Homoclinic solutions for eventually autonomous high-dimensional Hamiltonian systems

Holmes and Stuart [Z. Angew. Math. Phys. 43 (1992) 598-625] have investigated homoclinic solutions for eventually autonomous planar flows by analysing the geometry of the stable and unstable manifolds. We extend their discussion to higher-dimensional systems of Hamiltonian type by formulating the problem as the existence of intersection points of two Lagrangian manifolds. Their various assumptions can be restated and interpreted as ensuring some complexity of the generating function of one of the Lagrangian manifold with respect to symplectic coordinates that trivialise the second Lagrangian manifold. The critical points thus obtained correspond to homoclinic solutions. The main new feature in high-dimensions is that twice as many homoclinic solutions are found as for planar flows, in analogy with results obtained for autonomous Lagrangian systems by Ambrosetti and Coti Zelati [Rend. Sem. Mat. Univ. Padova 89 (1993) 177-194].     

Homoclinic solutions for a class of second-order Hamiltonian systems

A new result for existence of homoclinic orbits is obtained for the second-order Hamiltonian systems , where t∈R, u∈Rn and W₁,W₂∈C¹(R×Rn,R) and f∈C(R,Rn) are not necessary periodic in t. This result generalizes and improves some existing results in the literature.     

二阶渐近周期奇异哈密顿系统同宿轨道

运用集中紧性方法和Ekeland变分原理研究R^2中二阶渐近周期奇异Hamilton系统ue (1 g(t))V‘u(t,u)=0的极小问题，并证明该系统具有两条非平凡同宿轨道。     

Homoclinic orbits for an infinite dimensional Hamiltonian system with periodic potential

In this paper, we study the following diffusion system where $z:(u,v):\mathbb{R}\times\mathbb{R}^{N}\rightarrow\mathbb{R}^{2}$ , $V(x)\in C(\mathbb{R}^{N},\mathbb{R})$ is a general periodic function, g(t,x,v), f(t,x,u) are periodic in t,x and superquadratic in v,u at infinity. By using much more direct methods to prove all Cerami sequences for the energy functional are bounded and establish the existence of homoclinic orbits, which are ground state solutions for above system.     

Homoclinic orbits for a nonperiodic Hamiltonian system

In this paper we prove the existence and multiplicity of homoclinic orbits for first order Hamiltonian systems of the form

     

Homoclinic solutions for a class of second order Hamiltonian systems

In this paper, we study homoclinic solutions for the nonperiodic second order Hamiltonian systems where L is unnecessarily coercive or uniformly positively definite, and is only locally defined near the origin with respect to u. Under some general conditions on L and W, we show that the above system has infinitely many homoclinic solutions near the origin. Some related results in the literature are extended and generalized.     

Homoclinic solutions for a class of asymptotically quadratic Hamiltonian systems

In this paper we are devoted to considering the existence of homoclinic solutions for some second order non-autonomous Hamiltonian systems with the asymptotically quadratic potential at infinity. The proof is based on a variant version of the Mountain Pass Theorem. Recent results in the literature are generalized and significantly improved.     

Homoclinic solutions for a class of subquadratic second-order Hamiltonian systems

In this paper, we study the existence of infinitely many homoclinic solutions for a class of subquadratic second-order Hamiltonian systems. By using the variant fountain theorem, we obtain a new criterion for guaranteeing that second-order Hamiltonian systems has infinitely many homoclinic solutions. Recent results from the literature are generalized and significantly improved. An example is also given in this paper to illustrate our main results.     

Homoclinic solutions for a class of non-autonomous subquadratic second-order Hamiltonian systems

In this paper we consider the existence of homoclinic solutions for the following second-order non-autonomous Hamiltonian system:

(HS)     

Homoclinic solutions for a class of second order discrete Hamiltonian systems

Consider the second order discrete Hamiltonian systems Δ2u(n-1)-L(n)u(n) + ▽W (n, u(n)) = f(n),where n ∈ Z, u ∈ RN and W : Z × RN → R and f : Z → RN are not necessarily periodic in n. Under some comparatively general assumptions on L, W and f , we establish results on the existence of homoclinic orbits. The obtained results successfully generalize those for the scalar case.     

Homoclinic solutions for a class of the second order Hamiltonian systems

We study the existence of homoclinic orbits for the second order Hamiltonian system , where q∈Rⁿ and V∈C¹(R×Rⁿ,R), V(t,q)=-K(t,q)+W(t,q) is T-periodic in t. A map K satisfies the “pinching” condition b₁|q|²?K(t,q)?b₂|q|², W is superlinear at the infinity and f is sufficiently small in L²(R,Rⁿ). A homoclinic orbit is obtained as a limit of 2kT-periodic solutions of a certain sequence of the second order differential equations.     

Homoclinic solutions for nonautonomous second-order Hamiltonian systems with a coercive potential

A new existence result of homoclinic orbits is obtained for the second-order Hamiltonian systems , where F(t,x) is periodic with respect to t. This result generalizes some known results in the literature.