Nonlinear spatially developing Görtler vortices in curved wall jet flow

Cunff, Cédric Le; Zebib, Abdelfattah

doi:10.1063/1.869022

Cited by 14 publications

(10 citation statements)

References 11 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Wadey [15] used asymptotic methods for linear theory to study Görtler vortices in wall jet flows for large spanwise wavenumbers. It was found that curved wall jets on both concave and convex walls were more stable to streamwise vortices than boundary-layer flows.An experimental study of streamwise vortices appeared for wall jet flow on a concave wall, see Matsson [16], followed by nonlinear simulations of the same flow by Le Cunff and Zebib [17]. The simulations were able to capture the primary instability of streamwise vortices in the experiments.…”

mentioning

confidence: 99%

See 1 more Smart Citation

Görtler vortices in Falkner–Skan flows with suction and blowing

Matsson

2007

Numerical Methods in Fluids

View full text Add to dashboard Cite

In this paper, we use nonlinear calculations to study curved boundary-layer flows with pressure gradients and self-similar suction or blowing. For an accelerated outer flow, stabilization occurs in the linear region while the saturation amplitude of vortices is larger than for flows with a decelerating outer flow. The combined effects of boundary-layer suction and a favourable pressure gradient can give a significant stabilization of the flow. Streamwise vortices can be amplified on both concave and convex walls for decelerated Falkner-Skan flow with an overshoot in the velocity profile. The disturbance amplitude is generally lower far downstream compared with profiles without overshoot. the wall jet without freestream as described by Glauert [4]. Libby and Liu have shown that there exists at least four branches for adverse pressure gradients and Zaturska and Banks [5] found a new branch related to favourable pressure gradients. Solutions to the Falkner-Skan equation in the form of overshoot velocity profiles have also been included in the textbooks by White [6] and Sobey [7].Overshoot profiles are unstable on both concave and convex walls and streamwise vortices can develop. On curved walls the Görtler number is the appropriate parameter for the stability problem. The Görtler number is defined as Go = Re √ , the curvature parameter = /R, where R is the radius of curvature of the wall and = √ x/U ∞ is the boundary-layer thickness, where x is the streamwise coordinate and is the kinematic viscosity. The Reynolds number is defined as Re = U ∞ / , where U ∞ is the freestream velocity. Streamwise vortices in curved boundary layers have been studied frequently both numerically and experimentally, for a review see Hall [8], Saric [9], and Floryan [10]. However, studies of streamwise vortices in wall jet flows are more sparse. The first parallel neutral stability calculations were made by Kahawita [11] for the Glauert wall jet without freestream. Non-parallel linear stability theory was used by Floryan [12,13], followed by Matsson [14] who studied the influence of system rotation and self-similar suction or blowing on wall jets. Wadey [15] used asymptotic methods for linear theory to study Görtler vortices in wall jet flows for large spanwise wavenumbers. It was found that curved wall jets on both concave and convex walls were more stable to streamwise vortices than boundary-layer flows.An experimental study of streamwise vortices appeared for wall jet flow on a concave wall, see Matsson [16], followed by nonlinear simulations of the same flow by Le Cunff and Zebib [17]. The simulations were able to capture the primary instability of streamwise vortices in the experiments. They also found that for low Görtler numbers the disturbance amplitude initially could be increased but the amplitude further downstream attained an amplitude which was lower than the starting level. However, at higher Görtler numbers the streamwise vortices increased exponentially in amplitude followed by a maximum and an almost constant level furt...

show abstract

mentioning

confidence: 99%

“…An experimental study of streamwise vortices appeared for wall jet flow on a concave wall, see Matsson [16], followed by nonlinear simulations of the same flow by Le Cunff and Zebib [17]. The simulations were able to capture the primary instability of streamwise vortices in the experiments.…”

mentioning

confidence: 99%

Görtler vortices in Falkner–Skan flows with suction and blowing

Matsson

2007

Numerical Methods in Fluids

View full text Add to dashboard Cite

show abstract

“…The results are mathematically reliable only for ␣Ͼ0.1 since the matrices become ill-conditioned below this threshold. 18 The neutral curves are presented for decelerated and accelerated boundary layers in Fig. 4 on a convex wall where the curvature has a stabilizing effect.…”

Section: A Linear Resultsmentioning

confidence: 99%

“…4 Le Cunff and Zebib 18 verified the consistency of a u-normalization with a direct integration of the equation where no splitting is introduced.…”

Section: ͑24͒mentioning

confidence: 91%

See 1 more Smart Citation

Görtler-crossflow vortices

Cunff

Zebib

1997

Physics of Fluids

Self Cite

View full text Add to dashboard Cite

Crossflow influence on steady Görtler vortices is studied in a pressure-driven boundary layer developing along a curved wall. Linear theory shows that crossflow is destabilizing in the long wavelength range. In the non-linear simulations, co-rotating vortices are transformed into counter-rotating vortices for accelerated boundary layers. The streamwise location, where counter-rotating vortices appear, depends on the amplitude of the pressure gradient. Linear studies indicate that a secondary instability may develop on the steady vortex profile.

show abstract

Large‐Eddy Simulation of a katabatic jet along a convexly curved slope: 2. Evidence of Görtler vortices

Brun

2017

JGR Atmospheres

View full text Add to dashboard Cite

This paper is the second part of a study of katabatic jet along a convexly curved slope with a maximum angle of about 35.5°. Large‐Eddy Simulation (LES) is performed with a special focus on the outer‐layer shear of the katabatic jet. In the first part, a basic statistical quantitative analysis of the flow was performed. Here a qualitative and quantitative description of vortical structures is used to gain insight in the present 3‐D turbulent flow. It is shown that Görtler vortices oriented in the streamwise downslope direction develop in the shear layer. They spread with a specific mushroom shape in the vertical direction up to about 100 m height. They play a main role with respect to local turbulent mixing in the ground surface boundary layer. The present curved slope configuration constitutes a realistic model for alpine orography. This paper provides a procedure based on local turbulence anisotropy to track Görtler vortices for in situ measurements, which has never been proposed in the literature.

show abstract

Nonlinear spatially developing Görtler vortices in curved wall jet flow

Cited by 14 publications

References 11 publications

Görtler vortices in Falkner–Skan flows with suction and blowing

Görtler vortices in Falkner–Skan flows with suction and blowing

Görtler-crossflow vortices

Large‐Eddy Simulation of a katabatic jet along a convexly curved slope: 2. Evidence of Görtler vortices

Contact Info

Product

Resources

About