Notation

Suppose we are given a permutation group on a set . It induces interesting structures both on and on that are closely related (for more details cf. [7]). To begin with, there are the orbits of the elements : , two of which are either identical or disjoint. Therefore, the set

of all the orbits is a set-partition of . To the orbits there correspond the stabilizers (which are in fact subgroups): , and the close relationship between orbits and stabilizers is the existence of the following natural bijection between an orbit of an element and the set of left cosets of its stabilizer:

The cycle index of is the following polynomial in the indeterminates over , defined by

where is the cycle type of the permutation . This means, decomposes into disjoint cycles of length for . All elements of a conjugacy class have the same cycle type, so the cycle index can be computed in the following way:

where is the system of conjugacy classes of and where is a representative of the conjugacy class .

Let and denote permutation groups on and , respectively. The wreath product is a permutation group on the set , defined by

with multiplication , where and . In the case when and we write instead of .

The wreath product acts in a natural way on . The effect of the permutation on is

The following lemma ([9][10]) reduces the action of a wreath product to the action of the group on the set of all functions from into the set of all orbits of on :

. Lehmann's Lemma:   If and denote permutation groups on and , respectively, then acts on in the following way:

Moreover, the mapping

is a bijection if is given by .

There are many enumerative and constructive results dealing with various group actions on the set induced by permutation groups on the domain and on the range . For example, acts upon by

The corresponding generating function for the numbers of -orbits on is given by (see [1]):

The group action of above can be restricted to the set of all injective mappings from to , the corresponding generating function is