An investigation is made of a class of Calabi-Yau spaces for which the manifold may be
represented as a complete intersection of polynomials in a product of projective spaces.
There are at least a hundred topologically distinct manifolds in this class. All manifolds in this
class have negative Euler numbers which lie in the range of− 200⩽ χ⩽ 0.

Based on the method by Küchle (Math Z 218 (4), 563–575, 1995), we give a procedure to list
up all complete intersection Calabi–Yau manifolds with respect to direct sums of irreducible
homogeneous vector bundles on Grassmannians for each dimension. In particular, we give
a classification of such Calabi–Yau 3-folds and determine their topological invariants. We
also give alternative descriptions for some of them.