Matches in DBpedia 2016-04 for { <http://dbpedia.org/resource/Polyknight> ?p ?o }
Showing triples 1 to 35 of
35
with 100 triples per page.
- Polyknight abstract "A polyknight is a plane geometric figure formed by selecting cells in a square lattice that could represent the path of a chess knight in which doubling back is allowed. It is a polyform with square cells which are not necessarily connected, comparable to the polyking. Alternatively, it can be interpreted as a connected subset of the vertices of a knight's graph, a graph formed by connecting pairs of lattice squares that are a knight's move apart.".
- Polyknight thumbnail Tetraknights.png?width=300.
- Polyknight wikiPageID "33006898".
- Polyknight wikiPageLength "3052".
- Polyknight wikiPageOutDegree "12".
- Polyknight wikiPageRevisionID "656823645".
- Polyknight wikiPageWikiLink Category:Polyforms.
- Polyknight wikiPageWikiLink Category:Recreational_mathematics.
- Polyknight wikiPageWikiLink Glide_reflection.
- Polyknight wikiPageWikiLink Knight_(chess).
- Polyknight wikiPageWikiLink Knights_graph.
- Polyknight wikiPageWikiLink On-Line_Encyclopedia_of_Integer_Sequences.
- Polyknight wikiPageWikiLink Polyform.
- Polyknight wikiPageWikiLink Polyking.
- Polyknight wikiPageWikiLink Reflection_(mathematics).
- Polyknight wikiPageWikiLink Rotation.
- Polyknight wikiPageWikiLink Translation_(geometry).
- Polyknight wikiPageWikiLink File:Tetraknights.png.
- Polyknight wikiPageUsesTemplate Template:Gallery.
- Polyknight wikiPageUsesTemplate Template:OEIS_link.
- Polyknight wikiPageUsesTemplate Template:Polyforms.
- Polyknight wikiPageUsesTemplate Template:Reflist.
- Polyknight subject Category:Polyforms.
- Polyknight subject Category:Recreational_mathematics.
- Polyknight hypernym Figure.
- Polyknight type Person.
- Polyknight type Field.
- Polyknight comment "A polyknight is a plane geometric figure formed by selecting cells in a square lattice that could represent the path of a chess knight in which doubling back is allowed. It is a polyform with square cells which are not necessarily connected, comparable to the polyking. Alternatively, it can be interpreted as a connected subset of the vertices of a knight's graph, a graph formed by connecting pairs of lattice squares that are a knight's move apart.".
- Polyknight label "Polyknight".
- Polyknight sameAs Q7226514.
- Polyknight sameAs m.0h532q6.
- Polyknight sameAs Q7226514.
- Polyknight wasDerivedFrom Polyknight?oldid=656823645.
- Polyknight depiction Tetraknights.png.
- Polyknight isPrimaryTopicOf Polyknight.