Least-squares finite element approximation of Fisher's reaction–diffusion equation

In this paper we construct a collection of vector functions which are later used as a basis in finding a least squares finite element approximation to Navier's equation. Through ideas from potential theory, pointwise convergence is demonstrated.

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

The Taylor-least squares (TLS) scheme, developed to solve the unsteady advection4iffusion equation for advection-dominated cases in one and two dimensions, is extended to three dimensions and applied to some 3D examples to demonstrate its accuracy. The serendipity Hermite element is selected as an i