Extraction methods for second derivatives in finite element approximations of linear elasticity problems

## Dedicated to G. C. Hsiao on the occasion of his 60th birthday The two-dimensional frictionless contact problem of linear isotropic elasticity in the half-space is treated as a boundary variational inequality involving the Poincare-Steklov operator and discretized by linear boundary elements. Qua

In a previous paper a modified Hu-Washizu variational formulation has been used to derive an accurate four node plane strain/stress finite element denoted QE2. For the mixed element QE2 two enhanced strain terms are used and the assumed stresses satisfy the equilibrium equations a priori for the lin

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

The interaction of acoustic waves with submerged structures remains one of the most di cult and challenging problems in underwater acoustics. Many techniques such as coupled Boundary Element (BE)=Finite Element (FE) or coupled Inÿnite Element (IE)=Finite Element approximations have evolved. In the p

For a class of two-dimensional boundary value problems including diffusion and elasticity problems, it is proved that the constants in the corresponding strengthened Cauchy-Buniakowski-Schwarz (CBS) inequality in the cases of two-level hierarchical piecewise-linear/piecewise-linear and piecewise-lin

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.