Graphical Mahonian Statistics on Words
Combinatorics
2016-07-04 v1
Abstract
Foata and Zeilberger defined the graphical major index, , and the graphical inversion index, , for words. These statistics are a generalization of the classical permutation statistics and indexed by directed graphs . They showed that and are equidistributed over all rearrangement classes if and only if is bipartitional. In this paper we strengthen their result by showing that if and are equidistributed on a single rearrangement class then is essentially bipartitional. Moreover, we define a graphical sorting index, , which generalizes the sorting index of a permutation. We then characterize the graphs for which is equidistributed with and 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}
}