Homoclinic Orbits on Invariant Manifolds of a Functional Differential Equation

We construct an invariant manifold of periodic orbits for a class of non-linear Schro dinger equations. Using standard ideas of the theory of center manifolds, we rederive the results of Soffer and Weinstein (Comm. Math. Phys. 133, 119 146 (1997); J. Differential Equations 98, 376 390 (1992)) on the

In this paper, we consider a general autonomous functional differential equation having a local center manifold. Then, we give an algorithmic procedure to compute the terms in the Taylor expansion of this manifold up to any order.

This work addresses a computational algorithm of terms of a center manifold for neutral functional differential equations. The Bogdanov᎐Takens and the Hopf singularities are considered. Finally, as an illustration of our scheme, we give an example where the second term of a center manifold is explic

A sufficient and necessary condition for a planar critical point to be isolated as an invariant set is given. Using the concept of an isolated invariant set, some existence criteria of orbits connecting two critical points bifurcating from a single critical point for planar differential equations de