Mathematics – Dynamical Systems
Scientific paper
2000-09-19
Annali della Scuola Normale Superiore di pisa, serie IV. vol. XXVII, fasc 2, 1998
Mathematics
Dynamical Systems
37 pages
Scientific paper
We consider autonomous Lagrangian systems with two degrees of freedom, having an hyperbolic equilibrium of saddle-saddle type (that is the eingenvalues of the linearized system about the equilibrium are $\pm \lambda_1, \pm \lambda_2 $, $\lambda_1, \lambda_2 > 0$). We assume that $\lambda_1 > \lambda_2$ and that the system possesses two homoclinic orbits. Under a nondegeneracy assumption on the homoclinics and under suitable conditions on the geometric behaviour of these homoclinics near the equilibrium we prove, by variational methods, then they give rise to an infinite family of multibump homoclinic solutions and that the topological entropy at the zero energy level is positive. A method to deal also with homoclinics satisfying a weaker nondegeneracy condition is developed and it is applied, for simplicity, when $\lambda_1 \approx \lambda_2$. An application to a perturbation of a uncoupled system is also given.
Berti Massimiliano
Bolle Philippe
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