In this paper two of the main sources of non-stationary dynamics, namely the time-variability and the presence of nonlinearity, are analysed through the analytical and experimental study of a time-varying inertia pendulum. The pendulum undergoes large swinging amplitudes, so that its equation of motion is definitely nonlinear, and hence becomes a nonlinear time-varying system. The analysis is carried out through two subspace-based techniques for the identification of both the linear time-varying system and the nonlinear system. The flexural and the nonlinear swinging motions of the pendulum are uncoupled and are considered separately: for each of them an analytical model is built for comparisons and the identification procedures are deve...
This project is concerned with the study of the dynamics of a playground swing, primarily involving ...
The nonlinear dynamics of a parametrically excited pendulum is addressed. The proposed analytical ap...
AbstractPlane motion of the spring pendulum is considered. The mathematical model of the system is t...
The experimental study of damping in a time-varying inertia pendulum is presented. The system consis...
The experimental study of damping in a time-varying inertia pendulum is presented. The system consis...
In this master thesis, the dynamics of a moving point pendulum and coupled pendulum system are analy...
A time-domain procedure for the identification of nonlinear vibrating structures, presented in a com...
Methods for nonlinear system identification of structures generally require input-output measured da...
The paper presents an experimental passive elasto-magnetic suspension based on rare-earth permanent ...
A self-starting multistage, time-domain procedure is presented for the identification of nonlinear, ...
In many engineering applications the dynamics may significantly be affected by nonlinear effects, wh...
An inverted pendulum is a classic case of robust controller design. A successfully validated and pre...
The trifilar pendulum is one of the most widely used methods for the measurement of the moment of in...
.-A phenomenological introduction into concepts of nonlinear dynamics is given. A driven pendulum is...
Many new methods for theoretical modelling, numerical analysis and experimental testing have been de...
This project is concerned with the study of the dynamics of a playground swing, primarily involving ...
The nonlinear dynamics of a parametrically excited pendulum is addressed. The proposed analytical ap...
AbstractPlane motion of the spring pendulum is considered. The mathematical model of the system is t...
The experimental study of damping in a time-varying inertia pendulum is presented. The system consis...
The experimental study of damping in a time-varying inertia pendulum is presented. The system consis...
In this master thesis, the dynamics of a moving point pendulum and coupled pendulum system are analy...
A time-domain procedure for the identification of nonlinear vibrating structures, presented in a com...
Methods for nonlinear system identification of structures generally require input-output measured da...
The paper presents an experimental passive elasto-magnetic suspension based on rare-earth permanent ...
A self-starting multistage, time-domain procedure is presented for the identification of nonlinear, ...
In many engineering applications the dynamics may significantly be affected by nonlinear effects, wh...
An inverted pendulum is a classic case of robust controller design. A successfully validated and pre...
The trifilar pendulum is one of the most widely used methods for the measurement of the moment of in...
.-A phenomenological introduction into concepts of nonlinear dynamics is given. A driven pendulum is...
Many new methods for theoretical modelling, numerical analysis and experimental testing have been de...
This project is concerned with the study of the dynamics of a playground swing, primarily involving ...
The nonlinear dynamics of a parametrically excited pendulum is addressed. The proposed analytical ap...
AbstractPlane motion of the spring pendulum is considered. The mathematical model of the system is t...