Quasi-periodic solutions of the negative-order Jaulent-Miodek hierarchy

A uniform construction of quasi-periodic solutions to the negative-order Jaulent-Miodek (nJM) hierarchy is presented by using a family of backward Neumann type systems. From the backward Lenard gradients, the nJM hierarchy is put into the zero-curvature setting and the bi-Hamiltonian structure displaying its integrability. The nonlinearization of Lax pair is generalized to the nJM hierarchy such that it can be reduced to a sequence of backward Neumann type systems, whose involutive solutions yield finite parametric solutions of the nJM hierarchy. The negative N-order stationary JM equation is given to specify a finite-dimensional invariant subspace for the nJM flows. With a spectral curve determined by the Lax matrix, the nJM flows are linearized on the Jacobi variety of a Riemann surface. Finally, the Riemann-Jacobi inversion is applied to Abel-Jacobi solutions of the nJM flows, by which some quasi-periodic solutions are obtained for the nJM hierarchy.