# Hall algebras and quantum symmetric pairs II: reflection functors

**Authors:** Ming Lu, Weiqiang Wang

arXiv: 1904.01621 · 2021-05-26

## TL;DR

This paper develops reflection functors for $	extit{i}$Hall algebras linked to quantum symmetric pairs, establishing symmetries and automorphisms that relate to braid group relations and aid in constructing bases for $	extit{i}$quantum groups.

## Contribution

It introduces BGP type reflection functors for $	extit{i}$Hall algebras, leading to new symmetries and automorphisms of $	extit{i}$quantum groups, and provides a framework for constructing bases in ADE types.

## Key findings

- Reflection functors induce isomorphisms of $	extit{i}$Hall algebras.
- Symmetries satisfy braid group relations.
- Framework for $q$-root vectors and PBW bases.

## Abstract

Recently the authors initiated an $\imath$Hall algebra approach to (universal) $\imath$quantum groups arising from quantum symmetric pairs. In this paper we construct and study BGP type reflection functors which lead to isomorphisms of the $\imath$Hall algebras associated to acyclic $\imath$quivers. For Dynkin quivers, these symmetries on $\imath$Hall algebras induce automorphisms of universal $\imath$quantum groups, which are shown to satisfy the braid group relations associated to the restricted Weyl group of a symmetric pair; conjecturally these continue to hold for acyclic quivers/Kac-Moody setting. This leads to a conceptual construction of $q$-root vectors and PBW bases for (universal) quasi-split $\imath$quantum groups of ADE type.

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Source: https://tomesphere.com/paper/1904.01621