Definition
2
[0GW] 1 Let \((X, Ο )\) be a topological space and let \(x_ 0 β X\).
We denote as neighbourhood of \(x_ 0\) any superset of an open set containing \(x_ 0\) .
We call fundamental system of neighbourhoods of \(x_ 0\) a family \(\{ U_ i \} _{iβI}\) of neighborhoods \(x_ 0\) with the property that each neighborhood of \(x_ 0\) contains at least one of the \(U_ i\) .
We will say that \(U\) is an open neighborhood of \(x_ 0\) simply to say that \(U\) is an open set that contains \(x_ 0\).