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A New new hypothesis on the anisotro...

Konozsy, Laszlo.

A New 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

Record Type:	Electronic resources : Monograph/item
Title/Author:	A New new hypothesis on the anisotropic reynolds stress tensor for turbulent flows.by Laszlo Konozsy.
remainder title:	Theoretical background and development of an anisotropic hybrid k-omega shear-stress transport/Stochastic Turbulence Model
Author:	Konozsy, Laszlo.
Published:	Cham :Springer International Publishing :2019.
Description:	xvii, 141 p. :ill., digital ;24 cm.
Contained By:	Springer eBooks
Subject:	TurbulenceMathematical models.
Online resource:	https://doi.org/10.1007/978-3-030-13543-0
ISBN:	9783030135430$q(electronic bk.)

A New 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
Konozsy, Laszlo.

A New 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[electronic resource] /Theoretical background and development of an anisotropic hybrid k-omega shear-stress transport/Stochastic Turbulence Modelby Laszlo Konozsy. - Cham :Springer International Publishing :2019. - xvii, 141 p. :ill., digital ;24 cm. - Fluid mechanics and its applications,v.1200926-5112 ;. - Fluid mechanics and its applications ;v.98..

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.

This book gives a mathematical insight--including intermediate derivation steps--into engineering physics and turbulence modeling related to an anisotropic modification to the Boussinesq hypothesis (deformation theory) coupled with the similarity theory of velocity fluctuations. Through mathematical derivations and their explanations, the reader will be able to understand new theoretical concepts quickly, including how to put a new hypothesis on the anisotropic Reynolds stress tensor into engineering practice. The anisotropic modification to the eddy viscosity hypothesis is in the center of research interest, however, the unification of the deformation theory and the anisotropic similarity theory of turbulent velocity fluctuations is still missing from the literature. This book brings a mathematically challenging subject closer to graduate students and researchers who are developing the next generation of anisotropic turbulence models. Indispensable for graduate students, researchers and scientists in fluid mechanics and mechanical engineering.

ISBN: 9783030135430$q(electronic bk.)

Standard No.: 10.1007/978-3-030-13543-0doiSubjects--Topical Terms:

197021
Turbulence
--Mathematical models.

LC Class. No.: TA357.5.T87 / K865 2019

Dewey Class. No.: 532.0527015118

A New 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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505 0 $a 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.
520 $a This book gives a mathematical insight--including intermediate derivation steps--into engineering physics and turbulence modeling related to an anisotropic modification to the Boussinesq hypothesis (deformation theory) coupled with the similarity theory of velocity fluctuations. Through mathematical derivations and their explanations, the reader will be able to understand new theoretical concepts quickly, including how to put a new hypothesis on the anisotropic Reynolds stress tensor into engineering practice. The anisotropic modification to the eddy viscosity hypothesis is in the center of research interest, however, the unification of the deformation theory and the anisotropic similarity theory of turbulent velocity fluctuations is still missing from the literature. This book brings a mathematically challenging subject closer to graduate students and researchers who are developing the next generation of anisotropic turbulence models. Indispensable for graduate students, researchers and scientists in fluid mechanics and mechanical engineering.
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