L10a140 Quick Notes: Difference between revisions
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<noinclude>''Back to [[L10a140]]''<br></noinclude> |
<noinclude>''Back to [[L10a140]]''<br></noinclude> |
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Brunnian link. Presumably the simplest Brunnian link other than the Borromean rings.[http://drorbn.net/AcademicPensieve/2010-08/nb/AllBrunnians,Maybe.pdf] The second in an infinite series of Brunnian links -- if the blue and yellow loops in the illustration have only one twist along each side, the result is the Borromean rings; if the blue and yellow loops have three twists along each side, the result is this L10a140 link; if the blue and yellow loops have five twists along each side, the result is a three-loop link with 14 overall crossings, etc.[http://www.mi.sanu.ac.rs/vismath/bor/bor4.htm] |
Brunnian link. Presumably the simplest Brunnian link other than the Borromean rings.[http://drorbn.net/AcademicPensieve/2010-08/nb/AllBrunnians,Maybe.pdf] The second in an infinite series of Brunnian links -- if the blue and yellow loops in the illustration below have only one twist along each side, the result is the Borromean rings; if the blue and yellow loops have three twists along each side, the result is this L10a140 link; if the blue and yellow loops have five twists along each side, the result is a three-loop link with 14 overall crossings, etc.[http://www.mi.sanu.ac.rs/vismath/bor/bor4.htm] |
Revision as of 10:20, 2 May 2013
Back to L10a140
Brunnian link. Presumably the simplest Brunnian link other than the Borromean rings.[1] The second in an infinite series of Brunnian links -- if the blue and yellow loops in the illustration below have only one twist along each side, the result is the Borromean rings; if the blue and yellow loops have three twists along each side, the result is this L10a140 link; if the blue and yellow loops have five twists along each side, the result is a three-loop link with 14 overall crossings, etc.[2]