Toda systems for Takiff algebras

Abstract

We study completely integrable systems attached to Takiff algebras gN, extending open Toda systems of split simple Lie algebras g. With respect to Darboux coordinates on coadjoint orbits O, the potentials of the hamiltonians are products of polynomial and exponential functions. General solutions for equations of motion for gN are obtained using differential operators called jet transformations. These results are applied to a 3-body problem based on sl(2), and to an extension of soliton solutions for A∞ to associated Takiff algebras. The new classical integrable systems are then lifted to families of commuting operators in an enveloping algebra, solving a Vinberg problem and quantizing the Poisson algebra of functions on O.

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