Stability of closed characteristics on symmetric compact convex hypersurfaces in 2n

Abstract

In this article, let ⊂2n be a compact convex hypersurface which is symmetric with respect to the origin. We prove that if carries finitely many geometrically distinct closed characteristics, then at least n-1 of them must be non-hyperbolic; if carries exactly n geometrically distinct closed characteristics, then at least two of them must be elliptic.