EDB — 0V3

[0V3] Given a metric space \((X,d)\) and its subset \(C⊆ X\), The following three conditions are equivalent.

• \(C\) is sequentially compact: every sequence \((x_ n)⊂ C\) has a subsequence converging to an element of \(C\).

• \(C\) is compact: from each family of open sets whose union covers \(C\), we can choose a finite subfamily whose union covers \(C\).

• \(C\) is complete, and is totally bounded: for every \(𝜀{\gt}0\) there are finite points \(x_ 1...x_ n∈ C\) such that \(C⊆ ⋃_{i=1}^ n B(x_ i,𝜀)\).