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Mathematical Problems of the Dynamics of Incompressible Fluid on a Rotating Sphere - Yuri N. Skiba

Mathematical Problems of the Dynamics of Incompressible Fluid on a Rotating Sphere

(Autor)

Buch | Softcover
XII, 239 Seiten
2018 | 1. Softcover reprint of the original 1st ed. 2017
Springer International Publishing (Verlag)
978-3-319-88022-8 (ISBN)
CHF 74,85 inkl. MwSt
This book presents selected mathematical problems involving the dynamics of a two-dimensional viscous and ideal incompressible fluid on a rotating sphere. In this case, the fluid motion is completely governed by the barotropic vorticity equation (BVE), and the viscosity term in the vorticity equation is taken in its general form, which contains the derivative of real degree of the spherical Laplace operator.
This work builds a bridge between basic concepts and concrete outcomes by pursuing a rich combination of theoretical, analytical and numerical approaches, and is recommended for specialists developing mathematical methods for application to problems in physics, hydrodynamics, meteorology and geophysics, as well for upper undergraduate or graduate students in the areas of dynamics of incompressible fluid on a rotating sphere, theory of functions on a sphere, and flow stability.

Yuri N. Skiba is a senior researcher at the Center for Atmospheric Sciences, National Autonomous University of Mexico (UNAM), and head of the Mathematical Modeling of Atmospheric Processes group. He holds a PhD in Physics and Mathematics from the Academy of Sciences of the USSR (1979) and a Master in Theoretical Mechanics from the State University of Novosibirsk (1971). He serves as both associate editor and reviewer for several journals. His fields of interest include computational and mathematical modeling, thermodynamic and hydrodynamic modeling, nonlinear fluid dynamics, numerical analysis of PDEs, transport of pollutants, and optimal control of emission rates.

Chapter 01- Introduction.- Chapter 02- Spaces of Functions on a Sphere.- Chapter 03- Solvability of Vorticity Equation on a Sphere.- Chapter 04- Dynamics of Ideal Fluid on a Sphere.- Chapter 05- Stability of Rossby-Haurwitz (RH) Waves.- Chapter 06- Stability of Modons and Wu-Verkley waves.- Chapter 07- Linear and Nonlinear Stability of Flows.- Chapter 08- Numerical Study of Linear Stability.- References.

"The book contains a deep analysis of mathematical problems of two-dimensional dynamics of an ideal liquid on a rotating sphere and some numerical calculations of the related problems. ... This book may be useful for scientists, graduate students, and for all interested in the numerical calculations of dynamics of a liquid on a rotating sphere." (Oleg A. Sinkevich, zbMATH 1391.76003, 2018)

“The book contains a deep analysis of mathematical problems of two-dimensional dynamics of an ideal liquid on a rotating sphere and some numerical calculations of the related problems. … This book may be useful for scientists, graduate students, and for all interested in the numerical calculations of dynamics of a liquid on a rotating sphere.” (Oleg A. Sinkevich, zbMATH 1391.76003, 2018)

Erscheinungsdatum
Zusatzinfo XII, 239 p. 34 illus.
Verlagsort Cham
Sprache englisch
Maße 155 x 235 mm
Gewicht 3869 g
Themenwelt Mathematik / Informatik Mathematik Algebra
Mathematik / Informatik Mathematik Angewandte Mathematik
Naturwissenschaften Physik / Astronomie Theoretische Physik
Technik Umwelttechnik / Biotechnologie
Schlagworte Barotropic vorticity equation • Flow stability • fluid- and aerodynamics • Fluid Dynamics • incompressible fluid • linear stability • M13120 • P19013 • P21026 • Rossby-Haurwitz waves • U24005 • Wu-Verkley waves
ISBN-10 3-319-88022-5 / 3319880225
ISBN-13 978-3-319-88022-8 / 9783319880228
Zustand Neuware
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