Stability and approximability of the 1–0 element for Stokes equations

The conforming spectral element methods are applied to solve the linearized Navier-Stokes equations by the help of stabilization techniques like those applied for finite elements. The stability and convergence analysis is carried out and essential numerical results are presented demonstrating the hi

This article studies a least-squares finite element method for the numerical approximation of compressible Stokes equations. Optimal order error estimates for the velocity and pressure in the H 1 are established. The choice of finite element spaces for the velocity and pressure is not subject to the

## Abstract This paper considers the penalty finite element method for the Stokes equations, based on some stable finite elements space pair (__X__~__h__~, __M__~__h__~) that do satisfy the discrete inf–sup condition. Theoretical results show that the penalty error converges as fast as one should e

## Abstract This article first recalls the results of a stabilized finite element method based on a local Gauss integration method for the stationary Stokes equations approximated by low equal‐order elements that do not satisfy the __inf‐sup__ condition. Then, we derive general superconvergence res