We study the dynamics of a spherical rigid body that rocks and rolls on a plane under the effect of gravity. The distribution of mass is non-uniform and the centre of mass does not coincide with the geometric centre. The symmetric case, with moments of inertia I1 = I2 < I3, is integrable and themotion is completely regular. Three known conservation laws are the total energy E, Jellett’s quantity QJ and Routh’s quantity QR. When the inertial symmetry I1 = I2 is broken, even slightly, the character of the solutions is profoundly changed and new types of motion become possible. We derive the equations governing the general motion and present analytical and numerical evidence of the recession, or reversal of precession, that has been o...
The rocking motion of a solid block on a moving deformable base is a dynamic problem, that despite i...
The Dzhanibekov and tennis racket phenomena are described by the torque-free rotation of a rigid bod...
We study the class of nonholonomic mechanical systems formed by a heavy symmetric ball that rolls wi...
We study the dynamics of a spherical rigid body that rocks and rolls on a plane under the effect of ...
We consider two types of trajectories found in a wide range of mechanical systems, viz. box orbits a...
The rolling and sliding motions of a rigid body subject to gravity and supported by a plane surface ...
In this report we first analyse the capabilities of a generalized kinematic (Newton's like) restitut...
The celebrated mathematician John E. Littlewood noted that a hoop with an attached mass rolling on a...
We study the dynamics of an elastic body whose shape and position evolve due to the gravitational fo...
We consider free rotation of a body whose parts move slowly with respect to each other under the act...
In this work I examine the counterintuitive accelerating rotation of a disk-shaped object, such as a...
Whenever a freely spinning body is found in a complex rotational state, this means that either the b...
Understanding of the mechanisms that may lead to failure of rocking bodies is of significant import...
This question is about rolling motion and conservation of energy. A solid sphere and a silid disc wi...
Internal stresses dissipate energy in a rotating body, unless it spins about one of its principal ax...
The rocking motion of a solid block on a moving deformable base is a dynamic problem, that despite i...
The Dzhanibekov and tennis racket phenomena are described by the torque-free rotation of a rigid bod...
We study the class of nonholonomic mechanical systems formed by a heavy symmetric ball that rolls wi...
We study the dynamics of a spherical rigid body that rocks and rolls on a plane under the effect of ...
We consider two types of trajectories found in a wide range of mechanical systems, viz. box orbits a...
The rolling and sliding motions of a rigid body subject to gravity and supported by a plane surface ...
In this report we first analyse the capabilities of a generalized kinematic (Newton's like) restitut...
The celebrated mathematician John E. Littlewood noted that a hoop with an attached mass rolling on a...
We study the dynamics of an elastic body whose shape and position evolve due to the gravitational fo...
We consider free rotation of a body whose parts move slowly with respect to each other under the act...
In this work I examine the counterintuitive accelerating rotation of a disk-shaped object, such as a...
Whenever a freely spinning body is found in a complex rotational state, this means that either the b...
Understanding of the mechanisms that may lead to failure of rocking bodies is of significant import...
This question is about rolling motion and conservation of energy. A solid sphere and a silid disc wi...
Internal stresses dissipate energy in a rotating body, unless it spins about one of its principal ax...
The rocking motion of a solid block on a moving deformable base is a dynamic problem, that despite i...
The Dzhanibekov and tennis racket phenomena are described by the torque-free rotation of a rigid bod...
We study the class of nonholonomic mechanical systems formed by a heavy symmetric ball that rolls wi...