On the Divisibility of Degrees of Representations of Lie Algebras
Abstract
Let g be a reductive Lie algebra, and m a positive integer. There is a natural density of irreducible representations of g, whose degrees are not divisible by m. For g=gln, this density decays exponentially to 0 as n ∞. Similar results hold for simple Lie algebras and Lie groups, and there are versions for self-dual and orthogonal representations.
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