On a conjecture concerning the shuffle-compatible permutation statistics

Abstract

The notion of shuffle-compatible permutation statistics was implicit in Stanley's work on P-partitions and was first explicitly studied by Gessel and Zhuang. The aim of this paper is to prove that the triple (udr, pk, des) is shuffle-compatible as conjectured by Gessel and Zhuang, where udr denotes the number of up-down runs, pk denotes the peak number, and des denotes the descent number. This is accomplished by establishing an (udr, pk, des)-preserving bijection in the spirit of Baker-Jarvis and Sagan's bijective proofs of shuffle-compatibility property of permutation statistics. As an application, our bijection also enables us to prove that the pair ( cpk, cdes) is cyclic shuffle-compatible, where cpk denotes the cyclic peak number and cdes denotes the cyclic descent number.