On Pattern Avoiding Alternating Permutations

Abstract

An alternating permutation of length n is a permutation π=π1 π2 ... πn such that π1 < π2 > π3 < π4 > .... Let An denote set of alternating permutations of 1,2,..., n, and let An(σ) be set of alternating permutations in An that avoid a pattern σ. Recently, Lewis used generating trees to enumerate A2n(1234), A2n(2143) and A2n+1(2143), and he posed several conjectures on the Wilf-equivalence of alternating permutations avoiding certain patterns. Some of these conjectures have been proved by B\'ona, Xu and Yan. In this paper, we prove the two relations |A2n+1(1243)|=|A2n+1(2143)| and |A2n(4312)|=|A2n(1234)| as conjectured by Lewis.