Stabilized mixed finite element methods for linear elasticity on simplicial grids in $\mathbb{R}^{n}$

TL;DR

This paper introduces two classes of stabilized mixed finite element methods for linear elasticity on simplicial grids, providing stability, error analysis, and demonstrating efficiency through numerical results.

Contribution

The paper develops new stabilized mixed finite element methods for linear elasticity that feature low degrees of freedom and rigorous stability and error analysis.

Findings

Methods satisfy discrete inf-sup conditions

Error estimates are established for the methods

Numerical results confirm theoretical predictions

Abstract

In this paper, we design two classes of stabilized mixed finite element methods for linear elasticity on simplicial grids. In the first class of elements, we use $\boldsymbol{H}(\mathbf{div}, \Omega; \mathbb{S})$-$P_k$ and $\boldsymbol{L}^2(\Omega; \mathbb{R}^n)$-$P_{k-1}$ to approximate the stress and displacement spaces, respectively, for $1\leq k\leq n$, and employ a stabilization technique in terms of the jump of the discrete displacement over the faces of the triangulation under consideration; in the second class of elements, we use $\boldsymbol{H}_0^1(\Omega; \mathbb{R}^n)$-$P_{k}$ to approximate the displacement space for $1\leq k\leq n$, and adopt the stabilization technique suggested by Brezzi, Fortin, and Marini. We establish the discrete inf-sup conditions, and consequently present the a priori error analysis for them. The main ingredient for the analysis is two special interpolation operators, which can be constructed using a crucial $\boldsymbol{H}(\mathbf{div})$ bubble function space of polynomials on each element. The feature of these methods is the low number of global degrees of freedom in the lowest order case. We present some numerical results to demonstrate the theoretical estimates.