In mathematics, especially in the fields of group theory and representation theory of groups, a class function is a function on a group G that is constant on the conjugacy classes of G. In other words, it is invariant under the conjugation map on G. Such functions play a basic role in representation theory.
The character of a linear representation of G over a field K is always a class function with values in K. The class functions form the center of the group ring K[G]. Here a class function f is identified with the element [math]\displaystyle{ \sum_{g \in G} f(g) g }[/math].
The set of class functions of a group G with values in a field K form a K-vector space. If G is finite and the characteristic of the field does not divide the order of G, then there is an inner product defined on this space defined by [math]\displaystyle{ \langle \phi , \psi \rangle = \frac{1}{|G|} \sum_{g \in G} \phi(g) \overline{\psi(g)} }[/math] where |G| denotes the order of G and bar is conjugation in the field K. The set of irreducible characters of G forms an orthogonal basis, and if K is a splitting field for G, for instance if K is algebraically closed, then the irreducible characters form an orthonormal basis.
In the case of a compact group and K = C the field of complex numbers, the notion of Haar measure allows one to replace the finite sum above with an integral: [math]\displaystyle{ \langle \phi, \psi \rangle = \int_G \phi(t) \overline{\psi(t)}\, dt. }[/math]
When K is the real numbers or the complex numbers, the inner product is a non-degenerate Hermitian bilinear form.
Original source: https://en.wikipedia.org/wiki/Class function.
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