Super lattice integrated catalysts

We prove that the classical, non-periodic Toda lattice is super-integrable. In other words, we show that it possesses 2N À 1 independent constants of motion, where N is the number of degrees of freedom. The main ingredient of the proof is the use of some special action-angle coordinates introduced b

a b s t r a c t Two Lie super algebras are constructed from which we establish two super-isospectral problems. Under the frame of the zero curvature equations, the super-GJ hierarchy and the super-Yang hierarchy are presented respectively. Meanwhile, their super-Hamiltonian structures are obtained b

A lattice L with a positive definite quadratic form is called reflective if the Ž . unique largest subgroup generated by reflections of the orthogonal group O L has Ž . no fixed vector. Equivalently, the ''root system'' R L has maximal rank. The root system of a lattice is defined in Section 1; the