About: Ramanujan–Sato series

Property	Value
dbo:abstract	En matemáticas, una serie de Ramanujan-Sato generaliza las de Ramanujan tales como a la forma mediante el uso de otras secuencias de enteros bien definidas obedeciendo una cierta relación de recurrencia, secuencias que pueden expresarse en términos de coeficientes binomiales y empleando formas modulares de niveles superiores. Ramanujan hizo el enigmático comentario de que había "teorías correspondientes", pero solo mucho después H. H. Chan y S. Cooper han encontrado un enfoque general que utilizaba el subgrupo de congruencia modular subyacente , mientras que G. Almkvist ha encontrado numerosos otros ejemplos también con un método general que utiliza operadores diferenciales. Los niveles 1-4A fueron dados por Ramanujan (1914), el nivel 5 por H. H. Chan y S. Cooper (2012), el 6A por Chan, Tanigawa, Yang y Zudilin, el 6B por Sato (2002}}, el 6C por H. Chan, S. Chan y Z. Liu (2004), el 6D por H. Chan y H. Verrill (2009), el nivel 7 por S. Cooper (2012), parte del nivel 8 por Almkvist y Guillera (2012), parte del nivel 10 por Y. Yang, y el resto por H. H. Chan y S. Cooper. La notación jn(t) se deriva de Zagier y Tn se refiere a la serie relevante de McKay-Thompson. (es) In mathematics, a Ramanujan–Sato series generalizes Ramanujan’s pi formulas such as, to the form by using other well-defined sequences of integers obeying a certain recurrence relation, sequences which may be expressed in terms of binomial coefficients , and employing modular forms of higher levels. Ramanujan made the enigmatic remark that there were "corresponding theories", but it was only recently that H. H. Chan and S. Cooper found a general approach that used the underlying modular congruence subgroup , while G. Almkvist has experimentally found numerous other examples also with a general method using differential operators. Levels 1–4A were given by Ramanujan (1914), level 5 by H. H. Chan and S. Cooper (2012), 6A by Chan, Tanigawa, Yang, and Zudilin, 6B by Sato (2002), 6C by H. Chan, S. Chan, and Z. Liu (2004), 6D by H. Chan and H. Verrill (2009), level 7 by S. Cooper (2012), part of level 8 by Almkvist and Guillera (2012), part of level 10 by Y. Yang, and the rest by H. H. Chan and S. Cooper. The notation jn(τ) is derived from Zagier and Tn refers to the relevant McKay–Thompson series. (en) Em matemática, séries de Ramanujan-Sato generalizam fórmulas pi de Ramanujan tais como, para a forma, utilizando outras sequências bem definidas de inteiros , obedecendo uma certa relação de recorrência, sequências que podem ser expressas em termos de coeficientes binomial , e empregando formas modulares de níveis mais elevados. A série é nomeado em homenagem a Takeshi Sato e Srinivasa Ramanujan. (pt)
dbo:wikiPageExternalLink	http://oeis.org/wiki/Index_to_OEIS:_Section_Mat%23McKay_Thompson http://www.cecm.sfu.ca/organics/papers/garvan/paper/html/paper.html http://mathworld.wolfram.com/FranelNumber.html
dbo:wikiPageID	42185330 (xsd:integer)
dbo:wikiPageLength	35336 (xsd:nonNegativeInteger)
dbo:wikiPageRevisionID	1099315673 (xsd:integer)
dbo:wikiPageWikiLink	dbr:Baby_Monster_group dbr:Binomial_coefficients dbr:Borwein's_algorithm dbr:Dedekind_eta_function dbr:Apéry's_theorem dbc:Pi_algorithms dbr:List_of_formulae_involving_π dbr:Integer_lattice dbc:Srinivasa_Ramanujan dbr:Mathematics dbr:Circumference_of_an_ellipse dbr:Eisenstein_series dbr:Modular_form dbr:Monstrous_moonshine dbr:Stirling's_approximation dbr:Fundamental_unit_(number_theory) dbr:Catalan_numbers dbr:Irreducible_representation dbr:Weber_modular_function dbr:Cube_root dbr:Central_binomial_coefficient dbr:Chudnovsky_algorithm dbr:Recurrence_relation dbc:Mathematical_series dbr:J-invariant dbr:Arithmetic-geometric_mean dbr:John_McKay_(mathematician) dbr:Diamond_cubic dbr:Don_Zagier dbr:Square_root dbr:Integer dbr:Sequence dbr:Experimental_mathematics dbr:Differential_operators dbr:Wallis_product dbr:Fischer_group_Fi23 dbr:Ramanujan dbr:Modular_forms
dbp:wikiPageUsesTemplate	dbt:Reflist dbt:OEIS2C
dcterms:subject	dbc:Pi_algorithms dbc:Srinivasa_Ramanujan dbc:Mathematical_series
rdfs:comment	Em matemática, séries de Ramanujan-Sato generalizam fórmulas pi de Ramanujan tais como, para a forma, utilizando outras sequências bem definidas de inteiros , obedecendo uma certa relação de recorrência, sequências que podem ser expressas em termos de coeficientes binomial , e empregando formas modulares de níveis mais elevados. A série é nomeado em homenagem a Takeshi Sato e Srinivasa Ramanujan. (pt) En matemáticas, una serie de Ramanujan-Sato generaliza las de Ramanujan tales como a la forma mediante el uso de otras secuencias de enteros bien definidas obedeciendo una cierta relación de recurrencia, secuencias que pueden expresarse en términos de coeficientes binomiales y empleando formas modulares de niveles superiores. La notación jn(t) se deriva de Zagier y Tn se refiere a la serie relevante de McKay-Thompson. (es) In mathematics, a Ramanujan–Sato series generalizes Ramanujan’s pi formulas such as, to the form by using other well-defined sequences of integers obeying a certain recurrence relation, sequences which may be expressed in terms of binomial coefficients , and employing modular forms of higher levels. The notation jn(τ) is derived from Zagier and Tn refers to the relevant McKay–Thompson series. (en)
rdfs:label	Serie de Ramanujan-Sato (es) Ramanujan–Sato series (en) Séries de Ramanujan–Sato (pt)
owl:sameAs	freebase:Ramanujan–Sato series wikidata:Ramanujan–Sato series dbpedia-es:Ramanujan–Sato series dbpedia-fa:Ramanujan–Sato series dbpedia-pt:Ramanujan–Sato series https://global.dbpedia.org/id/gLA7
prov:wasDerivedFrom	wikipedia-en:Ramanujan–Sato_series?oldid=1099315673&ns=0
foaf:isPrimaryTopicOf	wikipedia-en:Ramanujan–Sato_series
is dbo:knownFor of	dbr:Srinivasa_Ramanujan
is dbo:wikiPageRedirects of	dbr:Ramanujan-Sato_series
is dbo:wikiPageWikiLink of	dbr:Borwein's_algorithm dbr:Dedekind_eta_function dbr:List_of_formulae_involving_π dbr:Approximations_of_π dbr:Weber_modular_function dbr:Chudnovsky_algorithm dbr:Heegner_number dbr:J-invariant dbr:Pi dbr:Srinivasa_Ramanujan dbr:List_of_things_named_after_Srinivasa_Ramanujan dbr:List_of_topics_related_to_π dbr:Ramanujan-Sato_series
is foaf:primaryTopic of	wikipedia-en:Ramanujan–Sato_series