On the action of the symmetric group on the free LAnKe: a question of Friedmann, Hanlon, Stanley and Wachs
Abstract
A LAnKe (also known as a Lie algebra of the nth kind, or a Filippov algebra) is a vector space equipped with a skew-symmetric n-linear form that satisfies the generalized Jacobi identity. The symmetric group Sm acts on the multilinear part of the free LAnKe on m=(n-1)k+1 generators, where k is the number of brackets, by permutation of the generators. The corresponding representation was studied by Friedmann, Hanlon, Stanley and Wachs, who asked whether for n k, its irreducible decomposition contains no summand whose Young diagram has at most k-1 columns. The answer is affirmative if k 3. In this paper, we show that the answer is affirmative for all k. A proof has been given recently by Friedmann, Hanlon and Wachs. The two proofs are completely different.
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