Nonlinear preconditioned conjugate gradient and least-squares finite elements

In this study we consider parallel conjugate gradient solution of sparse systems arising from the least-squares mixed finite element method. Of particular interest are transport problems involving convection. The least-squares approach leads to a symmetric positive system and the conjugate gradient

In this paper, we propose some least-squares finite element procedures for linear and nonlinear parabolic equations based on first-order systems. By selecting the least-squares functional properly each proposed procedure can be split into two independent symmetric positive definite sub-procedures, o

The least-squares mixed ®nite element method is concisely described and supporting error estimates and computational results for linear elliptic (steady diffusion) problems are brie¯y summarized. The extension to the stationary Navier±Stokes problems for Newtonian, generalized Newtonian and viscoela