Factoriality of normal projective varieties

Abstract

For a normal projective variety X, the Q-factoriality defect σ(X) is defined to be the rank of the quotient of the group of Weil divisors by the subgroup of Cartier ones. We prove a slight improvement of a topological formula of S.G. Park and M. Popa asserting that σ(X)=h2n-2(X)-h2(X) by assuming only 2-semi-rationality, that is, Rkπ* OX=0 for k=1,2, instead of rational singularities for X, where π:X X is a desingularization with hk(X):= Hk(X, Q) and n:= X>2. Our proof generalizes the one by Y. Namikawa and J.H.M. Steenbrink for the case n=3 with isolated hypersurface singularities. We also give a proof of (a slight generalization of) the assertion that Q-factoriality implies factoriality if X is a local complete intersection whose singular locus has at least codimension three. These imply a slight improvement of Grothendieck's theorem in the projective case asserting that X is factorial if it is a local complete intersection whose singular locus has at least codimension three and at general points of its components of codimension three, X has rational singularities and is a Q-homology manifold.