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Colloquium on Topology, Gyula, Hungary
August 9-15, 1998
János Bolyai Mathematical Society
Budapest, Hungary

Organizers
M. Bognár, A. Császár (chairman), J. Gerlits, I. Juhász, E. Makai, G. Moussong, R. Rimányi, L. Soukup, A. Stipsicz, J. Szenthe, A. Szücs (secretary)

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On cell-like resolutions of 2-polyhedra up to special ones
by
Salikhov Konstantin
Moscow State University
Coauthors: Dusan Repovs

We show that two important concepts of geometric topology - cell-like resolutions and special polyherdra - are closely related. A cell-like (resp. collapsible) resolutoin of a polyhedron P is a pair (Q, f) of a polyhedron Q and a PL proper surjective map f:Q --> P with cell-like (resp. collapsible) point-inverses. Our main result is:

Let P be a finite connected polyhedron of dimension at most two, distinct from a point. Then P admits a cell-like (or collapsible) resolution up to a special (in the sense of Matveev) polyhedron Q iff either P is a 2-shpere or (P - P' is a disjoint union of open 2-disks, and P is ``dimensionally homogeneous'')

Here P' is the subgraph of P, consisting of all points having no neighbourhood, homeomorphic to a closed 2-disk. Among the corollaries is a reduction of the Whitehead Conjecture on asphericalness.

Date received: June 15, 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 Conferences Inc. Document # cabc-35.