An approach to derive turbulent scaling laws based on symmetry analysis is presented. It unifies a large set of scaling laws for the mean velocity of stationary parallel turbulent shear flows. The approach is derived from the Reynolds averaged Navier-Stokes equations, the fluctuation equations, and the velocity product equations, which are the dyad product of the velocity fluctuations with the equations for the velocity fluctuations. For the plane case the results include the logarithmic law of the wall, an algebraic law, the viscous sublayer, the linear region in the centre of a Couette flow and in the centre of a rotating channel flow, and a new exponential mean velocity profile that is found in the mid-wake region of high Reynolds number...
[EN] The calculation of turbulence statistics is considered the key unsolved problem of fluid mechan...
Recent advances in the theory of turbulent solutions of the Navier-Stokes equations are discussed an...
The classical scaling theory of Prandtl, von Kármán and Millikan, based upon the distinction in a wa...
An approach to derive turbulent scaling laws based on symmetry analysis is presented. It unifies a l...
A new turbulence approach based on Lie-group analysis is presented. It unifies a large set of self-s...
The objective is the development of a new theory which enables the algorithmic computation of all se...
A new turbulence theory based on Lie-group analysis is presented. This theory unifies a large set of...
In the present work, scaling laws for special turbulent flow phenomena are investigated using a math...
The Lie group approach developed by Oberlack (1997) is used to derive new scaling laws for high-Reyn...
Investigating the multi-point correlation (MPC) equations for the velocity and pressure fluctuations...
The given thesis is based on the turbulence theory based on Lie group methods, which has been develo...
The objective of this thesis is the analysis of a fully developed, turbulent Poiseuille flow with wa...
First-principle-based prediction of mean-flow quantities of wall-bounded turbulent flows (channel, p...
The classical scaling theory of turbulent parallel flow provides a framework for the description of...
Turbulent shear flows, such as those occurring in the wall region of turbulent boundary layers, show...
[EN] The calculation of turbulence statistics is considered the key unsolved problem of fluid mechan...
Recent advances in the theory of turbulent solutions of the Navier-Stokes equations are discussed an...
The classical scaling theory of Prandtl, von Kármán and Millikan, based upon the distinction in a wa...
An approach to derive turbulent scaling laws based on symmetry analysis is presented. It unifies a l...
A new turbulence approach based on Lie-group analysis is presented. It unifies a large set of self-s...
The objective is the development of a new theory which enables the algorithmic computation of all se...
A new turbulence theory based on Lie-group analysis is presented. This theory unifies a large set of...
In the present work, scaling laws for special turbulent flow phenomena are investigated using a math...
The Lie group approach developed by Oberlack (1997) is used to derive new scaling laws for high-Reyn...
Investigating the multi-point correlation (MPC) equations for the velocity and pressure fluctuations...
The given thesis is based on the turbulence theory based on Lie group methods, which has been develo...
The objective of this thesis is the analysis of a fully developed, turbulent Poiseuille flow with wa...
First-principle-based prediction of mean-flow quantities of wall-bounded turbulent flows (channel, p...
The classical scaling theory of turbulent parallel flow provides a framework for the description of...
Turbulent shear flows, such as those occurring in the wall region of turbulent boundary layers, show...
[EN] The calculation of turbulence statistics is considered the key unsolved problem of fluid mechan...
Recent advances in the theory of turbulent solutions of the Navier-Stokes equations are discussed an...
The classical scaling theory of Prandtl, von Kármán and Millikan, based upon the distinction in a wa...