This paper is concerned with the stochastic stability of an inverted pendulum with a point mass at the top and a spring at the base; the bar is massless. The base is subjected to a vertical acceleration A(t) that is supposed to be a Gaussian stochastic process. A line-like structure excited by a vertical ground motion can be idealized in this way. Without simplifying assumptions the study of the stochastic stability gives rise to a non-trivial problem as the equation of motion belongs to the class of damped Mathieu equations. Thus, it is assumed that during the motion the angle of rotation theta remains small so that sin(theta) = theta . In this way, the motion equation assumes the classical form of the second order oscillator, but the exc...
The article presents analysis of the stochastic technical stability of mathematical models (describe...
The ordinary differential equation for the motion of an inverted pendulum whose support is subjected...
Reduced models of stochastic parametric vibrations of elastic systems with regard to their previous ...
This paper is concerned with the stochastic stability of an inverted pendulum with a point mass at t...
This paper is concerned with the stochastic stability of an inverted pendulum with a point mass at t...
In this work a quantitative and qualitative analysis of the dynamical stabilization of an inverted p...
This paper analyzes the stochastic stability of a damped Mathieu oscillator subjected to a parametri...
AbstractThis paper studies the rotational motion of a parametrically excited pendulum, dynamics of w...
Instability behaviour of a gyropendulum subjected to white noise vertical support motion is examined...
International audienceThis paper deals with the nonlinear dynamics of a mechanical system which cons...
A second order oscillator is considered having a random perturbation in its stiffness. This is given...
Recently an elastic inverted pendulum structure was proposed as a means to make nonlinear energy har...
We present new solutions for the dynamics of a pendulum energy converter which is vertically excited...
The paper deals with the stochastic analysis of a single-degree-of-freedom vehicle moving at constan...
The article presents analysis of the stochastic technical stability of mathematical models (describe...
The ordinary differential equation for the motion of an inverted pendulum whose support is subjected...
Reduced models of stochastic parametric vibrations of elastic systems with regard to their previous ...
This paper is concerned with the stochastic stability of an inverted pendulum with a point mass at t...
This paper is concerned with the stochastic stability of an inverted pendulum with a point mass at t...
In this work a quantitative and qualitative analysis of the dynamical stabilization of an inverted p...
This paper analyzes the stochastic stability of a damped Mathieu oscillator subjected to a parametri...
AbstractThis paper studies the rotational motion of a parametrically excited pendulum, dynamics of w...
Instability behaviour of a gyropendulum subjected to white noise vertical support motion is examined...
International audienceThis paper deals with the nonlinear dynamics of a mechanical system which cons...
A second order oscillator is considered having a random perturbation in its stiffness. This is given...
Recently an elastic inverted pendulum structure was proposed as a means to make nonlinear energy har...
We present new solutions for the dynamics of a pendulum energy converter which is vertically excited...
The paper deals with the stochastic analysis of a single-degree-of-freedom vehicle moving at constan...
The article presents analysis of the stochastic technical stability of mathematical models (describe...
The ordinary differential equation for the motion of an inverted pendulum whose support is subjected...
Reduced models of stochastic parametric vibrations of elastic systems with regard to their previous ...