CONDITIONS ON THE EXISTENCE OF LOCALIZED EXCITATIONS IN NONLINEAR DISCRETE-SYSTEMS

We use recent results that localized excitations in nonlinear Hamiltonian lattices can be viewed and described as multiple-frequency excitations. Their dynamics in phase space takes place on tori of corresponding dimension. For a one-dimensional Hamiltonian lattice with nearest neighbor interaction we transform the problem of solving the coupled differential equations of motion into a certain mapping M(l+1) = F(M(l),M(l-1)), where M(l) for every l (lattice site) is a function defined on an infinite discrete space of the same dimension as the torus. We consider this mapping in the ''tails'' of the localized excitation, i.e., for l --> +/-infinity. For a generic Hamiltonian lattice the thus-linearized mapping is analyzed. We find conditions of existence of periodic (one-frequency) localized excitations as well as of multiple-frequency excitations. The symmetries of the solutions are obtained. As a result we find that the existence of localized excitations can be a generic property of nonlinear Hamiltonian lattices in contrast to nonlinear Hamiltonian fields.