Sequences, Series, and Special Functions2. lf(z)I ~ 1 for lzl < 1
3. J(c) = 0, where 0 < lei < 1
ThenIJ(z)I ~I; ~c: I
1
for lzl < 1 and IJ'(c)I ~ 1 - lcl 2Equality holds iff f(z) = a(z - c)/(1 - cz), where lal = 1.
585(8.13-7)Proof Let z' = g(z) = (z -c)/(1-cz). This function is analytic in lzl < 1
since its pole, namely, z 0 = 1/c, lies outside the unit circle. The inverse
function is given by
z=g -le z ') =--z' + c
1 +cz'
and it is easily verified that the unit disk lzl < 1 is mapped by g ontolz'I < 1 (Exercises 5.1, problem 7)..
Now, if we defineF(z') = J(z) = J(g-^1 (z')) = f ( ;~~;,)
we have
1. F(z') is analytic in lz'I < 1
- IF(z')I = IJ(z)I ~ 1 for lz'I < 1
3. F(O) = J(c) = 0
Hence, by Schwarz's lemma,
IF(z')I ~ lz'I for lz'I <^1 and IF'(O)I ~^1which implies that
IJ(z) ~ I z -_c I
1-cz
for lzl < 1
and sinceF'(z') = f'(z) dz = J'(z) l - lcl2
dz' (1 + cz')2we have
IF'(O)I = lf'(c)l(l - lcl^2 ) ~ 1
or