About: Automorphic form

Property	Value
dbo:abstract	In harmonic analysis and number theory, an automorphic form is a well-behaved function from a topological group G to the complex numbers (or complex vector space) which is invariant under the action of a discrete subgroup of the topological group. Automorphic forms are a generalization of the idea of periodic functions in Euclidean space to general topological groups. Modular forms are holomorphic automorphic forms defined over the groups SL(2, R) or PSL(2, R) with the discrete subgroup being the modular group, or one of its congruence subgroups; in this sense the theory of automorphic forms is an extension of the theory of modular forms. More generally, one can use the adelic approach as a way of dealing with the whole family of congruence subgroups at once. From this point of view, an automorphic form over the group G(AF), for an algebraic group G and an algebraic number field F, is a complex-valued function on G(AF) that is left invariant under G(F) and satisfies certain smoothness and growth conditions. Poincaré first discovered automorphic forms as generalizations of trigonometric and elliptic functions. Through the Langlands conjectures automorphic forms play an important role in modern number theory. (en) San anailís armónach agus san uimhirtheoiric, is feidhm dea-iompartha í an fhoirm uathmhorfach ó ghrúpa toipeolaíoch G go dtí na huimhreacha coimpléascacha (nó an spás veicteoireach coimpléascach) atá do-athraitheach faoi den ghrúpa toipeolaíoch. Is éard atá i bhfoirmeacha uathmhorfacha ná ginearálú ar smaoineamh na bhfeidhmeanna tréimhsiúla i spás Eoiclídeach do ghrúpaí toipeolaíocha ginearálta. (ga) Une forme automorphique, en analyse harmonique et théorie des nombres, est une fonction d'un groupe topologique G à valeurs dans le corps des nombres complexes (ou un espace vectoriel complexe) qui est invariante sous l'action d'un sous-groupe discret du groupe topologique et qui vérifie certaines conditions de dérivabilité et de croissance à l'infini. Les formes automorphes sont une généralisation de l'idée de fonctions périodiques dans l'espace euclidien à des groupes topologiques généraux. Les formes modulaires sont des formes automorphes définies sur les groupes et et prenant comme sous groupe discret le groupe modulaire; en ce sens la théorie des formes automorphes est une généralisation de la théorie des formes modulaires. Plus généralement, l'approche adélique permet une définition plus intrinsèque, en considérant toutes les classes de congruences de sous-groupes en un. Poincaré a d'abord découvert les formes automorphes comme généralisations des fonctions trigonométriques et elliptiques. Grâce aux conjectures de Langlands, les formes automorphes jouent un rôle important en théorie moderne des nombres. (fr) 調和解析や数論において、保型形式（ほけいけいしき、英: automorphic form）は、位相群 G 上で定義された複素数（あるいは複素ベクトル空間）値の函数で、離散部分群 Γ ⊂ G の作用の下に不変なものである。保型形式は、ユークリッド空間における周期函数（これは離散位相群としての 1 次元トーラス上の函数と見なされる）を、一般の位相群に対して一般化したものである。