Nonlinear elasticity with the shifted boundary method
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Publication:6550148
DOI10.1016/J.CMA.2024.116988zbMATH Open1539.7406MaRDI QIDQ6550148
Publication date: 4 June 2024
Published in: Computer Methods in Applied Mechanics and Engineering (Search for Journal in Brave)
complex geometryapproximate boundary conditionsnonlinear solid mechanicsunfitted finite elementsshifted boundary methodimaging-to-computing
Cites Work
- Title not available (Why is that?)
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- An isogeometric design-through-analysis methodology based on adaptive hierarchical refinement of NURBS, immersed boundary methods, and T-spline CAD surfaces
- Explicit mixed strain-displacement finite elements for compressible and quasi-incompressible elasticity and plasticity
- Topology optimization using the finite cell method
- Ghost penalty
- Isogeometric analysis using T-splines
- Mixed stabilized finite element methods in nonlinear solid mechanics. I: Formulation
- Mixed stabilized finite element methods in nonlinear solid mechanics. II: Strain localization
- The shifted boundary method for hyperbolic systems: embedded domain computations of linear waves and shallow water flows
- The finite cell method for three-dimensional problems of solid mechanics
- Isogeometric analysis of structural vibrations
- Finite cell method. \(h\)- and \(p\)-extension for embedded domain problems in solid mechanics
- The variational multiscale method -- a paradigm for computational mechanics
- Discontinuous Galerkin finite element methods for linear elasticity and quasistatic linear viscoelasticity
- A new face-oriented stabilized XFEM approach for 2D and 3D incompressible Navier-Stokes equations
- Mixed stabilized finite element methods in nonlinear solid mechanics. III: compressible and incompressible plasticity
- An unfitted finite element method, based on Nitsche's method, for elliptic interface problems.
- Improved versions of assumed enhanced strain tri-linear elements for 3D finite deformation problems
- Analysis of the shifted boundary method for the Stokes problem
- The shifted boundary method for embedded domain computations. I: Poisson and Stokes problems
- The shifted boundary method for embedded domain computations. II: Linear advection-diffusion and incompressible Navier-Stokes equations
- Explicit mixed strain-displacement finite element for dynamic geometrically non-linear solid mechanics
- A weighted shifted boundary method for free surface flow problems
- A new finite element level set reinitialization method based on the shifted boundary method
- The high-order shifted boundary method and its analysis
- Robust numerical integration on curved polyhedra based on folded decompositions
- Adaptive isogeometric analysis on two-dimensional trimmed domains based on a hierarchical approach
- High-order gradients with the shifted boundary method: an embedded enriched mixed formulation for elliptic PDEs
- A velocity/stress mixed stabilized nodal finite element for elastodynamics: analysis and computations with strongly and weakly enforced boundary conditions
- Shape optimization using the cut finite element method
- Shape optimisation with multiresolution subdivision surfaces and immersed finite elements
- Über ein Variationsprinzip zur Lösung von Dirichlet-Problemen bei Verwendung von Teilräumen, die keinen Randbedingungen unterworfen sind. (On a variational principle for solving Dirichlet problems less boundary conditions using subspaces)
- Cut finite element methods for linear elasticity problems
- A face-oriented stabilized Nitsche-type extended variational multiscale method for incompressible two-phase flow
- Discontinuous Galerkin methods for non-linear elasticity
- Mixed and Hybrid Finite Element Methods
- Geometrically non-linear enhanced strain mixed methods and the method of incompatible modes
- A finite element method for crack growth without remeshing
- Analysis-aware defeaturing: Problem setting and a posteriori estimation
- A class of mixed assumed strain methods and the method of incompatible modes
- Fictitious domain methods using cut elements: III. A stabilized Nitsche method for Stokes’ problem
- A general discontinuous Galerkin method for finite hyperelasticity. Formulation and numerical applications
- Overlapping Multipatch Isogeometric Method with Minimal Stabilization
- The simple shifted fracture method
- A blended shifted‐fracture/phase‐field framework for sharp/diffuse crack modeling
- A penalty-free shifted boundary method of arbitrary order
- Stabilized isogeometric formulation of the Stokes problem on overlapping patches
- Ana posteriorierror estimator for isogeometric analysis on trimmed geometries
- The shifted interface method: a flexible approach to embedded interface computations
- The shifted fracture method
- The shifted boundary method for solid mechanics
Related Items (2)
The shifted boundary method in isogeometric analysis ⋮ A shifted boundary method for the compressible Euler equations
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