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- Dowker_notation abstract "In the mathematical field of knot theory, the Dowker notation, also called the Dowker–Thistlethwaite notation or code, for a knot is a sequence of even integers. The notation is named after Clifford Hugh Dowker and Morwen Thistlethwaite, who refined a notation originally due to Peter Guthrie Tait. To generate the Dowker notation, traverse the knot using an arbitrary starting point and direction. Label each of the n crossings with the numbers 1, ..., 2n in order of traversal (each crossing is visited and labelled twice), with the following modification: if the label is an even number and the strand followed crosses over at the crossing, then change the sign on the label to be a negative. When finished, each crossing will be labelled a pair of integers, one even and one odd. The Dowker notation is the sequence of even integer labels associated with the labels 1, 3, ..., 2n − 1 in turn.For example, a knot diagram may have crossings labelled with the pairs (1, −6) (−3, 12) (5, −2) (7, −8) (−9, 4) and (11, −10). The Dowker notation for this labelling is the sequence: −6 12 −2 −8 4 −10.A knot can be recovered from a Dowker sequence, but the recovered knot may differ from the original by being a reflection or (more generally) by having any connected sum component reflected in the line between its entry/exit points – the Dowker notation is unchanged by these reflections. Knots tabulations typically consider only prime knots and disregard chirality, so this ambiguity does not affect the tabulation.The ménage problem, posed by Tait, concerns counting the number of different number sequences possible in this notation.".
- Dowker_notation thumbnail Dowker-notation-example.png?width=300.
- Dowker_notation wikiPageID "5708669".
- Dowker_notation wikiPageLength "2774".
- Dowker_notation wikiPageOutDegree "17".
- Dowker_notation wikiPageRevisionID "675733825".
- Dowker_notation wikiPageWikiLink Category:Knot_theory.
- Dowker_notation wikiPageWikiLink Category:Mathematical_notation.
- Dowker_notation wikiPageWikiLink Chirality.
- Dowker_notation wikiPageWikiLink Clifford_Hugh_Dowker.
- Dowker_notation wikiPageWikiLink Connected_sum.
- Dowker_notation wikiPageWikiLink Conway_notation_(knot_theory).
- Dowker_notation wikiPageWikiLink Integer.
- Dowker_notation wikiPageWikiLink Knot_(mathematics).
- Dowker_notation wikiPageWikiLink Knot_theory.
- Dowker_notation wikiPageWikiLink Mathematics.
- Dowker_notation wikiPageWikiLink Morwen_Thistlethwaite.
- Dowker_notation wikiPageWikiLink Ménage_problem.
- Dowker_notation wikiPageWikiLink Peter_Tait_(physicist).
- Dowker_notation wikiPageWikiLink Prime_knot.
- Dowker_notation wikiPageWikiLink File:Dowker-notation-example.png.
- Dowker_notation wikiPageWikiLinkText "Dowker notation".
- Dowker_notation wikiPageUsesTemplate Template:Cite_book.
- Dowker_notation wikiPageUsesTemplate Template:Cite_journal.
- Dowker_notation wikiPageUsesTemplate Template:Knot_Atlas.
- Dowker_notation wikiPageUsesTemplate Template:Knot_theory.
- Dowker_notation wikiPageUsesTemplate Template:Knottheory-stub.
- Dowker_notation subject Category:Knot_theory.
- Dowker_notation subject Category:Mathematical_notation.
- Dowker_notation hypernym Sequence.
- Dowker_notation comment "In the mathematical field of knot theory, the Dowker notation, also called the Dowker–Thistlethwaite notation or code, for a knot is a sequence of even integers. The notation is named after Clifford Hugh Dowker and Morwen Thistlethwaite, who refined a notation originally due to Peter Guthrie Tait. To generate the Dowker notation, traverse the knot using an arbitrary starting point and direction.".
- Dowker_notation label "Dowker notation".
- Dowker_notation sameAs Q5302692.
- Dowker_notation sameAs ドウカーの表示法.
- Dowker_notation sameAs m.025tl7n.
- Dowker_notation sameAs Q5302692.
- Dowker_notation wasDerivedFrom Dowker_notation?oldid=675733825.
- Dowker_notation depiction Dowker-notation-example.png.
- Dowker_notation isPrimaryTopicOf Dowker_notation.