Matches in DBpedia 2016-04 for { <http://dbpedia.org/resource/Sturmian_word> ?p ?o }
Showing triples 1 to 60 of
60
with 100 triples per page.
- Sturmian_word abstract "In mathematics, a Sturmian word (Sturmian sequence or billiard sequence), named after Jacques Charles François Sturm, is a certain kind of infinitely long sequence of characters. Such a sequence can be generated by considering a game of English billiards on a square table. The struck ball will successively hit the vertical and horizontal edges labelled 0 and 1 generating a sequence of letters. This sequence is a Sturmian word.".
- Sturmian_word thumbnail Fibonacci_word_cutting_sequence.png?width=300.
- Sturmian_word wikiPageID "1701956".
- Sturmian_word wikiPageLength "11918".
- Sturmian_word wikiPageOutDegree "35".
- Sturmian_word wikiPageRevisionID "679287674".
- Sturmian_word wikiPageWikiLink Beatty_sequence.
- Sturmian_word wikiPageWikiLink Cambridge_University_Press.
- Sturmian_word wikiPageWikiLink Category:Combinatorics_on_words.
- Sturmian_word wikiPageWikiLink Category:Sequences_and_series.
- Sturmian_word wikiPageWikiLink Complexity_function.
- Sturmian_word wikiPageWikiLink Concatenation.
- Sturmian_word wikiPageWikiLink Continued_fraction.
- Sturmian_word wikiPageWikiLink Cutting_sequence.
- Sturmian_word wikiPageWikiLink Discretization.
- Sturmian_word wikiPageWikiLink English_billiards.
- Sturmian_word wikiPageWikiLink Fibonacci_word.
- Sturmian_word wikiPageWikiLink Finite_difference.
- Sturmian_word wikiPageWikiLink Golden_ratio.
- Sturmian_word wikiPageWikiLink Gustav_A._Hedlund.
- Sturmian_word wikiPageWikiLink Hamming_weight.
- Sturmian_word wikiPageWikiLink Irrational_number.
- Sturmian_word wikiPageWikiLink Irrational_rotation.
- Sturmian_word wikiPageWikiLink Jacques_Charles_François_Sturm.
- Sturmian_word wikiPageWikiLink Johann_III_Bernoulli.
- Sturmian_word wikiPageWikiLink Limit_of_a_sequence.
- Sturmian_word wikiPageWikiLink Marston_Morse.
- Sturmian_word wikiPageWikiLink Mathematics.
- Sturmian_word wikiPageWikiLink Real_number.
- Sturmian_word wikiPageWikiLink Sequence.
- Sturmian_word wikiPageWikiLink String_(computer_science).
- Sturmian_word wikiPageWikiLink Sturm–Picone_comparison_theorem.
- Sturmian_word wikiPageWikiLink Substring.
- Sturmian_word wikiPageWikiLink Transcendental_number.
- Sturmian_word wikiPageWikiLink File:Fibonacci_word_cutting_sequence.png.
- Sturmian_word wikiPageWikiLink File:Sturmian-sequence-from-irrational-rotation.gif.
- Sturmian_word wikiPageWikiLinkText "Sturmian sequences".
- Sturmian_word wikiPageWikiLinkText "Sturmian word".
- Sturmian_word wikiPageWikiLinkText "Sturmian word#Frequencies".
- Sturmian_word wikiPageWikiLinkText "Sturmian word#Slope and intercept".
- Sturmian_word wikiPageWikiLinkText "Sturmian_word#Discussion".
- Sturmian_word wikiPageWikiLinkText "directive sequence".
- Sturmian_word wikiPageWikiLinkText "standard word".
- Sturmian_word wikiPageUsesTemplate Template:Cite_book.
- Sturmian_word wikiPageUsesTemplate Template:Reflist.
- Sturmian_word wikiPageUsesTemplate Template:Rp.
- Sturmian_word subject Category:Combinatorics_on_words.
- Sturmian_word subject Category:Sequences_and_series.
- Sturmian_word hypernym Kind.
- Sturmian_word type Combinatoric.
- Sturmian_word comment "In mathematics, a Sturmian word (Sturmian sequence or billiard sequence), named after Jacques Charles François Sturm, is a certain kind of infinitely long sequence of characters. Such a sequence can be generated by considering a game of English billiards on a square table. The struck ball will successively hit the vertical and horizontal edges labelled 0 and 1 generating a sequence of letters. This sequence is a Sturmian word.".
- Sturmian_word label "Sturmian word".
- Sturmian_word sameAs Q3325046.
- Sturmian_word sameAs Mot_sturmien.
- Sturmian_word sameAs Sturmiaans_woord.
- Sturmian_word sameAs m.05plfs.
- Sturmian_word sameAs Q3325046.
- Sturmian_word wasDerivedFrom Sturmian_word?oldid=679287674.
- Sturmian_word depiction Fibonacci_word_cutting_sequence.png.
- Sturmian_word isPrimaryTopicOf Sturmian_word.