Linear representation theory of dihedral group:D8

This article gives specific information, namely, linear representation theory, about a particular group, namely: dihedral group:D8.
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We shall use the dihedral group with the following presentation:

${\displaystyle \langle a,x\mid a^{4}=x^{2}=e,xax^{-1}=a^{-1}\rangle }$.

Summary

Item	Value
Degrees of irreducible representations over a splitting field	1,1,1,1,2 maximum: 2, lcm: 2, number: 5, sum of squares: 8
Schur index values of irreducible representations	1,1,1,1,1
Smallest ring of realization for all irreducible representations (characteristic zero)	${\displaystyle \mathbb {Z} }$
Smallest field of realization for all irreducible representations (characteristic zero)	${\displaystyle \mathbb {Q} }$ (hence, it is a rational representation group)
Condition for being a splitting field for this group	Any field of characteristic not two is a splitting field.
Smallest size splitting field	field:F3, i.e., the field with three elements.	Orbits over a splitting field under action of automorphism group	orbit sizes: 1 (degree 1 representation), 1 (degree 1 representation), 2 (degree 1 representations), and 1 (degree 2 representation) number: 4
Other groups with the same character table	quaternion group (see linear representation theory of quaternion group)

Representations

Summary information

Below is summary information on irreducible representations. Note that a particular representation may make sense, and be irreducible, only for certain kinds of fields -- see the "Values not allowed for field characteristic" and "Criterion for field" columns to see the condition the field must satisfy for the representation to be irreducible there.

Name of representation type	Number of representations of this type	Values not allowed for field characteristic	Criterion for field	What happens over a splitting field?	Kernel	Degree	Schur index	What happens by reducing the ${\displaystyle \mathbb {Z} }$-representation over bad characteristics?
trivial	1	--	any	remains the same	whole group	1	1	--
sign representation with kernel cyclic of order four	1	--	any	remains the same	cyclic maximal subgroup of dihedral group:D8	1	1	There are no bad characteristics, but it is noteworthy that in characteristic two, this representation is the same as the trivial representation.
sign representation with kernel a Klein four-subgroup	2	--	any	remains the same	Klein four-subgroups of dihedral group:D8	1	1	There are no bad characteristics, but it is noteworthy that in characteristic two, this representation is the same as the trivial representation.
two-dimensional irreducible	1	2	any	remains the same	trivial subgroup, i.e., it is a faithful linear representation	2	1	The exact form of the new representation depends on the choice of matrices before we go mod 2, but the kernel becomes one of the Klein four-subgroups of dihedral group:D8, and we thus get a representation of cyclic group:Z2 in characteristic two that sends the non-identity element to ${\displaystyle {\begin{pmatrix}0&1\\1&0\\\end{pmatrix}}}$. This has an invariant one-dimensional subspace and is not irreducible.

Trivial representation

The trivial representation is a one-dimensional representation that sends all elements of the dihedral group to ${\displaystyle 1}$.

Sign representations with kernels as the maximal normal subgroups

The dihedral group has three normal subgroups of index two: the subgroup ${\displaystyle \langle a\rangle }$, the subgroup ${\displaystyle \langle a^{2},x\rangle }$, and the subgroup ${\displaystyle \langle a^{2},ax\rangle }$. For each such subgroup, there is an irreducible one-dimensional representation sending elements in that subgroup to ${\displaystyle 1}$ and elements outside that subgroup to ${\displaystyle -1}$.

The trivial representation and the three sign representations described above are the only faithful one-dimensional representations.

Two-dimensional irreducible representation

The dihedral group of order eight has a two-dimensional irreducible representation, where the element ${\displaystyle a}$ acts as a rotation (by an angle of ${\displaystyle \pi /2}$, and the element ${\displaystyle x}$ acts as a reflection about the first axis. The matrices are:

${\displaystyle a\mapsto {\begin{pmatrix}0&-1\\1&0\\\end{pmatrix}},\qquad x\mapsto {\begin{pmatrix}1&0\\0&-1\\\end{pmatrix}}.}$

There are many other choices of two-dimensional representation, but these are all equivalent as linear representations.

Over other fields

These representations generalize to any field of characteristic not equal to ${\displaystyle 2}$.

