Montel's theorem

Montel's theorem: In complex analysis, an area of mathematics, Montel's theorem refers to one of two theorems about families of holomorphic functions. These are named after Paul Montel, and give conditions under which a family of holomorphic functions is normal.

Contents

1 Uniformly bounded families are normal

2 Functions omitting two values

3 Necessity

4 Proofs

5 Relationship to theorems for entire functions

6 See also

7 Notes

8 References

Uniformly bounded families are normal

The first, and simpler, version of the theorem states that a uniformly bounded family of holomorphic functions defined on an open subset of the complex numbers is normal.

This theorem has the following formally stronger corollary. Suppose that $\mathcal{F}$ is a family of meromorphic functions on an open set $D$ . If $z_0\in D$ is such that $\mathcal{F}$ is not normal in $z 0$ , and $U\subset D$ is a neighborhood of $z 0$ , then $\bigcup_{f\in\mathcal{F}}f(U)$ is dense in the complex plane.

Functions omitting two values

The stronger version of Montel's Theorem (occasionally referred to as the Fundamental Normality Test) states that a family of holomorphic functions, all of which omit the same two values $a,b\in\mathbb{C}$ , is normal.

Necessity

The conditions in the above theorems are sufficient, but not necessary for normality. Indeed, the family $\{z\mapsto z+a: a\in\C\}$ is normal, but does not omit any complex value.

Proofs

The first version of Montel's theorem is a direct consequence of Marty's Theorem (which states that a family is normal if and only if the spherical derivatives are locally bounded) and Cauchy's integral formula.^[1]

This theorem has also been called the Stieltjes–Osgood theorem, after Thomas Joannes Stieltjes and William Fogg Osgood.^[2]

The Corollary stated above is deduced as follows. Suppose that all the functions in $\mathcal{F}$ omit the same neighborhood of the point $z 0$ . By postcomposing with the map $z\mapsto \frac{1}{z-z_0}$ we obtain a uniformly bounded family, which is normal by the first version of the theorem.

The second version of Montel's theorem can be deduced from the first by using the fact that there exists a holomorphic universal covering from the unit disk to the twice punctured plane $\mathbb{C}\setminus\{a,b\}$ . (Such a covering is given by the elliptic modular function).

However, this version of Montel's theorem can also be proved in a more elementary manner, without the use of covering space theory or the modular function, by using Zalcman's lemma.

Relationship to theorems for entire functions

A heuristic principle known as Bloch's principle (made precise by a result by Larry Zalcman) states that properties that imply that an entire function is constant correspond to properties that ensure that a family of holomorphic functions is normal.

For example, the first version of Montel's theorem stated above is the analog of Liouville's theorem, while the second version corresponds to Picard's theorem.

See also

Montel space

Fundamental normality test

Notes

^ Hartje Kriete (1998). Progress in Holomorphic Dynamics. CRC Press. pp. 164. http://books.google.ca/books?id=HwqjxJOLLOoC. Retrieved 2009-03-01.

^ Reinhold Remmert, Leslie Kay (1998). Classical Topics in Complex Function Theory. Springer. pp. 154. http://books.google.ca/books?id=BHc2b0iCoy8C. Retrieved 2009-03-01.

References

John B. Conway (1978). Functions of One Complex Variable I. Springer-Verlag. ISBN 0-387-90328-3.

J. L. Schiff (1993). Normal Families. Springer-Verlag. ISBN 0-387-97967-0.

This article incorporates material from Montel's theorem on PlanetMath, which is licensed under the Creative Commons Attribution/Share-Alike License.

Categories:
Complex analysis
Compactness theorems
Theorems in complex analysis

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Montel's theorem

Contents

Uniformly bounded families are normal

Functions omitting two values

Necessity

Proofs

Relationship to theorems for entire functions

See also

Notes

References

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Montel's theorem

Contents

Uniformly bounded families are normal

Functions omitting two values

Necessity

Proofs

Relationship to theorems for entire functions

See also

Notes

References

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