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1. Navier-Stokes equations
: theory and numerical analysis
by Temam, Roger
1977, Studies in mathematics and its applications, ISBN 0720428408, Volume 2., x, 500
Navier-Stokes equations
Book
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2. Full Text Navier-Stokes Equations : An Introduction with Applications
by Łukaszewicz, Grzegorz and Kalita, Piotr
04/2016, Advances in mechanics and mathematics, ISBN 3319277588, Volume 34, 395
This volume is devoted to the study of the Navier-Stokes equations, providing a comprehensive reference for a range of applications: from advanced... 
Hydraulic engineering | Navier-Stokes equations
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3. The Navier-Stokes equations
: a classification of flows and exact solutions
by Drazin, P. G and Riley, N. (Norman) and London Mathematical Society
2006, London Mathematical Society lecture note series, ISBN 9780521681629, Volume 334, x, 196
The Navier-Stokes equations were firmly established in the 19th Century as the system of nonlinear partial differential equations which describe the motion of... 
Navier-Stokes equations
Book
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4. Recent advances in harmonic analysis and partial differential equations
: AMS special sessions, March 12-13, 2011, Statesboro, Georgia : the JAMI Conference, March 21-25, 2011, Baltimore, Maryland
by Nahmod, Andrea R., 1964 and American Mathematical Society sponsoring body
2012, Volume 581.
Differential equations, Partial | Harmonic analysis
Conference Proceeding
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5. Nonlinear symmetries and nonlinear equations
by Gaeta, Giuseppe, 1959
1994, Mathematics and its applications, ISBN 079233048X, Volume 299., xix, 258
Nonlinear theories | Differential equations, Nonlinear | Mathematical physics | Symmetry
Book
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6. Full Text The Three-Dimensional Navier–Stokes Equations
: Classical Theory
by Robinson, James C and Rodrigo, José L and Sadowski, Witold
09/2016, Cambridge studies in advanced mathematics, ISBN 9781107019669, Volume 157, 467
A rigorous but accessible introduction to the mathematical theory of the three-dimensional Navier–Stokes equations, this book provides self-contained proofs of... 
Navier-Stokes equations
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7. Full Text A conservative, weakly nonlinear semi-implicit finite volume scheme for the compressible Navier−Stokes equations with general equation of state
by Dumbser, Michael and Casulli, Vincenzo
Applied Mathematics and Computation, ISSN 0096-3003, 01/2016, Volume 272, pp. 479 - 497
In the present paper a new efficient semi-implicit finite volume method is proposed for the solution of the compressible Euler and Navier Stokes equations of... 
Staggered semi-implicit finite volume method | Large time steps | General equation of state (EOS) | Compressible Euler and Navier[formula omitted]Stokes equations | All Mach number flow solver | Mildly nonlinear system | Compressible Euler and Navier-Stokes equations | INCOMPRESSIBLE-FLOW | HLLC RIEMANN SOLVER | MATHEMATICS, APPLIED | THERMODYNAMIC PROPERTIES | DISCONTINUOUS GALERKIN METHOD | DIFFERENCE-SCHEMES | SHALLOW-WATER EQUATIONS | GODUNOV-TYPE SCHEMES | GAS-DYNAMICS | MAGNETOHYDRODYNAMIC FLOWS | Staggered semi implicit finite volume method | UNSTRUCTURED MESHES | Fluid dynamics | Algorithms | Mechanical engineering
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8. Harmonic analysis method for nonlinear evolution equations, I
by Wang, Baoxiang
2011, ISBN 9789814360739, xiv, 283
Book
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9. Regularity results for nonlinear elliptic systems and applications
by Bensoussan, Alain and Frehse, J. (Jens)
2002, Applied mathematical sciences, ISBN 9783540677567, Volume 151, xii, 440
Differential equations, Elliptic | Differential equations, Nonlinear | Numerical solutions
Book
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10. Exponential attractors for dissipative evolution equations
by Eden, A
1994, Recherches en mathematiques appliquées., ISBN 9780471952237, viii, 182
Differential equations, Partial | Differentiable dynamical systems | Numerical solutions | Evolution equations, Nonlinear
Book
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11. Regularity problem for quasilinear elliptic and parabolic systems
by Koshelev, A. I
1995, Lecture notes in mathematics, ISBN 3540602518, Volume 1614., xxi, 255
Differential equations, Elliptic | Differential equations, Parabolic | Numerical solutions
Book
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12. Numerical methods for singularly perturbed differential equations
: convection-diffusion and flow problems
by Roos, Hans-Görg and Stynes, M and Tobiska, L
1996, Springer series in computational mathematics, ISBN 9783540607182, Volume 24., xvi, 348
Perturbation (Mathematics) | Numerical solutions | Differential equations
Book
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13. Full Text Vanishing Viscosity Limit of the Navier–Stokes Equations to the Euler Equations for Compressible Fluid Flow with Vacuum
by Geng, Yongcai and Li, Yachun and Zhu, Shengguo
Archive for Rational Mechanics and Analysis, ISSN 0003-9527, 11/2019, Volume 234, Issue 2, pp. 727 - 775
We establish the vanishing viscosity limit of the Navier–Stokes equations to the Euler equations for three-dimensional compressible isentropic flow in the... 
