Difference between revisions of "Glueing theorems"
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Theorems that establish the existence of analytic functions subject to prescribed relations on the boundary of a domain. | Theorems that establish the existence of analytic functions subject to prescribed relations on the boundary of a domain. | ||
| − | Lavrent'ev's glueing theorem [[#References|[1]]]: Given any analytic function | + | Lavrent'ev's glueing theorem [[#References|[1]]]: Given any analytic function $ x _ {1} = \phi ( x) $ |
| + | on $ [ - 1 , 1 ] $ | ||
| + | with $ \phi ( \pm 1 ) = \pm 1 $ | ||
| + | and $ \phi ^ \prime ( x) > 0 $, | ||
| + | then one can construct two analytic functions $ f _ {1} ( z , h ) $ | ||
| + | and $ f _ {2} ( z , h ) $, | ||
| + | where $ z = x + i y $ | ||
| + | and $ h = \textrm{ const } $, | ||
| + | mapping the rectangles $ | x | < 1 $, | ||
| + | $ - h < y < 0 $ | ||
| + | and $ | x | < 1 $, | ||
| + | $ 0 < y < h $ | ||
| + | univalently and conformally onto disjoint domains $ D _ {1} $ | ||
| + | and $ D _ {2} $, | ||
| + | respectively, in such a way that $ f _ {1} ( x , h ) = f _ {2} ( \phi ( x) , h ) $. | ||
| + | This theorem was used (see [[#References|[6]]]) to prove the existence of a function $ w = f ( z) $, | ||
| + | $ f ( 0) = 0 $, | ||
| + | $ f ( 1) = 1 $, | ||
| + | realizing a quasi-conformal mapping of the disc $ | z | \leq 1 $ | ||
| + | onto the disc $ | w | \leq 1 $ | ||
| + | and possessing almost-everywhere a given characteristic $ h ( z) $, | ||
| + | where | ||
| + | |||
| + | $$ | ||
| + | h ( z) = | ||
| + | \frac{w _ {\overline{z}\; } }{w _ {z} } | ||
| + | ,\ \ | ||
| + | | h ( z) | \leq h _ {0} < 1 , | ||
| + | $$ | ||
| − | + | and $ h ( z) $ | |
| + | is a measurable function defined for almost-all $ z= x+ iy $, | ||
| + | $ | z | \leq 1 $. | ||
| + | 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 [[#References|[5]]]. | ||
| − | + | Other glueing theorems (with weaker restrictions on the functions of type $ x _ {1} = \phi ( x) $, | |
| + | see [[#References|[2]]]) have played a major role in the theory of Riemann surfaces. Another example is as follows (see [[#References|[3]]], [[#References|[5]]]): Suppose one is given an arc $ \gamma _ {1} $ | ||
| + | on the circle $ | z | = 1 $ | ||
| + | with end points $ a $ | ||
| + | and $ b $, | ||
| + | $ a \neq b $, | ||
| + | and a function $ g ( z) $ | ||
| + | on $ \gamma _ {1} $ | ||
| + | with the properties: 1) at all the interior points of $ \gamma _ {1} $, | ||
| + | $ g ( z) $ | ||
| + | is regular and $ g ^ \prime ( z) \neq 0 $; | ||
| + | 2) the function $ z _ {1} = g ( z) $ | ||
| + | establishes a one-to-one mapping of $ \gamma _ {1} $ | ||
| + | onto the complementary arc $ \gamma _ {2} $ | ||
| + | on $ | z | = 1 $ | ||
| + | leaving $ a $ | ||
| + | and $ b $ | ||
| + | invariant. Then there is a function | ||
| − | + | $$ | |
| + | w = F ( z) = | ||
| + | \frac{1}{z} | ||
| − | + | + a _ {1} z + \dots , | |
| + | $$ | ||
| − | regular for | + | regular for $ | z | \leq 1 $ |
| + | except at $ 0, a , b $, | ||
| + | such that $ F ( z) = F ( g ( z) ) $ | ||
| + | at the interior points of $ \gamma _ {1} $. | ||
| − | It has also been proved that there is a univalent function | + | It has also been proved that there is a univalent function $ F( z) $ |
| + | with these properties (see [[#References|[4]]], Chapt. 2). | ||
====References==== | ====References==== | ||
| − | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> M.A. Lavrent'ev, | + | <table> |
| + | <TR><TD valign="top">[1]</TD> <TD valign="top"> M.A. Lavrent'ev, "Sur une classe de représentations continues" ''Mat. Sb.'' , '''42''' : 4 (1935) pp. 407–424</TD></TR> | ||
| + | <TR><TD valign="top">[2]</TD> <TD valign="top"> L.I. Volkovyskii, "On the problem of the connectedness type of Riemann surfaces" ''Mat. Sb.'' , '''18''' : 2 (1946) pp. 185–212 (In Russian)</TD></TR> | ||
