Non-hyperbolic closed characteristics on non-degenerate star-shaped hypersurfaces in R2n

Abstract

In this paper, we prove that for every index perfect non-degenerate compact star-shaped hypersurface ⊂ R2n, there exist at least n non-hyperbolic closed characteristics with even Maslov-type indices on when n is even. When n is odd, there exist at least n closed characteristics with odd Maslov-type indices on and at least (n-1) of them are non-hyperbolic. Here we call a compact star-shaped hypersurface ⊂ R2n index perfect if it carries only finitely many geometrically distinct prime closed characteristics, and every prime closed characteristic (τ,y) on possesses positive mean index and whose Maslov-type index i(y, m) of its m-th iterate satisfies i(y, m)= -1 when n is even, and i(y, m)∈ \-2,-1,0\ when n is odd for all m∈ N.