Description AC1-09: Difference between revisions
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edge. | edge. | ||
For this test case, the NASA delta wing geometry of Chu and Luckring (1996) with | For this test case, the NASA delta wing geometry of [[Description_AC1-09#3|Chu and Luckring (1996)]] | ||
a sharp leading edge and a leading-edge sweep angle of | with a sharp leading edge and a leading-edge sweep angle of <math>{65^\circ}</math> is considered. | ||
This geometry was also used in the Second International Vortex Flow Experiment | This geometry was also used in the Second International Vortex Flow Experiment | ||
(VFE-2, | (VFE-2, http://www.dlr.de/as/VFE-2). A large set of experiments and | ||
numerical results is available, see the Summary Report of the NATO RTO Task | numerical results is available, see the Summary Report of the NATO RTO Task | ||
Group AVT-113 (RTO TR-AVT-113, chapter 17--34, 2009). The most detailed | Group AVT-113 ([[Description_AC1-09#1|RTO TR-AVT-113, chapter 17--34, 2009]]). The most detailed | ||
experiments within VFE-2 are the experiments of TU München (Furman and | experiments within VFE-2 are the experiments of TU München ([[Description_AC1-09#4|Furman and | ||
Breitsamter, 2008 and 2009), which include steady and unsteady measurements of | Breitsamter, 2008 and 2009]]), which include steady and unsteady measurements of | ||
pressure and velocity. These experiments of TU München are considered here. | pressure and velocity. These experiments of TU München are considered here. | ||
In the EU-project ATAAC | In the EU-project ATAAC<ref>{ATAAC project (Advanced Turbulence Simulation for Aerodynamic | ||
Application Challenges), funded by the European Union under Grant Agreement | |||
Application Challenges) funded by the European Union under Grant Agreement | no.~233710</ref> | ||
no.~233710 | |||
CFD computations were performed belonging to the family of Detached Eddy | CFD computations were performed belonging to the family of Detached Eddy | ||
Simulation (DES). DES is a hybrid RANS--LES approach in which the attached | Simulation (DES). DES is a hybrid RANS--LES approach in which the attached | ||
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development of shear-layer instabilities and full 3D turbulence. | development of shear-layer instabilities and full 3D turbulence. | ||
In the EU-project DESider | In the EU-project DESider<ref>DESider project (Detached Eddy Simulation for Industrial Aerodynamics) | ||
funded by the European Union under Contract No.~AST3-CT-2003-50284 of the | funded by the European Union under Contract No.~AST3-CT-2003-50284 of the | ||
European Commission | European Commission</ref> | ||
(Haase | ([[Description_AC1-09#6|Haase ''et al.'', 2007]]), DES and SAS computations were performed for the | ||
vortex breakdown above a delta wing with a sharp leading edge (Ceresola, 2009). | vortex breakdown above a delta wing with a sharp leading edge ([[Description_AC1-09#2|Ceresola, 2009]]). | ||
A different wing with a higher leading-edge sweep ( | A different wing with a higher leading-edge sweep (<math>{76^\circ}</math>) was used. | ||
Satisfactory results were obtained for the time-averaged quantities, in | Satisfactory results were obtained for the time-averaged quantities, in | ||
particular in terms of the location of the vortex breakdown and the strength of | particular in terms of the location of the vortex breakdown and the strength of | ||
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suggested to employ a more isotropic grid in the area of the primary vortex. | suggested to employ a more isotropic grid in the area of the primary vortex. | ||
This suggestion has been followed here. | This suggestion has been followed here. | ||
<references/> | |||
==Relevance to Industrial Sector== | ==Relevance to Industrial Sector== | ||
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The parameters used to judge the CFD computations are | The parameters used to judge the CFD computations are | ||
*the time-averaged pressure coefficient <math>{\langle C_p \rangle}</math> and the root-mean-square (RMS) value of the pressure coefficient <math>{C_{p,\text{rms}} = ( \langle C_p^2 \rangle - \langle C_p \rangle^2 )^{1/2}}</math>, both at the wing surface, with the instantaneous pressure coefficient given by <math>{C_p = (p - p_\infty) / (\frac{1}{2}\rho_\infty u_\infty^2)}</math>, | |||
*the dimensionless time-averaged velocity vector <math>{\langle \vec{u} \rangle / u_\infty}</math> at several wing cross sections, and | |||
the time-averaged pressure coefficient | *the dimensionless resolved turbulent kinetic energy <math>{k / u_\infty^2 = \frac{1}{2} (\langle |\vec{u}|^2 \rangle - | \langle\vec{u}\rangle |^2) / u_\infty^2}</math> at several wing cross sections, | ||
root-mean-square (RMS) value of the pressure coefficient | with the brackets <math>{\langle f \rangle}</math> indicating the time average of <math>{f}</math>. | ||
= ( \langle C_p^2 \rangle - \langle C_p \rangle^2 )^{1/2} | |||
