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Rodríguez Sanjurjo, José Manuel (1985) On a theorem of B. J. Ball. Bulletin of the Polish Academy of Sciences. Mathematics, 33 (3-4). pp. 177-180. ISSN 0239-7269
Official URL: http://journals.impan.gov.pl/ba/
Abstract
The author generalizes some results of Ball concerning the relationship between the shape of a locally compact metrizable space with compact components and the shape of its components. The following results are proved. Let X and Y be locally compact metrizable spaces with compact components. (1) If μ:X→Y is a shape morphism, then there exists exactly one function Λ:□(X)→□(Y) satisfying the following condition: If X0∈□(X) and Y0=Λ(X0) then there is a shape morphism μ0:X0→Y0 such that S[i(Y0,Y)]⋅μ0=μ⋅S[i(X0,X)], where S[i(Y0,Y)] is the shape morphism induced by the inclusion. Moreover, Λ is continuous and for every compact set A⊂□(X) there exists exactly one shape morphism η:p−1(A)→q−1(Λ(A)) satisfying the following condition: S[i(q−1(Λ(A)),Y)]⋅η=μ⋅S[i(p−1(A),X)]. (2) Let μ:X→Y be a shape morphism such that the induced map Λ:□(X)→□(Y) is a homeomorphism. If for each component X0 of X the unique shape morphism μ0:X0→Y0=Λ(X0) satisfying S[i(Y0,Y)]⋅μ0=μ⋅S[i(X0,X)] is an isomorphism, then μ is an isomorphism.
Item Type: | Article |
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Uncontrolled Keywords: | shape in the sense of Fox; considers locally compact metrizable spaces; component spaces; shape morphisms; shape equivalence; embedding |
Subjects: | Sciences > Mathematics > Topology |
ID Code: | 21963 |
Deposited On: | 19 Jun 2013 16:11 |
Last Modified: | 12 Dec 2018 15:14 |
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