On the degenerated Arnold-Givental conjecture

Abstract

We present another view dealing with the Arnold-Givental conjecture on a real symplectic manifold (M, ω, τ) with nonempty and compact real part L= Fix(τ). For given ∈ (0, +∞] and m∈\0\ we show the equivalence of the following two claims: (i) (LφH1(L)) m for any Hamiltonian function H∈ C0∞([0, 1]× M) with Hofer's norm \|H\|<; (ii) P(H,τ) m for every H∈ C∞0(/× M) satisfying H(t,x)=H(-t,τ(x))\;∀ (t,x)∈R× M and with Hofer's norm \|H\|<2, where P(H, τ) is the set of all 1-periodic solutions of x(t)=XH(t,x(t)) satisfying x(-t)=τ(x(t))\;∀ t∈ (which are also called brake orbits sometimes). Suppose that (M, ω) is geometrical bounded for some J∈ J(M,ω) with τ J=-J and has a rationality index rω>0 or rω=+∞. Using Hofer's method we prove that if the Hamiltonian H in (ii) above has Hofer's norm \|H\|<rω then (LφH1(L)) P0(H,τ) Cuplength(L) for =2, and further for = if L is orientable, where P0(H,τ) consists of all contractible solutions in P(H,τ).