AbstractThe inverted pendulum with small parametric forcing is considered as an example of a wider class of parametrically forced Hamiltonian systems. The qualitative dynamics of the Poincaré map corresponding to the central periodic solution is studied via an approximating integrable normal form. At bifurcation points we construct local universal models in the appropriate symmetry context, using equivariant singularity theory. In this context, structural stability can be proved under generic conditions
UnrestrictedA pendulum is statically unstable in its upright inverted state due to the Earth's gravi...
A conventional pendulum has two equilibria, the lower one, and the upper one. This paper presents th...
A universal local bifurcation analysis is presented of an autonomous Hamiltonian system around a cer...
AbstractThe inverted pendulum with small parametric forcing is considered as an example of a wider c...
The inverted pendulum with small parametric forcing is considered as an example of a wider class of ...
The inverted pendulum with small parametric forcing is considered as an example of a wider class of ...
The inverted pendulum with a periodic parametric forcing is considered as a bifurcation problem in t...
The inverted pendulum with small parametric forcing is considered as an example of a wider class of ...
We consider Hamiltonian systems near equilibrium that can be (formally) reduced to one degree of fre...
A spring-pendulum in resonance is a time-independent Hamiltonian model system for formal reduction t...
This paper is concerned with the global coherent (i.e., non-chaotic) dynamics of the parametrically ...
A spring-pendulum in resonance is a time-independent Hamiltonian model system for formal reduction t...
UnrestrictedA pendulum is statically unstable in its upright inverted state due to the Earth's gravi...
A conventional pendulum has two equilibria, the lower one, and the upper one. This paper presents th...
A universal local bifurcation analysis is presented of an autonomous Hamiltonian system around a cer...
AbstractThe inverted pendulum with small parametric forcing is considered as an example of a wider c...
The inverted pendulum with small parametric forcing is considered as an example of a wider class of ...
The inverted pendulum with small parametric forcing is considered as an example of a wider class of ...
The inverted pendulum with a periodic parametric forcing is considered as a bifurcation problem in t...
The inverted pendulum with small parametric forcing is considered as an example of a wider class of ...
We consider Hamiltonian systems near equilibrium that can be (formally) reduced to one degree of fre...
A spring-pendulum in resonance is a time-independent Hamiltonian model system for formal reduction t...
This paper is concerned with the global coherent (i.e., non-chaotic) dynamics of the parametrically ...
A spring-pendulum in resonance is a time-independent Hamiltonian model system for formal reduction t...
UnrestrictedA pendulum is statically unstable in its upright inverted state due to the Earth's gravi...
A conventional pendulum has two equilibria, the lower one, and the upper one. This paper presents th...
A universal local bifurcation analysis is presented of an autonomous Hamiltonian system around a cer...