Computers and Fluids, ISSN 0045-7930, 08/2016, Volume 134-135, pp. 111 - 129

This paper is concerned with the numerical solution of the first order formulation of proposed by Peshkov & Romenski [Peshkov I, Romenski E. A hyperbolic model...

Hyperbolic conservation laws with stiff source terms and non-conservative products | Unified first order hyperbolic formulation of continuum mechanics | Symmetric-hyperbolic Godunov-Peshkov-Romenski model (GPR model) of nonlinear hyperelasticity | Viscous heat conducting fluids and nonlinear elasto-plastic solids | High order direct Arbitrary-Lagrangian-Eulerian finite volume schemes | High order ADER-WENO schemes on moving unstructured meshes | TRIANGULAR MESHES | High order direct | TETRAHEDRAL MESHES | ESSENTIALLY NONOSCILLATORY SCHEMES | HIGH-ORDER | Arbitrary-Lagrangian-Eulerian finite volume schemes | NONCONSERVATIVE HYPERBOLIC SYSTEMS | Godunov-Peshkov-Romenski model (GPR model) of nonlinear hyperelasticity | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | MECHANICS | CONTINUUM-MECHANICS | Symmetric-hyperbolic | BALANCE LAWS | CONSERVATION-LAWS | UNSTRUCTURED MESHES | DIFFUSE INTERFACE MODEL | Thermodynamics | Mechanical engineering | Analysis | Environmental law | Finite element method | Reconstruction | Numerical analysis | Mathematical analysis | Nonlinearity | Mathematical models | Continuum mechanics | Navier-Stokes equations | Numerical Analysis | Analysis of PDEs | Mathematics

Hyperbolic conservation laws with stiff source terms and non-conservative products | Unified first order hyperbolic formulation of continuum mechanics | Symmetric-hyperbolic Godunov-Peshkov-Romenski model (GPR model) of nonlinear hyperelasticity | Viscous heat conducting fluids and nonlinear elasto-plastic solids | High order direct Arbitrary-Lagrangian-Eulerian finite volume schemes | High order ADER-WENO schemes on moving unstructured meshes | TRIANGULAR MESHES | High order direct | TETRAHEDRAL MESHES | ESSENTIALLY NONOSCILLATORY SCHEMES | HIGH-ORDER | Arbitrary-Lagrangian-Eulerian finite volume schemes | NONCONSERVATIVE HYPERBOLIC SYSTEMS | Godunov-Peshkov-Romenski model (GPR model) of nonlinear hyperelasticity | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | MECHANICS | CONTINUUM-MECHANICS | Symmetric-hyperbolic | BALANCE LAWS | CONSERVATION-LAWS | UNSTRUCTURED MESHES | DIFFUSE INTERFACE MODEL | Thermodynamics | Mechanical engineering | Analysis | Environmental law | Finite element method | Reconstruction | Numerical analysis | Mathematical analysis | Nonlinearity | Mathematical models | Continuum mechanics | Navier-Stokes equations | Numerical Analysis | Analysis of PDEs | Mathematics

Journal Article

Journal of Computational Physics, ISSN 0021-9991, 06/2015, Volume 291, pp. 120 - 150

We present a novel cell-centered direct Arbitrary-Lagrangian–Eulerian (ALE) finite volume scheme on unstructured triangular meshes that is high order accurate...

Hyperbolic conservation laws | Euler equations of compressible gas dynamics | Arbitrary-Lagrangian–Eulerian (ALE) | Relativistic MHD equations (RMHD) | Moving unstructured meshes | High order Lagrangian ADER-WENO schemes | Time-accurate local time stepping (LTS) | High order lagrangian ADER-WENO schemes | Arbitrary-lagrangian-eulerian (ALE) | HLLC RIEMANN SOLVER | TETRAHEDRAL MESHES | DISCONTINUOUS GALERKIN METHOD | PHYSICS, MATHEMATICAL | RELATIVISTIC MAGNETOHYDRODYNAMICS | NONCONSERVATIVE HYPERBOLIC SYSTEMS | FREE-SURFACE FLOWS | COMPRESSIBLE EULER EQUATIONS | GAS-DYNAMICS | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | ADER SCHEMES | Arbitrary-Lagrangian-Eulerian (ALE) | CONSERVATION-LAWS | Algorithms | Reconstruction | Compressibility | Computation | Gas dynamics | Mathematical analysis | Fluxes | Inclusions | Mathematics - Numerical Analysis

