Homoclinic Orbits for a Quasi-Linear Hamiltonian System

We study the existence of homoclinic orbits for first order time-dependent Hamiltonian systems z ˙=JH z (z, t), where H(z, t) depends periodically on t and H z (z, t) is asymptotically linear in z as |z| Q .. We also consider an asymptotically linear Schrödinger equation in R N .

We study the existence of even homoclinic orbits for the second-order Hamiltonian system ü+V u (t, u) = 0. Let V(t, u) = -K(t, u)+W(t, u) ∈ C 1 (R×R n , R), where K is less quadratic and W is super quadratic in u at infinity. Since the system we considered is neither autonomous nor periodic, the (PS

## RN \_ S ª R has a unique strict global maximum at a point p g R N and a singular Under some compactness conditions on V at 1 infinity and around the singular set S we study the existence of homoclinic orbits to p which link with S. When V and G satisfy suitable geometrical conditions, we can p