English

Delta Operators on Almost Symmetric Functions

Representation Theory 2024-09-24 v2 Combinatorics

Abstract

We construct Δ\Delta-operators F[Δ]F[\Delta] on the space of almost symmetric functions Pas+\mathscr{P}_{as}^{+}. These operators extend the usual Δ\Delta-operators on the space of symmetric functions ΛPas+\Lambda \subset \mathscr{P}_{as}^{+} central to Macdonald theory. The F[Δ]F[\Delta] operators are constructed as certain limits of symmetric functions in the Cherednik operators YiY_i and act diagonally on the stable-limit non-symmetric Macdonald functions E~(μλ)(x1,x2,;q,t).\widetilde{E}_{(\mu|\lambda)}(x_1,x_2,\ldots;q,t). Using properties of Ion-Wu limits, we are able to compute commutation relations for the Δ\Delta-operators F[Δ]F[\Delta] and many of the other operators on Pas+\mathscr{P}_{as}^{+} introduced by Ion-Wu. Using these relations we show that there is an action of Bq,text\mathbb{B}_{q,t}^{\text{ext}} on almost symmetric functions which we show is isomorphic to the polynomial representation of Bq,text\mathbb{B}_{q,t}^{\text{ext}} constructed by Gonz\'{a}lez-Gorsky-Simental.

Keywords

Cite

@article{arxiv.2405.09846,
  title  = {Delta Operators on Almost Symmetric Functions},
  author = {Milo Bechtloff Weising},
  journal= {arXiv preprint arXiv:2405.09846},
  year   = {2024}
}

Comments

20 pages, corrected normalization error in section 3.4; this paper answers a conjecture from the author's prior paper arXiv:2307.05864

R2 v1 2026-06-28T16:29:06.142Z