Integral Perverse Obstructions for Normal Surface Singularities: Resolution Determinants and Monodromy

Abstract

For a germ (X,0) of a normal complex analytic surface, let E:=H0(p+ICX Z)0, where pICX Z and p+ICX Z denote the ordinary and dual middle-perversity intersection complexes with integral coefficients. This finite abelian group measures the integral discrepancy between the two middle extensions. Motivated by work of Jung--Saito, we study E as a local invariant of the singularity. We prove that E admits a topological realization as H2(L, Z), where L is the link of the singularity, and a geometric realization as the discriminant group of the exceptional lattice of the minimal resolution. In particular, if M is the intersection matrix of the irreducible exceptional curves, then |E|=|(M)|. If (X,0) is an isolated hypersurface surface singularity, we further prove that E (T-), where T is the Milnor monodromy on integral vanishing cohomology. Under the additional hypothesis that (T-) Z Q is an isomorphism, this yields |E|=|(T-)|. Thus the same local integral obstruction admits compatible perverse, topological, resolution-theoretic, and monodromy-theoretic realizations.