Character table

This character table works over characteristic zero:

Rep/Conj class	${\displaystyle e}$	${\displaystyle a^{2}}$	${\displaystyle \{a,a^{-1}\}}$	${\displaystyle \{x,a^{2}x\}}$	${\displaystyle \{ax,a^{3}x\}}$
Trivial representation	1	1	1	1	1
${\displaystyle \langle a\rangle }$-kernel	1	1	1	-1	-1
${\displaystyle \langle a^{2},x\rangle }$-kernel	1	1	-1	1	-1
${\displaystyle \langle a^{2},ax\rangle }$-kernel	1	1	-1	-1	1
2-dimensional	2	-2	0	0	0

Realizability information

Smallest ring of realization

Representation	Smallest ring over which it is realized	Smallest set of elements in matrix entries
trivial representation	${\displaystyle \mathbb {Z} }$ -- ring of integers	${\displaystyle \{1\}}$
${\displaystyle \langle a\rangle }$-kernel	${\displaystyle \mathbb {Z} }$ -- ring of integers	${\displaystyle \{1,-1\}}$
${\displaystyle \langle a^{2},x\rangle }$-kernel	${\displaystyle \mathbb {Z} }$ -- ring of integers	${\displaystyle \{1,0,-1\}}$

Smallest ring of realization as orthogonal matrices

Representation	Smallest ring over which it is realized	Smallest set of elements in matrix entries
trivial representation	${\displaystyle \mathbb {Z} }$ -- ring of integers	${\displaystyle \{1\}}$
${\displaystyle \langle a\rangle }$-kernel	${\displaystyle \mathbb {Z} }$ -- ring of integers	${\displaystyle \{1,-1\}}$
${\displaystyle \langle a^{2},x\rangle }$-kernel	${\displaystyle \mathbb {Z} }$ -- ring of integers	${\displaystyle \{1,0,-1\}}$

Orthogonality relations and numerical checks

• Any field of characteristic not equal to two is a splitting field for the dihedral group.
• The number of irreducible representations over such a field is ${\displaystyle 5}$, which is equal to the number of conjugacy classes.
• The number of one-dimensional representations equals ${\displaystyle 4}$, which is the order of the abelianization.
• The sum of squares of degrees is ${\displaystyle 1^{2}+1^{2}+1^{2}+1^{2}+2^{2}=8}$, equal to the order of the group. This confirms the fact that sum of squares of degrees of irreducible representations equals order of group.
• The degrees of irreducible representations all divide ${\displaystyle 2}$, which is the smallest possible index of an abelian normal subgroup. This confirms the fact that degree of irreducible representation divides index of abelian normal subgroup.
• The order of the inner automorphism group (which is ${\displaystyle 4}$) bounds the square of the degree of every irreducible representation. This confirms the fact that order of inner automorphism group bounds square of degree of irreducible representation.
• The character table satisfies the orthogonality relations: in particular, the row orthogonality theorem and the column orthogonality theorem.

Action of automorphism group

The automorphism group of the dihedral group preserves the trivial representation, the two-dimensional representation, and the sign representation whose kernel is the cyclic group ${\displaystyle \langle a\rangle }$. The two sign representations with kernels ${\displaystyle \langle a^{2},x\rangle }$ and ${\displaystyle \langle a^{2},ax\rangle }$ are exchanged by an outer automorphism.

Relation with representations of subgroups

Induced representations from subgroups

Since the dihedral group is a finite nilpotent group, it is in particular a finite supersolvable group, and hence, it is a monomial-representation group: every irreducible representation can be realized as a monomial representation, i.e., every irreducible representation is induced from a degree one representation of a subgroup. (Point (5) below explains how the two-dimensional irreducible representation is induced).

1. The trivial representation on the center induces a representation obtained as a sum of the four one-dimensional representations.
2. The sign representation on the center (which comprises ${\displaystyle \pm 1}$) induces the double of the two-dimensional irreducible representation of the dihedral group.
3. The trivial representation on the cyclic subgroup generated by ${\displaystyle a}$ induces a representation on the whole group that is the sum of a trivial representation and the representation with the ${\displaystyle a}$-kernel.
4. A representation on ${\displaystyle \langle a\rangle }$ that sends ${\displaystyle a}$ to ${\displaystyle -1}$ induces a representation of the whole group that is the sum of the sign representations for the other two kernels.
5. A representation on ${\displaystyle \langle a\rangle }$ that sends ${\displaystyle a}$ to ${\displaystyle i}$ (now viewed as a complex number) induces the two-dimensional irreducible representation.

Verification of Artin's induction theorem

Artin's induction theorem states that the characters induced from characters on cyclic subgroups span the space of class functions. Points (2) and (5) cover the case of the two-dimensional irreducible representation. PLACEHOLDER FOR INFORMATION TO BE FILLED IN: [SHOW MORE]