Definition:Generalized Sum

Definition
Let $\left({G, +}\right)$ be a topological group.

Let $\left({g_i}\right)_{i\in I}$ be an indexed subset of $G$.

Consider the set $\mathcal F$ of finite subsets of $I$, and let $\le$ denote the subset relation on $\mathcal F$.

By virtue of Subset Relation is Ordering, $\left({\mathcal F, \le}\right)$ is a poset.

Define the net $\phi: \mathcal F \to G$ by $\phi \left({F}\right) = \displaystyle \sum_{i \in F} g_i$.

Then the generalized sum $\displaystyle \sum \left\{{g_i: i \in I}\right\}$ is defined as the limit of the net $\phi$.

If this limit exists, the sum is said to converge.

If the limit does not exist, the sum is said to diverge.

Net Convergence
Let $\left({g_n}\right)_{n \in \N}$ be a sequence in $G$.

One says that the series $\displaystyle \sum_{n=1}^\infty g_n$ converges as a net or has net convergence if $\displaystyle \sum \left\{{g_n: n \in \N}\right\}$ converges.

By Net Convergence Equivalent to Absolute Convergence, when $G$ is a Banach space, this is equivalent to absolute convergence.

Absolute Net Convergence
Let $V$ be a Banach space.

Let $\left({v_i}\right)_{i\in I}$ be an indexed subset of $V$.

One says that $\displaystyle \sum \left\{{v_i: i \in I}\right\}$ converges absolutely if $\displaystyle \sum \left\{{\left\Vert{v_i}\right\Vert: i \in I}\right\}$ converges.

This nomenclature is appropriate as we have Absolutely Convergent Generalized Sum Converges.

Note
While the notion of a topological group may be somewhat overwhelming, one may as well read normed vector space in its place to at least grasp the most important use of a generalized sum.