Journal of fluid mechanics, ISSN 0022-1120, 03/2016, Volume 791, pp. 464 - 494

.... Validation of the numerical scheme with respect to previous analytic and computational work is provided, with particular attention to the viscosity contrast and the shear...

Papers | complex fluids | drops and bubbles | capsule/cell dynamics | PHYSICS, FLUIDS & PLASMAS | RHEOLOGY | BREAKUP | EXTENSIONAL FLOW | DEFORMATION | MEMBRANE VISCOSITY | MECHANICS | COVERED DROP | VISCOUS DROP | FLUID | DILUTE EMULSIONS | DYNAMICS | Viscosity | Fluid mechanics | Numerical analysis | Shear stresses | Shear | Boussinesq equations | Deformation | Shear flow | Fluid flow | Mathematical models | Droplets | Soft Condensed Matter | Biomechanics | Biological Physics | Computational Physics | Fluid Dynamics | Chemical and Process Engineering | Mechanics | Mechanics of the fluids | Reactive fluid environment | Condensed Matter | Engineering Sciences | Physics

Papers | complex fluids | drops and bubbles | capsule/cell dynamics | PHYSICS, FLUIDS & PLASMAS | RHEOLOGY | BREAKUP | EXTENSIONAL FLOW | DEFORMATION | MEMBRANE VISCOSITY | MECHANICS | COVERED DROP | VISCOUS DROP | FLUID | DILUTE EMULSIONS | DYNAMICS | Viscosity | Fluid mechanics | Numerical analysis | Shear stresses | Shear | Boussinesq equations | Deformation | Shear flow | Fluid flow | Mathematical models | Droplets | Soft Condensed Matter | Biomechanics | Biological Physics | Computational Physics | Fluid Dynamics | Chemical and Process Engineering | Mechanics | Mechanics of the fluids | Reactive fluid environment | Condensed Matter | Engineering Sciences | Physics

Journal Article

Journal of computational physics, ISSN 0021-9991, 1966

Journal

Theoretical and computational fluid dynamics, ISSN 1432-2250, 2018, Volume 32, Issue 3, pp. 371 - 397

Some effects of surface tension on fully nonlinear, long, surface water waves are studied by numerical means. The differences between various solitary waves...

Peakons | Engineering | Serre equations | 74J30 | Classical and Continuum Physics | 35Q35 | 92C35 | Engineering Fluid Dynamics | Surface tension | Computational Science and Engineering | Solitary waves | DERIVATION | PHYSICS, FLUIDS & PLASMAS | BOUSSINESQ SYSTEMS | COLLISIONS | MECHANICS | EVOLUTION | DISPERSIVE MEDIA | PLETHORA | CAPILLARY-GRAVITY WAVES | BOND | MODEL-EQUATIONS | PROPAGATION | Water waves | Usage | Models | Mathematical models | Properties | Methodology | Splines | Surface water waves | Equations | Wave dispersion | Finite element method | Solutions | Surface water | Tension | Runge-Kutta method | Interactions | Computational Physics | Fluid Dynamics | Pattern Formation and Solitons | Analysis of PDEs | Mathematics | Nonlinear Sciences | Classical Physics | Physics | Classical Analysis and ODEs | Atmospheric and Oceanic Physics | Numerical Analysis | Mechanics | Mechanics of the fluids | Exactly Solvable and Integrable Systems

Peakons | Engineering | Serre equations | 74J30 | Classical and Continuum Physics | 35Q35 | 92C35 | Engineering Fluid Dynamics | Surface tension | Computational Science and Engineering | Solitary waves | DERIVATION | PHYSICS, FLUIDS & PLASMAS | BOUSSINESQ SYSTEMS | COLLISIONS | MECHANICS | EVOLUTION | DISPERSIVE MEDIA | PLETHORA | CAPILLARY-GRAVITY WAVES | BOND | MODEL-EQUATIONS | PROPAGATION | Water waves | Usage | Models | Mathematical models | Properties | Methodology | Splines | Surface water waves | Equations | Wave dispersion | Finite element method | Solutions | Surface water | Tension | Runge-Kutta method | Interactions | Computational Physics | Fluid Dynamics | Pattern Formation and Solitons | Analysis of PDEs | Mathematics | Nonlinear Sciences | Classical Physics | Physics | Classical Analysis and ODEs | Atmospheric and Oceanic Physics | Numerical Analysis | Mechanics | Mechanics of the fluids | Exactly Solvable and Integrable Systems

Journal Article

Journal of Scientific Computing, ISSN 0885-7474, 10/2014, Volume 61, Issue 1, pp. 166 - 195

A highly accurate numerical scheme is presented for the Serre system of partial differential equations, which models the propagation of dispersive shallow...

