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In mathematics, a mapping - w = f(z)
is angle-preserving or (more usually) conformal at a point z0, if it preserves oriented angles between curves through z0, as well as their orientation, i.e. direction. Conformal maps preserve both angles and the shapes of infinitesimally small figures.
This is the basic concept for the following applications.
Cartography
In cartography, a conformal map projection is a map projection that preserves the angles at all but a finite number of points. The scale depends on location, but not on direction.
Examples include the Mercator projection and the stereographic projection.
Complex analysis An important family of examples comes from complex analysis. If U is an open subset of the complex plane, C, then a function - f : U → C
is conformal if and only if it is holomorphic or antiholomorphic (i.e conjugate to holomorphic), and its derivative is everywhere non-zero on U.
The Riemann mapping theorem, one of the profound results of complex analysis, states that any non-empty open simply connected proper subset of C admits a bijective conformal map to the open unit disk in C.
A map of the extended complex plane (which is conformally equivalent to a sphere) onto itself is conformal if and only if it is a Möbius transformation or its conjugate.
Riemannian geometry In Riemannian geometry, two Riemannian metrics g and h on smooth manifold M are called conformally equivalent if for g=uh for some positive function u on M. The function u is called conformal factor.
A diffeomorphism between two Riemannian manifolds is called a conformal map if the pulled back metric is conformally equivalent to the original one.
One can also define a conformal structure on a smooth manifold, as a class of conformally equivalent Riemannian metrics.
For example, stereographic projection of a sphere onto the plane augmented with a point at infinity is a conformal map.
Any conformal map from Euclidean space of dimension at least 3 to itself is a composition of a homothety and an isometry.
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