On exchange matrices from string diagrams
Abstract
Inspired by Fock-Goncharov's amalgamation procedure \cite{Fock-Goncharov-2006}, Shen-Weng introduced string diagrams in \cite{Shen-Weng-2021}, which are very useful to describe many interesting skew-symmetrizable matrices closely related with Lie theory. In this paper, we prove that the skew-symmetrizable matrices from string diagrams are in the smallest class of skew-symmetrizable matrices containing the zero matrix and closed under mutations and source-sink extensions. This result applies to the exchange matrices of cluster algebras from double Bruhat cells, unipotent cells, double Bott-Samelson cells and so on. Our main result can be used to explain why many skew-symmetrizable matrices from Lie theory have reddening sequences. It can be also used to prove some interesting results regarding non-degenerate potentials on many quivers from Lie theory.
Cite
@article{arxiv.2203.07822,
title = {On exchange matrices from string diagrams},
author = {Peigen Cao},
journal= {arXiv preprint arXiv:2203.07822},
year = {2022}
}
Comments
17 pages. Version 2: Minor changes and Example 3.6 added