Dini derivative

In mathematics, the upper Dini derivative of a continuous function,

$f:{\mathbb R} \mapsto {\mathbb R},$

denoted by $f'_+,\,$ is defined as

$f'_+(t) = \lim_{h\rightarrow 0^+} \sup \frac{f(t + h) - f(t)}{h}.$

The lower Dini derivative, $f'_-,\,$ is defined as

$f'_-(t) = \lim_{h\rightarrow 0^+} \inf \frac{f(t + h) - f(t)}{h}$

(see lim sup and lim inf). If $f$ is defined on a vector space, then the upper Dini derivative at $t$ in the direction $d$ is denoted

$f'_+ (t,d) = \lim_{h\rightarrow 0^+} \sup \frac{f(t + hd) - f(t)}{h}.$

If $f$ is locally Lipschitz then $f'_+\,$ is finite. If $f$ is differentiable at $t$ , then the Dini derivative at $t$ is the usual derivative at $t .$

[edit] Remarks

Sometimes the notation $D^+ f(t)\,$ is used instead of $f'_+(t),\,$ and $D^-f(t)\,$ is used instead of $f'_-(t).\,$

This article incorporates material from Dini derivative on PlanetMath, which is licensed under the GFDL.

This page was last modified 14:23, 11 March 2007 by Wikipedia user Geometry guy. Based on work by Wikipedia user(s) Oleg Alexandrov, GrinBot, YurikBot, Crisófilax, Icairns and Charles Matthews and Anonymous user(s) of Wikipedia.
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