scientific article; zbMATH DE number 7565082
From MaRDI portal
Publication:5093536
Publication date: 28 July 2022
Full work available at URL: https://www.global-sci.org/intro/article_detail/ijnam/20656.html
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Nitsche extended finite element methodH(curl)-elliptic interface problemsinterface-unfitted meshesthe lowest order of second family Nédélec edge elements
Stability and convergence of numerical methods for boundary value problems involving PDEs (65N12) Finite element, Rayleigh-Ritz and Galerkin methods for boundary value problems involving PDEs (65N30)
Related Items (2)
High-order weak Galerkin scheme for \(\mathbf{H} (\mathrm{div})\)-elliptic interface problems ⋮ A New Weak Galerkin Method with Weakly Enforced Dirichlet Boundary Condition
Cites Work
- Unnamed Item
- Unnamed Item
- \(H(\mathrm{div})\) and \(H(\mathbf{curl})\)-conforming virtual element methods
- Fictitious domain finite element methods using cut elements. II: A stabilized Nitsche method
- A new family of mixed finite elements in \({\mathbb{R}}^ 3\)
- The adaptive immersed interface finite element method for elliptic and Maxwell interface problems
- A nonconforming finite element method for a two-dimensional curl-curl and grad-div problem
- Mixed finite elements in \(\mathbb{R}^3\)
- A finite element method for approximating the time-harmonic Maxwell equations
- An unfitted finite element method, based on Nitsche's method, for elliptic interface problems.
- Convergence analysis of finite element methods for \(H\) (curl; \(\Omega \))-elliptic interface problems
- Analysis of a continuous finite element method for \(H(\mathrm{curl},\mathrm{div})\)-elliptic interface problem
- On the approximation of electromagnetic fields by edge finite elements. I: Sharp interpolation results for low-regularity fields
- New discretization schemes for time-harmonic Maxwell equations by weak Galerkin finite element methods
- Stabilized extended finite elements for the approximation of saddle point problems with unfitted interfaces
- On the approximation of electromagnetic fields by edge finite elements. II: A heterogeneous multiscale method for Maxwell's equations
- A finite element method for the simulation of strong and weak discontinuities in solid mechanics
- Auxiliary space preconditioning in \(H_0(\text{curl};\Omega)\)
- A cut finite element method for a Stokes interface problem
- A recovery-based a posteriori error estimator for \(H\)(curl) interface problems
- Uniform a priori estimates for elliptic and static Maxwell interface problems
- Analysis of an XFEM Discretization for Stokes Interface Problems
- An Interior Penalty Method with C0Finite Elements for the Approximation of the Maxwell Equations in Heterogeneous Media: Convergence Analysis with Minimal Regularity
- Convergence analysis of finite element methods for H(div;Ω)-elliptic interface problems
- Convergence of adaptive edge finite element methods forH(curl)-elliptic problems
- An a posteriori error indicator for discontinuous Galerkin discretizations of H(curl)-elliptic partial differential equations
- A Locally Divergence-Free Interior Penalty Method for Two-Dimensional Curl-Curl Problems
- Singularities of Maxwell interface problems
- Elastic crack growth in finite elements with minimal remeshing
- Finite Element Methods with Matching and Nonmatching Meshes for Maxwell Equations with Discontinuous Coefficients
- Finite Element Approximation of Electromagnetic Fields Using Nonfitting Meshes for Geophysics
- A Mixed $H^1$-Conforming Finite Element Method for Solving Maxwell's Equations with Non-$H^1$ Solution
- A Finite Element Method with Lagrange Multipliers for Low-Frequency Harmonic Maxwell Equations
- Finite Element Methods for Maxwell's Equations
- An Unfitted hp-Interface Penalty Finite Element Method for Elliptic Interface Problems
- A posteriori error estimates for Maxwell equations
This page was built for publication:
