Universal quivers

Sergey Fomin; Kiyoshi Igusa; Kyungyong Lee

doi:10.5802/alco.175

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Universal quivers

Sergey Fomin, Kiyoshi Igusa and Kyungyong Lee

Algebraic combinatorics, Vol.4(4), pp.683-702

09/02/2021

DOI: https://doi.org/10.5802/alco.175

Abstract

Quiver mutation

Universal quiver

Cluster algebra

We show that for any positive integer n, there exists a quiver Q with O(n2) vertices and O(n2) edges such that any quiver on n vertices is a full subquiver of a quiver mutation equivalent to Q. We generalize this statement to skew-symmetrizable matrices, and obtain other related results.

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Title: Universal quivers
Creators: Sergey Fomin
Kiyoshi Igusa - Brandeis University, Department of Mathematics
Kyungyong Lee
Publication Details: Algebraic combinatorics, Vol.4(4), pp.683-702
Publisher: Cellule MathDoc/CEDRAM
Identifiers: 9924148966301921
Academic Unit: Department of Mathematics
Language: English
Resource Type: Journal article

Universal quivers

Abstract

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