Conjugacy classes

In mathematics, especially group theory, the elements of any group may be partitioned into conjugacy classes; members of the same conjugacy class share many properties, and study of conjugacy classes of non-abelian groups reveals many important features of their structure. For an abelian group, each conjugacy class is a set containing one element (singleton set).

Functions that are constant for members of the same conjugacy class are called class functions.

Let $G$ be a group. Two elements $a$ and $b$ of $G$ are conjugate, if there exists an element $g$ in $G$ such that $gag -1 = b$ . One says also that $b$ is a conjugate of $a$ and that $a$ is a conjugate of $b$ .

In the case of the group $GL(n)$ of invertible matrices, the conjugacy relation is called matrix similarity.

It can be easily shown that conjugacy is an equivalence relation and therefore partitions G into equivalence classes. (This means that every element of the group belongs to precisely one conjugacy class, and the classes Cl(a) and Cl(b) are equal if and only if a and b are conjugate, and disjoint otherwise.) The equivalence class that contains the element a in G is

and is called the conjugacy class of $a$ . The class number of $G$ is the number of distinct (nonequivalent) conjugacy classes. All elements belonging to the same conjugacy class have the same order.

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