Grötzsch principle

A principle in the theory of conformal mapping, proposed in 1928 by H. Grötzsch

and used in proving inequalities for the lengths of curves of certain families and the area of the surface they bound. Grötzsch subsequently developed numerous applications of the strip method (cf. Strip method (analytic functions)) in the theory of univalent functions defined in finitely-connected or infinitely-connected domains.

Grötzsch' principle can be explained as follows. Let an annulus $ K ( r, R) = \{ {z } : {r < | z | < R } \} , $ $ 0 < r < R < \infty $, contain a finite number of pairwise-disjoint simply-connected domains $ B _ {k} , $ $ k = 1 \dots n $, with Jordan boundaries containing arcs $ \gamma _ {k} $ and $ \Gamma _ {k} $ of the respective circles $ | z | = r $, $ | z | = R $ which do not degenerate into points (the $ B _ {k} $ form strips which connect the boundary components of $ K ( r, R) $). If $ B _ {k} $ is mapped into some rectangle $ \{ {w } : {0 < \mathop{\rm Re} w < a _ {k} , 0< \mathop{\rm Im} w < b _ {k} } \} $ so that $ \gamma _ {k} $ and $ \Gamma _ {k} $ pass to sides of length $ a _ {k} $, respectively $ b _ {k} $, then

$$ \sum _ {k = 1 } ^ { n } \frac{a _ {k} }{b _ {k} } \leq \ \frac{2 \pi }{( \mathop{\rm ln} R - \mathop{\rm ln} r) } , $$

and equality is attained only if $ B _ {k} = \{ {z } : {r < | z | < R, \alpha _ {k} < \mathop{\rm arg} z < \beta _ {k} } \} $, $ \alpha _ {k} $, $ \beta _ {k} $ are constants, $ k = 1 \dots n $, and the union $ \cup _ {k = 1 } ^ {n} B _ {k} $ covers $ K ( r, R) $ except for the intervals of the rays $ \mathop{\rm arg} z = \alpha _ {k} $, $ \mathop{\rm arg} z = \beta _ {k} $ which belong to it.

Grötzsch' principle and the strip method are constituent parts of the method of the extremal metric (cf. Extremal metric, method of the) and are used not only in conformal mapping, but also in mapping of a more general nature such as quasi-conformal mapping.

References

Comments

Cf. also Grötzsch theorems; Distortion theorems.