Bing–Borsuk conjecture

In mathematics, the Bing–Borsuk conjecture states that every $n$ -dimensional homogeneous absolute neighborhood retract space is a topological manifold. The conjecture has been proved for dimensions 1 and 2, and it is known that the 3-dimensional version of the conjecture implies the Poincaré conjecture.

Definitions

A topological space is homogeneous if, for any two points $m_{1},m_{2}\in M$ , there is a homeomorphism of $M$ which takes $m_{1}$ to $m_{2}$ .

A metric space $M$ is an absolute neighborhood retract (ANR) if, for every closed embedding $f:M\rightarrow N$ (where $N$ is a metric space), there exists an open neighbourhood $U$ of the image $f(M)$ which retracts to $f(M)$ .^[1]

There is an alternate statement of the Bing–Borsuk conjecture: suppose $M$ is embedded in $\mathbb {R} ^{m+n}$ for some $m\geq 3$ and this embedding can be extended to an embedding of $M\times (-\varepsilon ,\varepsilon )$ . If $M$ has a mapping cylinder neighbourhood $N=C_{\varphi }$ of some map $\varphi :\partial N\rightarrow M$ with mapping cylinder projection $\pi :N\rightarrow M$ , then $\pi$ is an approximate fibration.^[2]

History

The conjecture was first made in a paper by R. H. Bing and Karol Borsuk in 1965, who proved it for $n=1$ and 2.^[3]^[4]

Włodzimierz Jakobsche showed in 1978 that, if the Bing–Borsuk conjecture is true in dimension 3, then the Poincaré conjecture must also be true.^[5]

The Busemann conjecture states that every Busemann $G$ -space is a topological manifold. It is a special case of the Bing–Borsuk conjecture. The Busemann conjecture is known to be true for dimensions 1 to 4.

References

^ Halverson, Denise M.; Repovš, Dušan (2008). "The Bing-Borsuk and the Busemann Conjectures". arXiv:0811.0886 [math.GT].
^ Daverman, R. J.; Husch, L. S. (1984). "Decompositions and approximate fibrations". The Michigan Mathematical Journal. 31 (2): 197–214. doi:10.1307/mmj/1029003024. ISSN 0026-2285.
^ Bing, R. H.; Armentrout, Steve (1998). The Collected Papers of R. H. Bing. American Mathematical Soc. p. 167. ISBN 9780821810477.
^ Bing, R. H.; Borsuk, K. (1965). "Some Remarks Concerning Topologically Homogeneous Spaces". The Annals of Mathematics. 81 (1): 100. doi:10.2307/1970385. JSTOR 1970385. Retrieved 2025-06-01.
^ Jakobsche, W. (1980). "The Bing–Borsuk conjecture is stronger than the Poincaré conjecture". Fundamenta Mathematicae. 106 (2): 127–134. doi:10.4064/fm-106-2-127-134. ISSN 0016-2736.

[1] Halverson, Denise M.; Repovš, Dušan (2008). "The Bing-Borsuk and the Busemann Conjectures". arXiv:0811.0886 [math.GT].

[2] Daverman, R. J.; Husch, L. S. (1984). "Decompositions and approximate fibrations". The Michigan Mathematical Journal. 31 (2): 197–214. doi:10.1307/mmj/1029003024. ISSN 0026-2285.

[3] Bing, R. H.; Armentrout, Steve (1998). The Collected Papers of R. H. Bing. American Mathematical Soc. p. 167. ISBN 9780821810477.

[BingBorsuk-4] Bing, R. H.; Borsuk, K. (1965). "Some Remarks Concerning Topologically Homogeneous Spaces". The Annals of Mathematics. 81 (1): 100. doi:10.2307/1970385. JSTOR 1970385. Retrieved 2025-06-01.

[5] Jakobsche, W. (1980). "The Bing–Borsuk conjecture is stronger than the Poincaré conjecture". Fundamenta Mathematicae. 106 (2): 127–134. doi:10.4064/fm-106-2-127-134. ISSN 0016-2736.

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