The Argument Principle
Let
be a function analytic on a simply connected region
and let
be a simple closed contour insuch that
for
Then the winding number of about 0 is given by
where
is the number of zeros ofinside
counted according to their orders.
Proof:
It is sufficient to prove that
(using the chain rule)
since
is a parametrization of
this argument is only valid if
is non zero onfor then the image of each constituent smooth path ofis a constituent smooth path of
so thatis a contour. In general howevercan have zeros onbut only a finite number. By making small detours tonear the zeros ofwe can obtain a simple closed contour
on whichis never zero and for which
- encloses the zeros ofas
Then since
we have
The principle can easily be extended to a contour about any point %alpha :
Letbe a function analytic on a simply connected regionand letbe a simple closed contour insuch that
forThen the winding number of about
is given by
is the number of zeros of
insidecounted according to their order.