Universal Lax pairs for Spin Calogero-Moser Models and Spin Exchange Models
Abstract
For any root system and an irreducible representation R of the reflection (Weyl) group G generated by , a spin Calogero-Moser model can be defined for each of the potentials: rational, hyperbolic, trigonometric and elliptic. For each member μ of R, to be called a "site", we associate a vector space Vμ whose element is called a "spin". Its dynamical variables are the canonical coordinates \qj,pj\ of a particle in Rr, (r= rank of ), and spin exchange operators \ P\ (∈) which exchange the spins at the sites μ and s(μ). Here s is the reflection generated by . For each and R a spin exchange model can be defined. The Hamiltonian of a spin exchange model is a linear combination of the spin exchange operators only. It is obtained by "freezing" the canonical variables at the equilibrium point of the corresponding classical Calogero-Moser model. For =Ar and R= vector representation it reduces to the well-known Haldane-Shastry model. Universal Lax pair operators for both spin Calogero-Moser models and spin exchange models are presented which enable us to construct as many conserved quantities as the number of sites for degenerate potentials.
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