On the Behrend function and the blowup of some fat points

Abstract

The Behrend function of a C-scheme X is a constructible function X X( C) Z introduced by Behrend, intrinsic to the scheme structure of X. It is a (subtle) invariant of singularities of X, playing a prominent role in enumerative geometry. To date, only a handful of general properties of the Behrend function are known. In this paper, we compute it for a large class of fat points (schemes supported at a single point). We first observe that, if X AN is a fat point, X is the sum of the multiplicities of the irreducible components of the exceptional divisor EX AN in the blowup BlX AN. Moreover, we prove that X can be computed explicitly through the normalisation of BlX AN. The proofs of our explicit formulas for the Behrend function of a fat point in A2 rely heavily on toric geometry techniques. Along the way, we find a formula for the number of irreducible components of EX A2, where X A2 is a fat point such that BlX A2 is normal.