We prove existence and multiplicity of subharmonic solutions for Hamiltonian systems obtained as perturbations of N planar uncoupled systems which, e.g., model some type of asymmetric oscillators. The nonlinearities are assumed to satisfy Landesman–Lazer conditions at the zero eigenvalue, and to have some kind of sublinear behaviour at infinity. The proof is carried out by the use of a generalized version of the Poincaré–Birkhoff Theorem. Different situations, including Lotka-Volterra systems, or systems with singularities, are also illustrated

Subharmonic solutions of Hamiltonian systems displaying some kind of sublinear growth

TOADER, Rodica
2019-01-01

Abstract

We prove existence and multiplicity of subharmonic solutions for Hamiltonian systems obtained as perturbations of N planar uncoupled systems which, e.g., model some type of asymmetric oscillators. The nonlinearities are assumed to satisfy Landesman–Lazer conditions at the zero eigenvalue, and to have some kind of sublinear behaviour at infinity. The proof is carried out by the use of a generalized version of the Poincaré–Birkhoff Theorem. Different situations, including Lotka-Volterra systems, or systems with singularities, are also illustrated
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11390/1107311
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