surface, with the instantaneous pressure coefficient given by | |||
p_\infty) / (\frac{1}{2}\rho_\infty u_\infty^2) | |||
the dimensionless time-averaged velocity vector | |||
u_\infty | |||
the dimensionless resolved turbulent kinetic energy | |||
\frac{1}{2} (\langle |\vec{u}|^2 \rangle - | \langle\vec{u}\rangle |^2) / | |||
u_\infty^2 | |||
with the brackets | |||
==Flow Domain Geometry== | ==Flow Domain Geometry== | ||
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leading edge. The geometry includes a sting. The analytic definition of the | leading edge. The geometry includes a sting. The analytic definition of the | ||
geometry (including sting) is given by Chu and Luckring (1996). A sketch of the | geometry (including sting) is given by Chu and Luckring (1996). A sketch of the | ||
geometry is given in Figure | geometry is given in [[Description_AC1-09#figure1|Figure 1]], with the origin of the | ||
coordinate system located at the apex of the wing, i.e., the most upstream | coordinate system located at the apex of the wing, i.e., the most upstream | ||
vertex. In the experiment of München, a root chord <math>{c_r = 0.98}</math> m has been used. | vertex. In the experiment of München, a root chord <math>{c_r = 0.98}</math> m has been used. | ||
A discretized definition of the geometry is available, with the coordinates | A discretized definition of the geometry [[Media:AC1-09_wing.dat|wing.dat]] is available, with the coordinates | ||
scaled by the root chord <math>{c_r}</math>. | scaled by the root chord <math>{c_r}</math>. | ||
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==References== | ==References== | ||
#<div id="1">Understanding and Modeling Vortical Flows to Improve the Technology Readiness Level for Military Aircraft. Summary Report of Task Group AVT-113, RTO Technical Report TR-AVT-113, October 2009.</div> | |||
#<div id="2">N. Ceresola (2009) TU Munich delta wing, Chapter IV.2 in Haase ''et al.'' (2009).</div> | |||
#<div id="3">J. Chu and J. M. Luckring (1996) Experimental surface pressure data obtained on 65° delta wing across Reynolds number and Mach number ranges, NASA TM 4645.</div> | |||
#<div id="4">A. Furman and Ch. Breitsamter (2008) Turbulent and unsteady flow characteristics of delta wing vortex systems, AIAA Paper 2008-0381.</div> | |||
#<div id="5">A. Furman and Ch. Breitsamter (2009) Experimental investigations on the VFE-2 configuration at TU Munich, Germany. Chapter 21 in RTO TR-AVT-113. http://ftp.rta.nato.int/public/PubFullText/RTO/TR/RTO-TR-AVT-113/TR-AVT-113-21.pdf.</div> | |||
#<div id="6">W. Haase, M. Braza, and A. Revell (eds.) (2009) DESider -- A European Effort on Hybrid RANS-LES Modelling, Notes on Numerical Fluid Mechanics and Multidisciplinary Design, Vol. 103, pp. 115--126, Springer-Verlag.</div> | |||
<br/> | <br/> | ||
---- | ---- | ||
{{ACContribs | {{ACContribs | ||
| authors=J.C. Kok, H. van der Ven, E. Tangermann, S. Sanchi, A. Probst, L. Temmerman | |authors=J.C. Kok, H. van der Ven (National Aerospace Laboratory NLR Amsterdam, The Netherlands), E. Tangermann (Airbus Defence and Space München, Germany), S. Sanchi (Computational Fluids and Structures Engineering Lausanne, Switzerland), A. Probst and K.A. Weinman (German Aerospace Center DLR Göttingen, Germany), L. Temmerman (NUMECA International Brussels, Belgium) | ||
| organisation= | |organisation= | ||
}} | }} | ||
{{ACHeader | {{ACHeader |
Latest revision as of 15:15, 11 February 2017
Vortex breakdown above a delta wing with sharp leading edge
Application Challenge AC1-09 © copyright ERCOFTAC 2024
Introduction
This test case is concerned with the prediction of vortex breakdown above a delta wing with a sharp leading edge at high angle of attack. The main modelling issue is the prediction of the location of the breakdown of the primary vortex above the wing. This primary vortex is formed as the shear layer emanating from the leading edge rolls up. Thus, it may be expected that the vortex breakdown is sensitive to the instabilities developing in the shear layer. A second modelling issue for this case is therefore the prediction of shear layer instabilities. A third, minor modelling issue is pressure-induced separation: even though the primary separation is fixed by the sharp leading edge, secondary pressure-induced separation may occur between the primary vortex and the leading edge.
For this test case, the NASA delta wing geometry of Chu and Luckring (1996) with a sharp leading edge and a leading-edge sweep angle of is considered. This geometry was also used in the Second International Vortex Flow Experiment (VFE-2, http://www.dlr.de/as/VFE-2). A large set of experiments and numerical results is available, see the Summary Report of the NATO RTO Task Group AVT-113 (RTO TR-AVT-113, chapter 17--34, 2009). The most detailed experiments within VFE-2 are the experiments of TU München (Furman and Breitsamter, 2008 and 2009), which include steady and unsteady measurements of pressure and velocity. These experiments of TU München are considered here.
