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- Möbius_ladder abstract "In graph theory, the Möbius ladder Mn is a cubic circulant graph with an even number n of vertices, formed from an n-cycle by adding edges (called "rungs") connecting opposite pairs of vertices in the cycle. It is so-named because (with the exception of M6 = K3,3) Mn has exactly n/2 4-cycles which link together by their shared edges to form a topological Möbius strip. Möbius ladders were named and first studied by Guy and Harary (1967).".
- Möbius_ladder thumbnail Moebius-ladder-16.svg?width=300.
- Möbius_ladder wikiPageID "7355278".
- Möbius_ladder wikiPageRevisionID "559217992".
- Möbius_ladder author1Link "Richard K. Guy".
- Möbius_ladder author2Link "Frank Harary".
- Möbius_ladder authorlink "Klaus Wagner".
- Möbius_ladder first "Klaus".
- Möbius_ladder last "Guy".
- Möbius_ladder last "Harary".
- Möbius_ladder last "Wagner".
- Möbius_ladder title "Möbius Ladder".
- Möbius_ladder urlname "MoebiusLadder".
- Möbius_ladder year "1937".
- Möbius_ladder year "1967".
- Möbius_ladder subject Category:Parametric_families_of_graphs.
- Möbius_ladder subject Category:Regular_graphs.
- Möbius_ladder comment "In graph theory, the Möbius ladder Mn is a cubic circulant graph with an even number n of vertices, formed from an n-cycle by adding edges (called "rungs") connecting opposite pairs of vertices in the cycle. It is so-named because (with the exception of M6 = K3,3) Mn has exactly n/2 4-cycles which link together by their shared edges to form a topological Möbius strip. Möbius ladders were named and first studied by Guy and Harary (1967).".
- Möbius_ladder label "Möbius ladder".
- Möbius_ladder label "Échelle de Möbius".
- Möbius_ladder sameAs M%C3%B6bius_ladder.
- Möbius_ladder sameAs Échelle_de_Möbius.
- Möbius_ladder sameAs Q4307303.
- Möbius_ladder sameAs Q4307303.
- Möbius_ladder wasDerivedFrom Möbius_ladder?oldid=559217992.
- Möbius_ladder depiction Moebius-ladder-16.svg.