Pattern avoidance seen in multiplicities of maximal weights of affine Lie algebra representations
Abstract
We prove that the multiplicities of certain maximal weights of g(A(1)n)-modules are counted by pattern avoidance on words. This proves and generalizes a conjecture of Misra-Rebecca. We also prove similar phenomena in types A(2)2n and D(2)n+1. Both proofs are applications of Kashiwara's crystal theory.
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