A Relationship Between Character Values Of Wreath Products And The Symmetric Group
Abstract
A relation between certain irreducible character values of the hyperoctahedral group Bn (Z/2Z Sn) and the symmetric group S2n was proved by F. L\"ubeck and D. Prasad in 2021. Their proof is algebraic in nature and uses Lie theory. Using combinatorial methods, R. Adin and Y. Roichman proved a similar relation between certain character values of G Sn and Srn, where G is an abelian group of order r (generalizing the result of L\"ubeck-Prasad). Using their result, we prove yet another relation between certain irreducible character values of G Sn and Srn, where G is an abelian group of order r.
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