In fluid dynamics, Görtler vortices are secondary flows that appear in a boundary layer flow along a concave wall. If the boundary layer is thin compared to the radius of curvature of the wall, the pressure remains constant across the boundary layer. On the other hand, if the boundary layer thickness is comparable to the radius of curvature, the centrifugal action creates a pressure variation across the boundary layer. This leads to the centrifugal instability (Görtler instability) of the boundary layer and consequent formation of Görtler vortices. These phenomena are named after mathematician Henry Görtler.

Görtler number

The onset of Görtler vortices can be predicted using the dimensionless number called Görtler number (G). It is the ratio of centrifugal effects to the viscous effects in the boundary layer and is defined as

G = U e θ ν ( θ R ) 1 / 2 {\displaystyle \mathrm {G} ={\frac {U_{e}\theta }{\nu }}\left({\frac {\theta }{R}}\right)^{1/2}}

where

U e {\displaystyle U_{e}} = external velocity
θ {\displaystyle \theta } = momentum thickness
ν {\displaystyle \nu } = kinematic viscosity
R {\displaystyle R} = radius of curvature of the wall

Görtler instability occurs when G exceeds about 0.3.

Other instances

A similar phenomenon arising from the same centrifugal action is sometimes observed in rotational flows which do not follow a curved wall, such as the rib vortices seen in the wakes of cylinders and generated behind moving structures.

References

  • Görtler, H. (1955). "Dreidimensionales zur Stabilitätstheorie laminarer Grenzschichten". Journal of Applied Mathematics and Mechanics. 35 (9–10): 362–363. Bibcode:1955ZaMM...35..360.. doi:10.1002/zamm.19550350906.9–10&rft.pages=362-363&rft.date=1955&rft_id=info:doi/10.1002/zamm.19550350906&rft_id=info:bibcode/1955ZaMM...35..360.&rft.aulast=Görtler&rft.aufirst=H.&rfr_id=info:sid/en.wikipedia.org:Görtler vortices">
  • Saric, W. S. (1994). "Görtler vortices". Annu. Rev. Fluid Mech. 26: 379–409. Bibcode:1994AnRFM..26..379S. doi:10.1146/annurev.fl.26.010194.002115.

Evolution of Görtler vortices generated by an azimuthally periodic

(Left) Representation of vortices in the liddriven

From bottom to top; Taylor vortices, Dean Vortices, and Görtler

1 The formation of Görtler vortices on a concave wall. Here the

Görtler vortices, Re L = 3.0 × 10 6 (case 4) Download Scientific Diagram