Some remarks on the uniqueness of the complex projective spaces

Abstract

We first notice in this article that if a compact K\"ahler manifold has the same integral cohomology ring and Pontrjagin classes as the complex projective space CPn, then it is biholomorphic to CPn provided n is odd. The same holds for even n if we further assume that M is simply-connected. This technically refines a classical result of Hirzebruch-Kodaira and Yau. This observation, together with a result of Dessai and Wilking, enables us to characterize all CPn in terms of homotopy type under mild symmetry. When n=4, we can drop the requirement on Pontrjagin classes by showing that a simply-connected compact K\"ahler manifold having the same integral cohomology ring as CP4 is biholomorphic to CP4, which improves on results of Fujita and Libgober-Wood.