Linearity-preserving flux correction and convergence acceleration for constrained Galerkin schemes
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Publication:765281
DOI10.1016/j.cam.2011.11.019zbMath1241.65083OpenAlexW2111228815MaRDI QIDQ765281
Publication date: 19 March 2012
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cam.2011.11.019
maximum principlefinite element methodconvergence accelerationslope limitingflux correctionAnderson accelerationTransport equationsGalerkin discrretizationlinearity preservation
Finite difference methods for initial value and initial-boundary value problems involving PDEs (65M06) Finite element, Rayleigh-Ritz and Galerkin methods for initial value and initial-boundary value problems involving PDEs (65M60)
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Uses Software
Cites Work
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- Formulation, analysis and numerical study of an optimization-based conservative interpolation (remap) of scalar fields for arbitrary Lagrangian-Eulerian methods
- A comparison of finite element and finite difference solutions of the one- and two-dimensional Burgers' equations
- Failsafe flux limiting and constrained data projections for equations of gas dynamics
- Finite element methods for time-dependent convection-diffusion-reaction equations with small diffusion
- Fully multidimensional flux-corrected transport algorithms for fluids
- On the design of general-purpose flux limiters for finite element schemes. I: Scalar convection
- Non-oscillatory third order fluctuation splitting schemes for steady scalar conservation laws
- On spurious oscillations at layers diminishing (SOLD) methods for convection-diffusion equations. II: Analysis for \(P_{1}\) and \(Q_{1}\) finite elements
- Explicit and implicit FEM-FCT algorithms with flux linearization
- A constrained finite element method satisfying the discrete maximum principle for anisotropic diffusion problems
- On spurious oscillations at layers diminishing (SOLD) methods for convection-diffusion equations. I: A review
- High resolution schemes for hyperbolic conservation laws
- A fast, matrix-free implicit method for compressible flows on unstructured grids
- Computational algorithms for aerodynamic analysis and design
- Flux correction tools for finite elements
- Stopping criteria for iterations in finite element methods
- The node-centred finite volume approach: Bridge between finite differences and finite elements
- Edges, stars, superedges and chains
- A comparative study on methods for convergence acceleration of iterative vector sequences
- Variational analysis of a mixed element/volume scheme with fourth-order viscosity on general triangulations
- Construction of TVD-like artificial viscosities on two-dimensional arbitrary FEM grids
- Monotone finite volume schemes for diffusion equations on unstructured triangular and shape-regular polygonal meshes
- Implicit finite element schemes for the stationary compressible Euler equations
- Two classes of multisecant methods for nonlinear acceleration
- Anderson Acceleration for Fixed-Point Iterations
- High Resolution Schemes Using Flux Limiters for Hyperbolic Conservation Laws
- Extrapolation Methods for Vector Sequences
- Finite element flux-corrected transport (FEM-FCT) for the euler and Navier-Stokes equations
- Multidimensional upwinding: Its relation to finite elements
- High-Resolution Conservative Algorithms for Advection in Incompressible Flow
- Continuous and discrete parabolic operators and their qualitative properties
- Applied Computational Fluid Dynamics Techniques
- Efficient solution techniques for implicit finite element schemes with flux limiters
- Iterative Procedures for Nonlinear Integral Equations
- Flux-corrected transport. I: SHASTA, a fluid transport algorithm that works
