# $(q,t)$-characters of Kirillov-Reshetikhin modules of type $A_r$ as   quantum cluster variables

**Authors:** Bolor Turmunkh

arXiv: 1705.10026 · 2018-07-04

## TL;DR

This paper demonstrates that Nakajima's $t$-deformed $T$-system for type $A_r$ corresponds to a quantum mutation relation within a specific quantized cluster algebra structure, linking geometric and algebraic frameworks.

## Contribution

It establishes a precise connection between Nakajima's $t$-deformed $T$-system and quantum cluster algebra mutations for type $A_r$, clarifying their algebraic structure.

## Key findings

- The $t$-deformed $T$-system satisfies a quantum mutation relation.
- This relation is realized in a specific quantization of cluster algebra structures.
- The work links geometric $t$-deformations with algebraic quantum cluster theory.

## Abstract

Nakajima introduced a $t$-deformation of $q$-characters, $(q,t)$-characters for short, and their twisted multiplication through the geometry of quiver varieties. The Nakajima $(q,t)$-characters of Kirillov-Reshetikhin modules satisfy a $t$-deformed $T$-system. The $T$-system is a discrete dynamical system that can be interpreted as a mutation relation in a cluster algebra in two different ways, depending on the choice of direction of evolution. In this paper, we show that the Nakajima $t$-deformed $T$-system of type $A_r$ forms a quantum mutation relation in a quantization of exactly one of the cluster algebra structures attached to the $T$-system.

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Source: https://tomesphere.com/paper/1705.10026