Pro-end group

In mathematics , a pro- finite or profinite group is a topological group G, which is the inverse (projective) limit of a system of finite groups. This Limes is formed in the category of topological groups; here we consider every finite group as a topological group with the discrete topology . A topological group is pro finite if and only if it is Hausdorffian , compact and totally disjointed .

Examples

• Every finite group is obviously also pro-finite (choose only the group itself as the system of finite groups).
• The p-adic numbers and the per- finite numbers are examples of infinite per-finite groups.${\ displaystyle \ mathbb {Z} _ {p}}$ ${\ displaystyle {\ widehat {\ mathbb {Z}}}}$
• Every Galois group of a Galois extension L | K (provided with the Krull topology ) is pro finite.
• If G is an arbitrary group, then one obtains a per-finite group Ĝ, the per-finite completion or per-finite completion of G, by taking the inverse limit of G / H, where H runs through all normal divisors of G with finite index .