Bloch's principle explained

Bloch's Principle is a philosophical principle in mathematicsstated by André Bloch.^[1]

Bloch states the principle in Latin as: Nihil est in infinito quod non prius fuerit in finito, and explains this as follows: Every proposition in whose statement the actual infinity occurs can be always considered a consequence, almost immediate, of a proposition where it does not occur, a proposition in finite terms.

Bloch mainly applied this principle to the theory of functions of a complex variable. Thus, for example, according to this principle, Picard's theorem corresponds to Schottky's theorem, and Valiron's theorem corresponds to Bloch's theorem.

Based on his Principle, Bloch was able to predict or conjecture severalimportant results such as the Ahlfors's Five Islands theorem,Cartan's theorem on holomorphic curves omitting hyperplanes,^[2] Hayman's result that an exceptional set of radii is unavoidable in Nevanlinna theory.

In the more recent times several general theorems were proved which can be regarded as rigorous statements in the spirit of the Bloch Principle:

Zalcman's lemma

A family

of functions meromorphic on the unit disc

\Delta

is not normal if and only if there exist:

a number

0<r<1

points

z_n,

|z_n|<r

functions

f_n\inlF

numbers

\rho_n\to0+

such that

f_n(z_n+\rho_n\zeta)\tog(\zeta),

spherically uniformly on compact subsets of

where

is a nonconstant meromorphic function on

^[3]

Zalcman's lemma may be generalized to several complex variables. First, define the following:

A family

of holomorphic functions on a domain

\Omega\subsetCⁿ

is normal in

\Omega

if every sequence of functions

\{f_j\}\subseteqlF

contains either a subsequence which converges to a limit function

f\neinfty

uniformly on each compact subset of

\Omega,

or a subsequence which converges uniformly to

infty

on each compact subset.

For every function

\varphi

of class

C^2(\Omega)

define at each point

z\in\Omega

a Hermitian form

L_z(\varphi,

	n
v):=\sum
	k,l=1

	\partial^2\varphi
	\partialz_k\partial\overline{z

_l}(z)v_k\overline{v}_l (v\inC^n),

and call it the Levi form of the function

\varphi

If function

is holomorphic on

\Omega,

set

f^\sharp(z):=\sup

	2),
\sqrt{L
	z(log(1+\|f\|

v)}.

This quantity is well defined since the Levi form

	2),
L
	z(log(1+\|f\|

is nonnegative for all

z\in\Omega.

In particular, for

n=1

the above formula takes the form

f^\sharp(z):=

	\|f'(z)\|
	1+\|f(z)\|²

and

z^\sharp

coincides with the spherical metric on

The following characterization of normality can be made based on Marty's theorem, which states that a family is normal if and only if the spherical derivatives are locally bounded:^[4]

Suppose that the family

of functions holomorphic on

\Omega\subsetCⁿ

is not normal at some point

z_0\in\Omega.

Then there exist sequences

f_j\inlF,

z_j\toz_0,

\rho_j=1/f

	\sharp(z

	j)\to

such that the sequence

g_j(z)=f_j(z_j+\rho_jz)

converges locally uniformly in

Cⁿ

to a non-constant entire function

satisfying

g^{\sharp(z)\leq}g^\sharp(0)=1

Brody's lemma

Let X be a compact complex analytic manifold, such that every holomorphic map from the complex planeto X is constant. Then there exists a metric on X such that every holomorphic map from the unit disc with the Poincaré metric to X does not increase distances.^[5]

References

News: A.. Bloch. La conception actuelle de la theorie de fonctions entieres et meromorphes. Enseignement Math.. 1926. 25. 83–103.
Book: Lang, S.. la. Introduction to complex hyperbolic spaces. Springer Verlag. 1987.
L.. Zalcman. Heuristic principle in complex function theory. Amer. Math. Monthly. 82. 1975. 8. 813–817. 10.1080/00029890.1975.11993942.
Book: P. V. Dovbush (2020). Zalcman's lemma in Cn, Complex Variables and Elliptic Equations, 65:5, 796-800, DOI: 10.1080/17476933.2019.1627529. 10.1080/17476933.2019.1627529. 198444355.
Lang (1987).