Hyperbolic conservation laws | Euler equations of compressible gas dynamics | Arbitrary-Lagrangian–Eulerian (ALE) | Relativistic MHD equations (RMHD) | Moving unstructured meshes | High order Lagrangian ADER-WENO schemes | Time-accurate local time stepping (LTS) | High order lagrangian ADER-WENO schemes | Arbitrary-lagrangian-eulerian (ALE) | HLLC RIEMANN SOLVER | TETRAHEDRAL MESHES | DISCONTINUOUS GALERKIN METHOD | PHYSICS, MATHEMATICAL | RELATIVISTIC MAGNETOHYDRODYNAMICS | NONCONSERVATIVE HYPERBOLIC SYSTEMS | FREE-SURFACE FLOWS | COMPRESSIBLE EULER EQUATIONS | GAS-DYNAMICS | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | ADER SCHEMES | Arbitrary-Lagrangian-Eulerian (ALE) | CONSERVATION-LAWS | Algorithms | Reconstruction | Compressibility | Computation | Gas dynamics | Mathematical analysis | Fluxes | Inclusions | Mathematics - Numerical Analysis

Journal Article

Computer Methods in Applied Mechanics and Engineering, ISSN 0045-7825, 10/2014, Volume 280, pp. 57 - 83

In this article a new high order accurate cell-centered Arbitrary-Lagrangian–Eulerian (ALE) Godunov-type finite volume method with time-accurate local time...

Hyperbolic conservation laws | Euler equations of compressible gas dynamics | Arbitrary-Lagrangian–Eulerian (ALE) Godunov-type finite volume methods | Time-accurate local time stepping (LTS) | High order Lagrangian ADER–WENO schemes | Magnetohydrodynamics equations (MHD) | High order Lagrangian ADER-WENO schemes | Arbitrary-Lagrangian-Eulerian (ALE) Godunov-type finite volume methods | TETRAHEDRAL MESHES | ADAPTIVE MESH REFINEMENT | EQUATIONS | DISCONTINUOUS GALERKIN METHOD | HIGH-ORDER | GAS-DYNAMICS | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | MECHANICS | ENGINEERING, MULTIDISCIPLINARY | COMPRESSIBLE FLOW | BALANCE LAWS | SYSTEMS | UNSTRUCTURED MESHES | Environmental law | Reconstruction | Formulations | Algorithms | Gas dynamics | Mathematical analysis | Conservation | Magnetohydrodynamic equations | Finite volume method | Mathematics - Numerical Analysis

Hyperbolic conservation laws | Euler equations of compressible gas dynamics | Arbitrary-Lagrangian–Eulerian (ALE) Godunov-type finite volume methods | Time-accurate local time stepping (LTS) | High order Lagrangian ADER–WENO schemes | Magnetohydrodynamics equations (MHD) | High order Lagrangian ADER-WENO schemes | Arbitrary-Lagrangian-Eulerian (ALE) Godunov-type finite volume methods | TETRAHEDRAL MESHES | ADAPTIVE MESH REFINEMENT | EQUATIONS | DISCONTINUOUS GALERKIN METHOD | HIGH-ORDER | GAS-DYNAMICS | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | MECHANICS | ENGINEERING, MULTIDISCIPLINARY | COMPRESSIBLE FLOW | BALANCE LAWS | SYSTEMS | UNSTRUCTURED MESHES | Environmental law | Reconstruction | Formulations | Algorithms | Gas dynamics | Mathematical analysis | Conservation | Magnetohydrodynamic equations | Finite volume method | Mathematics - Numerical Analysis

Journal Article

Computers and Fluids, ISSN 0045-7930, 09/2015, Volume 118, pp. 204 - 224

In this paper we present a novel arbitrary high order accurate discontinuous Galerkin (DG) finite element method on space–time adaptive Cartesian meshes (AMR)...

