Concretization Noematics of Instanced Regimentation Pluriform Refigurization Phalanx
Versandkostenfrei!
Versandfertig in 1-2 Wochen
27,99 €
inkl. MwSt.
PAYBACK Punkte
14 °P sammeln!
The generalized symmetric groups are the wreath product groups of the cyclic group with the symmetric group, a natural group-theoretic construction with many interesting applications. Some interesting special cases of these groups are the symmetric group and the hyperoctahedral group. We denote the wreath product groups (Z/rZ) ¿ Sn with G(n, r) throughout this thesis. The problem of counting the number of irreducible representations of a given group whose determinant is non-trivial gains interest for re- searchers recently. In the case of symmetric groups, they call such representations to be...
The generalized symmetric groups are the wreath product groups of the cyclic group with the symmetric group, a natural group-theoretic construction with many interesting applications. Some interesting special cases of these groups are the symmetric group and the hyperoctahedral group. We denote the wreath product groups (Z/rZ) ¿ Sn with G(n, r) throughout this thesis. The problem of counting the number of irreducible representations of a given group whose determinant is non-trivial gains interest for re- searchers recently. In the case of symmetric groups, they call such representations to be chiral if the composition of ¿ with the determinant map is non-trivial. The problem of counting the non-trivial determinants in [7] and [13] have their genesis in [28]. In [28], Macdonald developed combinatorics for partitions and gave a closed formula to count the number of odd-dimensional Specht modules for the symmetric groups. This number happened to be the product of the powers of 2 in the binary expansion of n and was obtained by characterizing the 2-core tower of the odd partitions.
Andere Kunden interessierten sich für
