DBpedia 2014 |

DBpedia 2014

Matches in DBpedia 2014 for { <http://dbpedia.org/resource/Hitchin_system> ?p ?o. }

Showing items 1 to 30 of 30 with 100 items per page.

Hitchin_system abstract "In mathematics, the Hitchin integrable system is an integrable system depending on the choice of a complex reductive group and a compact Riemann surface, introduced by Nigel Hitchin in 1987. It lies on the crossroadsof the algebraic geometry, theory of Lie algebras and integrable system theory. It also plays an important role in geometric Langlands correspondence over the field of complex numbers; related to conformal field theory. A genus zero analogue of the Hitchin system arises as a certain limit of the Knizhnik–Zamolodchikov equations. Almost all integrable systems of classical mechanics can be obtained as particular cases of the Hitchin system (or its meromorphic generalization or in a singular limit).The Hitchin fibration is the map from the moduli space of Hitchin pairs to characteristic polynomials. Ngô (2006, 2010) used Hitchin fibrations over finite fields in his proof of the fundamental lemma.".
Hitchin_system wikiPageExternalLink s00222-005-0483-7.
Hitchin_system wikiPageExternalLink ICM2006.2.
Hitchin_system wikiPageID "23652892".
Hitchin_system wikiPageRevisionID "588821828".
Hitchin_system hasPhotoCollection Hitchin_system.
Hitchin_system subject Category:Algebraic_geometry.
Hitchin_system subject Category:Differential_geometry.
Hitchin_system subject Category:Dynamical_systems.
Hitchin_system subject Category:Hamiltonian_mechanics.
Hitchin_system subject Category:Lie_groups.
Hitchin_system type Abstraction100002137.
Hitchin_system type Attribute100024264.
Hitchin_system type DynamicalSystem106246361.
Hitchin_system type DynamicalSystems.
Hitchin_system type Group100031264.
Hitchin_system type LieGroups.
Hitchin_system type PhaseSpace100029114.
Hitchin_system type Space100028651.
Hitchin_system comment "In mathematics, the Hitchin integrable system is an integrable system depending on the choice of a complex reductive group and a compact Riemann surface, introduced by Nigel Hitchin in 1987. It lies on the crossroadsof the algebraic geometry, theory of Lie algebras and integrable system theory. It also plays an important role in geometric Langlands correspondence over the field of complex numbers; related to conformal field theory.".
Hitchin_system label "Hitchin system".
Hitchin_system label "ヒッチン系".
Hitchin_system sameAs ヒッチン系.
Hitchin_system sameAs 히친_계.
Hitchin_system sameAs m.06zqr1x.
Hitchin_system sameAs Q8009704.
Hitchin_system sameAs Q8009704.
Hitchin_system sameAs Hitchin_system.
Hitchin_system wasDerivedFrom Hitchin_system?oldid=588821828.
Hitchin_system isPrimaryTopicOf Hitchin_system.