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We are to prove that the set $\Bigg\{ \sum^m_{i=1}\sum^n_{j=1}|a_ib_j| :m,n\in \mathbb N \Bigg\}$ is bounded. Also, We are to use this to show that the iterated sum $\sum^\infty_{i=1} \sum^\infty_{j=1}|a_ib_j|$ converges.

I could prove that the set is bounded, however, I can't solve the second part.
I become very confused when I have to deal with iterated sums. Could anyone please help me with this problem.

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    There are two hints: (1) The infinite summation of a non-negative sequence is equal to the supremum of the set of partial sums: $\sum_{i=1}^{\infty} |a_i| = \sup_{n\in\mathbb{N}} \sum_{i=1}^{n} |a_i|,$ and (2) supremum can be distributed: $ \sup_{(x,y)\in A\times B}f(x, y) = \sup_{x\in A}\sup_{y\in B} f(x,y). $2012-08-15

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Although by first proving that the sum is bounded, it can be proved that the sum converges. But, there is a way to directly prove that it converges.

For that, let $\sum^\infty_{i=1}|a_i|=L~~~~~\text{and}~~~~~\sum^\infty_{j=1}|b_j|=M$ For each fixed $i \in \mathbb N$, the Algebraic Limit Theorem will allow us to write $\sum^\infty_{j=1}|a_ib_j|$=$|a_i|\sum^\infty_{j=1}|b_j|$. If one continues the process, we will see that: $\sum^\infty_{i=1}\sum^\infty_{j=1}|a_ib_j|=\sum^\infty_{i=1}|a_i|\sum^\infty_{j=1}|b_j|=ML$ Hence,$\sum^\infty_{i=1}\sum^\infty_{j=1}|a_ib_j|$ converges (to $ML$).

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In order to show that $\sum_{i=1}^\infty\sum_{j=1}^\infty|a_ib_j|$ converges, you must show that there is some real number $a$ such that for every $\epsilon>0$ there is some $n_0\in\Bbb Z^+$ such that $\left|a-\sum_{i=1}^m\sum_{j=1}^n|a_ib_j|\right|<\epsilon$ whenever $m,n\ge n_0$.

For $m,n\in\Bbb Z^+$ let $s_{mn}=\sum_{i=1}^m\sum_{j=1}^n|a_ib_j|\;.$ You know that the set $S=\{s_{mn}:m,n\in\Bbb Z^+\}$ is bounded. You also know that $s_{k\ell}\le s_{mn}$ whenever $k\le m$ and $\ell\le n$, since the terms $|a_ib_j|$ are non-negative. For $n\in\Bbb Z^+$ let $d_n=s_{nn}$; then $s_{k\ell}\le d_n$ whenever $k,\ell\le n$. In other words, the sums $d_n$ are cofinal in $S$: for each $s\in S$ there is an $n\in\Bbb Z^+$ such that $s\le d_n$.

Consider the sequence $\langle d_n:n\in\Bbb Z^+\rangle$: it’s bounded and non-decreasing, so it converges to some limit $a$; I’ll leave to you the easy verification that $s\le a$ for all $s\in S$. Fix $\epsilon>0$. There is some $n_0\in\Bbb Z^+$ such that $|a-d_n|<\epsilon$ whenever $n\ge n_0$. Suppose that $m,n\ge n_0$; then $a-\epsilon, so $\left|a-\sum_{i=1}^m\sum_{j=1}^n|a_ib_j|\right|<\epsilon$ whenever $m,n\ge n_0$, exactly as we wanted.