On the topology of a resolution of isolated singularities

Abstract

Let Y be a complex projective variety of dimension n with isolated singularities, π:X Y a resolution of singularities, G:=π-1Sing(Y) the exceptional locus. From Decomposition Theorem one knows that the map Hk-1(G) Hk(Y,Y Sing(Y)) vanishes for k>n. Assuming this vanishing, we give a short proof of Decomposition Theorem for π. A consequence is a short proof of the Decomposition Theorem for π in all cases where one can prove the vanishing directly. This happens when either Y is a normal surface, or when π is the blowing-up of Y along Sing(Y) with smooth and connected fibres, or when π admits a natural Gysin morphism. We prove that this last condition is equivalent to say that the map Hk-1(G) Hk(Y,Y Sing(Y)) vanishes for any k, and that the pull-back π*k:Hk(Y) Hk(X) is injective. This provides a relationship between Decomposition Theorem and Bivariant Theory.