Stable P-symmetric closed characteristics on partially symmetric compact convex hypersurfaces

Abstract

In this paper, let n≥2 be an integer, P=diag(-In-,I,-In-,I) for some integer ∈[0, n-1), and ⊂ R2n be a partially symmetric compact convex hypersurface, i.e., x∈ implies Px∈. We prove that if is (r,R)-pinched with Rr<53, then carries at least two geometrically distinct P-symmetric closed characteristics which possess at least 2n-4 Floquet multipliers on the unit circle of the complex plane.