A finite element formulation for finite static axisymmetric deformation of hyperelastic membranes

For the stress analysis of planar deformable bodies, we usually refer to either plane stress or plane strain hypothesis. Three-dimensional analysis is required when neither hypothesis is applicable, e.g. bodies with finite thickness. In this paper, we derive an 'exact' solution for the plane stress

In this paper, two well established Taylor-Galerkin finite element methods and a second-order Godunov-type finite difference scheme are applied to the problem of finite amplitude axisymmetric wave propagation in hyperelastic membranes. The Taylor-Galerkin finite element methods are derived using con

This paper is concerned with a novel, fully variational formulation for finite deformation analysis of inelastic membranes with wrinkling. In contrast to conventional approaches, every aspect of the physical problem derives from minimization of suitable energy functionals. A variational formulation

For the finite element analysis of metal forming processes, a method based on the equilibrium of nodal forces is proposed by assuming the deforming metal to be a slightly compressible rigid-plastic material. As an extension of the method, a formulation for finite deformation is derived on the basis