Atlas home || Conferences | Abstracts | about Atlas

Spring Topology and Dynamical Systems Conference 2003
March 20-22, 2003
Texas Tech University
Lubbock, TX, USA

Organizers
Wayne Lewis, Razvan Gelca, Harold Bennett, Carl Seaquist

View Abstracts
Conference Homepage

Completing Artin's ordered braid group on infinitely many strands
by
Paul Fabel
Mississippi State University

Artin's braid group on n strands B(n) is the fundamental group of the configuration space consisting of planar sets with precisely n elements. Artin's braid group on infinitely many strands B(\infty) is the direct limit of B(n) taken over monomorphisms from B(n) into B(n+1) which attach a 'trivial strand' to each element of B(n). There is a notable order topology on B(\infty) with respect to which B(\infty) becomes a topological group homeomorphic to the rationals. We will exhibit a complete topological group extending B(\infty).

Date received: February 25, 2003

Copyright © 2003 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 # cajz-60.