Residually finite group: Difference between revisions

This article defines a group property: a property that can be evaluated to true/false for any given group, invariant under isomorphism
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This is a variation of finiteness (groups)|Find other variations of finiteness (groups) |

Definition

Symbol-free definition

A group is said to be finitely approximable or residually finite if it satisfies the following equivalent conditions:

1. For any non-identity element of the group, there is a subgroup of finite index not containing that element.
2. For any non-identity element of the group, there is a normal subgroup of finite index not containing that element. In other words, there is a homomorphism from the whole group to a finite group where the image of the given element is a non-identity element of the finite group.
3. The intersection of subgroups of finite index in it is trivial.
4. The intersection of normal subgroups of finite index in it is trivial.
5. The natural map from the group to its profinite completion, is injective.
6. It is a subdirect product of (possibly infinitely many) finite groups, i.e., it is isomorphic to a subgroup of a direct product of finite groups that surjects onto each of the direct factors.
7. It is isomorphic to a subgroup of a direct product of finite groups.
8. Under the profinite topology, it is a Hausdorff space.

Equivalence of definitions

Definitions (1) and (3) are clearly equivalent, as are definitions (2) and (4). The equivalence of definitions (1) and (2) follows from Poincare's theorem which states that any subgroup of index ${\displaystyle n}$ contains a normal subgroup of index dividing ${\displaystyle n!}$, namely its normal core. In particular, any subgroup of finite index contains a normal subgroup of finite index.

Definitions (4) and (5) are equivalent because the kernel of the natural map to the profinite completion is the intersection of normal subgroups of finite index.

Formalisms

In terms of the residually operator

This property is obtained by applying the residually operator to the property: finite group
View other properties obtained by applying the residually operator

The group property of being residually finite is obtained by applying the residually operator to the group property of being finite.

Relation with other properties

Stronger properties

Weaker properties