High order space–time adaptive mesh refinement (AMR) | Hyperbolic conservation laws | MOOD paradigm | ADER-DG and ADER-WENO finite volume schemes | A posteriori sub-cell finite volume limiter | Arbitrary high-order discontinuous Galerkin schemes | High order space-time adaptive mesh refinement (AMR) | HERMITE WENO SCHEMES | GENERALIZED RIEMANN PROBLEM | TANG VORTEX SYSTEM | EFFICIENT IMPLEMENTATION | ASYMPTOTIC-EXPANSION | HIGH-ORDER | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | MECHANICS | MESH REFINEMENT | COMPRESSIBLE FLOW | CONSERVATION-LAWS | UNSTRUCTURED MESHES | Fluid dynamics | Environmental law | Magnetohydrodynamics | Fluids | Computational fluid dynamics | Mathematical analysis | Fluid flow | Mathematical models | Polynomials | Galerkin methods

High order space–time adaptive mesh refinement (AMR) | Hyperbolic conservation laws | MOOD paradigm | ADER-DG and ADER-WENO finite volume schemes | A posteriori sub-cell finite volume limiter | Arbitrary high-order discontinuous Galerkin schemes | High order space-time adaptive mesh refinement (AMR) | HERMITE WENO SCHEMES | GENERALIZED RIEMANN PROBLEM | TANG VORTEX SYSTEM | EFFICIENT IMPLEMENTATION | ASYMPTOTIC-EXPANSION | HIGH-ORDER | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | MECHANICS | MESH REFINEMENT | COMPRESSIBLE FLOW | CONSERVATION-LAWS | UNSTRUCTURED MESHES | Fluid dynamics | Environmental law | Magnetohydrodynamics | Fluids | Computational fluid dynamics | Mathematical analysis | Fluid flow | Mathematical models | Polynomials | Galerkin methods

Journal Article

Journal of Computational Physics, ISSN 0021-9991, 06/2016, Volume 314, pp. 824 - 862

This paper is concerned with the numerical solution of the first order hyperbolic formulation of continuum mechanics recently proposed by Peshkov and Romenski...

Unified first order hyperbolic formulation of nonlinear continuum mechanics | Path-conservative methods and stiff source terms | Fluid mechanics and solid mechanics | Viscous compressible fluids and elastic solids | Arbitrary high-order discontinuous Galerkin schemes | ADER–WENO finite volume schemes | ADER-WENO finite volume schemes | ESSENTIALLY NONOSCILLATORY SCHEMES | DISCONTINUOUS GALERKIN METHOD | DIFFUSION-REACTION EQUATIONS | BLOOD-FLOW | PHYSICS, MATHEMATICAL | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | NAVIER-STOKES EQUATIONS | PARTIAL-DIFFERENTIAL-EQUATIONS | SPECTRAL ELEMENT METHOD | GODUNOV-TYPE METHODS | UNSTRUCTURED MESHES | FINITE-VOLUME SCHEMES | Mechanical engineering | Analysis | Differential equations | Computational fluid dynamics | Partial differential equations | Computation | Mathematical analysis | Fluid flow | Mathematical models | Continuum mechanics | Navier-Stokes equations | Mathematics - Numerical Analysis | FLUIDS | STRAINS | CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS | THERMAL CONDUCTION | MATHEMATICAL MODELS | WAVE PROPAGATION | RELAXATION | ASYMPTOTIC SOLUTIONS | FINITE ELEMENT METHOD | ELASTICITY | FLUID MECHANICS | THERMODYNAMICS | FLOW VISUALIZATION | HEAT FLUX

