Prime end

In mathematics, the prime end compactification is a method to compactify a topological disc (i.e. a simply connected open set in the plane) by adding the boundary circle in an appropriate way.

Historical notes

The concept of prime ends was introduced by Constantin Carathéodory to describe the boundary behavior of conformal maps in the complex plane in geometric terms.^[1] The theory has been generalized to more general open sets.^[2] The expository paper of Script error: No such module "Footnotes". provides a good account of this theory with complete proofs: it also introduces a definition which make sense in any open set and dimension.^[2] Script error: No such module "Footnotes". gives an accessible introduction to prime ends in the context of complex dynamical systems.

Formal definition

The set of prime ends of the domain Template:Mvar is the set of equivalence classes of chains of arcs converging to a point on the boundary of Template:Mvar.

In this way, a point in the boundary may correspond to many points in the prime ends of Template:Mvar, and conversely, many points in the boundary may correspond to a point in the prime ends of Template:Mvar.^[3]

Applications

Carathéodory's principal theorem on the correspondence between boundaries under conformal mappings can be expressed as follows:

If Template:Mvar maps the unit disk conformally and one-to-one onto the domain Template:Mvar, it induces a one-to-one mapping between the points on the unit circle and the prime ends of Template:Mvar.

Notes

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References

Template:More footnotes This article incorporates material from the Citizendium article "Prime ends", which is licensed under the Creative Commons Attribution-ShareAlike 3.0 Unported License but not under the GFDL.

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