Dual system least-squares finite element method for a hyperbolic problem
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Publication:2113849
DOI10.1515/cmam-2021-0003zbMath1482.65213OpenAlexW3169562054WikidataQ115514494 ScholiaQ115514494MaRDI QIDQ2113849
Publication date: 14 March 2022
Published in: Computational Methods in Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1515/cmam-2021-0003
Newton's methodhyperbolic problemdual system least-squares finite element methodwave shocks and oscillation
Stability and convergence of numerical methods for boundary value problems involving PDEs (65N12) Finite element, Rayleigh-Ritz and Galerkin methods for boundary value problems involving PDEs (65N30)
Uses Software
Cites Work
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- Handbook of numerical methods for hyperbolic problems. Basic and fundamental issues
- Proceedings of the XV international conference on hyperbolic problems: theory, numerics, applications
- Finite volume WENO methods for hyperbolic conservation laws on Cartesian grids with adaptive mesh refinement
- ENO and WENO schemes with the exact conservation property for one-dimensional shallow water equations
- Implicit shock tracking using an optimization-based high-order discontinuous Galerkin method
- Adaptive flux-only least-squares finite element methods for linear transport equations
- A new finite element formulation for computational fluid dynamics. VIII. The Galerkin/least-squares method for advective-diffusive equations
- Least-squares finite element methods
- A bubble-stabilized least-squares finite element method for steady MHD duct flow problems at high Hartmann numbers
- Stabilized finite element methods. I.: Application to the advective- diffusive model
- Towards unification of the vorticity confinement and shock capturing (TVD and ENO/WENO) methods
- Lectures on hyperbolic equations and their numerical approximation
- Newton-\(\mathrm{LL}^\ast\) method for the second-order semi-linear elliptic partial differential equations
- Adaptive least-squares finite element methods for linear transport equations based on an H(div) flux reformulation
- Godunov-type numerical scheme for the shallow water equations with horizontal temperature gradient
- The flux reconstruction method with Lax-Wendroff type temporal discretization for hyperbolic conservation laws
- The solitary wave solution for quantum plasma nonlinear dynamic model
- A local projection stabilization method with shock capturing and diagonal mass matrix for solving non-stationary transport dominated problems
- A class of high resolution shock capturing schemes for hyperbolic conservation laws
- Spectral (finite) volume method for conservation laws on unstructured grids. VI: Extension to viscous flow
- A high resolution total variation diminishing scheme for hyperbolic conservation law and related problems
- A Comparative Study of Least-squares, SUPG and Galerkin Methods for Convection Problems
- a unified Riemann-problem-based extension of the Warming-Beam and Lax-Wendroff schemes
- An Algebraic Multigrid Method with Guaranteed Convergence Rate
- FOSLL* for Nonlinear Partial Differential Equations
- Finite Element Methods for Navier-Stokes Equations
- Upwind Difference Schemes for Hyperbolic Systems of Conservation Laws
- Finite Element Methods of Least-Squares Type
- First-Order System $\CL\CL^*$ (FOSLL*): Scalar Elliptic Partial Differential Equations
- An adaptive wavelet space‐time SUPG method for hyperbolic conservation laws
- Least-Squares Finite Element Methods and Algebraic Multigrid Solvers for Linear Hyperbolic PDEs
- Time-Space Discretization of the Nonlinear Hyperbolic Systemutt= div (\sigma(Du)+Dut)
- Mixed and least‐squares finite element methods with application to linear hyperbolic problems
- Nonlinear Interpolation and Total Variation Diminishing Schemes
- Existence and uniqueness solution for a hyperbolic relaxation of the Caginalp phase-field system with singular nonlinear terms
- Total variation diminishing schemes in optimal control of scalar conservation laws
- Feedback Control of Nonlinear Hyperbolic PDE Systems Inspired by Traffic Flow Models
- Finite Element Method for the Space and Time Fractional Fokker–Planck Equation
- Numerical Conservation Properties of H(div)-Conforming Least-Squares Finite Element Methods for the Burgers Equation
- Stabilized Finite Element Methods for Nonsymmetric, Noncoercive, and Ill-Posed Problems. Part I: Elliptic Equations
- Efficient high‐resolution relaxation schemes for hyperbolic systems of conservation laws
- The Mathematical Theory of Finite Element Methods
- Solutions in the large for nonlinear hyperbolic systems of equations
- Book Reviews
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