A new hypothesis on the anisotropic reynolds stress tensor for turbulent flows. Volume I, Theoretical background and development of an anisotropic hybrid k-omega shear-stress transport/stochastic turbulence model /
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Author / Creator: | Könözsy, László, author. |
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Imprint: | Cham, Switzerland : Springer, [2019] ©2019 |
Description: | 1 online resource |
Language: | English |
Series: | Fluid mechanics and its applications ; volume 120 Fluid mechanics and its applications ; v. 120. |
Subject: | |
Format: | E-Resource Book |
URL for this record: | http://pi.lib.uchicago.edu/1001/cat/bib/11792814 |
Table of Contents:
- 1 Introduction
- 1.1 Historical Background and Literature Review
- 1.2 Governing Equations of Incompressible Turbulent Flows
- 1.3 Summary
- References
- 2 Theoretical Principles and Galilean Invariance
- 2.1 Introduction
- 2.2 Basic Principles of Advanced Turbulence Modelling
- 2.3 Summary
- References
- 3 The k-w Shear-Stress Transport (SST) Turbulence Model
- 3.1 Introduction
- 3.2 Mathematical Derivations
- 3.3 Governing Equations of the k-w SST Turbulence Model
- 3.4 Summary
- References
- 4 Three-Dimensional Anisotropic Similarity Theory of Turbulent Velocity Fluctuations
- 4.1 Introduction
- 4.2 Similarity Theory of Turbulent Oscillatory Motions
- 4.3 Summary
- References
- 5 A New Hypothesis on the Anisotropic Reynolds Stress Tensor
- 5.1 Introduction
- 5.2 The Anisotropic Reynolds Stress Tensor
- 5.3 An Anisotropic Hybrid k-w SST/STM Closure Model for Incompressible Flows
- 5.4 Governing Equations of the Anisotropic Hybrid k-w SST/STM Closure Model
- 5.5 On the Implementation of the Anisotropic Hybrid k-w SST/STM Turbulence Model
- 5.6 Summary
- References
- Appendices: Additional Mathematical Derivations
- A.1 The Unit Base Vectors of the Fluctuating OrthogonalCoordinate System
- A.2 Galilean Invariance of the Unsteady Fluctuating VorticityTransport Equation
- A.3 The Deviatoric Part of the Similarity Tensor.