On the minimal number of periodic orbits on some hypersurfaces in R2n
Abstract
We study periodic orbits on a nondegenerate dynamically convex starshaped hypersurface in R2n along the lines of Long and Zhu, but using properties of the S1-equivariant symplectic homology. We prove that there exist at least n distinct simple periodic orbits on any nondegenerate starshaped hypersurface in R2n satisfying the condition that the minimal Conley-Zehnder index is at least n-1. The condition is weaker than dynamical convexity.
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