There exists a sequence of points such that as and
Proof
Consider the polynomial
with .
For n large compared to m, we will show that has a zero near to
and .
We show that one can take .
To show that has a zero near , let
Then .
Consider
the circle
.
On this circle,
, while
so for , by Rouché's theorem and have the same
number of zeros inside the circle, namely one.
This proves the claim
and answers the Conway-Parker question.
