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Cluster variables for affine Lie--Poisson systems

Mathematical Physics 2020-12-22 v1 High Energy Physics - Theory math.MP Quantum Algebra

Abstract

We show that having any planar (cyclic or acyclic) directed network on a disc with the only condition that all n1+mn_1+m sources are separated from all n2+mn_2+m sinks, we can construct a cluster-algebra realization of elements of an affine Lie--Poisson algebra R(λ,μ)T1(λ)T2(μ)=T2(μ)T1(λ)R(λ,μ)R(\lambda,\mu)T^{1}(\lambda)T^{2}(\mu)=T^{2}(\mu)T^{1}(\lambda)R(\lambda,\mu) with (n1×n2)(n_1\times n_2)-matrices T(λ)T(\lambda) corresponding to a planar directed network on an annulus. Upon satisfaction of some invertibility conditions, we can extend this construction to realizations of a quantum loop algebra. Having the quantum loop algebra we can also construct a realization of the twisted Yangian algebra, or that of the quantum reflection equation. Every such planar network therefore corresponds to a symplectic leaf of the corresponding infinite-dimensional algebra.

Keywords

Cite

@article{arxiv.2012.10982,
  title  = {Cluster variables for affine Lie--Poisson systems},
  author = {Leonid O. Chekhov},
  journal= {arXiv preprint arXiv:2012.10982},
  year   = {2020}
}

Comments

17 pages, 4 figures

R2 v1 2026-06-23T21:06:38.977Z