Invariant manifolds with asymptotic phase

For autonomous difference equations with an invariant manifold, conditions are known which guarantee that a solution approaching this manifold eventually behaves like a solution on this manifold. In this paper, we extend the fundamental result in this context to difference equations which are nonaut

We introduce the notion of h, k manifolds and give conditions under which the property of being a manifold with asymptotic phase holds. These conditions allow the construction of a transformation of the variational equation of a nonlinear Ž . nonautonomous systems with h, k dichotomies, into an almo

Several additional possibilities of the Routh-Lyapunov method for isolating and analysing the stationarity sets of dynamical systems admitting of smooth first integrals are discussed. A procedure is proposed for isolating these sets together with the first integrals corresponding to the vector field

We describe the spectrum of the Laplacian on a manifold with asymptotically cusp ends and find asymptotics of a corresponding spectral shift function. Here the spectral shift function is the difference of the eigenvalue counting function and the scattering phase.