This thesis considers four nonlinear systems with parametric forcing. The first problem involves an inverted pendulum with asymmetric elastic restraints subjected to harmonic vertical base excitation. On linearizing trigonometric terms the pendulum is governed by an asymmetric Mathieu equation. Solutions to this equation are scaleable. The stability regions in the parameter plane are studied numerically. Periodic solutions at the boundaries of stable regions in the parameter plane are found numerically and then their existence is proved theoretically. The second problem involves use of the method of multiple scales to elucidate the dynamics associated with early and delayed ejection of ions from Paul traps. A slow flow equation is develop...
In order to explain a beating-like phenomenon observed in an experiment by Kono,2) nonlinear effects...
Parametric excitation is epitomized by the Mathieu equation, x''+(d + e cos t)x = 0, which involves ...
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...
This thesis involves the study of four problems in the area of nonlinear vibrations, using the asymp...
Abstract: Motivated by the dynamics of a trimaran, an investigation of the dynamic behaviour of a do...
Motivated by the dynamics of a trimaran, an investigation of the dynamic behaviour of a double forci...
Consider a one-mass system with two degrees of freedom, non-linearly coupled, with parametric excita...
Motivated by the dynamics of a trimaran, an investigation of the dynamic behaviour of a double forci...
The response of a one-degree-of-freedom system with quadratic and cubic non-linearities to a fundame...
Parametrically forced structures and systems, governed by Mathieu-Hill's equations, are pervasive in...
The inverted pendulum with small parametric forcing is considered as an example of a wider class of ...
Two parametrically-induced phenomena are addressed in the context of a double pendulum subject to a ...
Analysis is conducted on a linear control system used for the stabilization of an inverted pendulum,...
The response of a one-degree-of-freedom system with quadratic and cubic non-linearities to a princip...
In order to explain a beating-like phenomenon observed in an experiment by Kono,2) nonlinear effects...
Parametric excitation is epitomized by the Mathieu equation, x''+(d + e cos t)x = 0, which involves ...
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...
This thesis involves the study of four problems in the area of nonlinear vibrations, using the asymp...
Abstract: Motivated by the dynamics of a trimaran, an investigation of the dynamic behaviour of a do...
Motivated by the dynamics of a trimaran, an investigation of the dynamic behaviour of a double forci...
Consider a one-mass system with two degrees of freedom, non-linearly coupled, with parametric excita...
Motivated by the dynamics of a trimaran, an investigation of the dynamic behaviour of a double forci...
The response of a one-degree-of-freedom system with quadratic and cubic non-linearities to a fundame...
Parametrically forced structures and systems, governed by Mathieu-Hill's equations, are pervasive in...
The inverted pendulum with small parametric forcing is considered as an example of a wider class of ...
Two parametrically-induced phenomena are addressed in the context of a double pendulum subject to a ...
Analysis is conducted on a linear control system used for the stabilization of an inverted pendulum,...
The response of a one-degree-of-freedom system with quadratic and cubic non-linearities to a princip...
In order to explain a beating-like phenomenon observed in an experiment by Kono,2) nonlinear effects...
Parametric excitation is epitomized by the Mathieu equation, x''+(d + e cos t)x = 0, which involves ...
This thesis involves the analysis of four classes of nonlinear oscillators. We investigate a damped ...