In mathematics, a character group is the group of representations of a group by complex-valued functions. These functions can be thought of as one-dimensional matrix representations and so are special cases of the group characters that arise in the related context of character theory. Whenever a group is represented by matrices, the function defined by the trace of the matrices is called a character; however, these traces do not in general form a group. Some important properties of these one-dimensional characters apply to characters in general:
The primary importance of the character group for finite abelian groups is in number theory, where it is used to construct Dirichlet characters. The character group of the cyclic group also appears in the theory of the discrete Fourier transform. For locally compact abelian groups, the character group (with an assumption of continuity) is central to Fourier analysis.
See main article: Character (mathematics). Let
G
f:G\toC\setminus\{0\}
G
G
C x
f(g1g2)=f(g1)f(g2)
g1,g2\inG
If
f
G
f(g)
g\inG
k\inN
gk=e
f(g)k=f(gk)=f(e)=1
Each character f is a constant on conjugacy classes of G, that is, f(hgh−1) = f(g). For this reason, a character is sometimes called a class function.
A finite abelian group of order n has exactly n distinct characters. These are denoted by f1, ..., fn. The function f1 is the trivial representation, which is given by
f1(g)=1
g\inG
If G is an abelian group, then the set of characters fk forms an abelian group under pointwise multiplication. That is, the product of characters
fj
fk
(fjfk)(g)=fj(g)fk(g)
g\inG
\hat{G}
\hat{G}
G
\hat{G}
|fk(g)|=1
g\inG
There is another definition of character group[1] pg 29 which uses
U(1)=\{z\inC*:|z|=1\}
C*
V/Λ
We can express explicit elements in the character group as follows: recall that elements inHom(Λ,U(1))\congV\vee/Λ\vee=X\vee
U(1)
fore2\pi
x\inR
V
can be factored as a map\phi:Λ\toU(1)
This follows from elementary properties of homomorphisms. Note that\phi:Λ\toR\xrightarrow{\exp({2\pii ⋅ })}U(1)
giving us the desired factorization. As the group\begin{align} \phi(x+y)&=\exp({2\pii}f(x+y))\\ &=\phi(x)+\phi(y)\\ &=\exp(2\piif(x))\exp(2\piif(y)) \end{align}
we have the isomorphism of the character group, as a group, with the group of homomorphisms ofHom(Λ,R)\congHom(Z2n,R)
Z2n
R
Hom(Z,G)\congG
G
after composing with the complex exponential, we find thatHom(Z2n,R)\congR2n
which is the expected result.Hom(Z2n,U(1))\congR2n/Z2n
Since every finitely generated abelian group is isomorphic to
the character group can be easily computed in all finitely generated cases. From universal properties, and the isomorphism between finite products and coproducts, we have the character groups ofG\congZn ⊕
m oplus i=1 Z/ai
G
for the first case, this is isomorphic toHom(Z,C*) ⊕
*) ⊕ oplus i,C
(C*) ⊕
1\inZ/ni
ni
| \zeta | |
| ni |
=\exp(2\pii/ni)
Consider the
n x n
Ajk=fj(gk)
gk
The sum of the entries in the jth row of A is given by
| n | |
| \sum | |
| k=1 |
Ajk=
| n | |
| \sum | |
| k=1 |
fj(gk)=0
j ≠ 1
| n | |
| \sum | |
| k=1 |
A1k=n
The sum of the entries in the kth column of A is given by
| n | |
| \sum | |
| j=1 |
Ajk=
| n | |
| \sum | |
| j=1 |
fj(gk)=0
k ≠ 1
| n | |
| \sum | |
| j=1 |
Aj1=
| n | |
| \sum | |
| j=1 |
fj(e)=n
Let
A\ast
AA\ast=A\astA=nI
| n | |
| \sum | |
| k=1 |
| * | |
| {f | |
| k} |
(gi)fk(gj)=n\deltaij
\deltaij
| * | |
| f | |
| k |
(gi)
fk(gi)