Cyclic quasi-symmetric functions
Abstract
The ring of cyclic quasi-symmetric functions and its non-Escher subring are introduced in this paper. A natural basis consists of fundamental cyclic quasi-symmetric functions; for the non-Escher subring they arise as toric -partition enumerators, for toric posets with a total cyclic order. The associated structure constants are determined by cyclic shuffles of permutations. We then prove the following positivity phenomenon: for every non-hook shape , the coefficients in the expansion of the Schur function in terms of fundamental cyclic quasi-symmetric functions are nonnegative. The proof relies on the existence of a cyclic descent map on the standard Young tableaux (SYT) of shape . The theory has applications to the enumeration of cyclic shuffles and SYT by cyclic descents.
Cite
@article{arxiv.1811.05440,
title = {Cyclic quasi-symmetric functions},
author = {Ron M. Adin and Ira M. Gessel and Victor Reiner and Yuval Roichman},
journal= {arXiv preprint arXiv:1811.05440},
year = {2020}
}
Comments
38 pages, added references and updated last section