Abstract Numerical simulations have proved that Variational Multiscale Methods (VMM) perform well as pure numerical large eddy simulation (LES) models. In this paper we focus on the orthogonal subgrid scale (OSS) finite element method and make an analysis of the statistical behavior of its stabilization terms in the quasi static approximation. This is done by resorting to results from classical statistical fluid mechanics concerning two point velocity, pressure and combined correlation functions of various orders. Given a fine enough mesh with characteristic element size h in the inertial subrange of a turbulent flow, it is shown that the rate of transfer of subgrid kinetic energy provided by the OSS stabilization terms does not depend on h...
We analyze the behaviour of several subgrid scale (SGS) models for large eddy simulations (LES) by m...
AbstractWe analyze the behaviour of several subgrid scale (SGS) models for large eddy simulations (L...
Abstract. Variational multiscale methods lead to stable finite element approximations of the Navier-...
In this article we study the approximation to thermal turbulence from a strictly numerical point of ...
Objective: In this article we study the approximation to thermal turbulence from a strictly numerica...
We aim at giving support to the idea that no physical Large Eddy Simulation (LES) model should be us...
In this work we study the performance of some variational multiscale models (VMS) in the large eddy ...
An important open question for Large Eddy Simulation (LES) of turbulent flow is whether the subgrid-...
The variational multiscale method thought as an implicit large eddy simulation model for turbulent f...
This thesis is concerned with one of the most promising approaches to the numerical simulation of tu...
Variational multiscale methods lead to stable finite element approximations of the Navier-Stokes equ...
Variational multiscale methods lead to stable finite element approximations of the Navier-Stokes equ...
The variational multiscale method has been shown to perform well for large-eddy simulation (LES) of ...
Abstract. Variational multiscale methods lead to stable finite element approximations of the Navier–...
A Residual-Based Large-Eddy Simulation (RB-LES) method is developed. This is done by discretizing th...
We analyze the behaviour of several subgrid scale (SGS) models for large eddy simulations (LES) by m...
AbstractWe analyze the behaviour of several subgrid scale (SGS) models for large eddy simulations (L...
Abstract. Variational multiscale methods lead to stable finite element approximations of the Navier-...
In this article we study the approximation to thermal turbulence from a strictly numerical point of ...
Objective: In this article we study the approximation to thermal turbulence from a strictly numerica...
We aim at giving support to the idea that no physical Large Eddy Simulation (LES) model should be us...
In this work we study the performance of some variational multiscale models (VMS) in the large eddy ...
An important open question for Large Eddy Simulation (LES) of turbulent flow is whether the subgrid-...
The variational multiscale method thought as an implicit large eddy simulation model for turbulent f...
This thesis is concerned with one of the most promising approaches to the numerical simulation of tu...
Variational multiscale methods lead to stable finite element approximations of the Navier-Stokes equ...
Variational multiscale methods lead to stable finite element approximations of the Navier-Stokes equ...
The variational multiscale method has been shown to perform well for large-eddy simulation (LES) of ...
Abstract. Variational multiscale methods lead to stable finite element approximations of the Navier–...
A Residual-Based Large-Eddy Simulation (RB-LES) method is developed. This is done by discretizing th...
We analyze the behaviour of several subgrid scale (SGS) models for large eddy simulations (LES) by m...
AbstractWe analyze the behaviour of several subgrid scale (SGS) models for large eddy simulations (L...
Abstract. Variational multiscale methods lead to stable finite element approximations of the Navier-...