This report presents the mathematical foundation of approximate deconvolution LES models together with the model phenomenology downstream of the theory. This mathematical foundation now begins to be complete for the incompressible Navier–Stokes equations. It is built upon averaging, deconvolving and addressing closure so as to obtain the physically correct energy and helicity balances in the LES model. We show how this is determined and how correct energy balance implies correct prediction of turbulent statistics. Interestingly, the approach is simple and thus gives a road map to develop models for more complex turbulent flows. We illustrate this herein for the case of MHD turbulence.https://nsuworks.nova.edu/cnso_math_facbooks/1010/thumbna...
International audienceWe first outline the procedure of averaging the incompressible Navier-Stokes e...
We consider the case of a homogeneous, isotropic, fully developed, turbulent flow. We show analytica...
AbstractThis article shows that so called general Green–Taylor solutions, also called Taylor solutio...
This report presents the mathematical foundation of approximate deconvolution LES models together wi...
Summary. This report presents the mathematical foundation of approximate deconvolution LES models to...
Turbulence appears in many processes in the nature and it is connected with many engineering, biophy...
This volume presents a mathematical development of a recent approach to the modeling and simulation ...
AbstractThe conservation of mass, momentum, energy, helicity, and enstrophy in fluid flow are import...
AbstractWe apply the phenomenology of homogeneous, isotropic turbulence to the family of approximate...
This thesis is a study of physical fidelity in turbulence modeling. We first consider conservation l...
We propose a model for magnetohydrodynamic flows at high Reynolds and magnetic Reynolds numbers. The...
In this report, we present several results in the theory of α -models of turbulence with improv...
This thesis is concerned with the derivation and mathematical analysis of new turbulencemodels, base...
Fluid motion and its richness of detail are described by theNavier-Stokes equations. Most of the num...
We propose a new family of models for uid ows at high Reynolds numbers, large eddy simulation with c...
International audienceWe first outline the procedure of averaging the incompressible Navier-Stokes e...
We consider the case of a homogeneous, isotropic, fully developed, turbulent flow. We show analytica...
AbstractThis article shows that so called general Green–Taylor solutions, also called Taylor solutio...
This report presents the mathematical foundation of approximate deconvolution LES models together wi...
Summary. This report presents the mathematical foundation of approximate deconvolution LES models to...
Turbulence appears in many processes in the nature and it is connected with many engineering, biophy...
This volume presents a mathematical development of a recent approach to the modeling and simulation ...
AbstractThe conservation of mass, momentum, energy, helicity, and enstrophy in fluid flow are import...
AbstractWe apply the phenomenology of homogeneous, isotropic turbulence to the family of approximate...
This thesis is a study of physical fidelity in turbulence modeling. We first consider conservation l...
We propose a model for magnetohydrodynamic flows at high Reynolds and magnetic Reynolds numbers. The...
In this report, we present several results in the theory of α -models of turbulence with improv...
This thesis is concerned with the derivation and mathematical analysis of new turbulencemodels, base...
Fluid motion and its richness of detail are described by theNavier-Stokes equations. Most of the num...
We propose a new family of models for uid ows at high Reynolds numbers, large eddy simulation with c...
International audienceWe first outline the procedure of averaging the incompressible Navier-Stokes e...
We consider the case of a homogeneous, isotropic, fully developed, turbulent flow. We show analytica...
AbstractThis article shows that so called general Green–Taylor solutions, also called Taylor solutio...