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Line 49: When ''α, β'', and ''γ'' are rational, the triangle is a Schwarz triangle. When each of ''α, β'', and ''γ'' are either the reciprocal of an integer or zero, the triangle is a [[Möbius triangle]], i.e. a non-overlapping Schwarz triangle. For a Möbius triangle, the inverse is a [[modular function]]. In the spherical case, that modular function is a [[rational function]]. For Euclidean triangles, the inverse can be expressed using [[elliptical function]]s.<ref name=Lee /> == Ideal triangles == Line 61: 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-3'' − 3 additional parameters, which are difficult to determine in practice.{{sfn\|Nehari\|1975\|p=202}} See {{slink\|Schwarzian derivative#Conformal mapping of circular arc polygons}} for more details. == Applications == [[L. P. Lee]] used Schwarz triangle functions to derive [[conformal map projection]]s onto [[polyhedral map projection\|polyhedral]] surfaces.<ref name=Lee>{{cite book \| last = Lee \| first = L. P. \| author-link = Laurence Patrick Lee \| year = 1976 \| title = Conformal Projections ~~based~~Based on Elliptic Functions \|~~year~~ ___location =~~1976~~ Toronto \| publisher =~~University~~ ofB. ~~Toronto~~V. ~~Press~~Gutsell, York University \| series = Cartographica Monographs \| volume = 16 \| url = https://archive.org/details/conformalproject0000leel \| url-access = limited \| isbn = 0-919870-16-3}} Supplement No. 1 to [https://www.utpjournals.press/toc/cart/13/1 ''The Canadian Cartographer'' '''13'''].</ref> \|isbn=9780919870161 \|url=https://archive.org/details/conformalproject0000leel \|url-access=limited }} Chapters also published in [https://www.utpjournals.press/toc/cart/13/1 ''The Canadian Cartographer''. '''13''' (1). 1976.]</ref> ==References== {{reflist\|~~20em~~30em}} ==Sources== Line 74 ⟶ 73: * {{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 ~~\|url=https://www.worldcat.org/oclc/36225146~~ \|title=Ordinary differential equations in the complex ___domain \|date=1997 \|publisher=Dover Publications \|isbn=0-486-69620-0 \|___location=Mineola, N.Y. \|oclc=36225146}} * {{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}}