English

Verdier specialization via weak factorization

Algebraic Geometry 2013-07-04 v2

Abstract

Let X in V be a closed embedding, with V - X nonsingular. We define a constructible function on X, agreeing with Verdier's specialization of the constant function 1 when X is the zero-locus of a function on V. Our definition is given in terms of an embedded resolution of X; the independence on the choice of resolution is obtained as a consequence of the weak factorization theorem of Abramovich et al. The main property of the specialization function is a compatibility with the specialization of the Chern class of the complement V-X. With the definition adopted here, this is an easy consequence of standard intersection theory. It recovers Verdier's result when X is the zero-locus of a function on V. Our definition has a straightforward counterpart in a motivic group. The specialization function and the corresponding Chern class and motivic aspect all have natural `monodromy' decompositions, for for any X in V as above. The definition also yields an expression for Kai Behrend's constructible function when applied to (the singularity subscheme of) the zero-locus of a function on V.

Keywords

Cite

@article{arxiv.1009.2483,
  title  = {Verdier specialization via weak factorization},
  author = {Paolo Aluffi},
  journal= {arXiv preprint arXiv:1009.2483},
  year   = {2013}
}

Comments

Minor revision. To appear in Arkiv f\"or Matematik

R2 v1 2026-06-21T16:13:21.184Z