Constant coefficient and intersection complex L-classes of projective varieties
Abstract
For a projective variety X, we have the intersection complex L-classes L*(X) defined by Goresky-MacPerson using cohomotopy and also the constant coefficient L-class Lc*(X) defined by applying an L-class transformation (or T1*) to a cubic hyperresolution of X. These coincide if X is a Q-homology manifold. We show that the two L-classes L*(X) and Lc*(X) differ if they do by replacing X with an intersection of general hyperplane sections which has only Q-homologically isolated singularities. Finding a good sufficient condition for the non-coincidence of L*(X) and Lc*(X) is thus reduced to the latter case, where a necessary and sufficient condition has been obtained in terms of the Hodge signatures of stalks of intersection complex in our previous paper. In the case of projective hypersurfaces having only isolated singularities, the difference between L*(X) and Lc*(X) is given by the Hodge signatures of the link cohomologies at singular points, and the Hodge signatures of the vanishing cohomologies give the difference between Lc*(X) and the virtual L-class of X, that is, the image by a retraction map of the L-class of a smooth deformation of X in an ambient smooth projective variety Y in the very ample case.
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