What do you get when you sum over all possible permutations? You get 2n(n-2)!\sum\limits_{1\leq i<j\leq n}a_ia_j=2n(n-2)![\frac{(a_1+a_2+\dots+a_n)^2-\sum\limits_{i=1}^na_i^2}{2}]=-n(n-2)!\sum\limits_{i=1}^na_i^2 ...

The ratio test doesn't really have a converse. But all you need in this case is that if the sequence (a_n) of coefficients is bounded , then \sum a_nz^n converges for \lvert z\rvert<1. You ...

a) You only have \frac 1 N in the partial sums, not in the individual terms of the series. So why would you compare to the harmonic series? Your second line is correct. By definition, a series ...

\begin{align} \sum_{k=1}^nka_k &=\sum_{k=1}^n\sum_{j=1}^ka_k\\ &=\sum_{j=1}^n\sum_{k=j}^na_k\\ &=\sum_{j=1}^n(s_n-s_{j-1}) \end{align} Taking limits, we get by Monotone Convergence that \begin{align} \sum_{k=1}^\infty ka_k &=\sum_{j=1}^\infty(a-s_{j-1})\\ &=a+\sum_{j=1}^\infty(a-s_j)\\ \end{align}

This (with the conclusion corrected as in my comment) is just a change of variables, assuming t > 0. Let b_n = a_n t^{-n}, so b_n = O(1/n). Then with y = xt, as x \to (1/t)- we have y \to 1- ...

For every |a|\lt\frac12, 0\lt a-\log(1+a)\lt a^2. Since \sum\limits_n|a_n|^2 converges, |a_n|\lt\frac12 for every n large enough. Hence \sum\limits_n\left(a_n-\log(1+a_n)\right) converges ...