Enumerations for Permutations by Circular Peak Sets

Abstract

The circular peak set of a permutation σ is the set \σ(i) σ(i-1)<σ(i)>σ(i+1)\. In this paper, we focus on the enumeration problems for permutations by circular peak sets. Let cpn(S) denote the number of the permutations of order n which have the circular peak set S. For the case with |S|=0,1,2, we derive the explicit formulas for cpn(S). We also obtain some recurrence relations for the sequence cpn(S) and give the formula for cpn(S) in the general case.