A family of mixed finite elements for the biharmonic equations on triangular and tetrahedral grids

Abstract

This paper introduces a new family of mixed finite elements for solving a mixed formulation of the biharmonic equations in two and three dimensions. The symmetric stress σ=-∇2u is sought in the Sobolev space H(divdiv,;S) simultaneously with the displacement u in L2(). Stemming from the structure of H(div,;S) conforming elements for the linear elasticity problems proposed by J. Hu and S. Zhang, the H(divdiv,;S) conforming finite element spaces are constructed by imposing the normal continuity of divσ on the H(div,;S) conforming spaces of Pk symmetric tensors. The inheritance makes the basis functions easy to compute. The discrete spaces for u are composed of the piecewise Pk-2 polynomials without requiring any continuity. Such mixed finite elements are inf-sup stable on both triangular and tetrahedral grids for k≥ 3, and the optimal order of convergence is achieved. Besides, the superconvergence and the postprocessing results are displayed. Some numerical experiments are provided to demonstrate the theoretical analysis.