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Schwarz–Ahlfors–Pick theorem - Wikipedia, the free encyclopedia

Schwarz–Ahlfors–Pick theorem

From Wikipedia, the free encyclopedia

In mathematics, the Schwarz–Ahlfors–Pick theorem is an extension of the Schwarz lemma for hyperbolic geometry, such as the Poincaré half-plane model. It states that the Poincaré metric is distance-decreasing on harmonic functions.

The theorem states that every holomorphic automorphism of the unit disk U, or the upper half-plane H, with distances defined by the Poincaré metric, is a contraction mapping. That is, every such analytic mapping will not increase the distance between points. Stated more precisely:

Theorem: (Schwarz–Ahlfors–Pick) For all holomorphic automorphisms $f:U\rightarrow U$ , one has $\rho(f(z_1),f(z_2)) \leq \rho(z_1,z_2)$ for points $z_1,z_2 \in U$ and Poincaré distance $ρ.$

For any tangent vector T, the hyperbolic length of the tangent vector does not increase: $|f^*(T)| \leq |T|.$

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Categories: Hyperbolic geometry | Differential geometry | Riemann surfaces | Mathematical theorems

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