Efficient least squares finite elements for two-dimensional laminar boundary layer analysis

The development of a three-dimensional least-squares ÿnite element technique suitable for deformation analysis was presented. By adopting a spatial viewpoint, a consistent rate formulation that treats deformation as a process was established. The technique utilized the least-squares variational prin

A new "rst-order formulation for the two-dimensional elasticity equations is proposed by introducing additional variables which, called stresses here, are the derivatives of displacements. The resulted stress}displacement system can be further decomposed into two dependent subsystems, the stress sys

A least-squares mixed ®nite element method for the second-order non-self-adjoint two-point boundary value problems is formulated and analysed. Superconvergence estimates are developed in the maximum norm at Gaussian points and at Lobatto points.

This paper presents a p-version least-squares "nite element formulation for the k} turbulence model. The dimensionless forms of the describing partial di!erential equations are cast into a system of "rst-order partial di!erential equations by utilizing auxiliary variables. Primary, and auxiliary var