The evergreen problem of a bead on a rotating hoop shows a multitude of bifurca-tions when the bead moves with friction. This motion is studied for different values of the damping coefficient and rotational speeds of the hoop. Phase portraits and trajectories corresponding to all different modes of motion of the bead are presented. They illustrate the rich dynamics associated with this simple system. For some range of values of the damping coefficient and rotational speeds of the hoop, linear stability analysis of the equilibrium points is inadequate to classify their nature. A technique involving transformation of coordinates and order of magnitude arguments is pre-sented to examine such cases. This may provide a general framework to inves...
In this work, the combination of the 0-1 test for chaos and approximate entropy is applied to a newl...
The paper investigates the dynamics of some vibration systems taking into account the hereditary-typ...
This paper presents a mathematical model to investigate the nonlinear dynamic behavior of cage in hi...
The motion of a bead on a rotating circular hoop is investigated using elementary calculus and simpl...
An analysis of motion of a light hoop with a heavy circular disk attached to the inner side of its r...
Certain systems do not completely return to themselves when a subsystem moves through a closed circu...
We describe a simple mechanical system that involves Spontaneous Symmetry Breaking. The system consi...
The motion of a hoop hung on a spinning wire provides an illustrative and pedagogical example of a s...
The motion of a single bead on an inclined "line" made up of juxtaposed identical beads is analytica...
The motion of a single bead on an inclined “line” made up of juxtaposed identical beads is analytica...
We present a nonlinear bifurcation analysis of the dynamics of an automatic dynamic balancing mechan...
Highly symmetric patterns form spontaneously in a one-dimensional front of fluid inside a rotating h...
We present a geometric framework to deal with mechanical systems which have unilateral constraints, ...
In three experiments, the spatio-temporal patterns produced by the kinematics of the lower limbs whi...
Analytical and experimental investigations are performed in order to characterize the dynamic behavi...
In this work, the combination of the 0-1 test for chaos and approximate entropy is applied to a newl...
The paper investigates the dynamics of some vibration systems taking into account the hereditary-typ...
This paper presents a mathematical model to investigate the nonlinear dynamic behavior of cage in hi...
The motion of a bead on a rotating circular hoop is investigated using elementary calculus and simpl...
An analysis of motion of a light hoop with a heavy circular disk attached to the inner side of its r...
Certain systems do not completely return to themselves when a subsystem moves through a closed circu...
We describe a simple mechanical system that involves Spontaneous Symmetry Breaking. The system consi...
The motion of a hoop hung on a spinning wire provides an illustrative and pedagogical example of a s...
The motion of a single bead on an inclined "line" made up of juxtaposed identical beads is analytica...
The motion of a single bead on an inclined “line” made up of juxtaposed identical beads is analytica...
We present a nonlinear bifurcation analysis of the dynamics of an automatic dynamic balancing mechan...
Highly symmetric patterns form spontaneously in a one-dimensional front of fluid inside a rotating h...
We present a geometric framework to deal with mechanical systems which have unilateral constraints, ...
In three experiments, the spatio-temporal patterns produced by the kinematics of the lower limbs whi...
Analytical and experimental investigations are performed in order to characterize the dynamic behavi...
In this work, the combination of the 0-1 test for chaos and approximate entropy is applied to a newl...
The paper investigates the dynamics of some vibration systems taking into account the hereditary-typ...
This paper presents a mathematical model to investigate the nonlinear dynamic behavior of cage in hi...