The Lie group approach developed by Oberlack (1997) is used to derive new scaling laws for high-Reynolds-number turbulent pipe flows. The scaling laws, or, in the methodology of Lie groups, the invariant solutions, are based on the mean and fluctuation momentum equations. For their derivation no assumptions other than similarity of the Navier Stokes equations have been introduced where the Reynolds decomposition into the mean and fluctuation quantities has been implemented. The set of solutions for the axial mean velocity includes a logarithmic scaling law, which is distinct from the usual law of the wall, and an algebraic scaling law. Furthermore, an algebraic scaling law for the azimuthal mean velocity is obtained. In all scaling laws the...
The streamwise velocity component in turbulent pipe flow is assessed to determine whether it exhibit...
Direct numerical simulations of turbulent pipe flow involving friction Reynolds numbers of Reτ=180,3...
The objective is the development of a new theory which enables the algorithmic computation of all se...
The Lie group approach developed by Oberlack (1997) is used to derive new scaling laws for high-Reyn...
A new turbulence approach based on Lie-group analysis is presented. It unifies a large set of self-s...
An approach to derive turbulent scaling laws based on symmetry analysis is presented. It unifies a l...
In the present work, scaling laws for special turbulent flow phenomena are investigated using a math...
A new turbulence theory based on Lie-group analysis is presented. This theory unifies a large set of...
A direct numerical simulation of turbulent pipe flow is performed at Ret = 3008 with a long streamwi...
First-principle-based prediction of mean-flow quantities of wall-bounded turbulent flows (channel, p...
The objective of this thesis is the analysis of a fully developed, turbulent Poiseuille flow with wa...
The given thesis is based on the turbulence theory based on Lie group methods, which has been develo...
Direct numerical simulations of turbulent pipe flow in a flow domain of length L = 42R, friction Rey...
A three-layer asymptotic structure for turbulent pipe flow is proposed, revealing in terms of interm...
The scaling in the overlap region of turbulent wall-bounded flows has long been the source of contro...
The streamwise velocity component in turbulent pipe flow is assessed to determine whether it exhibit...
Direct numerical simulations of turbulent pipe flow involving friction Reynolds numbers of Reτ=180,3...
The objective is the development of a new theory which enables the algorithmic computation of all se...
The Lie group approach developed by Oberlack (1997) is used to derive new scaling laws for high-Reyn...
A new turbulence approach based on Lie-group analysis is presented. It unifies a large set of self-s...
An approach to derive turbulent scaling laws based on symmetry analysis is presented. It unifies a l...
In the present work, scaling laws for special turbulent flow phenomena are investigated using a math...
A new turbulence theory based on Lie-group analysis is presented. This theory unifies a large set of...
A direct numerical simulation of turbulent pipe flow is performed at Ret = 3008 with a long streamwi...
First-principle-based prediction of mean-flow quantities of wall-bounded turbulent flows (channel, p...
The objective of this thesis is the analysis of a fully developed, turbulent Poiseuille flow with wa...
The given thesis is based on the turbulence theory based on Lie group methods, which has been develo...
Direct numerical simulations of turbulent pipe flow in a flow domain of length L = 42R, friction Rey...
A three-layer asymptotic structure for turbulent pipe flow is proposed, revealing in terms of interm...
The scaling in the overlap region of turbulent wall-bounded flows has long been the source of contro...
The streamwise velocity component in turbulent pipe flow is assessed to determine whether it exhibit...
Direct numerical simulations of turbulent pipe flow involving friction Reynolds numbers of Reτ=180,3...
The objective is the development of a new theory which enables the algorithmic computation of all se...