Matches in DBpedia 2015-10 for { <http://dbpedia.org/resource/Young–Fibonacci_lattice> ?p ?o }
Showing triples 1 to 53 of
53
with 100 triples per page.
- Young–Fibonacci_lattice abstract "In mathematics, the Young–Fibonacci graph and Young–Fibonacci lattice, named after Alfred Young and Leonardo Fibonacci, are two closely related structures involving sequences of the digits 1 and 2. Any digit sequence of this type can be assigned a rank, the sum of its digits: for instance, the rank of 11212 is 1 + 1 + 2 + 1 + 2 = 7. As was already known in ancient India, the number of sequences with a given rank is a Fibonacci number. The Young–Fibonacci lattice is an infinite modular lattice having these digit sequences as its elements, compatible with this rank structure. The Young–Fibonacci graph is the graph of this lattice, and has a vertex for each digit sequence.The Young–Fibonacci graph and the Young–Fibonacci lattice were both initially studied in two papers by Fomin (1988) and Stanley (1988). They are named after the closely related Young's lattice and after the Fibonacci number of their elements at any given rank.".
- Young–Fibonacci_lattice thumbnail Young-Fibonacci.svg?width=300.
- Young–Fibonacci_lattice wikiPageID "21681153".
- Young–Fibonacci_lattice wikiPageLength "7739".
- Young–Fibonacci_lattice wikiPageOutDegree "27".
- Young–Fibonacci_lattice wikiPageRevisionID "623312003".
- Young–Fibonacci_lattice wikiPageWikiLink Alfred_Young.
- Young–Fibonacci_lattice wikiPageWikiLink Category:Combinatorics_on_words.
- Young–Fibonacci_lattice wikiPageWikiLink Category:Fibonacci_numbers.
- Young–Fibonacci_lattice wikiPageWikiLink Category:Individual_graphs.
- Young–Fibonacci_lattice wikiPageWikiLink Category:Infinite_graphs.
- Young–Fibonacci_lattice wikiPageWikiLink Category:Lattice_theory.
- Young–Fibonacci_lattice wikiPageWikiLink Differential_poset.
- Young–Fibonacci_lattice wikiPageWikiLink Directed_acyclic_graph.
- Young–Fibonacci_lattice wikiPageWikiLink Distributive_lattice.
- Young–Fibonacci_lattice wikiPageWikiLink Empty_string.
- Young–Fibonacci_lattice wikiPageWikiLink Fibonacci.
- Young–Fibonacci_lattice wikiPageWikiLink Fibonacci_number.
- Young–Fibonacci_lattice wikiPageWikiLink Graph_(mathematics).
- Young–Fibonacci_lattice wikiPageWikiLink Lattice_(order).
- Young–Fibonacci_lattice wikiPageWikiLink Leonardo_Fibonacci.
- Young–Fibonacci_lattice wikiPageWikiLink Mathematics.
- Young–Fibonacci_lattice wikiPageWikiLink Metre_(poetry).
- Young–Fibonacci_lattice wikiPageWikiLink Modular_lattice.
- Young–Fibonacci_lattice wikiPageWikiLink Partial_order.
- Young–Fibonacci_lattice wikiPageWikiLink Partially_ordered_set.
- Young–Fibonacci_lattice wikiPageWikiLink Prosody_(poetry).
- Young–Fibonacci_lattice wikiPageWikiLink Recurrence_relation.
- Young–Fibonacci_lattice wikiPageWikiLink Transitive_closure.
- Young–Fibonacci_lattice wikiPageWikiLink Undirected_graph.
- Young–Fibonacci_lattice wikiPageWikiLink Youngs_lattice.
- Young–Fibonacci_lattice wikiPageWikiLink File:Young-Fibonacci.svg.
- Young–Fibonacci_lattice wikiPageWikiLinkText "Young–Fibonacci graph".
- Young–Fibonacci_lattice wikiPageWikiLinkText "Young–Fibonacci lattice".
- Young–Fibonacci_lattice hasPhotoCollection Young–Fibonacci_lattice.
- Young–Fibonacci_lattice wikiPageUsesTemplate Template:Citation.
- Young–Fibonacci_lattice wikiPageUsesTemplate Template:Harvtxt.
- Young–Fibonacci_lattice wikiPageUsesTemplate Template:Math.
- Young–Fibonacci_lattice wikiPageUsesTemplate Template:Mvar.
- Young–Fibonacci_lattice subject Category:Combinatorics_on_words.
- Young–Fibonacci_lattice subject Category:Fibonacci_numbers.
- Young–Fibonacci_lattice subject Category:Individual_graphs.
- Young–Fibonacci_lattice subject Category:Infinite_graphs.
- Young–Fibonacci_lattice subject Category:Lattice_theory.
- Young–Fibonacci_lattice comment "In mathematics, the Young–Fibonacci graph and Young–Fibonacci lattice, named after Alfred Young and Leonardo Fibonacci, are two closely related structures involving sequences of the digits 1 and 2. Any digit sequence of this type can be assigned a rank, the sum of its digits: for instance, the rank of 11212 is 1 + 1 + 2 + 1 + 2 = 7. As was already known in ancient India, the number of sequences with a given rank is a Fibonacci number.".
- Young–Fibonacci_lattice label "Young–Fibonacci lattice".
- Young–Fibonacci_lattice sameAs Treillis_de_Young-Fibonacci.
- Young–Fibonacci_lattice sameAs m.05mxm30.
- Young–Fibonacci_lattice sameAs Q8058685.
- Young–Fibonacci_lattice sameAs Q8058685.
- Young–Fibonacci_lattice wasDerivedFrom Young–Fibonacci_lattice?oldid=623312003.
- Young–Fibonacci_lattice depiction Young-Fibonacci.svg.
- Young–Fibonacci_lattice isPrimaryTopicOf Young–Fibonacci_lattice.