Hirzebruch Classes and Motivic Chern Classes for Singular Spaces

Abstract: In this paper we study some new theories of characteristic homology classes of singular complex algebraic (or compactifiable analytic) spaces.We introduce a motivic Chern class transformation mCy: K 0 (var/X) → G 0 (X) ⊗ Z[y], which generalizes the total λ-class λy(T * X) of the cotangent bundle to singular spaces. Here K 0 (var/X) is the relative Grothendieck group of complex algebraic varieties over X as introduced and studied by Looijenga and Bittner in relation to motivic integration, and G 0 (X) is the Gr… Show more

“…Moreover, for a subgroup H of G with g ∈ H, these transformations commute with the obvious restriction functors Res G H . Also, by construction, MHT y * (id) is the complexified version of the transformation defined in [BSY,Sc09]. Finally, (52) and (63) yield the following multiplicativity property:…”

“…var/X), for any subgroup H < G. As in [BSY,Sc09], there is a natural transformation (as explained in the Appendix) χ G Hdg : K G 0 (var/X) → K 0 (MHM G (X)) to the Grothendieck group of G-equivariant mixed Hodge modules, mapping [id X ] to the class of the constant Hodge module [Q H X ]. The motivic Atiyah-Singer class transformation…”

Equivariant Characteristic Classes of Singular Complex Algebraic Varieties

“…Moreover, for a subgroup H of G with g ∈ H, these transformations commute with the obvious restriction functors Res G H . Also, by construction, MHT y * (id) is the complexified version of the transformation defined in [BSY,Sc09]. Finally, (52) and (63) yield the following multiplicativity property:…”

“…var/X), for any subgroup H < G. As in [BSY,Sc09], there is a natural transformation (as explained in the Appendix) χ G Hdg : K G 0 (var/X) → K 0 (MHM G (X)) to the Grothendieck group of G-equivariant mixed Hodge modules, mapping [id X ] to the class of the constant Hodge module [Q H X ]. The motivic Atiyah-Singer class transformation…”

Equivariant Characteristic Classes of Singular Complex Algebraic Varieties

“…In the case of complex algebraic varieties, one may also look at the MacPherson Chern classes [131], the Baum-Fulton-MacPherson Todd classes [6], the homology Hirzebruch classes [25,37] and their associated Hodge-genera defined in terms of the mixed Hodge structures on the (intersection) cohomology groups. The papers [35,36,37] provide Hodgetheoretic applications of the above topological stratified multiplicative formulae.…”

The decomposition theorem, perverse sheaves and the topology of algebraic maps

“…In the case of complex algebraic varieties, one may also look at the MacPherson Chern classes [132], the Baum-Fulton-MacPherson Todd classes [6], the homology Hirzebruch classes [25,37] and their associated Hodge-genera defined in terms of the mixed Hodge structures on the (intersection) cohomology groups. The papers [35,36,37] provide Hodge-theoretic applications of the above topological stratified multiplicative formulae.…”

Untitled