モジュラー形式は、モジュラー群あるいはのひとつを離散部分群として持つ（特殊線型群）や（射影特殊線型群）の上に定義された保型形式である。この意味では、保型形式の理論はモジュラー形式の理論の拡張である。アンリ・ポアンカレ (Henri_Poincaré) は、三角函数や楕円函数の一般化として、最初に保型形式を発見した。ラングランズ予想を通して、保型形式は現代の数論で重要な役割を果たす。 (ja) 수학에서 보형 형식(保型形式,또는 자기동형 형식(自己同型形式) 영어: automorphic form)은 고전적인 모듈러 형식을 임의의 리 군 및 그 이산 부분군으로 일반화시킨 개념이다. 즉, 어떤 이산 부분군의 작용에 대하여 불변인 해석 함수이다. 보형 형식의 이론은 랭글랜즈 프로그램을 통해 현대 수론의 핵심적인 부분을 차지한다. (ko) In de wiskunde, in het bijzonder in de getaltheorie, de groepentheorie en de , is een automorfe vorm een "nette" functie van een topologische groep in een complexe ruimte die invariant is onder de van een discrete ondergroep van de topologische groep. Automorfe vormen vormen een uitbreiding van de theorie van de modulaire vormen. (nl) Em matemática, a noção geral de forma automórfica é a extensão a funções analíticas, talvez de , da teoria das formas modulares. É em termos de um grupo de Lie , generalizar os grupos SL2(R) ou de formas modulares, e um , para generalizar o grupo modular, ou um de seus subgrupos congruentes. A formulação requer a noção geral de fator de automorfia para , a qual é o tipo de 1- na linguagem de . Os valores de podem ser números complexos, ou de fato matrizes complexas quadradas, correspondendo à possibilidade de valor de vetor das formas automórficas. A condição cociclo impostas sobre o fator de automorfia é alguma que possa ser rotineiramente checada, quando é derivada de uma matriz Jacobiana, por significar a regra da cadeia. (pt) 數學上所謂的自守形式（英語：Automorphic form），是一類特別的複變數函數，並在某個離散變換群下滿足由描述之變換規律。模形式與是其特例。由自守形式可定義自守表示，嚴格言之，自守表示並非尋常意義下的群表示，而是整體上的模。龐加萊在1880年代曾研究過自守形式，他稱之為富克斯函數。郎蘭茲綱領探討自守表示與數論的深入聯繫。 (zh)
dbo:thumbnail	wiki-commons:Special:FilePath/Dedekind_Eta.jpg?width=300
dbo:wikiPageID	782146 (xsd:integer)
dbo:wikiPageLength	12561 (xsd:nonNegativeInteger)
dbo:wikiPageRevisionID	1096091336 (xsd:integer)
dbo:wikiPageWikiLink	dbr:Prime_ideal dbr:Maass_cusp_form dbr:Algebraic_group dbr:Algebraic_number_field dbr:Holomorphic_function dbr:Riemann_zeta_function dbr:Robert_Langlands dbr:Cusp_form dbr:Vector_space dbr:Jacobi_form dbr:L-function dbr:Lie_group dbr:Compact_space dbr:Analytic_function dbr:Mathematics dbr:Elliptic_function dbr:SL2(R) dbr:Eigenfunction dbr:Eisenstein_series dbr:Elliptic_curve dbr:Modular_form dbr:Modular_group dbr:Morphism_of_algebraic_varieties dbr:Congruence_subgroup dbr:Theta_function dbr:Fuchsian_group dbr:Functional_analysis dbr:Functional_equation dbr:Functor dbr:Fundamental_representation dbr:Harmonic_analysis dbr:Ideal_class_group dbr:Spectral_theory dbr:Symplectic_group dbr:Adele_ring dbr:Adelic_algebraic_group dbr:Topological_group dbr:Trigonometric_functions dbr:Galois_group dbr:Hecke_operator dbr:Langlands_program dbr:Algebraic_geometry dbc:Lie_groups dbr:Number_theory dbr:Dirichlet_L-function dbr:Global_field dbr:Graduate_Studies_in_Mathematics dbr:Hilbert_modular_form dbr:Universal_enveloping_algebra dbr:Group_(mathematics) dbr:Group_action_(mathematics) dbr:Group_cohomology dbr:Height_function dbr:Henri_Poincaré