Difference between revisions of "Buchstab function"

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The Buchstab function is a [[continuous]] function $\omega \colon [1,\infty) \rightarrow (0,\infty)$ defined by the [[initial value problem]]  
 
The Buchstab function is a [[continuous]] function $\omega \colon [1,\infty) \rightarrow (0,\infty)$ defined by the [[initial value problem]]  
 
$$\dfrac{d}{du}(u\omega(u-1)); u \geq 2$$
 
$$\dfrac{d}{du}(u\omega(u-1)); u \geq 2$$
and for $1 \leq u \geq 2$, $\omega(u)=\dfrac{1}{u}$.
+
and for $1 \leq u \leq 2$, $\omega(u)=\dfrac{1}{u}$.

Revision as of 05:12, 17 July 2015

The Buchstab function is a continuous function $\omega \colon [1,\infty) \rightarrow (0,\infty)$ defined by the initial value problem $$\dfrac{d}{du}(u\omega(u-1)); u \geq 2$$ and for $1 \leq u \leq 2$, $\omega(u)=\dfrac{1}{u}$.