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Any differentiable complex function F(z) is the complex
potential for a 2D incompressible potential flow. Further 
is the complex conjugate velocity.
Reason: differentiability requires that 
is the same
whichever direction we take 
. In particular if we take equal to a change 
in x only, we should get the
same as when we take equal to a change 
in
y only. That means, if 
:
Since 
,
from which it follows that u and v satisfy both the continuity
equation and irrotationality:
Differentiable complex functions are easy to find:
- Constants are differentiable:
. - Function F(z)=z is differentiable:
. - Sums of differentiable functions are differentiable (see your calculus
book.)
- Products of differentiable functions are differentiable (see
your calculus book.)
- Inverses of differentiable functions are differentiable (see
your calculus book.)
- Functions with converging Taylor series are differentiable.
Not differentiable:
- Purely real functions such as x,
, ...
- Purely imaginary functions such as
, 
, ...
- Complex conjugates such as
.
Exercise:
Give as many 2d incompressible potential flows as you can.
You should now be able to do 18.2, 3
Next: Some Manipulations
Up: Introduction
Previous: Complex variables
02/22/02 0:25:34