Add to ORKGGlobal uniqueness of the smooth stress and deformation to within the usual rigid-body translation and rotation is established in the null traction boundary value problem of nonlinear homogeneous elasticity on a n-dimensional star-shaped region. A complementary energy is postulated to be a function of the Biot stress and to be para-convex and rank-(n-1) convex, conditions analogous to quasi-convexity and rank-(n-2) of the stored energy function. Uniqueness follows immediately from an identity involving the complementary energy and the Piola-Kirchhoff stress. The interrelationship is discussed between the two conditions imposed on the complementary energy, and between these conditions and those known for uniqueness in the linear elastic tract...
Bifurcation, global non-uniqueness and stability of solutions to the plane-strain problem of an inco...
In the context of the linear theory of thermoelasticity without energy dissipation for homogeneous a...
Residual stress is the stress present in a fixed reference placement in which the body is at rest in...
An integral identity is constructed from properties of the energy momentum tensor and is used to dem...
Abstract Conservation laws derived from the energy–momentum tensor are employed to establish unde...
The classical result for uniqueness in elasticity theory is due to Kirchhoff. It states that the sta...
Kirchhoff's uniqueness proof shows that, if the shear modulus is different from zero and Poisson's r...
A limit elastic energy for the pure traction problem is derived from re-scaled nonlinear energies of...
This investigation deals with certain generalizations of the classical uniqueness theorem for the se...
Any problem that has a characterization in the form of a "minimum energy" principle usuall...
The uniqueness and mathematical stability of the Dirichlet boundary value problem of linear elastost...
This paper presents a detailed study on analytical solutions to a general nonlinear boundary-value p...
The complementary variational problem is studied for thin elastic shells undergoing large deflection...
In a recent paper, we deduced a new energy functional for pure traction problems in elasticity, as t...
AbstractThe present work deals with the uniqueness theorem for plane crack problems in solids charac...
Bifurcation, global non-uniqueness and stability of solutions to the plane-strain problem of an inco...
In the context of the linear theory of thermoelasticity without energy dissipation for homogeneous a...
Residual stress is the stress present in a fixed reference placement in which the body is at rest in...
An integral identity is constructed from properties of the energy momentum tensor and is used to dem...
Abstract Conservation laws derived from the energy–momentum tensor are employed to establish unde...
The classical result for uniqueness in elasticity theory is due to Kirchhoff. It states that the sta...
Kirchhoff's uniqueness proof shows that, if the shear modulus is different from zero and Poisson's r...
A limit elastic energy for the pure traction problem is derived from re-scaled nonlinear energies of...
This investigation deals with certain generalizations of the classical uniqueness theorem for the se...
Any problem that has a characterization in the form of a "minimum energy" principle usuall...
The uniqueness and mathematical stability of the Dirichlet boundary value problem of linear elastost...
This paper presents a detailed study on analytical solutions to a general nonlinear boundary-value p...
The complementary variational problem is studied for thin elastic shells undergoing large deflection...
In a recent paper, we deduced a new energy functional for pure traction problems in elasticity, as t...
AbstractThe present work deals with the uniqueness theorem for plane crack problems in solids charac...
Bifurcation, global non-uniqueness and stability of solutions to the plane-strain problem of an inco...
In the context of the linear theory of thermoelasticity without energy dissipation for homogeneous a...
Residual stress is the stress present in a fixed reference placement in which the body is at rest in...