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arxiv 1404.6507 v2 pith:7JMZSAKB submitted 2014-04-25 hep-th math-phmath.MP

On Lie Groups and Toda Lattices

classification hep-th math-phmath.MP
keywords casecorrespondingpoissontodaa-seriesaffinebeyondchains
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We extend the construction of the relativistic Toda chains as integrable systems on the Poisson submanifolds in Lie groups beyond the case of A-series. For the simply-laced case this is just a direct generalization of the well-known relativistic Toda chains, and we construct explicitly the set of the Ad-invariant integrals of motion on symplectic leaves, which can be described by the Poisson quivers being just the blown up Dynkin diagrams. We also demonstrate how to get the set of "minimal" integrals of motion, using the co-multiplication rules for the corresponding Lie algebras. In the non simply-laced case the corresponding Bogoyavlensky-Coxeter-Toda systems are constructed using the Fock-Goncharov folding of the corresponding Poisson submanifolds. We discuss also how this procedure can be extended for the affine case beyond A-series, and consider explicitly an example from the affine D-series.

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  1. Dimers for Relativistic Toda Models with Reflective Boundaries

    hep-th 2025-10 unverdicted novelty 7.0

    Dimer graphs are constructed for relativistic Toda chains of listed Lie algebra types, and Seiberg-Witten curves of 5d N=1 pure SYM for group G are identified as spectral curves of the dual Toda chain for G^vee.