Enriched categories of correspondences and characteristic classes of singular varieties

Abstract

For the category V of complex algebraic varieties, the Grothendieck group of the commutative monoid of the isomorphism classes of correspondences X f M g Y with proper morphism f and smooth morphism g (such a correspondence is called a proper-smooth correspondence) gives rise to an enriched category Corr( V)+pro-sm of proper-smooth correspondences. In this paper we extend the well-known theories of characteristic classes of singular varieties such as Baum-Fulton-MacPherson's Riemann-Roch (abbr. BFM-RR) and MacPherson's Chern class transformation and so on to this enriched category Corr( V)+pro-sm. In order to deal with local complete intersection (abbr. .c.i.) morphism instead of smooth morphism, in a similar manner we consider an enriched category Zigzag( V)+pro-.c.i. of proper-.c.i. zigzags and extend BFM-RR to this enriched category Zigzag( V)+pro-.c.i.. We also consider an enriched category M*,*( V)+ of proper-smooth correspondences (X f M g Y; E) equipped with complex vector bundle E on M (such a correspondence is called a cobordism bicycle of vector bundle) and we extend BFM-RR to this enriched category M*,*( V)+ as well.