dbr:Henryk_Iwaniec dbr:Jacobian_matrix dbr:Tensor_product dbr:Abelian_group dbr:Abstract_algebra dbr:Chain_rule dbr:Laplacian dbr:Lazarus_Fuchs dbr:Moduli_space dbr:Real_analytic_Eisenstein_series dbr:Factor_of_automorphy dbr:Artin_reciprocity_law dbc:Automorphic_forms dbr:Automorphic_Forms_on_GL(2) dbr:Automorphic_factor dbr:Automorphism_group dbr:Srinivasa_Ramanujan dbr:Class_field_theory dbr:Field_extension dbr:Group_representation dbr:Idele dbr:Ilya_Piatetski-Shapiro dbr:Selberg_trace_formula dbr:Siegel_modular_form dbr:Infinite_prime dbr:Periodic_function dbr:P-adic_group dbr:Riemann–Roch_theorem dbr:PSL2(R) dbr:Casimir_operator dbr:Langlands_conjectures dbr:Langlands_philosophy dbr:Discrete_subgroup dbr:Hypergeometric_series dbr:Idele_class_group dbr:Primitive_root_of_unity dbr:Complex-analytic_manifold dbr:File:Dedekind_Eta.jpg
dbp:author	A. N. Parshin (en)
dbp:authorlink	Alexey Parshin (en)
dbp:id	3793 (xsd:integer) a/a014160 (en)
dbp:title	Automorphic Form (en) Jules Henri Poincaré (en)
dbp:wikiPageUsesTemplate	dbt:Springer dbt:Authority_control dbt:Citation_needed dbt:ISBN dbt:Quote dbt:Refbegin dbt:Refend dbt:Reflist dbt:See_also dbt:Short_description dbt:Wikiquote-inline dbt:PlanetMath_attribution
dcterms:subject	dbc:Lie_groups dbc:Automorphic_forms
rdf:type	owl:Thing yago:WikicatAutomorphicForms yago:WikicatLieGroups yago:Abstraction100002137 yago:Form106290637 yago:Group100031264 yago:LanguageUnit106284225 yago:Part113809207 yago:Relation100031921 yago:Word106286395
rdfs:comment	San anailís armónach agus san uimhirtheoiric, is feidhm dea-iompartha í an fhoirm uathmhorfach ó ghrúpa toipeolaíoch G go dtí na huimhreacha coimpléascacha (nó an spás veicteoireach coimpléascach) atá do-athraitheach faoi den ghrúpa toipeolaíoch. Is éard atá i bhfoirmeacha uathmhorfacha ná ginearálú ar smaoineamh na bhfeidhmeanna tréimhsiúla i spás Eoiclídeach do ghrúpaí toipeolaíocha ginearálta. (ga) 調和解析や数論において、保型形式（ほけいけいしき、英: automorphic form）は、位相群 G 上で定義された複素数（あるいは複素ベクトル空間）値の函数で、離散部分群 Γ ⊂ G の作用の下に不変なものである。保型形式は、ユークリッド空間における周期函数（これは離散位相群としての 1 次元トーラス上の函数と見なされる）を、一般の位相群に対して一般化したものである。モジュラー形式は、モジュラー群あるいはのひとつを離散部分群として持つ（特殊線型群）や（射影特殊線型群）の上に定義された保型形式である。この意味では、保型形式の理論はモジュラー形式の理論の拡張である。アンリ・ポアンカレ (Henri_Poincaré) は、三角函数や楕円函数の一般化として、最初に保型形式を発見した。ラングランズ予想を通して、保型形式は現代の数論で重要な役割を果たす。 (ja) 수학에서 보형 형식(保型形式,또는 자기동형 형식(自己同型形式) 영어: automorphic form)은 고전적인 모듈러 형식을 임의의 리 군 및 그 이산 부분군으로 일반화시킨 개념이다. 즉, 어떤 이산 부분군의 작용에 대하여 불변인 해석 함수이다. 보형 형식의 이론은 랭글랜즈 프로그램을 통해 현대 수론의 핵심적인 부분을 차지한다. (ko) In de wiskunde, in het bijzonder in de getaltheorie, de groepentheorie en de , is een automorfe vorm een "nette" functie van een topologische groep in een complexe ruimte die invariant is onder de van een discrete ondergroep van de topologische groep. Automorfe vormen vormen een uitbreiding van de theorie van de modulaire vormen. (nl) Em matemática, a noção geral de forma automórfica é a extensão a funções analíticas, talvez de , da teoria das formas modulares. É em termos de um grupo de Lie , generalizar os grupos