AbstractThis paper proves a multiplicity result for the minimal periodic solutions of Hamiltonian system x˙(t)=J∇H(x(t)) under a superquadratic hypothesis on H weaker than the Ambrosetti–Rabinowitz-type condition. We also define a class of homogeneous functions, that are more general than the classical ones, and prove the Rabinowitz's conjecture in the case of H satisfying such new homogeneity
We prove existence and multiplicity results for periodic solutions of Hamiltonian systems, by the us...
Some existence conditions of periodic solutions are obtained for a class of nonautono-mous subquadra...
AbstractThis paper presents a minimax method which gives existence and multiplicity results for time...
We study the minimal period problem of Hamiltonian systems which may not be strictly convex. For the...
AbstractIn this paper, we consider the superquadratic second order Hamiltonian systemu″(t)+A(t)u(t)+...
The existence of at least one nontrivial periodic solution for a class of second order Hamiltonian s...
2 This work is concerned with the study of existence and multiplicity of periodic solutions of Hamil...
AbstractIn this paper, we study the minimal period problem for the first-order Hamiltonian systems w...
AbstractConsider the periodic solutions of autonomous Hamiltonian systems x˙=J∇H(x) on the given com...
AbstractPeriodic solutions and infinitely distinct subharmonic solutions are obtained for a class of...
AbstractIn this paper, we study the existence of periodic solutions with prescribed minimal period f...
Variational methods are used in order to establish the existence and the multiplicity of nontrivial ...
In this paper we present some recent multiplicity results for a class of second order Hamiltonian sy...
AbstractThe existence and multiplicity of periodic solutions are obtained for nonautonomous second o...
By the use of a higher dimensional version of the Poincaré–Birkhoff theorem, we are able to generali...
We prove existence and multiplicity results for periodic solutions of Hamiltonian systems, by the us...
Some existence conditions of periodic solutions are obtained for a class of nonautono-mous subquadra...
AbstractThis paper presents a minimax method which gives existence and multiplicity results for time...
We study the minimal period problem of Hamiltonian systems which may not be strictly convex. For the...
AbstractIn this paper, we consider the superquadratic second order Hamiltonian systemu″(t)+A(t)u(t)+...
The existence of at least one nontrivial periodic solution for a class of second order Hamiltonian s...
2 This work is concerned with the study of existence and multiplicity of periodic solutions of Hamil...
AbstractIn this paper, we study the minimal period problem for the first-order Hamiltonian systems w...
AbstractConsider the periodic solutions of autonomous Hamiltonian systems x˙=J∇H(x) on the given com...
AbstractPeriodic solutions and infinitely distinct subharmonic solutions are obtained for a class of...
AbstractIn this paper, we study the existence of periodic solutions with prescribed minimal period f...
Variational methods are used in order to establish the existence and the multiplicity of nontrivial ...
In this paper we present some recent multiplicity results for a class of second order Hamiltonian sy...
AbstractThe existence and multiplicity of periodic solutions are obtained for nonautonomous second o...
By the use of a higher dimensional version of the Poincaré–Birkhoff theorem, we are able to generali...
We prove existence and multiplicity results for periodic solutions of Hamiltonian systems, by the us...
Some existence conditions of periodic solutions are obtained for a class of nonautono-mous subquadra...
AbstractThis paper presents a minimax method which gives existence and multiplicity results for time...
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