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Given a sequence $\{x_n\}_n$ and real numbers $c > 0$ and $L$, such that $\displaystyle\lim_{n \to \infty}x_n - L = 0$ and $\displaystyle\lim_{n \to \infty} \frac{| x_{n+1} - L |}{|x_n - L|^p} = c$, prove that $p \geq 1$.

This is assumed without proof in my textbook and I'd like a rigorous one, but I can't come up with it.

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    thanks again, "Calcolo Numerico" by Brugnano et al. didn't mention this.2012-02-07

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If we allow $c = 0$, then this is not true.

Take $x_n = \frac{1}{n}$

where we can pick $p = 0.5$

If $c \gt 0$, then I believe it is true.

We use the following fact:

If $f_n \to \infty$ and if $\dfrac{f_{n+1}}{f_n} \to p$, then $p \ge 1$.

(because otherwise $\sum f_n$ would be absolutely convergent, by the ratio test!)

Assuming $x_n \neq L$ for any $n$ (otherwise problem is meaningless I suppose).

Picking $f_n = -\log |x_n - L|$ will give the result, as I believe we can then show that $\dfrac{f_{n+1}}{f_n} \to p$.

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    @Aryabhata: thanks, i hope i can fill in the blanks myself2012-02-09