We study the existence of 2pi-periodic solutions for forced nonlinear oscillators at resonance, the nonlinearity being a bounded perturbation of a function deriving from an isochronous potential, i.e. a potential leading to free oscillations that all have the same period. The family of isochronous oscillators considered here includes oscillators with jumping nonlinearities, as well as oscillators with a repulsive singularity, to which a particular attention is paid. The existence results contain, as particular cases, conditions of Landesman-Lazer type. Even in the case of perturbed linear oscillators, they improve earlier results. Multiplicity and non-existence results are also given
This paper deals with families of periodically forced oscillators undergoing a Hopf-Nĕımarck-Sacker...
Usually oscillators with periodic excitations show a periodic motion with frequency equal to the for...
Abstract. We study oscillations in resonant systems under periodic forcing. The systems depend on a ...
We study the existence of 2π-periodic solutions for forced nonlinear oscillators at resonance, the n...
We deal with the existence of quasi-periodic Solutions of forced isochronous oscillators with a repu...
In this paper, the authors are concerned with the forced isochronous oscillators with a repulsive si...
An oscillator is called isochronous if all motions have a common period. When the system is forced b...
It is proved the existence of Aubry-Mather sets and infinitely many subharmonic solutions to an equa...
Free and forced oscillations in oscillators governed by the equation [MATHEMATICAL NOTATION GOES HER...
We consider oscillators x" + lambdax = p(t) with an obstacle at zero, i.e. the motion is restricted ...
Abstract We investigate a second-order periodic system with singular potential and resonance. Utiliz...
We consider the equation x " + mu x(+) - vx(-) = f(x) + g(x) + e(t) where x(+) = max{x, 0}; x(-) = m...
AbstractThe existence of periodic solutions for systems of forced pendulum-like equations was studie...
<正> In this paper, we consider the differential equationd~2x/dt~2+g(x) = p(t),where g(x)∈ C~1(...
AbstractWe consider forced dynamical systems with two degrees of freedom having singular potentials ...
This paper deals with families of periodically forced oscillators undergoing a Hopf-Nĕımarck-Sacker...
Usually oscillators with periodic excitations show a periodic motion with frequency equal to the for...
Abstract. We study oscillations in resonant systems under periodic forcing. The systems depend on a ...
We study the existence of 2π-periodic solutions for forced nonlinear oscillators at resonance, the n...
We deal with the existence of quasi-periodic Solutions of forced isochronous oscillators with a repu...
In this paper, the authors are concerned with the forced isochronous oscillators with a repulsive si...
An oscillator is called isochronous if all motions have a common period. When the system is forced b...
It is proved the existence of Aubry-Mather sets and infinitely many subharmonic solutions to an equa...
Free and forced oscillations in oscillators governed by the equation [MATHEMATICAL NOTATION GOES HER...
We consider oscillators x" + lambdax = p(t) with an obstacle at zero, i.e. the motion is restricted ...
Abstract We investigate a second-order periodic system with singular potential and resonance. Utiliz...
We consider the equation x " + mu x(+) - vx(-) = f(x) + g(x) + e(t) where x(+) = max{x, 0}; x(-) = m...
AbstractThe existence of periodic solutions for systems of forced pendulum-like equations was studie...
<正> In this paper, we consider the differential equationd~2x/dt~2+g(x) = p(t),where g(x)∈ C~1(...
AbstractWe consider forced dynamical systems with two degrees of freedom having singular potentials ...
This paper deals with families of periodically forced oscillators undergoing a Hopf-Nĕımarck-Sacker...
Usually oscillators with periodic excitations show a periodic motion with frequency equal to the for...
Abstract. We study oscillations in resonant systems under periodic forcing. The systems depend on a ...