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- Pompeiu_derivative abstract "In mathematical analysis, a Pompeiu derivative is a real-valued function of one real variable that is the derivative of an everywhere differentiable function and that vanishes in a dense set. In particular, a Pompeiu derivative is discontinuous at any point where it is not 0. Whether non-identically zero such functions may exist was a problem that arose in the context of early-1900s research on functional differentiability and integrability. The question was affirmatively answered by Dimitrie Pompeiu by constructing an explicit example; these functions are therefore named after him.".
- Pompeiu_derivative wikiPageID "26580514".
- Pompeiu_derivative wikiPageRevisionID "601170925".
- Pompeiu_derivative hasPhotoCollection Pompeiu_derivative.
- Pompeiu_derivative subject Category:Real_analysis.
- Pompeiu_derivative comment "In mathematical analysis, a Pompeiu derivative is a real-valued function of one real variable that is the derivative of an everywhere differentiable function and that vanishes in a dense set. In particular, a Pompeiu derivative is discontinuous at any point where it is not 0. Whether non-identically zero such functions may exist was a problem that arose in the context of early-1900s research on functional differentiability and integrability.".
- Pompeiu_derivative label "Pompeiu derivative".
- Pompeiu_derivative sameAs m.0bhbl6s.
- Pompeiu_derivative sameAs Q7227460.
- Pompeiu_derivative sameAs Q7227460.
- Pompeiu_derivative wasDerivedFrom Pompeiu_derivative?oldid=601170925.
- Pompeiu_derivative isPrimaryTopicOf Pompeiu_derivative.