Monin–Obukhov similarity theory is used in large-eddy simulation (LES) models as a surface boundary condition to predict the surface shear stress and scalar fluxes based on the gradients between the surface and the first grid level above the surface. We outline deficiencies of this methodology, such as the systematical underestimation of the surface shear stress, and propose a modified boundary condition to correct for this issue. The proposed boundary condition is applied to a set of LES for both neutral and stable boundary layers with successively decreasing grid spacing. The results indicate that the proposed boundary condition reliably corrects the surface shear stress and the sensible heat flux, and improves grid convergence of these q...
The atmospheric boundary layer flow downstream of an abrupt rough-to-smooth surface roughness transi...
The performance of the modulated-gradient subgrid-scale (SGS) model is investigated using large-eddy...
Large-eddy simulation (LES) is a well-established numerical technique, which resolves the most energ...
Monin–Obukhov similarity theory is used in large-eddy simulation (LES) models as a surface boundary ...
An important parameterization in large-eddy simulations (LES) of the atmospheric boundary layer is t...
We revisit the longstanding problem of grid sensitivity, i.e., the lack of grid convergence in large...
The von Karmãn constant (k) and the Monin-Obukhov similarity formulation occupy very important posit...
In several recent large-eddy simulation studies, the lowest grid level was located well within the r...
Large-eddy simulations are performed to evaluate the performance of the surface boundary condition d...
In current study, several fundamental and inherent problems in original Deardorff subgrid model are ...
We have identified certain fundamental limitations of a mixing-length parametrization used in a popu...
Results are presented from the first intercomparison of Large-eddy simulation (LES) models for the s...
Large-eddy simulations (LES) are an important tool for investigating the longstanding energy-balance...
A dynamic procedure is developed to compute the model coefficients in the recently introduced modula...
In single column and large-eddy simulation studies of the atmospheric boundary layer, surface sensib...
The atmospheric boundary layer flow downstream of an abrupt rough-to-smooth surface roughness transi...
The performance of the modulated-gradient subgrid-scale (SGS) model is investigated using large-eddy...
Large-eddy simulation (LES) is a well-established numerical technique, which resolves the most energ...
Monin–Obukhov similarity theory is used in large-eddy simulation (LES) models as a surface boundary ...
An important parameterization in large-eddy simulations (LES) of the atmospheric boundary layer is t...
We revisit the longstanding problem of grid sensitivity, i.e., the lack of grid convergence in large...
The von Karmãn constant (k) and the Monin-Obukhov similarity formulation occupy very important posit...
In several recent large-eddy simulation studies, the lowest grid level was located well within the r...
Large-eddy simulations are performed to evaluate the performance of the surface boundary condition d...
In current study, several fundamental and inherent problems in original Deardorff subgrid model are ...
We have identified certain fundamental limitations of a mixing-length parametrization used in a popu...
Results are presented from the first intercomparison of Large-eddy simulation (LES) models for the s...
Large-eddy simulations (LES) are an important tool for investigating the longstanding energy-balance...
A dynamic procedure is developed to compute the model coefficients in the recently introduced modula...
In single column and large-eddy simulation studies of the atmospheric boundary layer, surface sensib...
The atmospheric boundary layer flow downstream of an abrupt rough-to-smooth surface roughness transi...
The performance of the modulated-gradient subgrid-scale (SGS) model is investigated using large-eddy...
Large-eddy simulation (LES) is a well-established numerical technique, which resolves the most energ...