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On Knaster’s problem
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Dold?s theorem gives sufficient conditions for proving that there is no
G-equivariant mapping between two spaces. We prove a generalization of Dold?s
theorem, which requires triviality of homology with some coefficients, up to
dimension n, instead of n-connectedness. Then we apply it to a special case
of the famous Knaster?s problem, and obtain a new proof of a result of C.T.
Yang, which is much shorter and simpler than previous proofs. Also, we obtain
a positive answer to some other cases of Knaster?s problem, and improve a
result of V.V. Makeev, by weakening the conditions.
Title: On Knaster’s problem
Description:
Dold?s theorem gives sufficient conditions for proving that there is no
G-equivariant mapping between two spaces.
We prove a generalization of Dold?s
theorem, which requires triviality of homology with some coefficients, up to
dimension n, instead of n-connectedness.
Then we apply it to a special case
of the famous Knaster?s problem, and obtain a new proof of a result of C.
T.
Yang, which is much shorter and simpler than previous proofs.
Also, we obtain
a positive answer to some other cases of Knaster?s problem, and improve a
result of V.
V.
Makeev, by weakening the conditions.
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