The author presents an adaptive high-order unfitted finite element method for elliptic interface problems, focusing on automatic mesh generation and reliable implementation. The approach involves a posteriori error estimates and competitive performance demonstrations.
A new H(div div)-conforming finite element space is introduced for the biharmonic equation.
Combining multiscale finite element method for solving non-stationary Stokes-Darcy model efficiently.
Presenting a stabilizer-free weak Galerkin method for the Ciarlet-Raviart mixed form of the Biharmonic equation on polygonal meshes.
一貫した構築と境界自由度の深い探求によるH(div)-適合有限要素テンソルの開発。
Establishing finite element formats for electrofluid dynamics models through time filtering methods to achieve second-order convergence accuracy.
Proposing low-order finite elements for linear elasticity without Poisson locking.