boxtopológia

Boxtopológia is a mathematical concept that describes a particular type of topological space. It is constructed from a collection of open sets, where each set is associated with a point in the space. The defining characteristic of a boxtopology is how the open sets in the product space are defined. Specifically, for a collection of topological spaces indexed by a set $I$, say $\{X_i\}_{i \in I}$, the product space $X = \prod_{i \in I} X_i$ endowed with the boxtopology has a basis of open sets of the form $\prod_{i \in I} U_i$, where for each $i$, $U_i$ is an open set in $X_i$, and there is a finite subset $J \subseteq I$ such that $U_i = X_i$ for all $i \in I \setminus J$. This means that in any open set of the product space, only a finite number of the component spaces can have their topology restricted.

This differs from the standard Tychonoff topology (also known as the product topology) where an open set