AMCA: Fundamental groups of locally complicated spaces by Gregory R. Conner

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International Conference on Non-Positive Curvature in Group Theory, Topology, and Geometry
May 28-31, 1998
Vanderbilt University
Nashville, TN, USA

Organizers
B. Hughes, M. Mihalik, E. Prassidis, J. Ratcliffe, K. Ruane, M. Sapir, E. Schechter

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Fundamental groups of locally complicated spaces
by
Gregory R. Conner
Brigham Young University
Coauthors: James W. Cannon, Jack W. Lamoreaux

The notion of fundamental group is very useful in the study of spaces which are locally ``simple'', such as manifolds, simplicial complexes, CW-complexes, and, more generally, spaces which admit a universal cover.

This talk will focus on fundamental groups of spaces which are locally ``complicated''. The standard example of a locally complicated space is the Hawaiian earring (the union of planar circles of radius 1/n, for all naturals n, tangent to the x-axis at the origin.)

The results we will discuss come from four recent preprints and include the following:

The realization of the fundamental group of the Hawaiian earring as a group of ``infinite words'', generalizing the notion of free groups of finite rank.

The fundamental group of a connected, locally path connected, separable, one-dimensional metric space is countable if and only if it is free, if and only if the space has a universal cover.

The fundamental group of a connected, locally path connected, planar set is countable if and only if it is free, if and only if the space has a universal cover.

Date received: April 20, 1998

Copyright © 1998 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 Mathematical Conference Abstracts. Document # cabb-32.