A note on Euler number of locally conformally K\"ahler manifolds

Abstract

Let M2n be a compact Riemannian manifold of non-positive (resp. negative) sectional curvature. We call (M,J,θ) a d(bounded) locally conformally K\"ahler manifold if the lifted Lee form θ on the universal covering space of M is d(bounded). We shown that if M2n is homeomorphic to a d(bounded) LCK manifold, then its Euler number satisfies the inequality (-1)n(M2n)≥ (resp. >) 0.