We analyze the dynamical stability of a naturally straight, inextensible and unshearable elastic rod, under tension and controlled end rotation, within the Kirchhoff model in three dimensions. The cases of clamped boundary conditions and isoperimetric constraints are treated separately. We obtain explicit criteria for the static stability of arbitrary extrema of a general quadratic strain energy. We exploit the equivalence between the total energy and a suitably defined norm to prove that local minimizers of the strain energy, under explicit hypotheses, are stable in the dynamic sense due to Liapounov. We also extend our analysis to damped systems to show that static equilibria are dynamically stable in the Liapounov sense, in the presence ...
The nonlinear theory of Kirchhoff and Clebsch is extended to rods made of nonlocal materials; the mo...
In-plane vibrations of an elastic rod clamped at both extremities are studied. The rod is modeled as...
A theory for the dynamics and statics of growing elastic rods is presented. First, a single growing ...
The stability of an inextensible unshearable elastic rod with quadratic strain energy density subjec...
We study stability problems for equilibria of a naturally straight, inextensible, unshearable Kirchh...
The stability of an inextensible unshearable elastic rod with quadratic strain energy density subjec...
The stability of equilibrium of non-linearly elastic rods, whose deformations obey the classical Kir...
This paper develops and applies the energy-momentum method to the problem of nonlinear stability of ...
We study the stable configurations of a thin three-dimensional weakly prestrained rod subject to a t...
In this thesis, multiple problems concerning the equilibrium and stability properties of thin deform...
Imagine a thin elastic rod like a piano wire. We consider the situation that the elastic rod is bent...
Recently, the integrability of the stationary Kirchhoff equations describing an elastic rod folded i...
Aim of the paper is the formulation of a criterion of infinitesimal stability for a class of rods ma...
Abstract Consider a three-dimensional, homogeneous, compressible, hyperelastic body that occupies a ...
Abstract. We investigate the configurations of twisted elastic rods under applied end loads and clam...
The nonlinear theory of Kirchhoff and Clebsch is extended to rods made of nonlocal materials; the mo...
In-plane vibrations of an elastic rod clamped at both extremities are studied. The rod is modeled as...
A theory for the dynamics and statics of growing elastic rods is presented. First, a single growing ...
The stability of an inextensible unshearable elastic rod with quadratic strain energy density subjec...
We study stability problems for equilibria of a naturally straight, inextensible, unshearable Kirchh...
The stability of an inextensible unshearable elastic rod with quadratic strain energy density subjec...
The stability of equilibrium of non-linearly elastic rods, whose deformations obey the classical Kir...
This paper develops and applies the energy-momentum method to the problem of nonlinear stability of ...
We study the stable configurations of a thin three-dimensional weakly prestrained rod subject to a t...
In this thesis, multiple problems concerning the equilibrium and stability properties of thin deform...
Imagine a thin elastic rod like a piano wire. We consider the situation that the elastic rod is bent...
Recently, the integrability of the stationary Kirchhoff equations describing an elastic rod folded i...
Aim of the paper is the formulation of a criterion of infinitesimal stability for a class of rods ma...
Abstract Consider a three-dimensional, homogeneous, compressible, hyperelastic body that occupies a ...
Abstract. We investigate the configurations of twisted elastic rods under applied end loads and clam...
The nonlinear theory of Kirchhoff and Clebsch is extended to rods made of nonlocal materials; the mo...
In-plane vibrations of an elastic rod clamped at both extremities are studied. The rod is modeled as...
A theory for the dynamics and statics of growing elastic rods is presented. First, a single growing ...