TY - JOUR
T1 - A New Finite Element Space for Expanded Mixed Finite Element Method
AU - Chen , Jing
AU - Zhou , Zhaojie
AU - Chen , Huanzhen
AU - Wang , Hong
JO - Journal of Computational Mathematics
VL - 5
SP - 817
EP - 840
PY - 2023
DA - 2023/05
SN - 41
DO - http://doi.org/10.4208/jcm.2112-m2021-0204
UR - https://global-sci.org/intro/article_detail/jcm/21675.html
KW - New finite element space, Expanded mixed finite element, Minimum degrees of freedom, The inf-sup condition, Solvability, Optimal convergence.
AB - <p style="text-align: justify;">In this article, we propose a new finite element space $Λ_h$ for the expanded mixed
finite element method (EMFEM) for second-order elliptic problems to guarantee its computing capability and reduce the computation cost. The new finite element space $Λ_h$ is designed in such a way that the strong requirement $V_h ⊂ Λ_h$ in [9] is weakened to $\{v_h ∈ V_h; {\rm div} v_h = 0\} ⊂ Λ_h$ so that it needs fewer degrees of freedom than its classical
counterpart. Furthermore, the new $Λ_h$ coupled with the Raviart-Thomas space satisfies
the inf-sup condition, which is crucial to the computation of mixed methods for its close
relation to the behavior of the smallest nonzero eigenvalue of the stiff matrix, and thus
the existence, uniqueness and optimal approximate capability of the EMFEM solution are
proved for rectangular partitions in $\mathbb{R}^d$, $d = 2, 3$ and for triangular partitions in $\mathbb{R}^2.$ Also,
the solvability of the EMFEM for triangular partition in $\mathbb{R}^3$ can be directly proved without
the inf-sup condition. Numerical experiments are conducted to confirm these theoretical
findings.<br/></p>