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Does $S_k= sum limits_{n=1}^{infty}sin(n^k)/n$ converge for all $k>0$?
**Motivation**: I recently learned that $S_1$ [converges](http://en.wikipedia.org/wiki/Dirichlet%27s_test). I think $S_2$ converges by the integral test. Was the question known in general?
来源:https://math.stackexchange.com/questions/2270/convergence-of-sum-limits-n-1-infty-sinnk-n
This is a replacement for my previous answer. The sum converges, and this fact needs even more math than I believed before.
Begin by using summation by parts. This gives
$$sum_{n=1}^N left(sum_{m=1}^N sin(m^k)
ight) left( frac{1}{n}-frac{1}{n+1}
ight) + frac{1}{N+1} left(sum_{m=1}^N sin(m^k)
ight).$$
Write $S_n:= left(sum_{m=1}^n sin(m^k)
ight)$. So this is
$$sum_{n=1}^N S_n/(n(n+1)) + S_N/(N+1).$$
The second term goes to zero by Weyl's [polynomial equidistribution theorem][1]. So your question is equivalent to the question of whether $sum s_n/(n(n+1))$ converges. We may as well clean this up a little: Since $|S_n| leq n$, we know that $sum S_n left( 1/n(n+1) - 1/n^2
ight)$ converges. So the question is whether
$$sum frac{S_n}{n^2}$$
converges.
I will show that $S_n$ is small enough that $sum S_n/n^2$ converges absolutely.
The way I want to prove this is to use [Weyl's inequality][2]. Let $p_i/q_i$ be an infinite sequence of rational numbers such that $|1/(2 pi) - p_i/q_i| < 1/q_i^2$. Such a sequence exists by a standard lemma. Weyl inequality gives that
$$S_N = Oleft(N^{1+epsilon} (q_i^{-1} + N^{-1} + q_i N^{-k})^{1/2^{k-1}}
ight)$$
for any $epsilon>0$.
<hr>
Thanks to George Lowther for pointing out the next step: According to [Salikhov][3], for $q$ sufficiently large, we have
$$|pi - p/q| > 1/q^{7.6304+epsilon}.$$
Since $x mapsto 1/(2x)$ is Lipschitz near $pi$, and since $p/q$ near $pi$ implies that $p$ and $q$ are nearly proportional, we also have the lower bound $|1/(2 pi) - p/q|> 1/q^{7.6304+epsilon}$.
Let $p_i/q_i$ be the convergents of the continued fraction of $1/(2 pi)$. By a standard result, $|1/(2 pi) - p_i/q_i| leq 1/(q_i q_{i+1})$. Thus, $q_{i+1} leq q_i^{6.6304 + epsilon}$ for $i$ sufficiently large. Thus, the intervals $[q_i, q_i^{7}]$ contain all sufficiently large integers.
For any large enough $N$, choose $q_i$ such that $N^{k-1} in [q_i, q_i^7]$. Then Weyl's inequality gives the bound
$$S_N = O left( N^{1+epsilon} left(N^{-(k-1)/7} + N^{-1} + N^{-1}
ight)^{1/2^{k-1}}
ight)$$
So $S_N = O(N^{1-(k-1)/(7cdot 2^{k-1}) + epsilon})$, which is enough to make sure the sum converges.
${ }{}{}{}{}$
[1]: http://terrytao.wordpress.com/2010/03/28/254b-notes-1-equidistribution-of-polynomial-sequences-in-torii/
[2]: http://en.wikipedia.org/wiki/Weyl%27s_inequality
[3]: http://mathworld.wolfram.com/IrrationalityMeasure.html