Generating functions for permutations which avoid consecutive patterns with multiple descents

Abstract

Let Sn denote the group all permutations of n. For every permutation σ, we let des(σ) denote the number of descents in σ and LRMin(σ) denote the number of left-to-right minima of σ. Given a sequence τ = τ1 ·s τn of distinct positive integers, we define the reduction of τ, red(τ), to be the permutation of Sn that results by replacing the i-th smallest element of τ by i. If is a set of permutations, we say that a permutation σ = σ1 … σn ∈ Sn has a -match starting at position i if there is a i < j such that red(σi σi+1 … σj) ∈ . We let -mch(σ) denote the number of -matches in σ. We let NMn() be the set of σ ∈ Sn such that -mch(σ) = 0. In this paper, we modify Jones and Remmel's reciprocity method to study the generating function of the form equation NM(t,x,y)=Σn ≥ 0 tnn! NM,n(x,y) equation where NM,n(x,y) =Σσ ∈ NMn()xLRmin(σ)y1+des(σ) in the case where we no longer insist that all the permutations τ ∈ have at most one descent.