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- Littlewood_subordination_theorem abstract "In mathematics, the Littlewood subordination theorem, proved by J. E. Littlewood in 1925, is a theorem in operator theory and complex analysis. It states that any holomorphic univalent self-mapping of the unit disk in the complex numbers that fixes 0 induces a contractive composition operator on various function spaces of holomorphic functions on the disk. These spaces include the Hardy spaces, the Bergman spaces and Dirichlet space.".
- Littlewood_subordination_theorem wikiPageID "34036143".
- Littlewood_subordination_theorem wikiPageLength "4790".
- Littlewood_subordination_theorem wikiPageOutDegree "21".
- Littlewood_subordination_theorem wikiPageRevisionID "695749203".
- Littlewood_subordination_theorem wikiPageWikiLink Bergman_space.
- Littlewood_subordination_theorem wikiPageWikiLink Category:Operator_theory.
- Littlewood_subordination_theorem wikiPageWikiLink Category:Theorems_in_complex_analysis.
- Littlewood_subordination_theorem wikiPageWikiLink Complex_analysis.
- Littlewood_subordination_theorem wikiPageWikiLink Complex_number.
- Littlewood_subordination_theorem wikiPageWikiLink Composition_operator.
- Littlewood_subordination_theorem wikiPageWikiLink Contraction_(operator_theory).
- Littlewood_subordination_theorem wikiPageWikiLink Dirichlet_space.
- Littlewood_subordination_theorem wikiPageWikiLink Function_space.
- Littlewood_subordination_theorem wikiPageWikiLink Hardy_space.
- Littlewood_subordination_theorem wikiPageWikiLink Holomorphic_function.
- Littlewood_subordination_theorem wikiPageWikiLink John_Edensor_Littlewood.
- Littlewood_subordination_theorem wikiPageWikiLink Mathematics.
- Littlewood_subordination_theorem wikiPageWikiLink Operator_norm.
- Littlewood_subordination_theorem wikiPageWikiLink Operator_theory.
- Littlewood_subordination_theorem wikiPageWikiLink Subharmonic_function.
- Littlewood_subordination_theorem wikiPageWikiLink Unit_disk.
- Littlewood_subordination_theorem wikiPageWikiLink Univalent_function.
- Littlewood_subordination_theorem wikiPageWikiLinkText "Littlewood subordination theorem".
- Littlewood_subordination_theorem wikiPageUsesTemplate Template:Citation.
- Littlewood_subordination_theorem wikiPageUsesTemplate Template:Harvtxt.
- Littlewood_subordination_theorem wikiPageUsesTemplate Template:Reflist.
- Littlewood_subordination_theorem subject Category:Operator_theory.
- Littlewood_subordination_theorem subject Category:Theorems_in_complex_analysis.
- Littlewood_subordination_theorem hypernym Theorem.
- Littlewood_subordination_theorem type Physic.
- Littlewood_subordination_theorem type Theorem.
- Littlewood_subordination_theorem comment "In mathematics, the Littlewood subordination theorem, proved by J. E. Littlewood in 1925, is a theorem in operator theory and complex analysis. It states that any holomorphic univalent self-mapping of the unit disk in the complex numbers that fixes 0 induces a contractive composition operator on various function spaces of holomorphic functions on the disk. These spaces include the Hardy spaces, the Bergman spaces and Dirichlet space.".
- Littlewood_subordination_theorem label "Littlewood subordination theorem".
- Littlewood_subordination_theorem sameAs Q6653168.
- Littlewood_subordination_theorem sameAs m.0hr2hlx.
- Littlewood_subordination_theorem sameAs Q6653168.
- Littlewood_subordination_theorem wasDerivedFrom Littlewood_subordination_theorem?oldid=695749203.
- Littlewood_subordination_theorem isPrimaryTopicOf Littlewood_subordination_theorem.