Computing Young's Natural Representations for Generalized Symmetric Groups
Abstract
We provide an algorithmic framework for the computation of explicit representing matrices for all irreducible representations of a generalized symmetric group n, i.e., a wreath product of cyclic group of order r with the symmetric group n. The basic building block for this framework is the Specht matrix, a matrix with entries 0 and 1, defined in terms of pairs of certain words. Combinatorial objects like Young diagrams and Young tableaus arise naturally from this setup. In the case r = 1, we recover Young's natural representations of the symmetric group. For general r, a suitable notion of pairs of r-words is used to extend the construction to generalized symmetric groups. Separately, for r = 2, where n is the Weyl group of type Bn, a different construction is based on a notion of pairs of biwords.
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