A method of obtaining a full (two-dimensional) nonlinear stability analysis of inhomogeneous deformations of arbitrary incompressible hyperelastic materials is presented. The analysis that we develop replaces the second variation condition expressed as an integral involving two arbitrary perturbations, with an equivalent (third-order) system of ordinary differential equations. The positive-definiteness condition is thereby reduced to the simple numerical evaluation of zeros of a well-behaved function. The general theory is illustrated by applying it to the problem of the inflation of axially stretched thick-walled tubes. The bifurcation theory of such deformations is well known and we compare the bifurcation results with the new stability a...
Incremental equilibrium equations and corresponding boundary conditions for an isotropic, hyperelast...
Mechanical response of elastic materials undergoing large deformations exhibit several kinds of a lo...
We study the bulging behavior of thin cylindrical balloons with various aspect ratios under internal...
A method of obtaining a full (two-dimensional) nonlinear stability analysis of inhomogeneous deforma...
A method of obtaining a full three-dimensional non-linear Hadamard stability analysis of inhomogeneo...
We consider the problem of bulging, or necking, of an infinite thin-walled hyperelastic tube that is...
The nonlinear stability analysis introduced by Chen and Haughton [1] is employed to study the full n...
Inflation of membrane tubes and the associated problem of bifurcation and instability is a classical...
A numerical procedure to analyze bifurcation and post-bifurcation of a finite deformation boundary-v...
A version of Rivlin’s cube problem is considered for compressible materials. The cube is stretched a...
The axial compression of cylindrical tubes is considered from the point of view of both bifurcation ...
This article presents a theoretical and numerical investigation of the instability and bifurcation o...
<div><p>Abstract In this paper, stability analysis of thick-walled spherical and cylindrical shells...
AbstractIncremental equilibrium equations and corresponding boundary conditions for an isotropic, hy...
Adopting a form of strain-energy function for highly deformable incompressible clastic materials rec...
Incremental equilibrium equations and corresponding boundary conditions for an isotropic, hyperelast...
Mechanical response of elastic materials undergoing large deformations exhibit several kinds of a lo...
We study the bulging behavior of thin cylindrical balloons with various aspect ratios under internal...
A method of obtaining a full (two-dimensional) nonlinear stability analysis of inhomogeneous deforma...
A method of obtaining a full three-dimensional non-linear Hadamard stability analysis of inhomogeneo...
We consider the problem of bulging, or necking, of an infinite thin-walled hyperelastic tube that is...
The nonlinear stability analysis introduced by Chen and Haughton [1] is employed to study the full n...
Inflation of membrane tubes and the associated problem of bifurcation and instability is a classical...
A numerical procedure to analyze bifurcation and post-bifurcation of a finite deformation boundary-v...
A version of Rivlin’s cube problem is considered for compressible materials. The cube is stretched a...
The axial compression of cylindrical tubes is considered from the point of view of both bifurcation ...
This article presents a theoretical and numerical investigation of the instability and bifurcation o...
<div><p>Abstract In this paper, stability analysis of thick-walled spherical and cylindrical shells...
AbstractIncremental equilibrium equations and corresponding boundary conditions for an isotropic, hy...
Adopting a form of strain-energy function for highly deformable incompressible clastic materials rec...
Incremental equilibrium equations and corresponding boundary conditions for an isotropic, hyperelast...
Mechanical response of elastic materials undergoing large deformations exhibit several kinds of a lo...
We study the bulging behavior of thin cylindrical balloons with various aspect ratios under internal...