Complex geodesic

In mathematics, a complex geodesic is a generalization of the notion of geodesic to complex spaces.

Definition

Let (X, || ||) be a complex Banach space and let B be the open unit ball in X. Let Δ denote the open unit disc in the complex plane C, thought of as the Poincaré disc model for 2-dimensional real/1-dimensional complex hyperbolic geometry. Let the Poincaré metric ρ on Δ be given by

and denote the corresponding Carathéodory metric on B by d. Then a holomorphic function f : Δ  B is said to be a complex geodesic if

for all points w and z in Δ.

Properties and examples of complex geodesics

for some z  0, then f is a complex geodesic.
where α denotes the Caratheodory length of a tangent vector, then f is a complex geodesic.

References

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