Integrable Systems and Topology of Isospectral Manifolds

Abstract

The well known Liouville-Arnold theorem says that if a level surface of integrals of an integrable system is compact and connected, then it is a torus. However, in some important examples of integrable systems the topology of a level surface of integrals is quite complicated. This is due to the fact that in these examples the phase space has points where either the Hamiltonian is singular or the symplectic form is singular or degenerate. In such situations the Liouville-Arnold theorem does not apply. However, sometimes it is possible to define the corresponding flow on the whole level surface of integrals and use this flow to investigate the topology. Tomei (1982) and Fried (1986) used the Toda lattice to study the topology of the isospectral variety of Jacobi matrices. We recall these results and we also expose new results concerning the topology of the isospectral variety of zero-diagonal Jacobi matrices. This topology is studied using the Volterra system.