Almost Symmetric Schur Functions
Abstract
We introduce and study a generalization of the Schur functions called the almost symmetric Schur functions. These functions simultaneously generalize the finite variable key polynomials and the infinite variable Schur functions. They form a homogeneous basis for the space of almost symmetric functions and are defined using a family of recurrences involving the isobaric divided difference operators and limits of Weyl symmetrization operators. The are the specialization of the stable limit non-symmetric Macdonald functions defined by the author in previous work. We find a combinatorial formula for these functions simultaneously generalizing well known formulas for the Schur functions and the key polynomials. Further, we prove positivity results for the coefficients of the almost symmetric Schur functions expanded into the monomial basis and into the monomial-Schur basis of the space of almost symmetric functions. The latter positivity result follows after realizing the almost symmetric Schur functions as limits of characters of representations of parabolic subgroups in type
Cite
@article{arxiv.2405.01049,
title = {Almost Symmetric Schur Functions},
author = {Milo Bechtloff Weising},
journal= {arXiv preprint arXiv:2405.01049},
year = {2024}
}
Comments
23 pages