English

Categorical braid group actions and cactus groups

Representation Theory 2023-06-16 v3 Category Theory Quantum Algebra

Abstract

Let g\mathfrak{g} be a semisimple simply-laced Lie algebra of finite type. Let C\mathcal{C} be an abelian categorical representation of the quantum group Uq(g)U_q(\mathfrak{g}) categorifying an integrable representation VV. The Artin braid group BB of g\mathfrak{g} acts on Db(C)D^b(\mathcal{C}) by Rickard complexes, providing a triangulated equivalence Θw0:Db(Cμ)Db(Cw0(μ))\Theta_{w_0}:D^b(\mathcal{C}_\mu) \to D^b(\mathcal{C}_{w_0(\mu)}), where μ\mu is a weight of VV and Θw0\Theta_{w_0} is a positive lift of the longest element of the Weyl group. We prove that this equivalence is t-exact up to shift when VV is isotypic, generalising a fundamental result of Chuang and Rouquier in the case g=sl2\mathfrak{g}=\mathfrak{sl}_2. For general VV, we prove that Θw0\Theta_{w_0} is a perverse equivalence with respect to a Jordan-H\"older filtration of C\mathcal{C}. Using these results we construct, from the action of BB on VV, an action of the cactus group on the crystal of VV. This recovers the cactus group action on VV defined via generalised Sch\"utzenberger involutions, and provides a new connection between categorical representation theory and crystal bases. We also use these results to give new proofs of theorems of Berenstein-Zelevinsky, Rhoades, and Stembridge regarding the action of symmetric group on the Kazhdan-Lusztig basis of its Specht modules.

Keywords

Cite

@article{arxiv.2101.05931,
  title  = {Categorical braid group actions and cactus groups},
  author = {Iva Halacheva and Anthony Licata and Ivan Losev and Oded Yacobi},
  journal= {arXiv preprint arXiv:2101.05931},
  year   = {2023}
}

Comments

v3: 26 pages, fixed a mistake in Theorem 3.6. v2: 26 pages, revision based on referee comments. v1: 23 pages

R2 v1 2026-06-23T22:11:22.775Z