Generalized symmetric group mathematics , the generalized symmetric group wreath product of the cyclic group of order m and the symmetric group of order n .Examples There is a natural representation of elements of as generalized permutation matrices , where the nonzero entries are m -th roots of unity: representation theory has been studied since ; see references in. As with the symmetric group, the representations can be constructed in terms of Specht modules ; see.Homology The first group homology group is : the factors can be mapped to , while the sign map on the symmetric group yields the These are independent, and generate the group, hence are the abelianization .homology group is given by :Note that it depends on n and the parity of m: and which are the Schur multipliers of the symmetric group and signed symmetric group.
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