Multiplicity and stability of 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 satisfying Pk=I2n, ker(Pl-I2n)=0 for 1≤ l< k, where n, k≥2. In this paper, we prove that there exist at least n geometrically distinct closed characteristics on , which solves a longstanding conjecture about the multiplicity of closed characteristics for a broad class of compact convex hypersurfaces with symmetries(cf.,Page 235 of Eke1). Based on the proof, we further prove that if the number of geometrically distinct closed characteristics on is finite, then at least 2[n2] of them are non-hyperbolic; and if the number of geometrically distinct closed characteristics on is exactly n and k≥3, then all of them are P-cyclic symmetric, where a closed characteristic (τ, y) on is called P-cyclic symmetric if y( R)=Py( R).