Categorical braid group actions and cactus groups
Abstract
Let be a semisimple simply-laced Lie algebra of finite type. Let be an abelian categorical representation of the quantum group categorifying an integrable representation . The Artin braid group of acts on by Rickard complexes, providing a triangulated equivalence , where is a weight of and is a positive lift of the longest element of the Weyl group. We prove that this equivalence is t-exact up to shift when is isotypic, generalising a fundamental result of Chuang and Rouquier in the case . For general , we prove that is a perverse equivalence with respect to a Jordan-H\"older filtration of . Using these results we construct, from the action of on , an action of the cactus group on the crystal of . This recovers the cactus group action on 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