Let $D$ be the open unit disc. The Schwarz Lemma states that if $f: D \to D$ with $f(0) = 0$, then $|f(z)| \leq |z|$ for all $z \in D$ among other things. Can this extend to the case when $f: D \to \overline{D}$, where $\overline{D}$ is the closed unit disc?
Can the Schwarz lemma be extended to functions $f : D \to \overline{D}$?
3
$\begingroup$
complex-analysis
1 Answers
9
Holomorphic non-constant maps are open, which means that $f(D)$ must be an open subset of the plane, if $f$ is not the constant map. If you know that $f(D) \subseteq \overline{D}$, this means that you actually have $f(D) \subseteq D$, so the Lemma applies.
-
2Alternatively, the maximum modulus theorem implies that if $|f(z)|=1$ for some some $z\in D$, then $f$ is constant. – 2011-12-04