Enumerations of Permutations by Circular Descent Sets

Abstract

The circular descent of a permutation σ is a set \σ(i) σ(i)>σ(i+1)\. In this paper, we focus on the enumerations of permutations by the circular descent set. Let cdesn(S) be the number of permutations of length n which have the circular descent set S. We derive the explicit formula for cdesn(S). We describe a class of generating binary trees Tk with weights. We find that the number of permutations in the set CDESn(S) corresponds to the weights of Tk. As a application of the main results in this paper, we also give the enumeration of permutation tableaux according to their shape.