Difference between revisions of "Raabe criterion"
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| − | + | ''on the convergence of a series of complex numbers'' | |
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| + | A criterion for the convergence of series of complex numbers $\sum_n a_n$, proved by J. Raabe. If $a_n \neq 0$ and there is a number $R>1$ such that for sufficiently large $n$ the inequality | ||
| + | \begin{equation} | ||
| + | \frac{|a_{n+1}|}{|a_n|} \leq 1 - \frac{R}{n} | ||
| + | \end{equation} | ||
| + | holds, then $\sum_n a_n$ converges absolutely. If instead there is $N$ such that | ||
| + | \[ | ||
| + | \frac{|a_{n+1}|}{|a_n|} \geq 1 - \frac{1}{n} \qquad \forall n \geq N\, , | ||
| + | \] | ||
| + | then the series $\sum_n |a_n|$ diverges, which can be easily shown comparing it to the [[Harmonic series|harmonic series]]. However, the series itself might still converge, as can be seen taking | ||
| + | \[ | ||
| + | \sum_n (-1)^n \frac{1}{\sqrt{n}}\, . | ||
| + | \] | ||
| + | The number $R$ is related to the limit | ||
| + | \[ | ||
| + | \lim_{n\to \infty} n \left(1-\frac{|a_n|}{|a_{n+1}|}\right) | ||
| + | \] | ||
| + | and the criterion can therefore be compared to [[Gauss criterion|Gauss' criterion]]. Observe however that the [[Harmonic series|harmonic series]] $\sum \frac{1}{n}$ (which diverges) and the series $\sum \frac{1}{n (\log n)^2}$ (which converges) have both the property that | ||
| + | \[ | ||
| + | \lim_{n\to \infty} n \left(1-\frac{a_n}{a_{n+1}}\right) = 1\, . | ||
| + | \] | ||
====References==== | ====References==== | ||
| − | + | {| | |
| + | |- | ||
| + | |valign="top"|{{Ref|Kn}}|| K. Knopp, "Theorie und Anwendung der unendlichen Reihen" , Springer (1964) (English translation: Blackie, 1951 & Dover, reprint, 1990) | ||
| + | |- | ||
| + | |} | ||
Latest revision as of 10:49, 10 December 2013
2020 Mathematics Subject Classification: Primary: 40A05 [MSN][ZBL]
on the convergence of a series of complex numbers
A criterion for the convergence of series of complex numbers $\sum_n a_n$, proved by J. Raabe. If $a_n \neq 0$ and there is a number $R>1$ such that for sufficiently large $n$ the inequality \begin{equation} \frac{|a_{n+1}|}{|a_n|} \leq 1 - \frac{R}{n} \end{equation} holds, then $\sum_n a_n$ converges absolutely. If instead there is $N$ such that \[ \frac{|a_{n+1}|}{|a_n|} \geq 1 - \frac{1}{n} \qquad \forall n \geq N\, , \] then the series $\sum_n |a_n|$ diverges, which can be easily shown comparing it to the harmonic series. However, the series itself might still converge, as can be seen taking \[ \sum_n (-1)^n \frac{1}{\sqrt{n}}\, . \] The number $R$ is related to the limit \[ \lim_{n\to \infty} n \left(1-\frac{|a_n|}{|a_{n+1}|}\right) \] and the criterion can therefore be compared to Gauss' criterion. Observe however that the harmonic series $\sum \frac{1}{n}$ (which diverges) and the series $\sum \frac{1}{n (\log n)^2}$ (which converges) have both the property that \[ \lim_{n\to \infty} n \left(1-\frac{a_n}{a_{n+1}}\right) = 1\, . \]
References
| [Kn] | K. Knopp, "Theorie und Anwendung der unendlichen Reihen" , Springer (1964) (English translation: Blackie, 1951 & Dover, reprint, 1990) |
Raabe criterion. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Raabe_criterion&oldid=12025