English

Nilpotency indices for quantum Schubert cell algebras

Quantum Algebra 2024-09-24 v1 Rings and Algebras

Abstract

We study quantum analogs of ad\operatorname{ad}-nilpotency and Engel identities in quantum Schubert cell algebras Uq+[w]{\mathcal U}_q^+[w]. For each pair of Lusztig root vectors, XμX_\mu and XλX_\lambda, in Uq+[w]{\mathcal U}_q^+[w], where ww belongs to a finite Weyl group WW and μ\mu precedes λ\lambda with respect to a convex order on the roots in Δ+w(Δ)\Delta_+ \cap w(\Delta_-), we find the smallest natural number kk, called the nilpotency index, so that (adqXμ)k\left(\operatorname{ad}_q X_\mu \right)^k sends XλX_\lambda to 00, where adqXμ\operatorname{ad}_q X_\mu is the qq-adjoint map. We start by observing that every pair of Lusztig root vectors can be naturally associated to a triple (u,i,j)(u, i, j), where uWu \in W and ii and jj are indices such that (siusj)=(u)2\ell(s_i u s_j) = \ell(u) - 2. In light of this, we define an equivalence relation, based upon the weak left and weak right Bruhat orders, on the set of such triples. We show this equivalence relation respects nilpotency indices, and that each equivalence class contains an element of the form (v,r,s)(v, r, s), where vv is either (1) a bigrassmannian element satisfying a certain orthogonality condition, or (2) the longest element of some subgroup of WW generated by two simple reflections. For each such (v,r,s)(v, r, s), we compute the associated nilpotency index.

Cite

@article{arxiv.2409.13883,
  title  = {Nilpotency indices for quantum Schubert cell algebras},
  author = {Garrett Johnson and Hayk Melikyan},
  journal= {arXiv preprint arXiv:2409.13883},
  year   = {2024}
}

Comments

97 pages

R2 v1 2026-06-28T18:51:58.641Z