Unified first order hyperbolic formulation of nonlinear continuum mechanics | Path-conservative methods and stiff source terms | Fluid mechanics and solid mechanics | Viscous compressible fluids and elastic solids | Arbitrary high-order discontinuous Galerkin schemes | ADER–WENO finite volume schemes | ADER-WENO finite volume schemes | ESSENTIALLY NONOSCILLATORY SCHEMES | DISCONTINUOUS GALERKIN METHOD | DIFFUSION-REACTION EQUATIONS | BLOOD-FLOW | PHYSICS, MATHEMATICAL | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | NAVIER-STOKES EQUATIONS | PARTIAL-DIFFERENTIAL-EQUATIONS | SPECTRAL ELEMENT METHOD | GODUNOV-TYPE METHODS | UNSTRUCTURED MESHES | FINITE-VOLUME SCHEMES | Mechanical engineering | Analysis | Differential equations | Computational fluid dynamics | Partial differential equations | Computation | Mathematical analysis | Fluid flow | Mathematical models | Continuum mechanics | Navier-Stokes equations | Mathematics - Numerical Analysis | FLUIDS | STRAINS | CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS | THERMAL CONDUCTION | MATHEMATICAL MODELS | WAVE PROPAGATION | RELAXATION | ASYMPTOTIC SOLUTIONS | FINITE ELEMENT METHOD | ELASTICITY | FLUID MECHANICS | THERMODYNAMICS | FLOW VISUALIZATION | HEAT FLUX

Journal Article

Journal of Computational Physics, ISSN 0021-9991, 03/2017, Volume 333, pp. 409 - 413

ADER-WENO methods represent an effective set of techniques for solving hyperbolic systems of PDEs. These systems may be non-conservative and non-homogeneous,...

Eigenvalues | ADER-WENO | Galerkin | Convergence | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | MESHES | PHYSICS, MATHEMATICAL | FINITE-VOLUME SCHEMES

Eigenvalues | ADER-WENO | Galerkin | Convergence | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | MESHES | PHYSICS, MATHEMATICAL | FINITE-VOLUME SCHEMES

Journal Article

International Journal for Numerical Methods in Fluids, ISSN 0271-2091, 12/2014, Volume 76, Issue 10, pp. 737 - 778

SUMMARYIn this paper, we present a class of high‐order accurate cell‐centered arbitrary Lagrangian–Eulerian (ALE) one‐step ADER weighted essentially...

node solvers | Euler equations of compressible gas dynamics | multifluid flows | MHD equations | moving unstructured meshes | relativistic MHD equations (RMHD) | high‐order ADER‐WENO ALE finite volume schemes | cell‐centered direct ALE | Cell-centered direct ALE | Relativistic MHD equations (RMHD) | Moving unstructured meshes | high-order ADER-WENO ALE finite volume schemes | Multifluid flows | Node solvers | HLLC RIEMANN SOLVER | DISCONTINUOUS GALERKIN DISCRETIZATION | TETRAHEDRAL MESHES | PHYSICS, FLUIDS & PLASMAS | ESSENTIALLY NONOSCILLATORY SCHEMES | NONCONSERVATIVE HYPERBOLIC SYSTEMS | FREE-SURFACE FLOWS | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | MECHANICS | CENTERED LAGRANGIAN HYDRODYNAMICS | cell-centered direct ALE | NUMERICAL-SIMULATION | FINITE-VOLUME SCHEMES | EULER EQUATIONS | High-order ADER-WENO ALE finite volume schemes | Fluid dynamics | Beer | Magnetohydrodynamics | Computational fluid dynamics | Partial differential equations | Mathematical analysis | Conservation | Fluid flow | Solvers | Mathematical models

