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Spring Topology and Dynamical Systems Conference 2008
March 13-15, 2008
University of Wisconsin Milwaukee and Marquette University
Milwaukee, WI, USA

Organizers
Ric Ancel, Karen Brucks, Craig Guilbault, Chris Hruska, Suzanne Hruska, Boris Okun (UWM); Paul Bankston (Marquette); Lois Kailhofer (Alverno College).

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Partitions of open and connected subsets of the sphere
by
Lex Oversteegen
UAB
Coauthors: R. Fokkink, J. Mayer and E. Tymchatyn

Suppose that U is a connected and open subset of the sphere. It follows from a result of Kulkarni and Pinkall that U can be partitioned into disjoint closed subsets Fa of U such that for each a there exists a unique, round ball Ba ⊂ U (in the spherical metric) such that Fa ⊂ Ba. Each component of the boundary of each Fa in U is part of a round circle and hence is a particularly simple crosscut of U. If the boundary of U is connected, then the collection of all such crosscuts is sufficient for the study of prime ends of U. In this case we can replace these crosscuts by hyperbolic geodesics (or, as was done by H. Bell, by straight line segments) obtaining other partitions of U into disjoint closed sets. These results can be used to extend certain homeomorphisms on the boundary of U over U. (For example, the Schoenflies Theorem follows immediately.)

Date received: February 28, 2008

Copyright © 2008 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Conferences Inc. Document # cawy-10.