SL2(R) ou de formas modulares, e um , para generalizar o grupo modular, ou um de seus subgrupos congruentes. A formulação requer a noção geral de fator de automorfia para , a qual é o tipo de 1- na linguagem de . Os valores de podem ser números complexos, ou de fato matrizes complexas quadradas, correspondendo à possibilidade de valor de vetor das formas automórficas. A condição cociclo impostas sobre o fator de automorfia é alguma que possa ser rotineiramente checada, quando é derivada de uma matriz Jacobiana, por significar a regra da cadeia. (pt) 數學上所謂的自守形式（英語：Automorphic form），是一類特別的複變數函數，並在某個離散變換群下滿足由描述之變換規律。模形式與是其特例。由自守形式可定義自守表示，嚴格言之，自守表示並非尋常意義下的群表示，而是整體上的模。龐加萊在1880年代曾研究過自守形式，他稱之為富克斯函數。郎蘭茲綱領探討自守表示與數論的深入聯繫。 (zh) In harmonic analysis and number theory, an automorphic form is a well-behaved function from a topological group G to the complex numbers (or complex vector space) which is invariant under the action of a discrete subgroup of the topological group. Automorphic forms are a generalization of the idea of periodic functions in Euclidean space to general topological groups. Poincaré first discovered automorphic forms as generalizations of trigonometric and elliptic functions. Through the Langlands conjectures automorphic forms play an important role in modern number theory. (en) Une forme automorphique, en analyse harmonique et théorie des nombres, est une fonction d'un groupe topologique G à valeurs dans le corps des nombres complexes (ou un espace vectoriel complexe) qui est invariante sous l'action d'un sous-groupe discret du groupe topologique et qui vérifie certaines conditions de dérivabilité et de croissance à l'infini. Les formes automorphes sont une généralisation de l'idée de fonctions périodiques dans l'espace euclidien à des groupes topologiques généraux. (fr)
rdfs:label	Automorphic form (en) Foirm uathmhorfach (ga) Forme automorphe (fr) 보형 형식 (ko) 保型形式 (ja) Automorfe vorm (nl) Forma automórfica (pt) 自守形式 (zh)
rdfs:seeAlso	dbr:Cuspidal_representation
owl:sameAs	freebase:Automorphic form yago-res:Automorphic form http://d-nb.info/gnd/4192856-8 wikidata:Automorphic form dbpedia-fi:Automorphic form dbpedia-fr:Automorphic form dbpedia-ga:Automorphic form dbpedia-ja:Automorphic form dbpedia-ko:Automorphic form dbpedia-nl:Automorphic form dbpedia-pt:Automorphic form dbpedia-zh:Automorphic form https://global.dbpedia.org/id/CVoW
prov:wasDerivedFrom	wikipedia-en:Automorphic_form?oldid=1096091336&ns=0
foaf:depiction	wiki-commons:Special:FilePath/Dedekind_Eta.jpg
foaf:isPrimaryTopicOf	wikipedia-en:Automorphic_form
is dbo:academicDiscipline of	dbr:T._N._Venkataramana
is dbo:knownFor of	dbr:Henri_Poincaré dbr:Henryk_Iwaniec dbr:Ilya_Piatetski-Shapiro
is dbo:wikiPageDisambiguates of	dbr:Automorphic
is dbo:wikiPageRedirects of	dbr:Fuchsian_function dbr:Automorphic_representation dbr:Automorphy dbr:Automorphic_cuspidal_representation dbr:Automorphic_representations dbr:Automorphic_forms
