# Rewriting modulo isotopies in Khovanov-Lauda-Rouquier's categorification   of quantum groups

**Authors:** Benjamin Dupont

arXiv: 1907.09901 · 2019-07-24

## TL;DR

This paper employs algebraic rewriting techniques to verify the structure of a 2-categorification of quantum groups, confirming conjectured bases and establishing the non-degeneracy of the diagrammatic calculus.

## Contribution

It introduces a computational rewriting approach to validate the bases and non-degeneracy in Khovanov-Lauda-Rouquier's categorification of quantum groups, confirming conjectures.

## Key findings

- Confirmed conjectured bases for 2-cells in the 2-category.
- Proved non-degeneracy of the diagrammatic calculus.
- Established the 2-category as a valid categorification of quantum groups.

## Abstract

We study a presentation of Khovanov - Lauda - Rouquier's candidate $2$-categorification of a quantum group using algebraic rewriting methods. We use a computational approach based on rewriting modulo the isotopy axioms of its pivotal structure to compute a family of linear bases for all the vector spaces of $2$-cells in this $2$-category. We show that these bases correspond to Khovanov and Lauda's conjectured generating sets, proving the non-degeneracy of their diagrammatic calculus. This implies that this $2$-category is a categorification of Lusztig's idempotent and integral quantum group $\bf{U}_{q}(\mathfrak{g})$ associated to a symmetrizable simply-laced Kac-Moody algebra $\mathfrak{g}$.

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Source: https://tomesphere.com/paper/1907.09901