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- Zahorski_theorem abstract "In mathematics, Zahorski's theorem is a theorem of real analysis. It states that a necessary and sufficient condition for a subset of the real line to be the set of points of non-differentiability of a continuous real-valued function, is that it be the union of a Gδ set and a set of zero measure.This result was proved by Zygmunt Zahorsk in 1939 and first published in 1941.".
- Zahorski_theorem wikiPageID "6867714".
- Zahorski_theorem wikiPageRevisionID "603584078".
- Zahorski_theorem hasPhotoCollection Zahorski_theorem.
- Zahorski_theorem subject Category:Real_analysis.
- Zahorski_theorem subject Category:Theorems_in_analysis.
- Zahorski_theorem type Abstraction100002137.
- Zahorski_theorem type Communication100033020.
- Zahorski_theorem type Message106598915.
- Zahorski_theorem type Proposition106750804.
- Zahorski_theorem type Statement106722453.
- Zahorski_theorem type Theorem106752293.
- Zahorski_theorem type TheoremsInAnalysis.
- Zahorski_theorem comment "In mathematics, Zahorski's theorem is a theorem of real analysis. It states that a necessary and sufficient condition for a subset of the real line to be the set of points of non-differentiability of a continuous real-valued function, is that it be the union of a Gδ set and a set of zero measure.This result was proved by Zygmunt Zahorsk in 1939 and first published in 1941.".
- Zahorski_theorem label "Zahorski theorem".
- Zahorski_theorem sameAs m.0gtd62.
- Zahorski_theorem sameAs Q8064722.
- Zahorski_theorem sameAs Q8064722.
- Zahorski_theorem sameAs Zahorski_theorem.
- Zahorski_theorem wasDerivedFrom Zahorski_theorem?oldid=603584078.
- Zahorski_theorem isPrimaryTopicOf Zahorski_theorem.