RSK Insertion for Set Partitions and Diagram Algebras
Abstract
We give combinatorial proofs of two identities from the representation theory of the partition algebra C Ak(n), n 2k. The first is nk = Σλ fλ mkλ, where the sum is over partitions λ of n, fλ is the number of standard tableaux of shape λ, and mkλ is the number of "vacillating tableaux" of shape λ and length 2k. Our proof uses a combination of Robinson-Schensted-Knuth insertion and jeu de taquin. The second identity is B(2k) = Σλ (mkλ)2, where B(2k) is the number of set partitions of \1, >..., 2k\. We show that this insertion restricts to work for the diagram algebras which appear as subalgebras of the partition algebra: the Brauer, Temperley-Lieb, planar partition, rook monoid, planar rook monoid, and symmetric group algebras.
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