On the Limiting Vacillating Tableaux for Integer Sequences

Abstract

A fundamental identity in the representation theory of the partition algeba is nk = Σλ fλ mkλ for n ≥ 2k, where λ ranges over integer partitions of n, fλ is the number of standard Young tableaux of shape λ, and mkλ is the number of vacillating tableaux of shape λ and length 2k. Using a combination of RSK insertion and jeu de taquin, Halverson and Lewandowski constructed a bijection DInk that maps each integer sequence in [n]k to a pair consisting of a standard Young tableau and a vacillating tableau. In this paper, we show that for a given integer sequence i, when n is sufficiently large, the vacillating tableaux determined by DInk(i) become stable when n → ∞; the limit is called the limiting vacillating tableau for i. We give a characterization of the set of limiting vacillating tableaux and presents explicit formulas that enumerate those vacillating tableaux.