Asymptotics of Plethysm
Abstract
We study multiplicities adλμ,(dk) of highest weight representations Sdλ( Cn), λ pk, of length at most p, in Sμ(Sdk( Cn)), μ p, so called plethysm coefficients, as d tends to ∞. These are given by quasi-polynomials, which in the case of Sp(Sdk( Cn)) can explicitly be computed by Pieri's rule. We show that for all but a finite, explicit list of λ's the leading term is in fact constant and that adλμ,(dk) Vμp!cdλp,dk as d∞. In particular, we answer a conjecture of Kahle and Micha ek, going back to Howe.
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