586 Chapter^8
lf'(e)I:::; 1 -lle12Equality occurs iff F(z') = az', or f(z) = a[(z -e)/(1-cz)] with !al= 1.
The following theorem improves the first estimate in Schwarz's lemmawhen the origin is a zero of multiplicity k > 1.
Theorem 8.38 Suppose that:
- f is analytic in lzl < 1
2. lf(z)I :::; 1 for lzl < 1
- f(O) = f'(O) = · · · = J(k-l)(O) = O, j(k)(O) -/= 0
Then we have the estimates
for lzl < 1 and (8.13-8)
Equality holds iff f(z) = azk where !al = 1.
Proof Because of hypothesis 3 the Cauchy-Taylor expansion for f(z) about
the origin has the form
J(k)(O) k J(k+l)(O) k+i
f(z)=-k-!-z+(k+l)!z +···If we define
j(k)(O) j(k+ll(o)
g(z)= _k_!_ + (k+l)! z+···so that g(z) = f(z)/zk for 0 < lzl < 1 and g(O) = J(k)(O)/k!, the remainder
of the proof can be carried out as for the lemma.
As an application of Corollary 8.18 we shall prove the following property,
which is useful in the theory ~:f entire functions (Selected Topics, Chapter 3).
Theorem 8.39 (Borel-Caratheodory Theorem). Suppose that f is
analytic in a region G containing the closed disk lzl :::; R, and let
M(r) =max IJ(z)I,
lzl=rThen for 0 < r < R we have
A(r) = maxRef(z)
lzl=rM(r):::; R2
~rA(R)+ ~=~lf(O)I (8.13-9)Proof If f(z) = e = c 1 + ic 2 (a constant) in G, then (8.13-9) becomes
2r R+r
lei :::; R -r ei + R - r lei
or -e1 5 lei, a trivial inequality.