Superconvergence of least-squares mixed finite element for symmetric elliptic problems

We formulate a least-squares mixed finite element method over quadrilaterals. The superconvergence result obtaineded between the finite element approximation and our appropriate-chosen interpolation of the exact solution indicates an accuracy of O(h(r+2)) for the least-squares mixed finite element approximation if Raviart-Thomas or Brezzi-Douglas-Fortin-Marini elements of order r are employed with optimal error estimate of O(h(r+1)). Numerical results are included. (C) 2003 IMACS. Published by Elsevier B.V. All rights reserved.