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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Numerical methods for partial differential equations

Finite difference

Parabolic	Forward-time central-space (FTCS) Crank–Nicolson
Hyperbolic	Lax–Friedrichs Lax–Wendroff MacCormack Upwind Method of characteristics
Others	Alternating direction-implicit (ADI) Finite-difference frequency-domain (FDFD) Finite-difference time-domain (FDTD)

Finite volume

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)

Meshless/Meshfree

Smoothed-particle hydrodynamics (SPH)
Peridynamics (PD)
Moving particle semi-implicit method (MPS)
Material point method (MPM)
Particle-in-cell (PIC)

Domain decomposition

Schur complement
Fictitious domain
Schwarz alternating
- additive
- abstract additive
Neumann–Dirichlet
Neumann–Neumann
Poincaré–Steklov operator
Balancing (BDD)
Balancing by constraints (BDDC)
Tearing and interconnect (FETI)
FETI-DP

Others

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
- Petrov–Galerkin method
Validated numerics
Computer-assisted proof
Integrable algorithm
Method of fundamental solutions

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