... Lipschitz-continuous ^2.1

A field f(x) is Lipschitz-continuous of order $\alpha$ if $\exists \epsilon > 0 , \exists B finite, \exists 0 < \beta < \alpha : \forall \vert h\vert <\epsilon \vert f(h) - f(0)\vert \le B \vert h\vert^\beta$.

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