sl(N) Onsager's Algebra and Integrability

Abstract

We define an sl(N) analog of Onsager's Algebra through a finite set of relations that generalize the Dolan Grady defining relations for the original Onsager's Algebra. This infinite-dimensional Lie Algebra is shown to be isomorphic to a fixed point subalgebra of sl(N) Loop Algebra with respect to a certain involution. As the consequence of the generalized Dolan Grady relations a Hamiltonian linear in the generators of sl(N) Onsager's Algebra is shown to posses an infinite number of mutually commuting integrals of motion.

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