Maximal green sequences for $\mathcal{Q}^N$ quivers
Commutative Algebra
2025-01-15 v1
Abstract
We introduce quivers and construct maximal green sequences for these quivers. We prove that any finite connected full subquiver of the quivers defined by Hernandez and Leclerc, arising in monoidal categorifications of cluster algebras, is a special case of quivers. Moreover, we prove that the trees of oriented cycles introduced by Garver and Musiker are special cases of quivers. This result resolves an open problem proposed by Garver and Musiker, providing a construction of maximal green sequences for quivers that are trees of oriented cycles. Furthermore, we prove that quivers that are mutation equivalent to an orientation of a type AD Dynkin diagram can also be recognized as special cases of quivers.
Keywords
Cite
@article{arxiv.2501.08175,
title = {Maximal green sequences for $\mathcal{Q}^N$ quivers},
author = {Jingmin Guo and Bing Duan and Yanfeng Luo},
journal= {arXiv preprint arXiv:2501.08175},
year = {2025}
}