Regularization of Toda lattices by Hamiltonian reduction
Abstract
The Toda lattice defined by the Hamiltonian H=1 2 Σi=1n pi2 + Σi=1n-1 i eqi-qi+1 with i∈ \ 1\, which exhibits singular (blowing up) solutions if some of the i=-1, can be viewed as the reduced system following from a symmetry reduction of a subsystem of the free particle moving on the group G=SL(n, ). The subsystem is T*Ge, where Ge=N+ A N- consists of the determinant one matrices with positive principal minors, and the reduction is based on the maximal nilpotent group N+ × N-. Using the Bruhat decomposition we show that the full reduced system obtained from T*G, which is perfectly regular, contains 2n-1 Toda lattices. More precisely, if n is odd the reduced system contains all the possible Toda lattices having different signs for the i. If n is even, there exist two non-isomorphic reduced systems with different constituent Toda lattices. The Toda lattices occupy non-intersecting open submanifolds in the reduced phase space, wherein they are regularized by being glued together. We find a model of the reduced phase space as a hypersurface in 2n-1. If i=1 for all i, we prove for n=2,3,4 that the Toda phase space associated with T*Ge is a connected component of this hypersurface. The generalization of the construction for the other simple Lie groups is also presented.
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