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Post Closed as "Not suitable for this site" by D.-C. Cisinski, Ricardo Andrade, S. Carnahan
Typo in title
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edit approved Nov 7, 2014 at 19:54
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edit approved Nov 7, 2014 at 19:54
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Result like unseperatablility Unseparability of two linked ringrings in higher dimensions

I am not familiar with topology. We know that in $R^3$, we can not seperatecannot separate two "ring""rings": two copies of $S^1$, if they are "linked". I

I wonder that is there any similar resultresults for two copies of $S^1\times I^k$ embedded in $R^{2k+3}, I:= [-1,1]$? Thanks a lot!

Result like unseperatablility of two linked ring in higher dimensions

I am not familiar with topology. We know that in $R^3$, we can not seperate two "ring": two copies of $S^1$, if they are "linked". I wonder that is there any similar result for two copies of $S^1\times I^k$ embedded in $R^{2k+3}, I:= [-1,1]$? Thanks a lot!

Unseparability of two linked rings in higher dimensions

I am not familiar with topology. We know that in $R^3$, we cannot separate two "rings": two copies of $S^1$, if they are "linked".

I wonder that is there any similar results for two copies of $S^1\times I^k$ embedded in $R^{2k+3}, I:= [-1,1]$? Thanks a lot!

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Yong
Yong
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Result like unseperatablility of two linked ring in higher dimensions

I am not familiar with topology. We know that in $R^3$, we can not seperate two "ring": two copies of $S^1$, if they are "linked". I wonder that is there any similar result for two copies of $S^1\times I^k$ embedded in $R^{2k+3}, I:= [-1,1]$? Thanks a lot!