A mixed formulation of nonlinear-elastic problems

## Abstract This article deals with an expanded mixed finite element formulation, based on the Hu‐Washizu principle, for a nonlinear incompressible material in the plane. We follow our related previous works and introduce both the stress and the strain tensors as further unknowns, which yields a tw

This paper establishes through a concrete example that the integral equation formulation of time-dependent mixed boundary value problems can be extended for problems in the theory of elasticity. To this end, the method applied to the resulting integral equation is the one begun by Cherski [1] and ev

A mixed triangular finite element model has been developed for plate bending problems in which effects of shear deformation are included. Linear distribution for all variables is assumed and the matrix equation is obtained through Reissner's variational principle. In this model, interelement compati