Sequences and Series- limz->zo,zEB Un(z) = Ln.
Then
(a) limn->oo Ln = L (L finite)
(b) limz->zo,zEB f(z) = L199The first row and first column in the following diagram show the hypoth-
esis in the theorem, while the second row and second column correspond
to the conclusion:
n->oo
un(z) =====f f(z)z->zo zEB 1 1 z->zo zEB
Ln ------t L
n->ooProof (a) Since {un(z)} converges uniformly on B to f(z), by the Cauchy
condition we have, for every E > 0,
lum(z) - un(z)I < f for all z EB (4.10-1)
provided that m, n > N,. Hence letting z --+ zo (z remaining in B)
in (4.10-1), we obtain
ILm - Lnl ::; fform, n > N,. Thus the sequence {Ln} satisfies the Cauchy condition for
every E > 0, so {Ln} converges to a finite limit L.
(b) Now, from the identity
J(z) - L = f(z) - un(z) + un(z) - Ln + Ln - Lit follows that
IJ(z) - LI ::; lf(z) - un(z)I + lun(z) - Lnl + ILn - LI
Given E > 0 we have, by assumption (1),
fJf(z) - Un(z)I < 3 for n > N 1 and z E B.
and by assumption (3),
forJz-zol<o(E), zEB
Also, we have, by the first part of the conclusion,
( 4.10-2)( 4.10-3)( 4.10-4)(4.10-5)