Quantitative form of the Luzin $C$-property

В. Г. Кротов

Quantitative form of the Luzin $C$ -property

Authors

V. G. Krotov Белорус, ун-т , Минск

Abstract

We prove the following statement, which is a quantitative form of the Luzin theorem on

$C$ -property: Let

$(X, d, μ)$ be a bounded metric space with metric

$d$ and regular Borel measure

$μ$ that are related to one another by the doubling condition. Then, for any function

$f$ measurable on

$X$ , there exist a positive increasing function

$η ∈ Ω\; \left(η(+0) = 0\right.$ and

$η(t)t^{−a}$ decreases for a certain

$\left. a > 0\right)$ , a nonnegative function

$g$ measurable on

$X$ , and

$a$ set

$E ⊂ X, μE = 0$ , for which

$|f(x)−f(y)| ⩽ [g(x)+g(y)]η(d(x,y)),\;x,y ∈ X \setminus E.$ If

$f ∈ L^p(X),\; p >0$ , then it is possible to choose

$g$ belonging to

$L^p (X)$ .

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Published

25.03.2010

Issue

Vol. 62 No. 3 (2010)

Section

Research articles

How to Cite

Krotov, V. G. “Quantitative Form of the Luzin

$C$ -Property”. Ukrains’kyi Matematychnyi Zhurnal, vol. 62, no. 3, Mar. 2010, pp. 387–395, https://umj.imath.kiev.ua/index.php/umj/article/view/2874.

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Quantitative form of the Luzin $C$ -property

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Quantitative form of the Luzin CC-property

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Quantitative form of the Luzin $C$ -property