Chapter 7 : Flows of Ideal Fluids
Lecture 23 :


Flow About a Rotating Cylinder

Magnus Effect

Flow about a rotating cylinder is equivalent to the combination of flow past a cylinder and a vortex.
As such in addition to superimposed uniform flow and a doublet, a vortex is thrown at the doublet centre which will simulate a rotating cylinder in uniform stream.

 The pressure distribution will result in a force, a component of which will culminate in lift force

 The phenomenon of generation of lift by a rotating object placed in a stream is known as Magnus effect.

Velocity Potential and Stream Function

The velocity potential and stream functions for the combination of doublet, vortex and uniform flow are

    

      (clockwise rotation) (23.1)

   (clockwise rotation) (23.2)

By making use of either the stream function or velocity potential function, the velocity components are (putting x= rcosθ and y= rsinθ )

(23.3)

(23.4)

 

Stagnation Points

 At the stagnation points the velocity components must vanish. From Eq. (23.3), we get

 =0 (23.5)

Solution :

  1. From Eq. (23.5) it is evident that a zero radial velocity component may occur at
  •                        and
  • along the circle,    .

 Eq. (23.4) depicts that a zero transverse velocity requires

            or                (23.6)

            

At the stagnation point, both radial and transverse velocity components must be zero .

Thus the location of stagnation point occurs at

 

 

There will be two stagnation points since there are two angles for a given sine except for sin-1(±1)

Determination of Stream Line

The streamline passing through these points may be determined by evaluating ψ at these points.

 Substitution of the stagnation coordinate (r, θ) into the stream function (Eq. 23.2) yields

 

 

or,   (23.7)

 

Equating the general expression for stream function to the above constant, we get

 

By rearranging we can write

(23.8)

All points along the circle satisfy Eq. (23.8) , since for this value of r, each quantity within parentheses in the equation is zero.

Considering the interior of the circle (on which ψ = 0) to be a solid cylinder, the outer streamline pattern is shown in Fig 23.2.

Fig  23.2  Flow Past a Cylinder with Circulation

At the stagnation point

 

 

 

The limiting case arises for , where and two stagnation points meet at the bottom as shown in Fig. 23.3.

In the case of a circulatory flow past the cylinder, the streamlines are symmetric with respect to the y-axis. The presures at the points on the cylinder surface are symmetrical with respect to the y-axis. There is no symmetry with respect to the x-axis. Therefore a resultant force acts on the cylinder in the direction of the y-axis, and the resultant force in the direction of the x-axis is equal to zero as in the flow without circulation; that is, the D'Alembert paradox takes place here as well. Thus, in the presence of circulation, different flow patterns can take place and, therefore, it is necessary for the uniqueness of the solution, to specify the magnitude of circulation.

Fig 23.3    Flow Past a Circular Cylinder with Circulation Value

However, in all these cases the effects of the vortex and doublet become negligibly small as one moves a large distance from the cylinder.

The flow is assumed to be uniform at infinity.

We have already seen that the change in strength G of the vortex changes the flow pattern, particularly the position of the stagnation points but the radius of the cylinder remains unchanged.