Loubignac iteration
In applied mathematics, Loubignac iteration is an iterative method in finite element methods. It gives continuous stress field. It is named after Gilles Loubignac, who published the method in 1977.
References
- Loubignac's paper
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Parabolic |
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Hyperbolic |
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Others |
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- Godunov
- High-resolution
- Monotonic upstream-centered (MUSCL)
- Advection upstream-splitting (AUSM)
- Riemann solver
- Essentially non-oscillatory (ENO)
- Weighted essentially non-oscillatory (WENO)
- hp-FEM
- Extended (XFEM)
- Discontinuous Galerkin (DG)
- Spectral element (SEM)
- Mortar
- Gradient discretisation (GDM)
- Loubignac iteration
- Smoothed (S-FEM)
- Smoothed-particle hydrodynamics (SPH)
- Peridynamics (PD)
- Moving particle semi-implicit method (MPS)
- Material point method (MPM)
- Particle-in-cell (PIC)
- Spectral
- Pseudospectral (DVR)
- Method of lines
- Multigrid
- Collocation
- Level-set
- Boundary element
- Method of moments
- Immersed boundary
- Analytic element
- Isogeometric analysis
- Infinite difference method
- Infinite element method
- Galerkin method
- Validated numerics
- Computer-assisted proof
- Integrable algorithm
- Method of fundamental solutions
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