A stable interface-enriched formulation for immersed domains with strong enforcement of essential boundary conditions
From MaRDI portal
Publication:6495606
DOI10.1002/NME.6139WikidataQ127737706 ScholiaQ127737706MaRDI QIDQ6495606
Unnamed Author, Fred van Keulen, Alejandro M. Aragón, Sanne J. van den Boom
Publication date: 30 April 2024
Published in: International Journal for Numerical Methods in Engineering (Search for Journal in Brave)
Numerical and other methods in solid mechanics (74Sxx) Numerical methods for partial differential equations, boundary value problems (65Nxx) Elliptic equations and elliptic systems (35Jxx)
Related Items (1)
Cites Work
- An isogeometric design-through-analysis methodology based on adaptive hierarchical refinement of NURBS, immersed boundary methods, and T-spline CAD surfaces
- Hierarchical interface-enriched finite element method: an automated technique for mesh-independent simulations
- Topology optimization using the finite cell method
- Fictitious domain finite element methods using cut elements. II: A stabilized Nitsche method
- Stable generalized finite element method (SGFEM)
- Fictitious domain finite element methods using cut elements. I: A stabilized Lagrange multiplier method
- A 3D interface-enriched generalized finite element method for weakly discontinuous problems with complex internal geometries
- A robust Nitsche's formulation for interface problems
- 3D fluid-structure-contact interaction based on a combined XFEM FSI and dual mortar contact approach
- The finite cell method for three-dimensional problems of solid mechanics
- Finite cell method. \(h\)- and \(p\)-extension for embedded domain problems in solid mechanics
- The partition of unity finite element method: basic theory and applications
- A computational approach to handle complex microstructure geometries.
- Conforming to interface structured adaptive mesh refinement: 3D algorithm and implementation
- A NURBS-based interface-enriched generalized finite element scheme for the thermal analysis and design of microvascular composites
- An unfitted finite element method, based on Nitsche's method, for elliptic interface problems.
- A fictitious domain method for Dirichlet problem and applications
- A stable discontinuity-enriched finite element method for 3-D problems containing weak and strong discontinuities
- Numerical homogenization of hybrid metal foams using the finite cell method
- CutFEM topology optimization of 3D laminar incompressible flow problems
- 3D dimensionally reduced modeling and gradient-based optimization of microchannel cooling networks
- Shape optimization using the cut finite element method
- A coupling interface method for elliptic interface problems
- Stable generalized finite element method and associated iterative schemes; application to interface problems
- A stable and optimally convergent generalized FEM (SGFEM) for linear elastic fracture mechanics
- Density and level set-XFEM schemes for topology optimization of 3-D structures
- A hybrid level set/front tracking approach for finite element simulations of two-phase flows
- A gradient-based shape optimization scheme using an interface-enriched generalized FEM
- An ``immersed finite element method based on a locally anisotropic remeshing for the incompressible Stokes problem
- An interface-enriched generalized FEM for problems with discontinuous gradient fields
- Robust imposition of Dirichlet boundary conditions on embedded surfaces
- Weakly enforced essential boundary conditions for NURBS-embedded and trimmed NURBS geometries on the basis of the finite cell method
- Universal meshes: A method for triangulating planar curved domains immersed in nonconforming meshes
- Imposing Dirichlet boundary conditions in hierarchical Cartesian meshes by means of stabilized Lagrange multipliers
- An adaptive interface-enriched generalized FEM for the treatment of problems with curved interfaces
- A new formulation for imposing Dirichlet boundary conditions on non-matching meshes
- CutFEM: Discretizing geometry and partial differential equations
- Generalized finite element enrichment functions for discontinuous gradient fields
- A corrected XFEM approximation without problems in blending elements
- Nitsche's method for interface problems in computa-tional mechanics
- Fitted and Unfitted Finite-Element Methods for Elliptic Equations with Smooth Interfaces
- THE PARTITION OF UNITY METHOD
- Survey of meshless and generalized finite element methods: A unified approach
- The extended finite element method (XFEM) for solidification problems
- A finite element method for crack growth without remeshing
- A Locally Modified Parametric Finite Element Method for Interface Problems
- A generalized finite element method for the simulation of three-dimensional dynamic crack propagation.
This page was built for publication: A stable interface-enriched formulation for immersed domains with strong enforcement of essential boundary conditions
