Spectral curve, Darboux coordinates and Hamiltonian structure of periodic dressing chains

Abstract

A chain of one-dimensional Schr\"odinger operators connected by successive Darboux transformations is called the ``Darboux chain'' or ``dressing chain''. The periodic dressing chain with period N has a control parameter α. If α = 0, the N-periodic dressing chain may be thought of as a generalization of the fourth or fifth (depending on the parity of N) Painlev\'e equations . The N-periodic dressing chain has two different Lax representations due to Adler and to Noumi and Yamada. Adler's 2 × 2 Lax pair can be used to construct a transition matrix around the periodic lattice. One can thereby define an associated ``spectral curve'' and a set of Darboux coordinates called ``spectral Darboux coordinates''. The equations of motion of the dressing chain can be converted to a Hamiltonian system in these Darboux coordinates. The symplectic structure of this Hamiltonian formalism turns out to be consistent with a Poisson structure previously studied by Veselov, Shabat, Noumi and Yamada.

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