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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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Michael's Questions of Strict Contractibility
by
Jerzy Dydak
University of Tennessee
Coauthors: J.Segal, S.Spiez

A space X is strictly contractible to a point x0 in X if there exists a homotopy H:X×[0, 1] --> X starting at identity such that H(x, t)=x0 if and only if either x=x0 or t=1. E. Michael proved [11] that if E is locally compact and non-compact space then E×0 is a perfect retract of the product E×[0, 1) if and only if the one-point compactification E*=E \cup x* of E is strictly contractible to x*. We answer some questions posed by E. Michael in [11] and we characterize strictly contractible ANRs in shape-theoretic terms.

Date received: June 22, 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-33.