Vorticity and Incompressible Flow [ electronic resource ] / by Andrew J. Majda and Andrea L. Bertozzi.
By: Majda, Andrew J.
Contributor(s): Bertozzi, Andrea L [joint author].
Material type: TextSeries: Cambridge Texts in Applied Mathematics (27). Publisher: Cambridge : Cambridge University Press , 2010ISBN: 9780511613203 ( e-book ).Subject(s): Mathematical Modeling and Methods | Fluid Dynamics and Solid Mechanics | Mathematical Physics | Differential and Integral Equations | Dynamical Systems and Control TheoryGenre/Form: Electronic booksDDC classification: 532.059 Online resources: https://doi.org/10.1017/CBO9780511613203 View to click Summary: This book is a comprehensive introduction to the mathematical theory of vorticity and incompressible flow ranging from elementary introductory material to current research topics. While the contents center on mathematical theory, many parts of the book showcase the interaction between rigorous mathematical theory, numerical, asymptotic, and qualitative simplified modeling, and physical phenomena. The first half forms an introductory graduate course on vorticity and incompressible flow. The second half comprises a modern applied mathematics graduate course on the weak solution theory for incompressible flow.Item type | Current location | Call number | Status | Date due | Barcode |
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E-Book | WWW | 532.059 MAJ/V (Browse shelf) | Available | EB131 |
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532.0533 LU/I Introduction to the mechanics of viscous fluids / | 532.0533 OCK/V Viscous flow / | 532.0535 GHO/I An introduction to the theory of comprssible fluids / | 532.059 MAJ/V Vorticity and Incompressible Flow [ electronic resource ] / | 532.059 SAF/V Vortex dynamics / | 532.2 RAH/H Hydrostatics / | 532.5 CHA/H Hydrodynamic andhydromagnetic stability / |
This book is a comprehensive introduction to the mathematical theory of vorticity and incompressible flow ranging from elementary introductory material to current research topics. While the contents center on mathematical theory, many parts of the book showcase the interaction between rigorous mathematical theory, numerical, asymptotic, and qualitative simplified modeling, and physical phenomena. The first half forms an introductory graduate course on vorticity and incompressible flow. The second half comprises a modern applied mathematics graduate course on the weak solution theory for incompressible flow.
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