node solvers | Euler equations of compressible gas dynamics | multifluid flows | MHD equations | moving unstructured meshes | relativistic MHD equations (RMHD) | high‐order ADER‐WENO ALE finite volume schemes | cell‐centered direct ALE | Cell-centered direct ALE | Relativistic MHD equations (RMHD) | Moving unstructured meshes | high-order ADER-WENO ALE finite volume schemes | Multifluid flows | Node solvers | HLLC RIEMANN SOLVER | DISCONTINUOUS GALERKIN DISCRETIZATION | TETRAHEDRAL MESHES | PHYSICS, FLUIDS & PLASMAS | ESSENTIALLY NONOSCILLATORY SCHEMES | NONCONSERVATIVE HYPERBOLIC SYSTEMS | FREE-SURFACE FLOWS | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | MECHANICS | CENTERED LAGRANGIAN HYDRODYNAMICS | cell-centered direct ALE | NUMERICAL-SIMULATION | FINITE-VOLUME SCHEMES | EULER EQUATIONS | High-order ADER-WENO ALE finite volume schemes | Fluid dynamics | Beer | Magnetohydrodynamics | Computational fluid dynamics | Partial differential equations | Mathematical analysis | Conservation | Fluid flow | Solvers | Mathematical models

Journal Article

Computer Physics Communications, ISSN 0010-4655, 11/2017, Volume 220, pp. 297 - 318

This paper presents an ADER Discontinuous Galerkin (DG) method on space–time adaptive meshes (AMR) for the solution of two important families of non-linear...

Compressible Navier–Stokes equations | Arbitrary high-order discontinuous Galerkin schemes (ADER-DG) | Time-accurate local time stepping (LTS) | Viscous and resistive MHD equations | Space–time Adaptive Mesh Refinement (AMR) | A posteriori sub-cell ADER-WENO finite-volume limiter (MOOD paradigm) | HERMITE WENO SCHEMES | Space-time Adaptive Mesh Refinement (AMR) | GENERALIZED RIEMANN PROBLEM | ELEMENT-METHOD | HYPERBOLIC SYSTEMS | DISCONTINUOUS GALERKIN METHOD | HIGH-ORDER | PHYSICS, MATHEMATICAL | SOUND GENERATION | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | CONSERVATION-LAWS | UNSTRUCTURED MESHES | FINITE-VOLUME SCHEMES | Compressible Navier-Stokes equations | Fluid dynamics | Differential equations | Electric properties

Compressible Navier–Stokes equations | Arbitrary high-order discontinuous Galerkin schemes (ADER-DG) | Time-accurate local time stepping (LTS) | Viscous and resistive MHD equations | Space–time Adaptive Mesh Refinement (AMR) | A posteriori sub-cell ADER-WENO finite-volume limiter (MOOD paradigm) | HERMITE WENO SCHEMES | Space-time Adaptive Mesh Refinement (AMR) | GENERALIZED RIEMANN PROBLEM | ELEMENT-METHOD | HYPERBOLIC SYSTEMS | DISCONTINUOUS GALERKIN METHOD | HIGH-ORDER | PHYSICS, MATHEMATICAL | SOUND GENERATION | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | CONSERVATION-LAWS | UNSTRUCTURED MESHES | FINITE-VOLUME SCHEMES | Compressible Navier-Stokes equations | Fluid dynamics | Differential equations | Electric properties

Journal Article

Computers and Fluids, ISSN 0045-7930, 06/2018, Volume 169, pp. 380 - 387

Atherosclerosis is an inflammatory disease due to the accumulation of low-density lipoproteins (LDLs) in the arteries wall, with the consequence that plaque is...

Theoretical results | ADER-WENO | Nonlinear models | Finite volume | Numerical solution | Atherosclerosis | WENO SCHEMES | ESSENTIALLY NONOSCILLATORY SCHEMES | DIFFUSION-REACTION EQUATIONS | HIGH-ORDER | ACCURACY | LAWS | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | MECHANICS | SYSTEMS | ARTERY | FINITE-VOLUME SCHEMES | Models | Numerical analysis | Blood lipids | Analysis

Theoretical results | ADER-WENO | Nonlinear models | Finite volume | Numerical solution | Atherosclerosis | WENO SCHEMES | ESSENTIALLY NONOSCILLATORY SCHEMES | DIFFUSION-REACTION EQUATIONS | HIGH-ORDER | ACCURACY | LAWS | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | MECHANICS | SYSTEMS | ARTERY | FINITE-VOLUME SCHEMES | Models | Numerical analysis | Blood lipids | Analysis

Journal Article

Computer Physics Communications, ISSN 0010-4655, 03/2015, Volume 188, pp. 110 - 127

We present a high order one-step ADER–WENO finite volume scheme with space–time adaptive mesh refinement (AMR) for the solution of the special relativistic...

