Pattern-Avoiding Peak Functions
Abstract
In 2020, Hamaker, Pawlowski, and Sagan introduced the \emph{pattern quasisymmetric functions}, which are quasisymmetric functions associated with pattern-avoidance classes of permutations, and defined via expansions in fundamental quasisymmetric functions. They determined which subsets of the symmetric group index pattern quasisymmetric functions that are symmetric, and showed that these symmetric pattern quasisymmetric functions are also Schur-positive. They then posed the question of when symmetry or Schur -positivity occur for analogous quasisymmetric functions defined in terms of peak functions. In this work we answer this question, that is, we identify precisely which subsets of give a \emph{pattern-avoiding peak function} that is symmetric, and give explicit formulas for the positive expansion into the closely-related Schur -functions.
Cite
@article{arxiv.2510.17116,
title = {Pattern-Avoiding Peak Functions},
author = {Matthew Slattery-Holmes},
journal= {arXiv preprint arXiv:2510.17116},
year = {2025}
}
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26 pages