Constant coefficient and intersection complex $L$-classes of projective varieties

For a projective variety $X$ we have the intersection complex $L$-class defined by using the self-duality of the intersection complex and also the constant coefficient $L$-class which is the specialization at $y=1$ of the Hirzebruch characteristic class defined by taking a cubic hyperresolution. We show that these two $L$-classes differ if they do for an intersection of general hyperplane sections which has only cohomologically isolated singularities. So the study of a sufficient condition for non-coincidence is reduced to the latter case, where a necessary and sufficient condition has been obtained in terms of mixed Hodge structures on the stalks of the intersection complex in our previous paper. We also construct examples of projective varieties where the two $L$-classes differ although the constant coefficient and intersection cohomologies coincide.