order differential equations with small nonlinearity and weak dissipation, such as th...
We consider second order ordinary differential equations describing periodically forced dynamical sy...
This paper considers an application of a local theory of exponentially asymptotically stability of n...
AbstractWe consider the general nonlinear differential equation x˙=f(x) with x∈R2 and develop a meth...
We consider the general nonlinear differential equation x = f (x) with x epsilon R-2 and develop a m...
The determination of the basin of attraction of a periodic orbit can be achieved using a Lyapunov fu...
This paper establishes the conditions for existence, uniqueness, and exponentially asymptotically st...
We study a time-periodic non-smooth differential equation (x)over dot = f(t,x), x is an element of R...
In this paper we consider a general differential equation of the form x=f (x) with f epsilon C-l (R-...
Numerical methods to determine the basin of attraction for autonomous equations focus on a bounded s...
We consider a general system of ordinary differential equations (x) over dot = f (t, x), where x is ...
We consider a general nonsmooth ordinary differential equation x over dot = f(t, X), where x is an e...
AbstractWe give a result on existence of periodic orbits for autonomous differential systems with ar...
We prove a conjecture by Elaydi and Yakubu which states that the basin of attraction of an attractin...
Contraction analysis uses a local criterion to prove the long-term behaviour of a dynamical system. ...
AbstractSecond-order differential equations with small nonlinearity and weak dissipation, such as th...
We consider second order ordinary differential equations describing periodically forced dynamical sy...
This paper considers an application of a local theory of exponentially asymptotically stability of n...