Computational Mathematics and Numerical Analysis | Algorithms | Green–Naghdi equations | Theoretical, Mathematical and Computational Physics | 76B25 | Appl.Mathematics/Computational Methods of Engineering | 76B15 | Traveling waves | 65M30 | Mathematics | Undular bores | Green-Naghdi equations | DERIVATION | MATHEMATICS, APPLIED | SOLITARY WAVE | LONG WAVES | BOUSSINESQ SYSTEMS | KORTEWEG-DE-VRIES | WATER | SCHEMES | Water waves | Analysis | Methods | Fluid Dynamics | Computational Physics | Pattern Formation and Solitons | Analysis of PDEs | Nonlinear Sciences | Sciences of the Universe | Physics | Atmospheric and Oceanic Physics | Numerical Analysis | Computer Science | Mechanics | Mechanics of the fluids | Fluids mechanics | Ocean, Atmosphere | Engineering Sciences | Exactly Solvable and Integrable Systems

Computational Mathematics and Numerical Analysis | Algorithms | Green–Naghdi equations | Theoretical, Mathematical and Computational Physics | 76B25 | Appl.Mathematics/Computational Methods of Engineering | 76B15 | Traveling waves | 65M30 | Mathematics | Undular bores | Green-Naghdi equations | DERIVATION | MATHEMATICS, APPLIED | SOLITARY WAVE | LONG WAVES | BOUSSINESQ SYSTEMS | KORTEWEG-DE-VRIES | WATER | SCHEMES | Water waves | Analysis | Methods | Fluid Dynamics | Computational Physics | Pattern Formation and Solitons | Analysis of PDEs | Nonlinear Sciences | Sciences of the Universe | Physics | Atmospheric and Oceanic Physics | Numerical Analysis | Computer Science | Mechanics | Mechanics of the fluids | Fluids mechanics | Ocean, Atmosphere | Engineering Sciences | Exactly Solvable and Integrable Systems

Journal Article

Theoretical and Computational Fluid Dynamics, ISSN 0935-4964, 2/2013, Volume 27, Issue 1, pp. 177 - 199

The present study is devoted to the problem of tsunami wave generation. The main goal of this work is twofold. First of all, we propose a simple and...

Water waves | Engineering | Moving bottom | Engineering Fluid Dynamics | Co-seismic displacements | Computational Science and Engineering | Tsunami waves | Tsunami generation | Classical Continuum Physics | TENSILE FAULTS | PHYSICS, FLUIDS & PLASMAS | BOUSSINESQ SYSTEMS | BOTTOM | SIMULATION | DEFORMATION | FREE-SURFACE FLOWS | POTENTIAL FLOW | WATER-WAVES | MECHANICS | LONG WAVES | PROPAGATION | Wave-motion, Theory of | Earthquakes | Geophysics | Research | Tsunamis | Properties | France | Fluid dynamics | Waveform analysis | Faults | Boussinesq equations | Mathematical analysis | Underwater | Mathematical models | Euler equations | Seismic phenomena | Computational Physics | Earth Sciences | Fluid Dynamics | Sciences of the Universe | Mathematics | Oceanography | Physics | Atmospheric and Oceanic Physics | Numerical Analysis | Mechanics | Mechanics of the fluids | Fluids mechanics | Ocean, Atmosphere | Engineering Sciences | Environmental Sciences | Global Changes