Physics, general | Fluid- and Aerodynamics | Theoretical, Mathematical and Computational Physics | Complex Systems | Physics | Classical Mechanics | DERIVATION | EXISTENCE | MATHEMATICS, APPLIED | MECHANICS | MODELS | CLASSICAL-SOLUTIONS | KORTEWEG | SHALLOW-WATER EQUATIONS | Viscosity | Three dimensional flow | Fluid dynamics | Mathematical analysis | Fluid flow | Inviscid flow | Euler-Lagrange equation | Navier-Stokes equations | Compressible fluids | Viscous flow
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14. Navier-Stokes equations in planar domains
by Ben-Artzi, Matania, 1948 and Fishelov, Dalia and Croisille, Jean-Pierre, 1961
2013, ISBN 1848162758, xii, 302
Navier-Stokes equations
Book
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15. Compressible Navier-Stokes equations
: a study of leading edge effects
by Hariharan, S. I and Karbhari, P. R and ICASE
1987, 24
Leading edges | Navier-Stokes equation
Book
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16. Full Text On the Weak Solutions to the Maxwell–Landau–Lifshitz Equations and to the Hall–Magneto–Hydrodynamic Equations
by Dumas, Eric and Sueur, Franck
Communications in Mathematical Physics, ISSN 0010-3616, 9/2014, Volume 330, Issue 3, pp. 1179 - 1225
In this paper we deal with weak solutions to the Maxwell–Landau–Lifshitz equations and to the Hall–Magneto–Hydrodynamic equations. First we prove that these... 
Quantum Physics | Statistical Physics, Dynamical Systems and Complexity | Mathematical Physics | Classical and Quantum Gravitation, Relativity Theory | Theoretical, Mathematical and Computational Physics | Physics | EXISTENCE | NONUNIQUENESS | INCOMPRESSIBLE EULER | NAVIER-STOKES EQUATIONS | CONSERVATION | DIMENSION | IDEAL HYDRODYNAMICS | ENERGY-DISSIPATION | PHYSICS, MATHEMATICAL | EULER EQUATIONS | CONJECTURE | Mathematics - Analysis of PDEs | Analysis of PDEs | Mathematics
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17. Full Text On the time-fractional Navier–Stokes equations
by Zhou, Yong and Peng, Li
Computers and Mathematics with Applications, ISSN 0898-1221, 03/2017, Volume 73, Issue 6, pp. 874 - 891
This paper is concerned with the Navier–Stokes equations with time-fractional derivative of order . This type of equations can be used to simulate anomalous... 
Navier–Stokes equations | Mittag-Leffler functions | Mild solutions | Caputo fractional derivative | Regularity | EXISTENCE | MATHEMATICS, APPLIED | EXTERIOR DOMAINS | SPACES | CAUCHY-PROBLEM | Navier-Stokes equations | Fluid dynamics
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18. Attractors for semigroups and evolution equations
by Ladyzhenskai͡a, O. A. (Olʹga Aleksandrovna)
1991, Lezioni lincee., ISBN 052139922X, xi, 73
Semigroups | Metric spaces | Evolution equations
Book
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19. Quantized partial differential equations
by Prastaro, Agostino
2004, ISBN 9812387641, xiii, 485
Book
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20. Full Text Practical splitting methods for the adaptive integration of nonlinear evolution equations. Part II: Comparisons of local error estimation and step-selection strategies for nonlinear Schrödinger and wave equations
by Auzinger, Winfried and Březinová, Iva and Hofstätter, Harald and Koch, Othmar and Quell, Michael
Computer Physics Communications, ISSN 0010-4655, 01/2019, Volume 234, pp. 55 - 71
We compare the practical performance of adaptive splitting methods for the solution of nonlinear Schrödinger equations. Different methods for local error... 
Splitting methods | Embedded methods | Nonlinear Schrödinger equations | Adaptive step-size selection | Local error estimators | Defect-based methods | NUMERICAL-METHODS | PITAEVSKII EQUATIONS | CONVERGENCE ANALYSIS | ACCURATE | PHYSICS, MATHEMATICAL | Nonlinear Schrodinger equations | HERMITE-PSEUDOSPECTRAL-METHOD | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | NAVIER-STOKES EQUATIONS | NONUNIFORM FFT | DYNAMICS | CONSERVATION-LAWS | SCHEMES
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