Jump to content

Denjoy–Luzin–Saks theorem

From Wikipedia, the free encyclopedia

This is an old revision of this page, as edited by K9re11 (talk | contribs) at 15:07, 25 November 2014. The present address (URL) is a permanent link to this revision, which may differ significantly from the current revision.

In mathematics, the Denjoy–Luzin–Saks theorem states that a function of generalized bounded variation in the restricted sense has a derivative almost everywhere, and gives further conditions of the set of values of the function where the derivative does not exist. N. N. Luzin and A. Denjoy proved a weaker form of the theorem, and Saks (1937, theorem 7.2, page 230) later strengthened their theorem.

References

  • Saks, Stanisław (1937), Theory of the Integral, Monografie Matematyczne, vol. 7 (2nd ed.), Warszawa-Lwów: G.E. Stechert & Co., pp. VI+347, JFM 63.0183.05, Zbl 0017.30004 {{citation}}: External link in |series= (help)