Navier-Stokes turbulence : theory and analysis /

Navier-Stokes turbulence : theory and analysis /

Saved in:

Bibliographic Details
Author / Creator:	Kollmann, Wolfgang, 1942- author.
Imprint:	Cham, Switzerland : Springer, [2019] ©2019
Description:	1 online resource (xl, 725 pages) : illustrations (some color)
Language:	English
Subject:	Turbulence. Navier-Stokes equations. Navier-Stokes equations. Turbulence.
Format:	E-Resource Book
URL for this record:	http://pi.lib.uchicago.edu/1001/cat/bib/11998006

Hidden Bibliographic Details
ISBN:	9783030318697 3030318699
Notes:	Includes bibliographical references and index. Online resource; title from PDF title page (SpringerLink, viewed December 2, 2019).
Summary:	The book serves as a core text for graduate courses in advanced fluid mechanics and applied science. It consists of two parts. The first provides an introduction and general theory of fully developed turbulence, where treatment of turbulence is based on the linear functional equation derived by E. Hopf governing the characteristic functional that determines the statistical properties of a turbulent flow. In this section, Professor Kollmann explains how the theory is built on divergence free Schauder bases for the phase space of the turbulent flow and the space of argument vector fields for the characteristic functional. Subsequent chapters are devoted to mapping methods, homogeneous turbulence based upon the hypotheses of Kolmogorov and Onsager, intermittency, structural features of turbulent shear flows and their recognition. Outlines fundamental difficulties and presents several approaches for their analysis and solution; Emphasizes mathematical treatment of turbulent flows and methods for their computation; Reinforces concepts presented with problems to illustrate the theory and to introduce particular examples of turbulent flows such as periodic pipe flow; Includes several versions of the Hopf equation derived in spatial/Eulerian and material/Lagrangean description.
Standard no.:	10.1007/978-3-030-31

Table of Contents:

Introduction
Navier-Stokes equations
Basic properties of turbulent flows
Flow domains and bases
Phase and test function spaces
Probability measure and characteristic functional
Functional differential equations
Characteristic functionals for incompressible turbulent flows
Fdes for the characteristic functionals
Solution of Hopf type equations in the spatial description
The role of the pressure
Properties and construction of Mappings
M(): Single scalar in homogeneous turbulence
M(N): Mappings for velocity-scalar and position-scalar Pdfs
Integral transforms and spectra
Intermittency
Equilibrium theory of Kolmogorov and Onsager
Homogeneous turbulence
Length and time scales
The structure of turbulent ows
Wall-bounded turbulent ows
The limit of in_nite Reynolds number for incompressible uids
Appendix A: Mathematical tools
Appendix B: Example for a measure on a ball in Hilbert space
Appendix C: Scalar and vector bases for periodic pipe ow
Modi_ed Jacobi polynomials Pa;b
n (r)
Orthonormalisation of the modi_ed polynomials Pa;b
n (r)
Test function space Np: Scalar _elds
(i) Bases for the test function space Np
Function spaces: Vector _elds
(i) Construction of a general vector basis
(ii) Construction of a solenoidal vector basis
Gram-Schmidt orthonormalisation
Appendix D: Green's function for periodic pipe ow
Leray version of the Navier-Stokes pdes
Appendix E: Semi-empirical treatment of simple wall-bounded ows
Appendix F: Solutions to problems
Bibliography.