Matches in DBpedia 2015-10 for { <http://dbpedia.org/resource/Hille–Yosida_theorem> ?p ?o }
Showing triples 1 to 50 of
50
with 100 triples per page.
- Hille–Yosida_theorem abstract "In functional analysis, the Hille–Yosida theorem characterizes the generators of strongly continuous one-parameter semigroups of linear operators on Banach spaces. It is sometimes stated for the special case of contraction semigroups, with the general case being called the Feller–Miyadera–Phillips theorem (after William Feller, Isao Miyadera, and Ralph Phillips). The contraction semigroup case is widely used in the theory of Markov processes. In other scenarios, the closely related Lumer–Phillips theorem is often more useful in determining whether a given operator generates a strongly continuous contraction semigroup. The theorem is named after the mathematicians Einar Hille and Kōsaku Yosida who independently discovered the result around 1948.".
- Hille–Yosida_theorem wikiPageID "1578212".
- Hille–Yosida_theorem wikiPageLength "5795".
- Hille–Yosida_theorem wikiPageOutDegree "30".
- Hille–Yosida_theorem wikiPageRevisionID "664938388".
- Hille–Yosida_theorem wikiPageWikiLink Banach_space.
- Hille–Yosida_theorem wikiPageWikiLink C0-semigroup.
- Hille–Yosida_theorem wikiPageWikiLink C0_semigroup.
- Hille–Yosida_theorem wikiPageWikiLink Category:Semigroup_theory.
- Hille–Yosida_theorem wikiPageWikiLink Category:Theorems_in_functional_analysis.
- Hille–Yosida_theorem wikiPageWikiLink Closed_linear_operator.
- Hille–Yosida_theorem wikiPageWikiLink Contraction_semigroup.
- Hille–Yosida_theorem wikiPageWikiLink Dense_(topology).
- Hille–Yosida_theorem wikiPageWikiLink Dense_set.
- Hille–Yosida_theorem wikiPageWikiLink Einar_Hille.
- Hille–Yosida_theorem wikiPageWikiLink Functional_analysis.
- Hille–Yosida_theorem wikiPageWikiLink Integer.
- Hille–Yosida_theorem wikiPageWikiLink Integers.
- Hille–Yosida_theorem wikiPageWikiLink Kōsaku_Yosida.
- Hille–Yosida_theorem wikiPageWikiLink Linear_map.
- Hille–Yosida_theorem wikiPageWikiLink Linear_operator.
- Hille–Yosida_theorem wikiPageWikiLink Linear_subspace.
- Hille–Yosida_theorem wikiPageWikiLink Lumer–Phillips_theorem.
- Hille–Yosida_theorem wikiPageWikiLink Markov_process.
- Hille–Yosida_theorem wikiPageWikiLink Mathematician.
- Hille–Yosida_theorem wikiPageWikiLink One-parameter_semigroup.
- Hille–Yosida_theorem wikiPageWikiLink Quasicontraction_semigroup.
- Hille–Yosida_theorem wikiPageWikiLink Resolvent_formalism.
- Hille–Yosida_theorem wikiPageWikiLink Resolvent_operator.
- Hille–Yosida_theorem wikiPageWikiLink Resolvent_set.
- Hille–Yosida_theorem wikiPageWikiLink Stones_theorem_on_one-parameter_unitary_groups.
- Hille–Yosida_theorem wikiPageWikiLink Unbounded_operator.
- Hille–Yosida_theorem wikiPageWikiLink William_Feller.
- Hille–Yosida_theorem wikiPageWikiLinkText "Hille–Yosida theorem".
- Hille–Yosida_theorem wikiPageWikiLinkText "Hille–Yosida theorem".
- Hille–Yosida_theorem hasPhotoCollection Hille–Yosida_theorem.
- Hille–Yosida_theorem wikiPageUsesTemplate Template:Citation.
- Hille–Yosida_theorem wikiPageUsesTemplate Template:Main.
- Hille–Yosida_theorem wikiPageUsesTemplate Template:Reflist.
- Hille–Yosida_theorem subject Category:Semigroup_theory.
- Hille–Yosida_theorem subject Category:Theorems_in_functional_analysis.
- Hille–Yosida_theorem comment "In functional analysis, the Hille–Yosida theorem characterizes the generators of strongly continuous one-parameter semigroups of linear operators on Banach spaces. It is sometimes stated for the special case of contraction semigroups, with the general case being called the Feller–Miyadera–Phillips theorem (after William Feller, Isao Miyadera, and Ralph Phillips). The contraction semigroup case is widely used in the theory of Markov processes.".
- Hille–Yosida_theorem label "Hille–Yosida theorem".
- Hille–Yosida_theorem sameAs Théorème_de_Hille-Yosida.
- Hille–Yosida_theorem sameAs ヒレ-吉田の定理.
- Hille–Yosida_theorem sameAs m.05cxht.
- Hille–Yosida_theorem sameAs Q974405.
- Hille–Yosida_theorem sameAs Q974405.
- Hille–Yosida_theorem wasDerivedFrom Hille–Yosida_theorem?oldid=664938388.
- Hille–Yosida_theorem isPrimaryTopicOf Hille–Yosida_theorem.