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- C0-semigroup abstract "In mathematics, a C0-semigroup, also known as a strongly continuous one-parameter semigroup, is a generalization of the exponential function. Just as exponential functions provide solutions of scalar linear constant coefficient ordinary differential equations, strongly continuous semigroups provide solutions of linear constant coefficient ordinary differential equations in Banach spaces. Such differential equations in Banach spaces arise from e.g. delay differential equations and partial differential equations.Formally, a strongly continuous semigroup is a representation of the semigroup (R+,+) on some Banach space X that is continuous in the strong operator topology. Thus, strictly speaking, a strongly continuous semigroup is not a semigroup, but rather a continuous representation of a very particular semigroup.".
- C0-semigroup wikiPageID "1644938".
- C0-semigroup wikiPageLength "14727".
- C0-semigroup wikiPageOutDegree "45".
- C0-semigroup wikiPageRevisionID "701746615".
- C0-semigroup wikiPageWikiLink Analytic_semigroup.
- C0-semigroup wikiPageWikiLink Banach_space.
- C0-semigroup wikiPageWikiLink Bounded_operator.
- C0-semigroup wikiPageWikiLink Cambridge_University_Press.
- C0-semigroup wikiPageWikiLink Category:Functional_analysis.
- C0-semigroup wikiPageWikiLink Category:Semigroup_theory.
- C0-semigroup wikiPageWikiLink Cauchy_problem.
- C0-semigroup wikiPageWikiLink Compact_operator.
- C0-semigroup wikiPageWikiLink Continuous_function.
- C0-semigroup wikiPageWikiLink Decomposition_of_spectrum_(functional_analysis).
- C0-semigroup wikiPageWikiLink Delay_differential_equation.
- C0-semigroup wikiPageWikiLink E._Brian_Davies.
- C0-semigroup wikiPageWikiLink Exponential_function.
- C0-semigroup wikiPageWikiLink Functional_calculus.
- C0-semigroup wikiPageWikiLink Hardy_space.
- C0-semigroup wikiPageWikiLink Hilbert_space.
- C0-semigroup wikiPageWikiLink Hille–Yosida_theorem.
- C0-semigroup wikiPageWikiLink Identity_function.
- C0-semigroup wikiPageWikiLink Linear_map.
- C0-semigroup wikiPageWikiLink London_Mathematical_Society.
- C0-semigroup wikiPageWikiLink Lumer–Phillips_theorem.
- C0-semigroup wikiPageWikiLink Mathematics.
- C0-semigroup wikiPageWikiLink Matrix_exponential.
- C0-semigroup wikiPageWikiLink Operator_topologies.
- C0-semigroup wikiPageWikiLink Ordinary_differential_equation.
- C0-semigroup wikiPageWikiLink Partial_differential_equation.
- C0-semigroup wikiPageWikiLink Quasicontraction_semigroup.
- C0-semigroup wikiPageWikiLink Resolvent_formalism.
- C0-semigroup wikiPageWikiLink Resolvent_set.
- C0-semigroup wikiPageWikiLink Semigroup.
- C0-semigroup wikiPageWikiLink Spectral_radius.
- C0-semigroup wikiPageWikiLink Spectral_theorem.
- C0-semigroup wikiPageWikiLink Spectrum.
- C0-semigroup wikiPageWikiLink Strong_operator_topology.
- C0-semigroup wikiPageWikiLink Unbounded_operator.
- C0-semigroup wikiPageWikiLinkText "C0-semigroup".
- C0-semigroup wikiPageWikiLinkText "C0-semigroup#Abstract Cauchy problems".
- C0-semigroup wikiPageWikiLinkText "generator".
- C0-semigroup wikiPageWikiLinkText "semigroups".
- C0-semigroup wikiPageWikiLinkText "strongly continuous one-parameter semigroup".
- C0-semigroup wikiPageUsesTemplate Template:Citation.
- C0-semigroup wikiPageUsesTemplate Template:Main.
- C0-semigroup wikiPageUsesTemplate Template:Reflist.
- C0-semigroup subject Category:Functional_analysis.
- C0-semigroup subject Category:Semigroup_theory.
- C0-semigroup hypernym Generalization.
- C0-semigroup type Function.
- C0-semigroup comment "In mathematics, a C0-semigroup, also known as a strongly continuous one-parameter semigroup, is a generalization of the exponential function. Just as exponential functions provide solutions of scalar linear constant coefficient ordinary differential equations, strongly continuous semigroups provide solutions of linear constant coefficient ordinary differential equations in Banach spaces. Such differential equations in Banach spaces arise from e.g.".
- C0-semigroup label "C0-semigroup".
- C0-semigroup sameAs Q846542.
- C0-semigroup sameAs Stark_stetige_Halbgruppe.
- C0-semigroup sameAs C0半群.
- C0-semigroup sameAs Eenparameter-halfgroep_van_operatoren.
- C0-semigroup sameAs m.05k6c1.
- C0-semigroup sameAs Полугруппа_операторов.
- C0-semigroup sameAs Q846542.
- C0-semigroup wasDerivedFrom C0-semigroup?oldid=701746615.
- C0-semigroup isPrimaryTopicOf C0-semigroup.