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- Pettis_integral abstract "In mathematics, the Pettis integral or Gelfand–Pettis integral, named after I. M. Gelfand and B. J. Pettis, extends the definition of the Lebesgue integral to vector-valued functions on a measure space, by exploiting duality. The integral was introduced by Gelfand for the case when the measure space is an interval with Lebesgue measure. The integral is also called the weak integral in contrast to the Bochner integral, which is the strong integral.".
- Pettis_integral wikiPageExternalLink 266.abstract.
- Pettis_integral wikiPageExternalLink ?q=an:0014.16202.
- Pettis_integral wikiPageID "20983125".
- Pettis_integral wikiPageRevisionID "592254453".
- Pettis_integral first "V. I.".
- Pettis_integral hasPhotoCollection Pettis_integral.
- Pettis_integral id "p/p072490".
- Pettis_integral last "Sobolev".
- Pettis_integral title "Pettis integral".
- Pettis_integral subject Category:Functional_analysis.
- Pettis_integral subject Category:Integrals.
- Pettis_integral type Abstraction100002137.
- Pettis_integral type Calculation105802185.
- Pettis_integral type Cognition100023271.
- Pettis_integral type HigherCognitiveProcess105770664.
- Pettis_integral type Integral106015505.
- Pettis_integral type Integrals.
- Pettis_integral type ProblemSolving105796750.
- Pettis_integral type Process105701363.
- Pettis_integral type PsychologicalFeature100023100.
- Pettis_integral type Thinking105770926.
- Pettis_integral comment "In mathematics, the Pettis integral or Gelfand–Pettis integral, named after I. M. Gelfand and B. J. Pettis, extends the definition of the Lebesgue integral to vector-valued functions on a measure space, by exploiting duality. The integral was introduced by Gelfand for the case when the measure space is an interval with Lebesgue measure. The integral is also called the weak integral in contrast to the Bochner integral, which is the strong integral.".
- Pettis_integral label "Całka Pettisa".
- Pettis_integral label "Pettis integral".
- Pettis_integral label "ペティス積分".
- Pettis_integral sameAs ペティス積分.
- Pettis_integral sameAs Całka_Pettisa.
- Pettis_integral sameAs m.05b233d.
- Pettis_integral sameAs Q211188.
- Pettis_integral sameAs Q211188.
- Pettis_integral sameAs Pettis_integral.
- Pettis_integral wasDerivedFrom Pettis_integral?oldid=592254453.
- Pettis_integral isPrimaryTopicOf Pettis_integral.