English

Graphical Mahonian Statistics on Words

Combinatorics 2016-07-04 v1

Abstract

Foata and Zeilberger defined the graphical major index, majU\mathrm{maj}'_U, and the graphical inversion index, invU\mathrm{inv}'_U, for words. These statistics are a generalization of the classical permutation statistics maj\mathrm{maj} and inv\mathrm{inv} indexed by directed graphs UU. They showed that majU\mathrm{maj}'_U and invU\mathrm{inv}'_U are equidistributed over all rearrangement classes if and only if UU is bipartitional. In this paper we strengthen their result by showing that if majU\mathrm{maj}'_U and invU\mathrm{inv}'_U are equidistributed on a single rearrangement class then UU is essentially bipartitional. Moreover, we define a graphical sorting index, sorU\mathrm{sor}'_U, which generalizes the sorting index of a permutation. We then characterize the graphs UU for which sorU\mathrm{sor}'_U is equidistributed with invU\mathrm{inv}'_U and majU\mathrm{maj}'_U on a single rearrangement class.

Cite

@article{arxiv.1607.00033,
  title  = {Graphical Mahonian Statistics on Words},
  author = {Amy Grady and Svetlana Poznanović},
  journal= {arXiv preprint arXiv:1607.00033},
  year   = {2016}
}
R2 v1 2026-06-22T14:40:08.422Z