Resonance identity, stability and multiplicity of closed characteristics on compact convex hypersurfaces
Abstract
There is a long standing conjecture in Hamiltonian analysis which claims that there exist at least n geometrically distinct closed characteristics on every compact convex hypersurface in 2n with n 2. Besides many partial results, this conjecture has been only completely solved for n=2. In this paper, we give a confirmed answer to this conjecture for n=3. In order to prove this result, we establish first a new resonance identity for closed characteristics on every compact convex hypersurface in 2n when the number of geometrically distinct closed characteristics on is finite. Then using this identity and earlier techniques of the index iteration theory, we prove the mentioned multiplicity result for 6. If there are exactly two geometrically distinct closed characteristics on a compact convex hypersuface in 4, we prove that both of them must be irrationally elliptic.
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