| + | <TR><TD valign="top">[3]</TD> <TD valign="top"> A.C. Schaeffer, D.C. Spencer, "Variational methods in conformal mapping" ''Duke Math. J.'' , '''14''' : 4 (1947) pp. 949–966</TD></TR> | ||
| + | <TR><TD valign="top">[4]</TD> <TD valign="top"> A.C. Schaeffer, D.C. Spencer, "Coefficient regions for schlicht functions" , ''Amer. Math. Soc. Coll. Publ.'' , '''35''' , Amer. Math. Soc. (1950)</TD></TR> | ||
| + | <TR><TD valign="top">[5]</TD> <TD valign="top"> G.M. Goluzin, "Geometric theory of functions of a complex variable" , ''Transl. Math. Monogr.'' , '''26''' , Amer. Math. Soc. (1969) (Translated from Russian)</TD></TR> | ||
| + | <TR><TD valign="top">[6]</TD> <TD valign="top"> P.P. Belinskii, "General properties of quasi-conformal mappings" , Novosibirsk (1974) pp. Chapt. 2, Par. 1 (In Russian)</TD></TR> | ||
| + | </table> | ||
Latest revision as of 18:34, 8 June 2024
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 $ x _ {1} = \phi ( x) $ on $ [ - 1 , 1 ] $ with $ \phi ( \pm 1 ) = \pm 1 $ and $ \phi ^ \prime ( x) > 0 $, then one can construct two analytic functions $ f _ {1} ( z , h ) $ and $ f _ {2} ( z , h ) $, where $ z = x + i y $ and $ h = \textrm{ const } $, mapping the rectangles $ | x | < 1 $, $ - h < y < 0 $ and $ | x | < 1 $, $ 0 < y < h $ univalently and conformally onto disjoint domains $ D _ {1} $ and $ D _ {2} $, respectively, in such a way that $ f _ {1} ( x , h ) = f _ {2} ( \phi ( x) , h ) $. This theorem was used (see [6]) to prove the existence of a function $ w = f ( z) $, $ f ( 0) = 0 $, $ f ( 1) = 1 $, realizing a quasi-conformal mapping of the disc $ | z | \leq 1 $ onto the disc $ | w | \leq 1 $ and possessing almost-everywhere a given characteristic $ h ( z) $, where
$$ h ( z) = \frac{w _ {\overline{z}\; } }{w _ {z} } ,\ \ | h ( z) | \leq h _ {0} < 1 , $$
and $ h ( z) $ is a measurable function defined for almost-all $ z= x+ iy $, $ | z | \leq 1 $. 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 $ x _ {1} = \phi ( x) $, 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 $ \gamma _ {1} $ on the circle $ | z | = 1 $ with end points $ a $ and $ b $, $ a \neq b $, and a function $ g ( z) $ on $ \gamma _ {1} $ with the properties: 1) at all the interior points of $ \gamma _ {1} $, $ g ( z) $ is regular and $ g ^ \prime ( z) \neq 0 $; 2) the function $ z _ {1} = g ( z) $ establishes a one-to-one mapping of $ \gamma _ {1} $ onto the complementary arc $ \gamma _ {2} $ on $ | z | = 1 $ leaving $ a $ and $ b $ invariant. Then there is a function
$$ w = F ( z) = \frac{1}{z} + a _ {1} z + \dots , $$
regular for $ | z | \leq 1 $ except at $ 0, a , b $, such that $ F ( z) = F ( g ( z) ) $ at the interior points of $ \gamma _ {1} $.
It has also been proved that there is a univalent function $ F( z) $ with these properties (see [4], Chapt. 2).
References
| [1] | M.A. Lavrent'ev, "Sur une classe de représentations continues" Mat. Sb. , 42 : 4 (1935) pp. 407–424 |
| [2] | L.I. Volkovyskii, "On the problem of the connectedness type of Riemann surfaces" Mat. Sb. , 18 : 2 (1946) pp. 185–212 (In Russian) |
| [3] | A.C. Schaeffer, D.C. Spencer, "Variational methods in conformal mapping" Duke Math. J. , 14 : 4 (1947) pp. 949–966 |
| [4] | A.C. Schaeffer, D.C. Spencer, "Coefficient regions for schlicht functions" , Amer. Math. Soc. Coll. Publ. , 35 , Amer. Math. Soc. (1950) |
| [5] | G.M. Goluzin, "Geometric theory of functions of a complex variable" , Transl. Math. Monogr. , 26 , Amer. Math. Soc. (1969) (Translated from Russian) |
| [6] | P.P. Belinskii, "General properties of quasi-conformal mappings" , Novosibirsk (1974) pp. Chapt. 2, Par. 1 (In Russian) |
How to Cite This Entry:
Glueing theorems. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Glueing_theorems&oldid=16815
Glueing theorems. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Glueing_theorems&oldid=16815
This article was adapted from an original article by E.G. Goluzina (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article