Notes - Analysis II HT23, Lipschitz continuity

Created: February 07, 2023

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• [[Course - Analysis II HT23]]^U

Flashcards

What does it mean for a function $f : E \to \mathbb R$ to be Lipschitz continuous?

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\[\exists K > 0 \text{ s.t. } \forall x,y \in E : |f(x) - f(y)| \le K|x-y|\]

What does Lipschitz continuity imply about uniform continuity?

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Any Lipschitz continuous function is uniformly continuous.

Proofs

…empty…

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