L2-hard Lefschetz complete symplectic manifolds

Abstract

For a complete symplectic manifold M2n, we define the L2-hard Lefschetz property on M2n. We also prove that the complete symplectic manifold M2n satisfies L2-hard Lefschetz property if and only if every class of L2-harmonic forms contains a L2 symplectic harmonic form. As an application, we get if M2n is a closed symplectic parabolic manifold which satisfies the hard Lefschetz property, then its Euler characteristic satisfies the inequality (-1)n(M2n)≥0.