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The First Turkish International Conference on Topology and its Applications
August 2-5, 2000
Istanbul University
Istanbul, Turkey

Organizers
Nurettin Ergun, Mahir Hasanov, Turgut Önder, Cem Tezer, Murat Tuncali, Stephen Watson

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Partitioning in locally connected metric spaces
by
E. D. Tymchatyn
University of Saskatchewan, Canada

A partition of a locally connected metric space is a finite collection U of closed locally connected subsets u such that the boundary of u is a Z-set for arcs in u and each two members of U meet at most in common boundary points.Moise and Bing used partitions to prove that each Peano continuum admits a compatible convex metric.i.e.a metric d such that each pair of points are joined by a subset isometric to an interval in the real line.More recently partitions have been used in the study of Menger manifolds and Nobeling manifolds.We look again at partitions with an eye towards applications in the noncompact case.

Date received: July 5, 2000

Copyright © 2000 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 # caeh-59.