Local topological obstruction for divisors

Abstract

Given a smooth, projective variety X and an effective divisor D\,⊂eq\, X, it is well-known that the (topological) obstruction to the deformation of the fundamental class of D as a Hodge class, lies in H2(OX). In this article, we replace H2(OX) by H2D(OX) and give an analogous topological obstruction theory. We compare the resulting local topological obstruction theory with the geometric obstruction theory (i.e., the obstruction to the deformation of D as an effective Cartier divisor of a first order infinitesimal deformations of X). We apply this to study the jumping locus of families of linear systems and the Noether-Lefschetz locus. Finally, we give examples of first order deformations Xt of X for which the cohomology class [D] deforms as a Hodge class but D does not lift as an effective Cartier divisor of Xt.