AbstractThis paper is concerned with the following Hamiltonian elliptic system{−Δu+b(x)⋅∇u+V(x)u=Hv(x,u,v),−Δv−b(x)⋅∇v+V(x)v=Hu(x,u,v) for x∈RN. Existence and multiplicity of solutions are obtained for the systems with periodic or non-periodic potentials V via variational methods
We deal with the quasi-periodic solutions of the following second-order Hamiltonian systems x¨(t)=∇F...
We study the minimal period problem of Hamiltonian systems which may not be strictly convex. For the...
We analytically study the Hamiltonian system in R4 with Hamiltonian H = 1 2 p2 x +p2 y + 1 ...
AbstractThis paper is concerned with the following nonperiodic Hamiltonian elliptic system{−△u+V(x)u...
This paper is concerned with the following periodic Hamiltonian elliptic system $ \{ -\Delta \var...
In the present paper, we consider the following Hamiltonian elliptic system HES: -Δu+bx·∇u+Vxu=Hvx,u...
In this paper, we study the existence of periodic solutions of hamiltonian systems: x ̇ = J H ′(t, ...
0. Introduction and results In this short note, we study the existence of periodic solutions of a Ha...
[[abstract]]This article deals with second order periodic Hamiltonian systems. We apply variational ...
In this paper we present some recent multiplicity results for a class of second order Hamiltonian sy...
The existence of at least one nontrivial periodic solution for a class of second order Hamiltonian s...
Under an appropriate oscillating behavior of the nonlinear term, the existence of infinitely many pe...
We consider a potential W: ℝ m → ℝ with two different global minima a - , a + and, under a symmetry ...
AbstractWe study the existence of ground state solutions for the following elliptic systems in RN{−Δ...
2 This work is concerned with the study of existence and multiplicity of periodic solutions of Hamil...
We deal with the quasi-periodic solutions of the following second-order Hamiltonian systems x¨(t)=∇F...
We study the minimal period problem of Hamiltonian systems which may not be strictly convex. For the...
We analytically study the Hamiltonian system in R4 with Hamiltonian H = 1 2 p2 x +p2 y + 1 ...
AbstractThis paper is concerned with the following nonperiodic Hamiltonian elliptic system{−△u+V(x)u...
This paper is concerned with the following periodic Hamiltonian elliptic system $ \{ -\Delta \var...
In the present paper, we consider the following Hamiltonian elliptic system HES: -Δu+bx·∇u+Vxu=Hvx,u...
In this paper, we study the existence of periodic solutions of hamiltonian systems: x ̇ = J H ′(t, ...
0. Introduction and results In this short note, we study the existence of periodic solutions of a Ha...
[[abstract]]This article deals with second order periodic Hamiltonian systems. We apply variational ...
In this paper we present some recent multiplicity results for a class of second order Hamiltonian sy...
The existence of at least one nontrivial periodic solution for a class of second order Hamiltonian s...
Under an appropriate oscillating behavior of the nonlinear term, the existence of infinitely many pe...
We consider a potential W: ℝ m → ℝ with two different global minima a - , a + and, under a symmetry ...
AbstractWe study the existence of ground state solutions for the following elliptic systems in RN{−Δ...
2 This work is concerned with the study of existence and multiplicity of periodic solutions of Hamil...
We deal with the quasi-periodic solutions of the following second-order Hamiltonian systems x¨(t)=∇F...
We study the minimal period problem of Hamiltonian systems which may not be strictly convex. For the...
We analytically study the Hamiltonian system in R4 with Hamiltonian H = 1 2 p2 x +p2 y + 1 ...
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