English

The Sorting Index and Permutation Codes

Combinatorics 2012-06-05 v1

Abstract

In the combinatorial study of the coefficients of a bivariate polynomial that generalizes both the length and the reflection length generating functions for finite Coxeter groups, Petersen introduced a new Mahonian statistic sorsor, called the sorting index. Petersen proved that the pairs of statistics (sor,cyc)(sor,cyc) and (inv,rl-min)(inv,rl\textrm{-}min) have the same joint distribution over the symmetric group, and asked for a combinatorial proof of this fact. In answer to the question of Petersen, we observe a connection between the sorting index and the B-code of a permutation defined by Foata and Han, and we show that the bijection of Foata and Han serves the purpose of mapping (inv,rl-min)(inv,rl\textrm{-}min) to (sor,cyc)(sor,cyc). We also give a type BB analogue of the Foata-Han bijection, and we derive the quidistribution of (invB,LmapB,RmilB)(inv_B,{\rm Lmap_B},{\rm Rmil_B}) and (sorB,LmapB,CycB)(sor_B,{\rm Lmap_B},{\rm Cyc_B}) over signed permutations. So we get a combinatorial interpretation of Petersen's equidistribution of (invB,nminB)(inv_B,nmin_B) and (sorB,lB)(sor_B,l_B'). Moreover, we show that the six pairs of set-valued statistics (CycB,RmilB)\rm (Cyc_B,Rmil_B), (CycB,LmapB)\rm(Cyc_B,Lmap_B), (RmilB,LmapB)\rm(Rmil_B,Lmap_B), (LmapB,RmilB)\rm(Lmap_B,Rmil_B), (LmapB,CycB)\rm(Lmap_B,Cyc_B) and (RmilB,CycB)\rm(Rmil_B,Cyc_B) are equidistributed over signed permutations. For Coxeter groups of type DD, Petersen showed that the two statistics invDinv_D and sorDsor_D are equidistributed. We introduce two statistics nminDnmin_D and l~D\tilde{l}_D' for elements of DnD_n and we prove that the two pairs of statistics (invD,nminD)(inv_D,nmin_D) and (sorD,l~D)(sor_D,\tilde{l}_D') are equidistributed.

Keywords

Cite

@article{arxiv.1206.0503,
  title  = {The Sorting Index and Permutation Codes},
  author = {William Y. C. Chen and George Z. Gong and Jeremy J. F. Guo},
  journal= {arXiv preprint arXiv:1206.0503},
  year   = {2012}
}

Comments

25 pages

R2 v1 2026-06-21T21:13:39.293Z