The rigid body has been one of the most noteworthy applications of Newtonian mechanics. Applying the principles of classical mechanics to the rigid body is by no means routine. The equations of motion, though discovered two hundred and fifty years ago by Euler, have remained quite elusive since their introduction. Understanding the rigid body has required the applications of concepts from integrable systems, algebraic geometry, Lie groups, representation theory, and symplectic geometry to name a few. Moreover, several important developments in these fields have in fact originated with the study of the rigid body and subsequently have grown into general theories with much wider applications.In this work, we study the stability of equilibria ...
This paper applies the energy-momentum method to the problem of nonlinear stability of relative equi...
The dynamics of a rigid body in a central gravitational eld can be modelled by a Hamiltonian system...
This paper develops the energy momentum methodJor studying stability and bifurcation of Lagrangian ...
Rights Copyright © is held by the author. Digital access to this material is made possible by the Un...
We show how the Energy-Casimir method can be used to prove stabilizability of the angular momentum e...
This paper gives necessary and sufficient conditions for the (n-dimensional) generalized free rigid ...
The Energy-Casimir method, due to Newcomb, Arnold and others is illustrated by application to the mo...
This thesis contains two main chapters.In the first main chapter we consider free rotation of a body...
It is shown that for the generalized rigid body certain Cartan subalgebras (called of coordinate typ...
This paper gives necessary and sufficient conditions for the (n-dimensional) generalized free rigid...
This paper studies the dynamics of coupled planar rigid bodies, concentrating on the case of two or ...
We consider a system consisting of a rigid body to which a linear extensible shear beam is attached....
We consider a system consisting of a rigid body to which a linear extensible shear beam is attached....
We develop a general stability theory for equilibrium points of Poisson dynamical systems and relati...
This paper develops and applies the energy-momentum method to the problem of nonlinear stability of ...
This paper applies the energy-momentum method to the problem of nonlinear stability of relative equi...
The dynamics of a rigid body in a central gravitational eld can be modelled by a Hamiltonian system...
This paper develops the energy momentum methodJor studying stability and bifurcation of Lagrangian ...
Rights Copyright © is held by the author. Digital access to this material is made possible by the Un...
We show how the Energy-Casimir method can be used to prove stabilizability of the angular momentum e...
This paper gives necessary and sufficient conditions for the (n-dimensional) generalized free rigid ...
The Energy-Casimir method, due to Newcomb, Arnold and others is illustrated by application to the mo...
This thesis contains two main chapters.In the first main chapter we consider free rotation of a body...
It is shown that for the generalized rigid body certain Cartan subalgebras (called of coordinate typ...
This paper gives necessary and sufficient conditions for the (n-dimensional) generalized free rigid...
This paper studies the dynamics of coupled planar rigid bodies, concentrating on the case of two or ...
We consider a system consisting of a rigid body to which a linear extensible shear beam is attached....
We consider a system consisting of a rigid body to which a linear extensible shear beam is attached....
We develop a general stability theory for equilibrium points of Poisson dynamical systems and relati...
This paper develops and applies the energy-momentum method to the problem of nonlinear stability of ...
This paper applies the energy-momentum method to the problem of nonlinear stability of relative equi...
The dynamics of a rigid body in a central gravitational eld can be modelled by a Hamiltonian system...
This paper develops the energy momentum methodJor studying stability and bifurcation of Lagrangian ...