We present a class of constitutive updates for general viscoplastic solids
including such aspects of material behavior as finite elastic and plastic d
eformations, non-Newtonian viscosity, rate-sensitivity and arbitrary how an
d hardening rules. The distinguishing characteristic of the proposed consti
tutive updates is that, by construction, the corresponding incremental stre
ss-strain relations derive from a pseudo-elastic strain-energy density. Thi
s, in turn, confers the incremental boundary value problem a variational st
ructure. In particular, the incremental deformation mapping follows from a
minimum principle. This minimum principle may conveniently be taken as a ba
sis for error estimation and mesh adaption. The accuracy and robustness of
the variational constitutive updates is demonstrated with the aid of conver
gence tests involving the finitely-deforming Mises solid and ductile single
crystals. The ability of the updates to resolve the complex patterns of sl
ip activity which arise in the latter application is particularly noteworth
y. (C) 1999 Elsevier Science S.A. All rights reserved.