On Two Bijections from Sn(321) to Sn(132)

Abstract

Let Sn(321) (respectively, Sn(132)) denote the set of all permutations of 1,2,...,n that avoid the pattern 321 (respectively, the pattern 132). Elizalde and Pak gave a bijection Theta from Sn(321) to Sn(132) that preserves the numbers of fixed points and excedances for each element of Sn(321), and commutes with the operation of taking inverses. Bloom and Saracino proved that another bijection Gamma from Sn(321) to Sn(132), introduced by Robertson, has the same properties, and they later gave a pictorial reformulation of Gamma that made these results more transparent. Here we give a pictorial reformulation of Theta, from which it follows that, although the original definitions of Theta and Gamma are very different, these two bijections are in fact related to each other in a very simple way, by using inversion, reversal, and complementation.