# Cluster algebras of finite type via a Coxeter element and Demazure   Crystals of type A

**Authors:** Yuki Kanakubo, Toshiki Nakashima

arXiv: 1703.08323 · 2017-04-12

## TL;DR

This paper explicitly describes all cluster variables in a finite-type cluster algebra associated with a double Bruhat cell in SL(r+1,C), using categorification and Demazure crystals.

## Contribution

It provides explicit formulas for cluster variables in a finite cluster algebra of type A via categorification and crystal bases, connecting algebraic and combinatorial structures.

## Key findings

- Explicit forms of all cluster variables in the algebra
- Connection between cluster variables and Demazure crystals
- Categorification approach for finite-type cluster algebras

## Abstract

Let $G$ be a simply connected simple algebraic group over $\mathbb{C}$, $B$ and $B_-$ be its two opposite Borel subgroups. For two elements $u$, $v$ of the Weyl group $W$, it is known that the coordinate ring ${\mathbb C}[G^{u,v}]$ of the double Bruhat cell $G^{u,v}=BuB\cap B_-vB_-$ is isomorphic to a cluster algebra $\mathcal{A}(\textbf{i})_{{\mathbb C}}$ [arXiv:math/0305434, arXiv:1602.00498]. In the case $u=e$, $v=c^2$ ($c$ is a Coxeter element), the algebra ${\mathbb C}[G^{e,c^2}]$ has only finitely many cluster variables. In this article, for $G={\rm SL}_{r+1}(\mathbb{C})$, we obtain explicit forms of all the cluster variables in $\mathbb{C}[G^{e,c^2}]$ by considering its additive categorification via preprojective algebras, and describe them in terms of monomial realizations of Demazure crystals.

## Full text

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## References

21 references — full list in the complete paper: https://tomesphere.com/paper/1703.08323/full.md

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Source: https://tomesphere.com/paper/1703.08323