Consecutive patterns in restricted permutations and involutions

Abstract

It is well-known that the set In of involutions of the symmetric group Sn corresponds bijectively - by the Foata map F - to the set of n-permutations that avoid the two vincular patterns 123, 132. We consider a bijection from the set Sn to the set of histoires de Laguerre, namely, bicolored Motzkin paths with labelled steps, and study its properties when restricted to Sn(123,132). In particular, we show that the set Sn(123,132) of permutations that avoids the consecutive pattern 123 and the classical pattern 132 corresponds via to the set of Motzkin paths, while its image under F is the set of restricted involutions In(3412). We exploit these results to determine the joint distribution of the statistics des and inv over Sn(123,132) and over In(3412). Moreover, we determine the distribution in these two sets of every consecutive pattern of length three. To this aim, we use a modified version of the well-known Goulden-Jacson cluster method.