The inverted pendulum with a periodic parametric forcing is considered as a bifurcation problem in the reversible setting. Parameters are given by the size of the forcing and the frequency ratio. Normal form theory provides an integrable approximation of the Poincare map generated by a planar vector field. Genericity of the model is studied by a perturbation analysis, where the spatial symmetry is optional. Here equivariant singularity theory is used
We study the bifurcations associated with stability of the inverted (stationary) state in the parame...
AbstractThe vertical position is stable for a reversed compound pendulum provided its suspension is ...
An application of the new method of complete bifurcation groups (MCBG) in parametrically excited pen...
The inverted pendulum with a periodic parametric forcing is considered as a bifurcation problem in t...
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 small parametric forcing is considered as an example of a wider class of ...
This thesis involves the analysis of four classes of nonlinear oscillators. We investigate a damped ...
UnrestrictedA pendulum is statically unstable in its upright inverted state due to the Earth's gravi...
An application of the new method of complete bifurcation groups (MCBG) in a parametrically excited p...
A spring-pendulum in resonance is a time-independent Hamiltonian model system for formal reduction t...
An application of the new method of complete bifurcation groups (MCBG) in parametrically excited pen...
Dynamically stable periodic solutions of a pendulum with the periodically vibrating point of suspens...
In this paper we investigate the stability and the onset of chaotic oscillations around the pointing...
We study the bifurcations associated with stability of the inverted (stationary) state in the parame...
AbstractThe vertical position is stable for a reversed compound pendulum provided its suspension is ...
An application of the new method of complete bifurcation groups (MCBG) in parametrically excited pen...
The inverted pendulum with a periodic parametric forcing is considered as a bifurcation problem in t...
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 small parametric forcing is considered as an example of a wider class of ...
This thesis involves the analysis of four classes of nonlinear oscillators. We investigate a damped ...
UnrestrictedA pendulum is statically unstable in its upright inverted state due to the Earth's gravi...
An application of the new method of complete bifurcation groups (MCBG) in a parametrically excited p...
A spring-pendulum in resonance is a time-independent Hamiltonian model system for formal reduction t...
An application of the new method of complete bifurcation groups (MCBG) in parametrically excited pen...
Dynamically stable periodic solutions of a pendulum with the periodically vibrating point of suspens...
In this paper we investigate the stability and the onset of chaotic oscillations around the pointing...
We study the bifurcations associated with stability of the inverted (stationary) state in the parame...
AbstractThe vertical position is stable for a reversed compound pendulum provided its suspension is ...
An application of the new method of complete bifurcation groups (MCBG) in parametrically excited pen...