On the topological decomposition of the hypersurfaces in projective toric manifolds

Abstract

In this paper, we want to discuss the topology of the non-singular hypersurface Yn with complex dimension n in a projective toric manifold Xn+1. When n is odd, our main results are a decomposition of Yn Y' \ s(Sn × Sn) as a connected sum of s copies of Sn × Sn with a differential manifold Y' such that bn (Y')=0 or 2. When n is even and the degree of Y in X is big enough, we find that Y also admits such a decomposition Y' \ s(Sn × Sn), where Y' satisfy bn(Y')-|sign(Y')|=bn(X) sign(Hn(X)), where sign(Hn(X)) is the signature of a certain bilinear form defined on Hn(X,).