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Bibliographic Details
Main Author: Daugherty, Spencer
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2401.02502
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author Daugherty, Spencer
author_facet Daugherty, Spencer
contents We introduce two new bases of QSym, the flipped extended Schur functions and the backward extended Schur functions, as well as their duals in NSym, the flipped shin functions and the backward shin functions. These bases are the images of the extended Schur basis and shin basis under the involutions $ρ$ and $ω$ on the quasisymmetric and noncommutative symmetric functions, which generalize the classical involution $ω$ on the symmetric functions. In addition, we prove a Jacobi-Trudi rule for certain shin functions using creation operators. We define skew extended Schur functions and skew-II extended Schur functions based on left and right actions of NSym and QSym respectively. We then use the involutions $ρ$ and $ω$ to translate these and other known results to our flipped and backward bases.
format Preprint
id arxiv_https___arxiv_org_abs_2401_02502
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Extended Schur functions and bases related by involutions
Daugherty, Spencer
Combinatorics
05E05
We introduce two new bases of QSym, the flipped extended Schur functions and the backward extended Schur functions, as well as their duals in NSym, the flipped shin functions and the backward shin functions. These bases are the images of the extended Schur basis and shin basis under the involutions $ρ$ and $ω$ on the quasisymmetric and noncommutative symmetric functions, which generalize the classical involution $ω$ on the symmetric functions. In addition, we prove a Jacobi-Trudi rule for certain shin functions using creation operators. We define skew extended Schur functions and skew-II extended Schur functions based on left and right actions of NSym and QSym respectively. We then use the involutions $ρ$ and $ω$ to translate these and other known results to our flipped and backward bases.
title Extended Schur functions and bases related by involutions
topic Combinatorics
05E05
url https://arxiv.org/abs/2401.02502