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The [[Schwarz–Christoffel transformation]] gives the mapping from the upper half-plane to any Euclidean polygon.
The methodology used to derive the Schwarz triangle function earlier can be applied more generally to arc-edged polygons. However, for an ''n''-sided polygon, the solution has ''n
== Applications ==
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* {{Cite book |last=Ahlfors |first=Lars V. |author-link=Lars Ahlfors |title=Complex analysis: an introduction to the theory of analytic functions of one complex variable |date=1979 |publisher=McGraw-Hill |isbn=0-07-000657-1 |edition=3 |___location=New York |oclc=4036464}}
* {{cite book |last=Carathéodory |first=Constantin |author-link=Constantin Carathéodory |title=Theory of functions of a complex variable |volume=2 |translator=F. Steinhardt |publisher=Chelsea |year=1954|url=https://books.google.com/books?id=UTTvAAAAMAAJ|oclc=926250115}}
* {{Cite book |last=Hille |first=Einar |author-link=Einar Hille
* {{Cite book |last=Nehari |first=Zeev |author-link=Zeev Nehari |title=Conformal mapping |date=1975 |publisher=Dover Publications |isbn=0-486-61137-X |___location=New York |oclc=1504503}}
* {{cite book |last1=Sansone |first1=Giovanni |author-link=Giovanni Sansone |last2=Gerretsen |first2=Johan |title=Lectures on the theory of functions of a complex variable. II: Geometric theory |publisher=Wolters-Noordhoff |year=1969 |oclc=245996162}}
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