On the mean indices of closed characteristics on dynamically convex star-shaped hypersurfaces in R2n

Abstract

In this paper, we prove that for every dynamically convex compact star-shaped hypersurface ⊂R2n, there exist at least n+12 geometrically distinct closed characteristics possessing irrational mean indices provided the number of geometrically distinct closed characteristics on is finite, this improves Theorem 1.3 in LoZ of Y. Long and C. Zhu by finding one more closed characteristic possessing irrational mean index when n is odd. Moreover, there exist at least n+12+1 geometrically distinct closed characteristics such that the ratio of the mean indices of any two of them is a irrational number provided the number of geometrically distinct closed characteristics on is finite, this improves Theorem 1.2 in HuO of X. Hu and Y. Ou when n is odd. In particular, these estimates are sharp for n=3.