Calabi-Yau manifolds from pairs of non-compact Calabi-Yau manifolds

We construct the non-compact Calabi-Yau manifolds interpreted as the complex line bundles over the Hermitian symmetric spaces. These manifolds are the various generalizations of the complex line bundle over CP N -1 . Imposing an F-term constraint on the line bundle over CP N -1 , we obtain the line

## Abstract We show that the supersymmetry transformations for type II string theories on six‐manifolds can be written as differential conditions on a pair of pure spinors, the exponentiated Kähler form e^__iJ__^ and the holomorphic form O. The equations are explicitly symmetric under exchange of t

Let M = M L x 9 9 -x M m be a product of K~ihler C-spaces with second Betti numbers b2(g t) = 1 (1 ~t ~ m). The work establishes that the complete intersections X of M produce a finite number of N-dimensxonal Calabi-Yau manifolds. Moreover, if b4(M,) = 1, then the complete intersections with vanish