Generalized Toda mechanics associated with classical Lie algebras and their reductions
Abstract
For any classical Lie algebra g, we construct a family of integrable generalizations of Toda mechanics labeled a pair of ordered integers (m,n). The universal form of the Lax pair, equations of motion, Hamiltonian as well as Poisson brackets are provided, and explicit examples for g=Br,Cr,Dr with m,n≤3 are also given. For all m,n, it is shown that the dynamics of the (m,n-1)- and the (m-1,n)-Toda chains are natural reductions of that of the (m,n)-chain, and for m=n, there is also a family of symmetrically reduced Toda systems, the (m,m)Sym-Toda systems, which are also integrable. In the quantum case, all (m,n)-Toda systems with m>1 or n>1 describe the dynamics of standard Toda variables coupled to noncommutative variables. Except for the symmetrically reduced cases, the integrability for all (m,n)-Toda systems survive after quantization.
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