Water waves | Engineering | Moving bottom | Engineering Fluid Dynamics | Co-seismic displacements | Computational Science and Engineering | Tsunami waves | Tsunami generation | Classical Continuum Physics | TENSILE FAULTS | PHYSICS, FLUIDS & PLASMAS | BOUSSINESQ SYSTEMS | BOTTOM | SIMULATION | DEFORMATION | FREE-SURFACE FLOWS | POTENTIAL FLOW | WATER-WAVES | MECHANICS | LONG WAVES | PROPAGATION | Wave-motion, Theory of | Earthquakes | Geophysics | Research | Tsunamis | Properties | France | Fluid dynamics | Waveform analysis | Faults | Boussinesq equations | Mathematical analysis | Underwater | Mathematical models | Euler equations | Seismic phenomena | Computational Physics | Earth Sciences | Fluid Dynamics | Sciences of the Universe | Mathematics | Oceanography | Physics | Atmospheric and Oceanic Physics | Numerical Analysis | Mechanics | Mechanics of the fluids | Fluids mechanics | Ocean, Atmosphere | Engineering Sciences | Environmental Sciences | Global Changes

Journal Article

Journal of computational physics, ISSN 0021-9991, 2015, Volume 284, pp. 389 - 418

The multislope concept has been recently introduced in the literature to deal with MUSCL reconstructions on triangular and tetrahedral unstructured meshes in...

General unstructured meshes | Multislope MUSCL technique | CFL-dependent limiters | Cell-centered finite volume method | DESIGN | PHYSICS, MATHEMATICAL | FLOW | ACCURACY | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | HIGH-RESOLUTION SCHEMES | CONVERGENCE | LIMITERS | HYPERBOLIC CONSERVATION-LAWS | Specific gravity | Reconstruction | Slopes | Accuracy | Discretization | High density | Mathematical analysis | Mathematical models | Topology | Dealing | Fluid Dynamics | Computational Physics | Astrophysics | Distributed, Parallel, and Cluster Computing | Mathematical Physics | Analysis of PDEs | Mathematics | Plasma Physics | Physics | Mathematical Software | Functional Analysis | Numerical Analysis | Computer Science | Mechanics | Mechanics of the fluids | Reactive fluid environment | Fluids mechanics | Optimization and Control | Plasmas | Engineering Sciences | Other

General unstructured meshes | Multislope MUSCL technique | CFL-dependent limiters | Cell-centered finite volume method | DESIGN | PHYSICS, MATHEMATICAL | FLOW | ACCURACY | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | HIGH-RESOLUTION SCHEMES | CONVERGENCE | LIMITERS | HYPERBOLIC CONSERVATION-LAWS | Specific gravity | Reconstruction | Slopes | Accuracy | Discretization | High density | Mathematical analysis | Mathematical models | Topology | Dealing | Fluid Dynamics | Computational Physics | Astrophysics | Distributed, Parallel, and Cluster Computing | Mathematical Physics | Analysis of PDEs | Mathematics | Plasma Physics | Physics | Mathematical Software | Functional Analysis | Numerical Analysis | Computer Science | Mechanics | Mechanics of the fluids | Reactive fluid environment | Fluids mechanics | Optimization and Control | Plasmas | Engineering Sciences | Other

Journal Article

Physica. D, ISSN 0167-2789, 03/2015, Volume 297, pp. 76 - 87

In this study we examine the energy transfer mechanism during the nonlinear stage of the Modulational Instability (MI) in the modified Korteweg–de Vries (mKdV)...

Modified KdV equation | Modulational instability | NLS equation | Energy cascade | Korteweg–de Vries equation | Korteweg-de Vries equation | MATHEMATICS, APPLIED | PHYSICS, MULTIDISCIPLINARY | PHYSICS, FLUIDS & PLASMAS | STABILITY | DE-VRIES EQUATION | PHYSICS, MATHEMATICAL | EVOLUTION | PERIODIC-WAVES | SPECTRA | WATER | Analysis | Numerical analysis | Fluid Dynamics | Computational Physics | Earth Sciences | Pattern Formation and Solitons | Analysis of PDEs | Geophysics | Nonlinear Sciences | Mathematics | Sciences of the Universe | Physics | General Mathematics | Chaotic Dynamics | Atmospheric and Oceanic Physics | Numerical Analysis | Mechanics | Mechanics of the fluids | General Physics | Fluids mechanics | Engineering Sciences | Exactly Solvable and Integrable Systems | Environmental Sciences | Global Changes

