Frame patterns in n-cycles

Abstract

In this paper, we study the distribution of the number of occurrences of the simplest frame pattern, called the μ pattern, in n-cycles. Given an n-cycle C, we say that a pair i,j matches the μ pattern if i < j and as we traverse around C in a clockwise direction starting at i and ending at j, we never encounter a k with i < k < j. We say that i,j is a nontrivial μ-match if i+1 < j. Also, an n-cycle C is incontractible if there is no i such that i+1 immediately follows i in C. We show that the number of incontractible n-cycles in the symmetric group Sn is Dn-1, where Dn is the number of derangements in Sn. Further, we prove that the number of n-cycles in Sn with exactly k μ-matches can be expressed as a linear combination of binomial coefficients of the form n-1i where i ≤ 2k+1. We also show that the generating function NTIn,μ(q) of q raised to the number of nontrivial μ-matches in C over all incontractible n-cycles in Sn is a new q-analogue of Dn-1, which is different from the q-analogues of the derangement numbers that have been studied by Garsia and Remmel and by Wachs. We show that there is a rather surprising connection between the charge statistic on permutations due to Lascoux and Sch\"uzenberger and our polynomials in that the coefficient of the smallest power of q in NTI2k+1,μ(q) is the number of permutations in S2k+1 whose charge path is a Dyck path. Finally, we show that NTIn,μ(q)|qn-12 -k and NTn,μ(q)|qn-12 -k are the number of partitions of k for sufficiently large n.