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Generating set of a group
Abstract algebra concept / From Wikipedia, the free encyclopedia
In abstract algebra, a generating set of a group is a subset of the group set such that every element of the group can be expressed as a combination (under the group operation) of finitely many elements of the subset and their inverses.
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In other words, if is a subset of a group
, then
, the subgroup generated by
, is the smallest subgroup of
containing every element of
, which is equal to the intersection over all subgroups containing the elements of
; equivalently,
is the subgroup of all elements of
that can be expressed as the finite product of elements in
and their inverses. (Note that inverses are only needed if the group is infinite; in a finite group, the inverse of an element can be expressed as a power of that element.)
If , then we say that
generates
, and the elements in
are called generators or group generators. If
is the empty set, then
is the trivial group
, since we consider the empty product to be the identity.
When there is only a single element in
,
is usually written as
. In this case,
is the cyclic subgroup of the powers of
, a cyclic group, and we say this group is generated by
. Equivalent to saying an element
generates a group is saying that
equals the entire group
. For finite groups, it is also equivalent to saying that
has order
.
A group may need an infinite number of generators. For example the additive group of rational numbers is not finitely generated. It is generated by the inverses of all the integers, but any finite number of these generators can be removed from the generating set without it ceasing to be a generating set. In a case like this, all the elements in a generating set are nevertheless "non-generating elements", as are in fact all the elements of the whole group − see Frattini subgroup below.
If is a topological group then a subset
of
is called a set of topological generators if
is dense in
, i.e. the closure of
is the whole group
.