Polyhedra for which every homotopy domination over itself is a homotopy equivalence
نویسندگان
چکیده
In this paper we study an open problem: Is it true that each homotopy domination of a polyhedron over itself is equivalence? Since every ANR has the type polyhedron, question related in obvious way to longstanding Borsuk's problem (1967) two ANR's dominating other have same type? The answer positive for all polyhedra (or ANR's) with polycyclic-by-finite fundamental groups, manifolds, and clearly 1-dimensional polyhedra. some previous paper, proved also holds 2-dimensional weakly Hopfian (hence co-Hopfian) groups (a group if not isomorphic proper retract itself). extend result (G,n)-complexes (where n?2). A (G,n)-complex, n-dimensional finite CW-complex G ?r dimensions 1<r<n trivial. We discuss potential counterexamples. As corollary obtain classes spaces, question: types quasi-homeomorphic are equal?, (this was asked by S. Ferry recent edition Scottish Book (1981)).
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ژورنال
عنوان ژورنال: Topology and its Applications
سال: 2023
ISSN: ['1879-3207', '0166-8641']
DOI: https://doi.org/10.1016/j.topol.2023.108572