Data Portal @ linkeddatafragments.org

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

• Inverse_scattering_transform abstract "In mathematics, the inverse scattering transform is a method for solving some non-linear partial differential equations. It is one of the most important developments in mathematical physics in the past 40 years. The method is a non-linear analogue, and in some sense generalization, of the Fourier transform, which itself is applied to solve many linear partial differential equations. The name "inverse scattering method" comes from the key idea of recovering the time evolution of a potential from the time evolution of its scattering data: inverse scattering refers to the problem of recovering a potential from its scattering matrix, as opposed to the direct scattering problem of finding the scattering matrix from the potential The inverse scattering transform may be applied to many of the so-called exactly solvable models, that is to say completely integrable infinite dimensional systems. It was first introduced by Clifford S. Gardner, John M. Greene, and Martin D. Kruskal et al. (1967, 1974) for the Korteweg–de Vries equation, and soon extended to the nonlinear Schrödinger equation, the Sine-Gordon equation, and the Toda lattice equation. It was later used to solve many other equations, such as the Kadomtsev–Petviashvili equation, the Ishimori equation, the Dym equation, and so on. A further family of examples is provided by the Bogomolny equations (for a given gauge group and oriented Riemannian 3-fold), the solutions of which are magnetic monopoles.A characteristic of solutions obtained by the inverse scattering method is the existence of solitons, solutions resembling both particles and waves, which have no analogue for linear partial differential equations. The term "soliton" arises from non-linear optics. The inverse scattering problem can be written as a Riemann–Hilbert factorization problem. This formulation can be generalized to differential operators of order greater than 2 and also to periodic potentials.".
• Inverse_scattering_transform wikiPageExternalLink 0905.4746.
• Inverse_scattering_transform wikiPageExternalLink ist.pdf.
• Inverse_scattering_transform wikiPageID "4916481".
• Inverse_scattering_transform wikiPageRevisionID "605046532".
• Inverse_scattering_transform first "Clifford S.".
• Inverse_scattering_transform first "John M.".
• Inverse_scattering_transform first "Martin D.".
• Inverse_scattering_transform first "Robert M.".
• Inverse_scattering_transform hasPhotoCollection Inverse_scattering_transform.
• Inverse_scattering_transform last "Gardner".
• Inverse_scattering_transform last "Greene".
• Inverse_scattering_transform last "Kruskal".
• Inverse_scattering_transform last "Miura".
• Inverse_scattering_transform year "1967".
• Inverse_scattering_transform year "1974".
• Inverse_scattering_transform subject Category:Exactly_solvable_models.
• Inverse_scattering_transform subject Category:Partial_differential_equations.
• Inverse_scattering_transform subject Category:Scattering_theory.
• Inverse_scattering_transform subject Category:Transforms.
• Inverse_scattering_transform type Assistant109815790.
• Inverse_scattering_transform type CausalAgent100007347.
• Inverse_scattering_transform type ExactlySolvableModels.
• Inverse_scattering_transform type LivingThing100004258.
• Inverse_scattering_transform type Model110324560.
• Inverse_scattering_transform type Object100002684.
• Inverse_scattering_transform type Organism100004475.
• Inverse_scattering_transform type Person100007846.
• Inverse_scattering_transform type PhysicalEntity100001930.
• Inverse_scattering_transform type Whole100003553.
• Inverse_scattering_transform type Worker109632518.
• Inverse_scattering_transform type YagoLegalActor.
• Inverse_scattering_transform type YagoLegalActorGeo.
• Inverse_scattering_transform comment "In mathematics, the inverse scattering transform is a method for solving some non-linear partial differential equations. It is one of the most important developments in mathematical physics in the past 40 years. The method is a non-linear analogue, and in some sense generalization, of the Fourier transform, which itself is applied to solve many linear partial differential equations.".
• Inverse_scattering_transform label "Inverse scattering transform".
• Inverse_scattering_transform sameAs m.0cv19l.
• Inverse_scattering_transform sameAs Q17098188.
• Inverse_scattering_transform sameAs Q17098188.
• Inverse_scattering_transform sameAs Inverse_scattering_transform.
• Inverse_scattering_transform wasDerivedFrom Inverse_scattering_transform?oldid=605046532.
• Inverse_scattering_transform isPrimaryTopicOf Inverse_scattering_transform.