A character relationship between symmetric group and hyperoctahedral group
Abstract
We relate character theory of the symmetric groups S2n and S2n+1 with that of the hyperoctahedral group Bn = ( Z/2)n Sn, as part of the expectation that the character theory of reductive groups with diagram automorphism and their Weyl groups, is related to the character theory of the fixed subgroup of the diagram automorphism.
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