DNS 1-6 Statistical Data
Statistical data
In this section the relevant statistical data for the flow around the wing-body junction computed with MIGALE is given. The reported data is the one mentioned in Table 1 of the list of desirable quantities (PDF).
The data is available as:
- In .vtu (ASCII) format for statistical data.
- In .csv (text) format as vertical profiles at various locations.
Volume data
Volumetric data of the statistics are provided here. For more information regarding the stored quantities and the storage format, please refer to the storage format guidelines.
The available files are:
- averaged pressure (59.4 GB).
- averaged velocity x (64.4 GB).
- averaged velocity y (67.8 GB).
- averaged velocity z (67.2 GB).
- Reynolds stress xx (67.7 GB).
- Reynolds stress yx (68.7 GB).
- Reynolds stress yy (68.3 GB).
- Reynolds stress zx (68.7 GB).
- Reynolds stress zy (69.4 GB).
- Reynolds stress zz (67.7 GB).
- Taylor microscale (67.2 GB).
- Kolmogorov length scale (67.1 GB).
- Kolmogorov time scale (67.4 GB).
Surface data
Surface data of the statistics are provided here. For more information regarding the stored quantities and the storage format, please refer to the storage format guidelines.
The available files are:
The pressure coefficient contour on the bottom surface is reported in Fig. 13. Due to the problem geometry, a favourable pressure gradient is generated in front of the wing profile resulting in a reduction of (blue area). This reduction attenuates moving away from the airfoil, but it is still appreciable along the lateral boundaries, i.e., . Accordingly, although small, a blockage effect on the flow due to the lateral boundaries is obtained. As expected for a flow in the incompressible regime (here ), the maximum value of is close to 1.
Fig. 14 shows the time averaged dimensionless wall shear stress distribution on the floor. The favourable pressure gradient in front of the airfoil induces a flow acceleration, which is the main cause of the increase of the wall shear stress. Downstream the wing, in the wake region, the traces of the horseshoe vortexes on the floor can also be observed. Vortices are also clearly visible by the streamlines at selected planes shown in Fig. 15.
Figure 13: Wing-body junction. Contour of pressure coefficient on the bottom surface for |
Figure 14: Wing-body junction. Contour of averaged dimensionless wall shear stress on the bottom surface for |
Figure 15: Wing-body junction. Streamlines at selected planes, i.e., symmetry plane and cross section planes at and , superimposed on contour of averaged dimensionless wall shear stress |
Profile data
Profile data have been extracted from the symmetry plane at different streamwise locations () and made dimensionless with respect to reference quantities (, ). The data stored in each file are:
- vertical location
- average velocity components
- Reynolds stress components
- turbulent kinetic energy
Profiles at selected streamwise locations are reported in Fig. 16.
Figure 16: Wing-body junction. Profiles at symmetry plane at different stremwise locations |
Contour data
Contour data of the averaged velocity components and , the three normal stresses , and , the turbulent kinetic energy , and the shear stress in the symmetry plane are provided in Fig. 17. As the region depicted is in front of the leading edge, it is visible the effect of the horse-shoe vortex: while the streamwise component of the velocity becomes negative above the horizontal solid wall, the normalwise one presents a large negative region close to the leading edge. This results in a clockwise rotating vortex. Within this vortex the Reynolds stresses as well as the turbulent kinetic energy show the maximum intensity. Moreover, looking more in detail, it is possible to notice the presence of a tiny vortex in anticlockwise rotation clinging to the leading edge of the wing, near the wing-body junction. All contours are normalized with respect to the reference quantities.
Figure 17: Wing-body junction. Contours of average velocity compoents, Reynolds normal stresses, turbulent kinetic energy and Reynolds shear stress at symmetry plane |
Contributed by: Francesco Bassi (UNIBG), Alessandro Colombo (UNIBG), Francesco Carlo Massa (UNIBG), Michael Leschziner (ICL/ERCOFTAC), Jean-Baptiste Chapelier (ONERA) — University of Bergamo (UNIBG), ICL (Imperial College London), ONERA
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