Glueing theorems

Theorems that establish the existence of analytic functions subject to prescribed relations on the boundary of a domain.

Lavrent'ev's glueing theorem [1]: Given any analytic function on with and , then one can construct two analytic functions and , where and , mapping the rectangles , and , univalently and conformally onto disjoint domains and , respectively, in such a way that . This theorem was used (see [6]) to prove the existence of a function , , , realizing a quasi-conformal mapping of the disc onto the disc and possessing almost-everywhere a given characteristic , where

and is a measurable function defined for almost-all , . A modified form of Lavrent'ev's theorem was also used to solve the problem of mapping a simply-connected Riemann surface conformally onto the disc [5].

Other glueing theorems (with weaker restrictions on the functions of type , see [2]) have played a major role in the theory of Riemann surfaces. Another example is as follows (see [3], [5]): Suppose one is given an arc on the circle with end points and , , and a function on with the properties: 1) at all the interior points of , is regular and ; 2) the function establishes a one-to-one mapping of onto the complementary arc on leaving and invariant. Then there is a function

regular for except at , such that at the interior points of .

It has also been proved that there is a univalent function with these properties (see [4], Chapt. 2).

References