Modified KdV equation | Modulational instability | NLS equation | Energy cascade | Korteweg–de Vries equation | Korteweg-de Vries equation | MATHEMATICS, APPLIED | PHYSICS, MULTIDISCIPLINARY | PHYSICS, FLUIDS & PLASMAS | STABILITY | DE-VRIES EQUATION | PHYSICS, MATHEMATICAL | EVOLUTION | PERIODIC-WAVES | SPECTRA | WATER | Analysis | Numerical analysis | Fluid Dynamics | Computational Physics | Earth Sciences | Pattern Formation and Solitons | Analysis of PDEs | Geophysics | Nonlinear Sciences | Mathematics | Sciences of the Universe | Physics | General Mathematics | Chaotic Dynamics | Atmospheric and Oceanic Physics | Numerical Analysis | Mechanics | Mechanics of the fluids | General Physics | Fluids mechanics | Engineering Sciences | Exactly Solvable and Integrable Systems | Environmental Sciences | Global Changes

Journal Article

Computational mathematics and mathematical physics, ISSN 1555-6662, 1992

Journal

The Journal of Chemical Physics, ISSN 0021-9606, 03/2016, Volume 144, Issue 9, p. 094107

...THE JOURNAL OF CHEMICAL PHYSICS 144, 094107 (2016)
Range-separated time-dependent density-functional theory
with a frequency-dependent second-order Bethe...

CHARGE-TRANSFER EXCITATIONS | ACCURATE | CONFIGURATION-INTERACTION | APPROXIMATION | COMPLEXES | PHYSICS, ATOMIC, MOLECULAR & CHEMICAL | CHEMISTRY, PHYSICAL | FORMALISM | ENERGIES | ELECTRONIC EXCITATIONS | EXCITED-STATES | Time dependence | Correlation | Approximation | Response time | Mathematical analysis | Density functional theory | Excitation | or physical chemistry | Computational Physics | Chemical Physics | Condensed Matter | Chemical Sciences | Physics | Theoretical and | Other | GREEN FUNCTION | ADIABATIC APPROXIMATION | BETHE-SALPETER EQUATION | ETHYLENE | EXCITATION | DENSITY FUNCTIONAL METHOD | INORGANIC, ORGANIC, PHYSICAL AND ANALYTICAL CHEMISTRY | FREQUENCY DEPENDENCE | TIME DEPENDENCE

CHARGE-TRANSFER EXCITATIONS | ACCURATE | CONFIGURATION-INTERACTION | APPROXIMATION | COMPLEXES | PHYSICS, ATOMIC, MOLECULAR & CHEMICAL | CHEMISTRY, PHYSICAL | FORMALISM | ENERGIES | ELECTRONIC EXCITATIONS | EXCITED-STATES | Time dependence | Correlation | Approximation | Response time | Mathematical analysis | Density functional theory | Excitation | or physical chemistry | Computational Physics | Chemical Physics | Condensed Matter | Chemical Sciences | Physics | Theoretical and | Other | GREEN FUNCTION | ADIABATIC APPROXIMATION | BETHE-SALPETER EQUATION | ETHYLENE | EXCITATION | DENSITY FUNCTIONAL METHOD | INORGANIC, ORGANIC, PHYSICAL AND ANALYTICAL CHEMISTRY | FREQUENCY DEPENDENCE | TIME DEPENDENCE

Journal Article

Journal of non-Newtonian fluid mechanics, ISSN 0377-0257, 2010, Volume 165, Issue 7, pp. 394 - 408

Extrusion tests were performed by forcing a well-characterized model yield stress fluid from a cylindrical cartridge through various cylindrical extrusion dies...

