Elliptic and non-hyperbolic closed characteristics on compact convex P-cyclic symmetric hypersurfaces in R2n

Abstract

Let be a compact convex hypersurface in R2n which is P-cyclic symmetric, i.e., x∈ implies Px∈ with P being a 2n×2n symplectic orthogonal matrix and Pk=I2n, where n, k≥2, ker(P-I2n)=0. In this paper, we first generalize Ekeland index theory for periodic solutions of convex Hamiltonian system to a index theory with P boundary value condition and study its relationship with Maslov P-index theory, then we use index theory to prove the existence of elliptic and non-hyperbolic closed characteristics on compact convex P-cyclic symmetric hypersurfaces in R2n for a broad class of symplectic orthogonal matrix P.