Add to ORKGWe prove the existence of at least two geometrically different periodic solutions with winding number $N$ for the forced relativistic pendulum. The instability of a solution is also proved. The proof is topological and based on the version of the Poincaré-Birkhoff theorem by Franks. Moreover, with some restriction on the parameters, we prove the existence of twist dynamics
We show that the periodically perturbed N-dimensional relativistic pendulum equation has at least N ...
AbstractWe study the T-periodic solutions of the forced pendulum equation u″+cu′+a sin(u)=λf(t), whe...
We apply KAM theory to the equation of the forced relativistic pen- dulum to prove that all the sol...
We prove the existence of at least two geometrically different periodic solution with winding number...
We prove the existence of at least two geometrically different periodic solutions with winding numb...
Abstract. Using Szulkin’s critical point theory, we prove that the relativistic forced pendulum with...
Using Szulkin’s critical point theory, we prove that the relativistic forced pendulum with periodic ...
We consider the existence and multiplicity of periodic oscillations for the forced pendulum model w...
We establish multiplicity results of periodic solutions for relativistic pendulum type systems of or...
The paper surveys and compares some results on the existence and multiplicity of T-periodic solution...
We talk about our recent published work about periodic solutions of relativistic pendulum type syste...
We establish multiplicity results of periodic solutions for relativistic pendulum type systems of or...
We talk about our recent published work about periodic solutions of relativistic pendulum type syste...
We talk about our recent published work about periodic solutions of relativistic pendulum type syste...
We talk about our recent published work about periodic solutions of relativistic pendulum type syste...
We show that the periodically perturbed N-dimensional relativistic pendulum equation has at least N ...
AbstractWe study the T-periodic solutions of the forced pendulum equation u″+cu′+a sin(u)=λf(t), whe...
We apply KAM theory to the equation of the forced relativistic pen- dulum to prove that all the sol...
We prove the existence of at least two geometrically different periodic solution with winding number...
We prove the existence of at least two geometrically different periodic solutions with winding numb...
Abstract. Using Szulkin’s critical point theory, we prove that the relativistic forced pendulum with...
Using Szulkin’s critical point theory, we prove that the relativistic forced pendulum with periodic ...
We consider the existence and multiplicity of periodic oscillations for the forced pendulum model w...
We establish multiplicity results of periodic solutions for relativistic pendulum type systems of or...
The paper surveys and compares some results on the existence and multiplicity of T-periodic solution...
We talk about our recent published work about periodic solutions of relativistic pendulum type syste...
We establish multiplicity results of periodic solutions for relativistic pendulum type systems of or...
We talk about our recent published work about periodic solutions of relativistic pendulum type syste...
We talk about our recent published work about periodic solutions of relativistic pendulum type syste...
We talk about our recent published work about periodic solutions of relativistic pendulum type syste...
We show that the periodically perturbed N-dimensional relativistic pendulum equation has at least N ...
AbstractWe study the T-periodic solutions of the forced pendulum equation u″+cu′+a sin(u)=λf(t), whe...
We apply KAM theory to the equation of the forced relativistic pen- dulum to prove that all the sol...