Permutations whose reverse shares the same recording tableau in the RSK correspondence

Abstract

The RSK correspondence is a bijection between permutations and pairs of standard Young tableaux with identical shape, where the tableaux are commonly denoted P (insertion) and Q (recording). It has been an open problem to demonstrate |\w ∈ Sn | \, Q(w) = Q(wr)\| = cases 2n-12n-1 n-12 & n odd 0 & n even cases, where wr is the reverse permutation of w. First we show that for each w where Q(w) = Q(wr) the recording tableau Q(w) has a symmetric hook shape and satisfies a certain simple property. From these two results, we succeed in proving the desired identity.