In the EU-project ATAAC[1] CFD computations were performed belonging to the family of Detached Eddy Simulation (DES). DES is a hybrid RANS--LES approach in which the attached boundary layers are modelled with RANS while the (strongly) separated flow regions are modelled with LES. One of the difficulties of this type of method consists of the development of resolved turbulence as the method switches from RANS to LES. For the present test case, this concerns the development of instabilities in the shear layers. As will be shown, the standard DES approach does not suffice, but modifications are necessary to induce a more rapid development of shear-layer instabilities and full 3D turbulence.
In the EU-project DESider[2] (Haase et al., 2007), DES and SAS computations were performed for the vortex breakdown above a delta wing with a sharp leading edge (Ceresola, 2009). A different wing with a higher leading-edge sweep () was used. Satisfactory results were obtained for the time-averaged quantities, in particular in terms of the location of the vortex breakdown and the strength of the secondary separation. The prediction of fluctuating quantities, such as the RMS values of pressure and velocity components, however, was less satisfactory, showing a larger variation between the partners and a significant deviation from the experiment. To improve the prediction of fluctuating quantities, it was suggested to employ a more isotropic grid in the area of the primary vortex. This suggestion has been followed here.
- ↑ {ATAAC project (Advanced Turbulence Simulation for Aerodynamic Application Challenges), funded by the European Union under Grant Agreement no.~233710
- ↑ DESider project (Detached Eddy Simulation for Industrial Aerodynamics) funded by the European Union under Contract No.~AST3-CT-2003-50284 of the European Commission
Relevance to Industrial Sector
The wings of fighter aircraft as well as certain UAVs typically have a delta shape. The lift generated by such wings is, to a large extent, determined by the suction due to the main vortex above the wing. When the vortex breaks down, it generates a much weaker suction and much of the generated lift is lost. For the prediction of aircraft performance, it is therefore important to be able to compute the strength and location of vortex breakdown as well as the flow conditions at which breakdown occurs.
Design or Assessment Parameters
The parameters used to judge the CFD computations are
- the time-averaged pressure coefficient and the root-mean-square (RMS) value of the pressure coefficient , both at the wing surface, with the instantaneous pressure coefficient given by ,
- the dimensionless time-averaged velocity vector at several wing cross sections, and
- the dimensionless resolved turbulent kinetic energy at several wing cross sections,
with the brackets indicating the time average of .
Flow Domain Geometry
The NASA delta wing geometry has a leading-edge sweep and a sharp leading edge. The geometry includes a sting. The analytic definition of the geometry (including sting) is given by Chu and Luckring (1996). A sketch of the geometry is given in Figure 1, with the origin of the coordinate system located at the apex of the wing, i.e., the most upstream vertex. In the experiment of München, a root chord m has been used. A discretized definition of the geometry wing.dat is available, with the coordinates scaled by the root chord .
Figure 1: Geometry of VFE2 delta wing (taken from Chu and Luckring, 1996) |
---|
Flow Physics and Fluid Dynamics Data
The experiment has been performed at two Mach numbers ( and ) with corresponding Reynolds number and ) and at three angles of attack (, , and ). Vortex breakdown occurs at the highest angle of attack, and the most extensive experimental data set is available for the lowest Mach number, including velocity fluctuations. Therefore, the flow conditions considered here are
Note that the Reynolds number is based on the mean aerodynamic chord .
References
- Understanding and Modeling Vortical Flows to Improve the Technology Readiness Level for Military Aircraft. Summary Report of Task Group AVT-113, RTO Technical Report TR-AVT-113, October 2009.
- N. Ceresola (2009) TU Munich delta wing, Chapter IV.2 in Haase et al. (2009).
- J. Chu and J. M. Luckring (1996) Experimental surface pressure data obtained on 65° delta wing across Reynolds number and Mach number ranges, NASA TM 4645.
- A. Furman and Ch. Breitsamter (2008) Turbulent and unsteady flow characteristics of delta wing vortex systems, AIAA Paper 2008-0381.
- A. Furman and Ch. Breitsamter (2009) Experimental investigations on the VFE-2 configuration at TU Munich, Germany. Chapter 21 in RTO TR-AVT-113. http://ftp.rta.nato.int/public/PubFullText/RTO/TR/RTO-TR-AVT-113/TR-AVT-113-21.pdf.
- W. Haase, M. Braza, and A. Revell (eds.) (2009) DESider -- A European Effort on Hybrid RANS-LES Modelling, Notes on Numerical Fluid Mechanics and Multidisciplinary Design, Vol. 103, pp. 115--126, Springer-Verlag.
Contributed by: J.C. Kok, H. van der Ven (National Aerospace Laboratory NLR Amsterdam, The Netherlands), E. Tangermann (Airbus Defence and Space München, Germany), S. Sanchi (Computational Fluids and Structures Engineering Lausanne, Switzerland), A. Probst and K.A. Weinman (German Aerospace Center DLR Göttingen, Germany), L. Temmerman (NUMECA International Brussels, Belgium) — '
© copyright ERCOFTAC 2024