Simulation | MRI | Yield stress | Herschel–Bulkley | Axisymmetric contraction | Herschel-Bulkley | VISCOELASTIC FLOW | SQUEEZE FLOW | CONTRACTION RATIO | RHEOLOGICAL BEHAVIOR | PREDICTION | MECHANICS | PASTE EXTRUSION | ENTRY FLOW | MAGNETIC-RESONANCE | HERSCHEL-BULKLEY FLUIDS | NUMERICAL-SIMULATION | Pistons | Fluids | Computational fluid dynamics | Computer simulation | Extrusion dies | Fluid flow | Extrusion | Mathematical models | Soft Condensed Matter | Instrumentation and Detectors | Computational Physics | Condensed Matter | Physics | Signal and Image processing | Chemical Physics | Chemical and Process Engineering | Computer Science | Mechanics | Mechanics of the fluids | Fluids mechanics | Engineering Sciences

Simulation | MRI | Yield stress | Herschel–Bulkley | Axisymmetric contraction | Herschel-Bulkley | VISCOELASTIC FLOW | SQUEEZE FLOW | CONTRACTION RATIO | RHEOLOGICAL BEHAVIOR | PREDICTION | MECHANICS | PASTE EXTRUSION | ENTRY FLOW | MAGNETIC-RESONANCE | HERSCHEL-BULKLEY FLUIDS | NUMERICAL-SIMULATION | Pistons | Fluids | Computational fluid dynamics | Computer simulation | Extrusion dies | Fluid flow | Extrusion | Mathematical models | Soft Condensed Matter | Instrumentation and Detectors | Computational Physics | Condensed Matter | Physics | Signal and Image processing | Chemical Physics | Chemical and Process Engineering | Computer Science | Mechanics | Mechanics of the fluids | Fluids mechanics | Engineering Sciences

Journal Article

Computational Mathematics and Mathematical Physics, ISSN 0965-5425, 2/2013, Volume 53, Issue 2, pp. 221 - 236

Computational Mathematics and Mathematical Physics 53, 2 (2013)
221-236 Geometric discretizations that preserve certain Hamiltonian structures at the
discrete level has been proven to enhance the accuracy of numerical schemes...

pseudo-spectral methods | Korteweg-de Vries equation | Hamiltonian structures | Computational Mathematics and Numerical Analysis | wave turbulence | symplectic and multi-symplectic schemes | Mathematics | geometric numerical schemes | MATHEMATICS, APPLIED | BACKWARD ERROR ANALYSIS | MULTISYMPLECTIC GEOMETRY | INVARIANTIZATION | SIMULATION | PHYSICS, MATHEMATICAL | DISTRIBUTIONS | SOLITONS | EVOLUTION | DYNAMICS | INTEGRATORS | Turbulence | Analysis | Green technology | Studies | Geometry | Mathematical models | Computational mathematics | Partial differential equations | Physics | Nonlinear dynamics | Accuracy | Discretization | Computation | Mathematical analysis | Preserves | Nonlinearity

pseudo-spectral methods | Korteweg-de Vries equation | Hamiltonian structures | Computational Mathematics and Numerical Analysis | wave turbulence | symplectic and multi-symplectic schemes | Mathematics | geometric numerical schemes | MATHEMATICS, APPLIED | BACKWARD ERROR ANALYSIS | MULTISYMPLECTIC GEOMETRY | INVARIANTIZATION | SIMULATION | PHYSICS, MATHEMATICAL | DISTRIBUTIONS | SOLITONS | EVOLUTION | DYNAMICS | INTEGRATORS | Turbulence | Analysis | Green technology | Studies | Geometry | Mathematical models | Computational mathematics | Partial differential equations | Physics | Nonlinear dynamics | Accuracy | Discretization | Computation | Mathematical analysis | Preserves | Nonlinearity

Journal Article

2017, ISBN 9813200219, xviii, 292 pages

"This book is divided into two parts. In the first part we give an elementary introduction to computational physics consisting of 21 simulations which originated from a formal course of lectures and laboratory simulations delivered...

Monte Carlo method | Data processing | Physics | Mathematical physics

Monte Carlo method | Data processing | Physics | Mathematical physics

Book

Journal of computational physics, ISSN 0021-9991, 11/2013, Volume 252, pp. 275 - 289

In isogeometric analysis, parameterization of computational domain has great effects as mesh generation in finite element analysis...

Isogeometric analysis | Harmonic mapping | Variational method | Grid generation |

Isogeometric analysis | Harmonic mapping | Variational method | Grid generation |