A new approach to the finite-element formulation and solution of a class of problems in coupled thermoelastoviscoplasticity of crystalline solids

A general framework is developed for the finite element solution of optimal control problems governed by elliptic nonlinear partial differential equations. Typical applications are steady-state problems in nonlinear continuum mechanics, where a certain property of the solution (a function of displac

This paper presents a new approach for the formulation of multivariable ®nite element methods and establishes a systematic approach to tie the various existing hybrid/mixed ®nite elements together and to suggest the possibility of constructing some new models.

The fluid-dynamical equations governing wave propagation in catalytic converter elements containing isothermal mean flow are linearized, approximated and written in appropriate forms to act as the basis for a finite element solution scheme involving time harmonic variation. This solution scheme is d

## Abstract The present paper deals with the theoretical and numerical treatment of dynamic unilateral problems. The governing equations are formulated as an equivalent variational inequality expressing D' Alembert's principle in its inequality form. The discretization with respect to time and spac