In mathematics, the Schwarz lemma, named after Hermann Amandus Schwarz, is a result in complex analysis about holomorphic functions from the open unit disk to itself. The lemma is less celebrated than deeper theorems, such as the Riemann mapping theorem, which it helps to prove. It is, however, one of the simplest results capturing the rigidity of holomorphic functions.

Statement

Let be the open unit disk in the complex plane centered at the origin, and let be a holomorphic map such that and on .

Then for all , and .

Moreover, if for some non-zero or , then for some with .[1]

Proof

The proof is a straightforward application of the maximum modulus principle on the function

which is holomorphic on the whole of , including at the origin (because is differentiable at the origin and fixes zero). Now if denotes the closed disk of radius centered at the origin, then the maximum modulus principle implies that, for , given any , there exists on the boundary of such that

As we get .

Moreover, suppose that for some non-zero , or . Then, at some point of . So by the maximum modulus principle, is equal to a constant such that . Therefore, , as desired.

SchwarzPick theorem

A variant of the Schwarz lemma, known as the SchwarzPick theorem (after Georg Pick), characterizes the analytic automorphisms of the unit disc, i.e. bijective holomorphic mappings of the unit disc to itself:

Let be holomorphic. Then, for all ,

and, for all ,

The expression

is the distance of the points , in the Poincaré metric, i.e. the metric in the Poincaré disc model for hyperbolic geometry in dimension two. The SchwarzPick theorem then essentially states that a holomorphic map of the unit disk into itself decreases the distance of points in the Poincaré metric. If equality holds throughout in one of the two inequalities above (which is equivalent to saying that the holomorphic map preserves the distance in the Poincaré metric), then must be an analytic automorphism of the unit disc, given by a Möbius transformation mapping the unit disc to itself.

An analogous statement on the upper half-plane can be made as follows:

Let be holomorphic. Then, for all ,

This is an easy consequence of the SchwarzPick theorem mentioned above: One just needs to remember that the Cayley transform maps the upper half-plane conformally onto the unit disc . Then, the map is a holomorphic map from onto . Using the SchwarzPick theorem on this map, and finally simplifying the results by using the formula for , we get the desired result. Also, for all ,

If equality holds for either the one or the other expressions, then must be a Möbius transformation with real coefficients. That is, if equality holds, then

with and .

Proof of SchwarzPick theorem

The proof of the SchwarzPick theorem follows from Schwarz's lemma and the fact that a Möbius transformation of the form

maps the unit circle to itself. Fix and define the Möbius transformations

Since and the Möbius transformation is invertible, the composition maps to and the unit disk is mapped into itself. Thus we can apply Schwarz's lemma, which is to say

Now calling (which will still be in the unit disk) yields the desired conclusion

To prove the second part of the theorem, we rearrange the left-hand side into the difference quotient and let tend to .

The Schwarz–Ahlfors–Pick theorem provides an analogous theorem for hyperbolic manifolds.

De Branges' theorem, formerly known as the Bieberbach Conjecture, is an important extension of the lemma, giving restrictions on the higher derivatives of at in case is injective; that is, univalent.

The Koebe 1/4 theorem provides a related estimate in the case that is univalent.

See also

References

  1. Theorem 5.34 in Rodriguez, Jane P. Gilman, Irwin Kra, Rubi E. (2007). Complex analysis : in the spirit of Lipman Bers ([Online] ed.). New York: Springer. p. 95. ISBN 978-0-387-74714-9.{{cite book}}: CS1 maint: multiple names: authors list (link)
  • Jurgen Jost, Compact Riemann Surfaces (2002), Springer-Verlag, New York. ISBN 3-540-43299-X (See Section 2.3)
  • S. Dineen (1989). The Schwarz Lemma. Oxford. ISBN 0-19-853571-6.

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