English

Cluster algebras and snake modules

Quantum Algebra 2018-11-05 v4

Abstract

Snake modules introduced by Mukhin and Young form a family of modules of quantum affine algebras. The aim of this paper is to prove that the Hernandez-Leclerc conjecture about monoidal categorifications of cluster algebras is true for prime snake modules of types AnA_{n} and BnB_{n}. We prove that prime snake modules are real. We introduce SS-systems consisting of equations satisfied by the qq-characters of prime snake modules of types AnA_{n} and BnB_{n}. Moreover, we show that every equation in the SS-system of type AnA_n (respectively, BnB_n) corresponds to a mutation in the cluster algebra A\mathscr{A} (respectively, A\mathscr{A}') constructed by Hernandez and Leclerc and every prime snake module of type AnA_n (respectively, BnB_n) corresponds to some cluster variable in A\mathscr{A} (respectively, A\mathscr{A}'). In particular, this proves that the Hernandez-Leclerc conjecture is true for all prime snake modules of types AnA_{n} and BnB_{n}.

Keywords

Cite

@article{arxiv.1508.03467,
  title  = {Cluster algebras and snake modules},
  author = {Bing Duan and Jian-Rong Li and Yan-Feng Luo},
  journal= {arXiv preprint arXiv:1508.03467},
  year   = {2018}
}
R2 v1 2026-06-22T10:33:41.500Z