Motivic bivariant characteristic classes
Abstract
The relative Grothendieck group is the free abelian group generated by the isomorphism classes of complex algebraic varieties over modulo the "scissor relation". The motivic Hirzebruch class is a unique natural transformation satisfying that for a nonsingular variety the value of the isomorphism class of the identity is the Poincar\'e dual of the Hirzebruch cohomology class of the tangent bundle . It "unifies" the well-known three characteristic classes of singular varieties: MacPherson's Chern class, Baum-Fulton-MacPherson's Todd class (or Riemann-Roch) and Goresky-MacPherson's L-class or Cappell-Shaneson's L-class. In this paper we construct a bivariant relative Grothendieck group so that it equals the original relative Grothendieck group when is a point. We also construct a unique Grothendieck transformation satisfying a certain normalization condition for a smooth morphism so that it equals the motivic Hirzebruch class when is a point. When , is a "motivic" lift of Fulton-MacPherson's bivariant Riemann-Roch .
Keywords
Cite
@article{arxiv.1005.1124,
title = {Motivic bivariant characteristic classes},
author = {Shoji Yokura},
journal= {arXiv preprint arXiv:1005.1124},
year = {2011}
}
Comments
This paper has been withdrawn since its much improved version with Joerg Schuermann joining as a co-author has been posted as arXiv:1110.2166v1 [math.AG] with the same title