Magnetohydrodynamics | High order ADER–WENO finite volume scheme | Time-accurate local time stepping (LTS) | Space–time adaptive mesh refinement (AMR) | Special relativity | Space-time adaptive mesh refinement (AMR) | ADER-WENO finite volume scheme | High order | EQUATIONS | ESSENTIALLY NONOSCILLATORY SCHEMES | DISCONTINUOUS GALERKIN METHOD | PHYSICS, MATHEMATICAL | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | High order ADER-WENO finite volume scheme | SIMULATIONS | FLOWS | EXACT RIEMANN SOLVER | UNSTRUCTURED MESHES | HYPERBOLIC CONSERVATION-LAWS | FINITE-VOLUME SCHEMES | SHOCK CAPTURING SCHEMES | Mechanical engineering | Algorithms | Wave propagation | Computational fluid dynamics | Mathematical analysis | Fluid flow | Magnetohydrodynamic equations | Hydrodynamics | Mathematical models | Runge-Kutta method | Galerkin methods

Magnetohydrodynamics | High order ADER–WENO finite volume scheme | Time-accurate local time stepping (LTS) | Space–time adaptive mesh refinement (AMR) | Special relativity | Space-time adaptive mesh refinement (AMR) | ADER-WENO finite volume scheme | High order | EQUATIONS | ESSENTIALLY NONOSCILLATORY SCHEMES | DISCONTINUOUS GALERKIN METHOD | PHYSICS, MATHEMATICAL | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | High order ADER-WENO finite volume scheme | SIMULATIONS | FLOWS | EXACT RIEMANN SOLVER | UNSTRUCTURED MESHES | HYPERBOLIC CONSERVATION-LAWS | FINITE-VOLUME SCHEMES | SHOCK CAPTURING SCHEMES | Mechanical engineering | Algorithms | Wave propagation | Computational fluid dynamics | Mathematical analysis | Fluid flow | Magnetohydrodynamic equations | Hydrodynamics | Mathematical models | Runge-Kutta method | Galerkin methods

Journal Article

Computational Astrophysics and Cosmology, ISSN 2197-7909, 12/2016, Volume 3, Issue 1, pp. 1 - 32

We present a new version of conservative ADER-WENO finite volume schemes, in which both the high order spatial reconstruction as well as the time evolution of...

Computational Mathematics and Numerical Analysis | high order WENO reconstruction in primitive variables | ADER-WENO finite volume schemes | hyperbolic conservation laws | AMR | Numeric Computing | ADER discontinuous Galerkin schemes | relativistic hydrodynamics and magnetohydrodynamics | Physics | Astronomy, Astrophysics and Cosmology | Baer-Nunziato model | Reconstruction | Magnetohydrodynamics | Compressibility | Two phase flow | Computational fluid dynamics | Gas dynamics | Fluid flow | Hydrodynamics | Fluxes | Euler-Lagrange equation | Conversion | Relativistic effects | Finite element method | Accuracy | Spacetime | Relativism | Flow control | Evolution | Polynomials | Mathematical models | Hyperbolic systems | Research

Computational Mathematics and Numerical Analysis | high order WENO reconstruction in primitive variables | ADER-WENO finite volume schemes | hyperbolic conservation laws | AMR | Numeric Computing | ADER discontinuous Galerkin schemes | relativistic hydrodynamics and magnetohydrodynamics | Physics | Astronomy, Astrophysics and Cosmology | Baer-Nunziato model | Reconstruction | Magnetohydrodynamics | Compressibility | Two phase flow | Computational fluid dynamics | Gas dynamics | Fluid flow | Hydrodynamics | Fluxes | Euler-Lagrange equation | Conversion | Relativistic effects | Finite element method | Accuracy | Spacetime | Relativism | Flow control | Evolution | Polynomials | Mathematical models | Hyperbolic systems | Research

Journal Article