FINITE-ELEMENT ANALYSIS OF NONLINEAR CREEPING FLOWS

Steady-state creep problems with monotone constitutive laws are studied. Finite element approximations are constructed based on mixed Petrov-Galerkin formulations for constrained problems. Stability, convergence and a priori error estimates are proved for discontinuous stress and continuous velocity interpolations of the same order. Numerical results are presented confirming the rates of convergence predicted in the analysis and the good performance of this formulation. © 1990.