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Line 53: The inverse function is an [[automorphic function]] for this discrete group of Möbius transformations. This is a special case of a general scheme of [[Henri Poincaré]] that associates automorphic forms with ordinary differential equations with regular singular points. 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. ~~When~~For ~~the~~a ~~target~~Möbius triangle, the inverse is a ~~Möbius~~[[single-valued]] ~~triangle~~function, ~~the inverse~~which can be expressed asusing: * Spherical: [[rational function]]s * Euclidean: [[elliptical function]]s * Hyperbolic: [[modular function]]s ** Ideal triangle: [[modular lambda function]] As mentioned earlier, the Schwarz triangle function is not directly useful for ideal triangles, but the [[modular lambda function]] can be used to express maps from ideal triangles to the upper half-plane. == Extensions ==

Schwarz triangle function: Difference between revisions