A bijective enumeration of 3-strip tableaux
Abstract
Baryshnikov and Romik derived the combinatorial identities for the numbers of the m-strip tableaux. This generalized the classical Andr\'e's theorem for the number of up-down permutations. They asked for a bijective proof for the enumeration of 3-strip tableaux. In this paper we will provide such a bijective proof. First we count the 3-strip tableaux by decomposition. Secondly we will apply this "decomposition" idea on the up-down permutations and down-up permutations to enumerate the 3-strip tableaux bijectively.
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