S3 in S4: Difference between revisions

This article is about a particular subgroup in a group, up to equivalence of subgroups (i.e., an isomorphism of groups that induces the corresponding isomorphism of subgroups). The subgroup is (up to isomorphism) symmetric group:S3 and the group is (up to isomorphism) symmetric group:S4 (see subgroup structure of symmetric group:S4).
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We consider the subgroup ${\displaystyle H}$ in the group ${\displaystyle G}$ defined as follows.

${\displaystyle G}$ is the symmetric group of degree four, which, for concreteness, we take as the symmetric group on the set ${\displaystyle \{1,2,3,4\}}$.

${\displaystyle H}$ is the subgroup of ${\displaystyle G}$ comprising those permutations that fix ${\displaystyle \{4\}}$. In particular, ${\displaystyle H}$ is the symmetric group on ${\displaystyle \{1,2,3\}}$, embedded naturally in ${\displaystyle G}$. It is isomorphic to symmetric group:S3. ${\displaystyle H}$ has order ${\displaystyle 6}$.

There are three other conjugate subgroups to ${\displaystyle H}$ in ${\displaystyle G}$ (so the total conjugacy class size of subgroups is 4). The other subgroups are the subgroups fixing ${\displaystyle \{1\}}$, ${\displaystyle \{2\}}$, and ${\displaystyle \{3\}}$ respectively.

The four conjugates are:

${\displaystyle H=H_4=\{(),(1,2),(1,3),(2,3),(1,2,3),(1,3,2)\}}$

${\displaystyle H_1=\{(),(2,3),(3,4),(2,4),(2,3,4),(2,4,3)\}}$

${\displaystyle H_2=\{(),(1,3),(3,4),(1,4),(1,3,4),(1,4,3)\}}$

${\displaystyle H_3=\{(),(1,2),(2,4),(1,4),(1,2,4),(1,4,2)\}}$

See also subgroup structure of symmetric group:S4.

Cosets

There are four left cosets and four right cosets of each subgroup. Each left coset of a subgroup is a right coset of one of its conjugate subgroups. This gives a total of 16 subsets.

The cosets are parametrized by ordered pairs ${\displaystyle (i,j)\in \{1,2,3,4\}\times \{1,2,3,4\}}$. The coset parametrized by ${\displaystyle (i,j)}$ is the set of all elements that send ${\displaystyle i}$ to ${\displaystyle j}$. This is a left coset of ${\displaystyle H_i}$ and a right coset of ${\displaystyle H_j}$.

Complements

There is a unique normal complement that is common to all the subgroups. This is the subgroup normal Klein four-subgroup of symmetric group:S4:

${\displaystyle K:=\{(),(1,2)(3,4),(1,3)(2,4),(1,4)(2,3)\}}$

There is also a conjugacy class of subgroups each of which is a permutable complement to each of the ${\displaystyle H_i}$s. These are cyclic four-subgroups of symmetric group:S4, and these are:

${\displaystyle \{(),(1,2,3,4),(1,3)(2,4),(1,4,3,2)\},\{(),(1,3,2,4),(1,2)(3,4),(1,4,2,3)\},\{(),(1,2,4,3),(1,4)(2,3),(1,3,4,2)\}}$

Note that the fact that these are permutable complements can be understood as a special case of Cayley's theorem. See also every group of given order is a permutable complement for symmetric groups, which says that any finite group of order ${\displaystyle n}$ is, via the Cayley embedding, a permutable complement to ${\displaystyle S_{n-1}}$ in ${\displaystyle S_n}$.

Apart from these, each of the ${\displaystyle H_i}$s has a number of lattice complements:

• Any subgroup generated by double transposition in S4 is a lattice complement to each ${\displaystyle H_i}$ in the whole group. Thus, each ${\displaystyle H_i}$ has three such lattice complements.
• For each ${\displaystyle H_i}$, a subgroup of order three not contained in that ${\displaystyle H_i}$ is a lattice complement to it. Thus, each ${\displaystyle H_i}$ has three such lattice complements, because one of the four subgroups of order three is contained in that ${\displaystyle H_i}$.

Properties related to complementation

Arithmetic functions