What is the interpretation / intuition of a lipschtzian function? I mean, a continuous function is one that "does not show jumps", what is the significance of a function being lipschtziana?
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https://math.stackexchange.com/q/353276 – Sep 14 '18 at 14:08
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It is one that does not become arbitrarily steep. $\frac 1x$ becomes steeper than any given slope as $x$ approaches zero. It is not Lipschitz.
Ross Millikan
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