Cluster algebra structure on the finite dimensional representations of affine quantum group Uq(Â3)

doi:10.1088/1674-1056/24/1/010201

Abstract In this paper, we prove one case of conjecture given by Hernandez and Leclerc. We give a cluster algebra structure on the Grothendieck ring of a full subcategory of the finite dimensional representations of affine quantum group U_q(Â₃). As a conclusion, for every exchange relation of cluster algebra, there exists an exact sequence of the full subcategory corresponding to it.

Keywords: affine quantum group cluster algebra monoidal categorification

Received: 20 May 2014
Revised: 19 August 2014
Accepted manuscript online:

PACS:	02.20.Uw	(Quantum groups)
	02.10.Hh	(Rings and algebras)
	03.65.Fd	(Algebraic methods)

Fund: Project supported by the National Natural Science Foundation of China (Grant No. 11475178).

Corresponding Authors: Zheng Zhu-Jun
E-mail: zhengzj@scut.edu.cn

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Yang Yan-Min (杨彦敏), Ma Hai-Tao (马海涛), Lin Bing-Sheng (林冰生), Zheng Zhu-Jun (郑驻军) Cluster algebra structure on the finite dimensional representations of affine quantum group U_q(Â₃) 2015 Chin. Phys. B 24 010201

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Cluster algebra structure on the finite dimensional representations of affine quantum group Uq(Â3)

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Cluster algebra structure on the finite dimensional representations of affine quantum group U_q(Â₃)