is dbo:wikiPageWikiLink of	dbr:Princeton_University_Department_of_Mathematics dbr:Metaplectic_group dbr:On_the_Number_of_Primes_Less_Than_a_Given_Magnitude dbr:Representation_theory dbr:John_Tate_(mathematician) dbr:Joseph_Shalika dbr:List_of_Marathi_people_in_science,_engineering_and_technology dbr:Richard_Taylor_(mathematician) dbr:Riemann_hypothesis dbr:Robert_Fricke dbr:Robert_Langlands dbr:Cusp_form dbr:Vladimir_Drinfeld dbr:Jacobi_form dbr:Jacobi_group dbr:Jacquet–Langlands_correspondence dbr:Kuznetsov_trace_formula dbr:Lie_group dbr:List_of_important_publications_in_mathematics dbr:List_of_number_theory_topics dbr:Parabolic_induction dbr:Matthew_Emerton dbr:Gelfand_pair dbr:Generalized_Kac–Moody_algebra dbr:Wolf_Prize_in_Mathematics dbr:Yuri_Tschinkel dbr:Colette_Moeglin dbr:Alexei_Venkov dbr:Eisenstein_series dbr:Eknath_Prabhakar_Ghate dbr:Fuchsian_function dbr:Function_of_several_complex_variables dbr:Gan_Wee_Teck dbr:Goro_Shimura dbr:Modular_form dbr:Modularity_theorem dbr:Congruence_subgroup dbr:Consani–Scholten_quintic dbr:Converse_theorem dbr:Erez_Lapid dbr:Lafforgue's_theorem dbr:Arithmetic_Fuchsian_group dbr:Arithmetic_group dbr:Maass_wave_form dbr:Freydoon_Shahidi dbr:Fundamental_lemma_(Langlands_program) dbr:Kummer_sum dbr:Automorphic_representation dbr:Marko_Tadić dbr:Matsushima's_formula dbr:Aulacephalodon dbr:Automorphy dbr:Tomio_Kubota dbr:Walter_Lewis_Baily_Jr. dbr:Wei_Zhang_(mathematician) dbr:Wilfried_Schmid dbr:James_Cogdell dbr:Langlands_dual_group dbr:Langlands_program dbr:Lattice_(discrete_subgroup) dbr:Laurent_Clozel dbr:Akshay_Venkatesh dbr:Analytic_number_theory dbr:Fields_Medal dbr:Fourier_transform dbr:Base_change_lifting dbr:Basic_Number_Theory dbr:Breakthrough_Prize_in_Mathematics dbr:Hiroshi_Saito_(mathematician) dbr:List_of_Israeli_inventions_and_discoveries dbr:List_of_National_University_of_Singapore_people dbr:List_of_Princeton_University_people dbr:Ramin_Takloo-Bighash dbr:Günter_Harder dbr:Height_function dbr:Henri_Poincaré dbr:Henryk_Iwaniec dbr:Atiyah–Bott_fixed-point_theorem dbr:Israel_Gelfand dbr:Jack_Thorne_(mathematician) dbr:U._K._Anandavardhanan dbr:Atle_Selberg dbr:Kannan_Soundararajan dbr:Cole_Prize dbr:Eisenstein_integral dbr:Hermitian_symmetric_space dbr:Tempered_representation dbr:Artin_L-function dbr:Artin_reciprocity_law dbr:Automorphic_function dbr:Pi dbr:Fermat_Prize dbr:Ilya_Piatetski-Shapiro dbr:Institut_de_mathématiques_de_Jussieu_–_Paris_Rive_Gauche dbr:Kloosterman_sum dbr:Orbifold dbr:Automorphic dbr:Xinyi_Yuan dbr:Yifeng_Liu dbr:Séminaire_Nicolas_Bourbaki_(1950–1959) dbr:Séminaire_Nicolas_Bourbaki_(1960–1969) dbr:Shimura_variety dbr:Siegel_modular_form dbr:T._N._Venkataramana dbr:Voronoi_formula dbr:Waldspurger_formula dbr:Unifying_theories_in_mathematics dbr:Standard_L-function dbr:Pilar_Bayer dbr:Selberg_class dbr:Rankin–Selberg_method dbr:Robert_Kottwitz dbr:Stephen_S._Kudla dbr:Automorphic_cuspidal_representation dbr:Automorphic_representations dbr:Automorphic_forms
is dbp:knownFor of	dbr:Henri_Poincaré
is foaf:primaryTopic of	wikipedia-en:Automorphic_form