Global Weinstein Type Theorem on Multiple Rotating Periodic Solutions for Hamiltonian Systems
Abstract
This paper concerns the existence of multiple rotating periodic solutions for 2n dimensional convex Hamiltonian systems. For the symplectic orthogonal matrix Q, the rotating periodic solution has the form of z(t+T)=Qz(t), which might be periodic, anti-periodic, subharmonic or quasi-periodic according to the structure of Q. It is proved that there exist at least n geometrically distinct rotating periodic solutions on a given Q invariant convex energy surface under a pinching condition. As a result, it is proved that if the symmetric energy surface admits a nonsymmetric periodic solution, it has infinitely many periodic orbits. In order to prove the result, we introduce a new index on rotating periodic orbits.
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