Homoclinic orbits for first order hamiltonian systems possessing super-quadratic potentials

We study the existence of infinitely many homoclinic orbits for some second-order Hamiltonian systems: ü -L(t)u(t) + ∇ F(t, u(t)) = 0, ∀t ∈ R, by the variant fountain Theorem, where F(t, u) satisfies the super-quadratic condition F(t, u)/|u| 2 → ∞ as |u| → ∞ uniformly in t, and need not satisfy the

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

Some existence theorems for even homoclinic orbits are obtained for a class of second-order nonautonomous Hamiltonian systems with symmetric potentials under a class of new superquadratic conditions. A homoclinic orbit is obtained as a limit of solutions of a certain sequence of nil-boundary-value p

In this paper, the existence of homoclinic orbits for the second-order Hamiltonian systems without periodicity is studied and infinitely many homoclinic orbits for both superlinear and asymptotically linear cases are obtained.