Stepanov theorem

2020 Mathematics Subject Classification: Primary: 26B05 Secondary: 26B35 [MSN][ZBL]

A theorem proved by Stepanov about the differentiability of Lipschitz functions .

Theorem Let $E\subset \mathbb R^m$ be measurable and $f: E \to \mathbb R^n$ a measurable function. Then $f$ is a.e. differentiable on the set \[ \left\{x\in E: \limsup_{y\to x} \frac{|f(x)-f(y)|}{|x-y|} < \infty \right\}\, . \]

For a proof see Theorem 3.1.9 of [Fe]. Stepanov's theorem can be easily concluded from Rademacher's theorem. This is classically done through Lebesgue's density theorem, cf. Theorem 1 in Density of a set, but there is a an elementary derivation by Maly, see [Ma]. The measurability assumption can be dropped.

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