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- Q4891456 subject Q13267215.
- Q4891456 subject Q8981903.
- Q4891456 abstract "In the mathematical theory of knots, a Berge knot or doubly primitive knot is any member of a particular family of knots in the 3-sphere. A Berge knot K is defined by the conditions: K lies on a genus two Heegaard surface S in each handlebody bound by S, K meets some meridian disc exactly once.John Berge constructed these knots as a way of creating knots with lens space surgeries and classified all the Berge knots. Cameron Gordon conjectured these were the only knots admitting lens space surgeries. This is now known as the #Berge conjecture.".
- Q4891456 wikiPageExternalLink the-berge-conjecture.
- Q4891456 wikiPageExternalLink knot-complements-covering-knot-complements.
- Q4891456 wikiPageWikiLink Q1143042.
- Q4891456 wikiPageWikiLink Q1188853.
- Q4891456 wikiPageWikiLink Q13267215.
- Q4891456 wikiPageWikiLink Q2274197.
- Q4891456 wikiPageWikiLink Q2381352.
- Q4891456 wikiPageWikiLink Q2470499.
- Q4891456 wikiPageWikiLink Q30849.
- Q4891456 wikiPageWikiLink Q32229.
- Q4891456 wikiPageWikiLink Q3675173.
- Q4891456 wikiPageWikiLink Q5026253.
- Q4891456 wikiPageWikiLink Q564426.
- Q4891456 wikiPageWikiLink Q849798.
- Q4891456 wikiPageWikiLink Q8981903.
- Q4891456 comment "In the mathematical theory of knots, a Berge knot or doubly primitive knot is any member of a particular family of knots in the 3-sphere. A Berge knot K is defined by the conditions: K lies on a genus two Heegaard surface S in each handlebody bound by S, K meets some meridian disc exactly once.John Berge constructed these knots as a way of creating knots with lens space surgeries and classified all the Berge knots.".
- Q4891456 label "Berge knot".