Stability of closed characteristics on compact convex hypersurfaces in R2n
Abstract
Let ⊂ 2n with n≥2 be any C2 compact convex hypersurface and only has finitely geometrically distinct closed characteristics. Based on Y.Long and C.Zhu 's index jump methods LoZ1, we prove that there are at least two geometrically distinct elliptic closed characteristics, and moreover, there exist at least n () (n()≥[n2]+1) geometrically distinct closed characteristics such that for any two elements among them, the ratio of their mean indices is irrational number.
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