Matches in DBpedia 2016-04 for { <http://dbpedia.org/resource/Dunford–Pettis_property> ?p ?o }
Showing triples 1 to 48 of
48
with 100 triples per page.
- Dunford–Pettis_property abstract "In functional analysis, the Dunford–Pettis property, named after Nelson Dunford and B. J. Pettis, is a property of a Banach space stating that all weakly compact operators from this space into another Banach space are completely continuous. Many standard Banach spaces have this property, most notably, the space C(K) of continuous functions on a compact space and the space L1(μ) of the Lebesgue integrable functions on a measure space. Alexander Grothendieck introduced the concept in the early 1950s (Grothendieck 1953), following the work of Dunford and Pettis, who developed earlier results of Shizuo Kakutani, Kōsaku Yosida, and several others. Important results were obtained more recently by Jean Bourgain. Nevertheless, the Dunford–Pettis property is not completely understood.".
- Dunford–Pettis_property wikiPageExternalLink nrandpag1.pdf.
- Dunford–Pettis_property wikiPageID "16388109".
- Dunford–Pettis_property wikiPageLength "3836".
- Dunford–Pettis_property wikiPageOutDegree "25".
- Dunford–Pettis_property wikiPageRevisionID "661272058".
- Dunford–Pettis_property wikiPageWikiLink Alexander_Grothendieck.
- Dunford–Pettis_property wikiPageWikiLink Banach_space.
- Dunford–Pettis_property wikiPageWikiLink Billy_James_Pettis.
- Dunford–Pettis_property wikiPageWikiLink Category:Banach_spaces.
- Dunford–Pettis_property wikiPageWikiLink Compact_operator.
- Dunford–Pettis_property wikiPageWikiLink Compact_space.
- Dunford–Pettis_property wikiPageWikiLink Continuous_function.
- Dunford–Pettis_property wikiPageWikiLink Dual_space.
- Dunford–Pettis_property wikiPageWikiLink Dunford,_South_Yorkshire.
- Dunford–Pettis_property wikiPageWikiLink Functional_analysis.
- Dunford–Pettis_property wikiPageWikiLink Hilbert_space.
- Dunford–Pettis_property wikiPageWikiLink Jean_Bourgain.
- Dunford–Pettis_property wikiPageWikiLink Kōsaku_Yosida.
- Dunford–Pettis_property wikiPageWikiLink Lp_space.
- Dunford–Pettis_property wikiPageWikiLink Measure_(mathematics).
- Dunford–Pettis_property wikiPageWikiLink Nelson_Dunford.
- Dunford–Pettis_property wikiPageWikiLink Reflexive_space.
- Dunford–Pettis_property wikiPageWikiLink Rocky_Mountain_Journal_of_Mathematics.
- Dunford–Pettis_property wikiPageWikiLink Sequence.
- Dunford–Pettis_property wikiPageWikiLink Shizuo_Kakutani.
- Dunford–Pettis_property wikiPageWikiLink Uniform_norm.
- Dunford–Pettis_property wikiPageWikiLink Weak_topology.
- Dunford–Pettis_property wikiPageWikiLinkText "Dunford–Pettis property".
- Dunford–Pettis_property author "JMF Castillo, SY Shaw".
- Dunford–Pettis_property id "D/d110240".
- Dunford–Pettis_property title "Dunford–Pettis property".
- Dunford–Pettis_property wikiPageUsesTemplate Template:Citation.
- Dunford–Pettis_property wikiPageUsesTemplate Template:Harv.
- Dunford–Pettis_property wikiPageUsesTemplate Template:Springer.
- Dunford–Pettis_property subject Category:Banach_spaces.
- Dunford–Pettis_property hypernym Property.
- Dunford–Pettis_property type Building.
- Dunford–Pettis_property type Redirect.
- Dunford–Pettis_property type Space.
- Dunford–Pettis_property comment "In functional analysis, the Dunford–Pettis property, named after Nelson Dunford and B. J. Pettis, is a property of a Banach space stating that all weakly compact operators from this space into another Banach space are completely continuous. Many standard Banach spaces have this property, most notably, the space C(K) of continuous functions on a compact space and the space L1(μ) of the Lebesgue integrable functions on a measure space.".
- Dunford–Pettis_property label "Dunford–Pettis property".
- Dunford–Pettis_property sameAs Q1265637.
- Dunford–Pettis_property sameAs Dunford-Pettis-Eigenschaft.
- Dunford–Pettis_property sameAs m.03wj8_6.
- Dunford–Pettis_property sameAs Q1265637.
- Dunford–Pettis_property wasDerivedFrom Dunford–Pettis_property?oldid=661272058.
- Dunford–Pettis_property isPrimaryTopicOf Dunford–Pettis_property.