Existence of homoclinic orbits for second order Hamiltonian systems without (AR) condition

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.

This paper deals with the existence of homoclinic solutions for the following second order non-autonomous Hamiltonian system where is not globally superquadratic on q and some additionally reasonable assumptions, we give a new existence result to guarantee that (HS) has a homoclinic solution q(t)

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